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- ...around North America. Inspired by Eastern European teaching models, math circles often take a problem-discussion approach to teaching and learning [[mathema == Math Circles by City ==3 KB (436 words) - 18:35, 26 August 2021
- ...ber of points of intersection that can occur when <math>2</math> different circles and <math>2</math> different straight lines are drawn on the same piece of ...rcles in <math>4</math> points. Draw another line which intersects the two circles in <math>4</math> points and also intersects the first line. There are <mat1 KB (188 words) - 17:11, 7 August 2020
- ==PaperMath’s circles== ...of the congruent circles and where <math>n</math> is the number of tangent circles.4 KB (665 words) - 23:04, 27 March 2024
Page text matches
- ...ius <math>r > s</math> is tangent to both axes and to the second and third circles. What is <math>r/s</math>?2 KB (307 words) - 15:30, 30 March 2024
- * [[Math circles]] -- There are many in California.4 KB (514 words) - 04:02, 21 September 2023
- * [http://www.geometer.org/mathcircles/ Tom Davis's] site for [[math circles]] topics. * [http://www.geometer.org/mathcircles/ Tom Davis's] site for [[math circles]] topics.4 KB (516 words) - 03:01, 13 April 2023
- ...//www.amazon.com/exec/obidos/ASIN/0821804308/artofproblems-20 Mathematical Circles] -- A wonderful peak into Russian math training.24 KB (3,177 words) - 12:53, 20 February 2024
- ...around North America. Inspired by Eastern European teaching models, math circles often take a problem-discussion approach to teaching and learning [[mathema == Math Circles by City ==3 KB (436 words) - 18:35, 26 August 2021
- * [[Math circles]]713 bytes (94 words) - 13:36, 10 June 2008
- |[[Toronto Math Circles]] (Toronto Math Circles B1)19 KB (2,632 words) - 14:31, 12 June 2022
- ==Lines in Circles== *How many circles with radius <math>r</math> can we fit around a circle with radius <math>r</9 KB (1,581 words) - 18:59, 9 May 2024
- *Let <math> w_1 </math> and <math> w_2 </math> denote the circles <math> x^2+y^2+10x-24y-87=0 </math> and <math> x^2 +y^2-10x-24y+153=0, </ma5 KB (892 words) - 21:52, 1 May 2021
- 327 bytes (41 words) - 22:27, 24 April 2008
- ...n use properties of similarity. Additionally, similarity (especially with circles) where parallel lines are used can indicate that homothety can be used, and3 KB (532 words) - 01:11, 11 January 2021
- 6 KB (1,181 words) - 22:37, 22 January 2023
- Eight circles of diameter 1 are packed in the first quadrant of the coordinate plane as s7 KB (1,173 words) - 03:31, 4 January 2023
- ...ed circles splitting into congruent areas, and there are an additional two circles on each side. The line passes through <math>\left(1,\frac 12\right)</math> Assume that if unit [[square]]s are drawn circumscribing the circles, then the line will divide the area of the [[concave]] hexagonal region of4 KB (731 words) - 17:59, 4 January 2022
- ...ers that are <math>\tfrac{4}{3}</math> units apart. Two externally tangent circles <math>\omega_1</math> and <math>\omega_2</math> of radius <math>r_1</math>12 KB (1,784 words) - 16:49, 1 April 2021
- .../math> and <math> \overline{BC}</math> are common external tangents to the circles. What is the area of hexagon <math> AOBCPD</math>?13 KB (2,058 words) - 12:36, 4 July 2023
- ...nally tangent circles, as shown. What is the sum of the areas of the three circles? ...and <math>8</math>, respectively. A common internal tangent intersects the circles at <math>C</math> and <math>D</math>, respectively. Lines <math>AB</math> a15 KB (2,223 words) - 13:43, 28 December 2020
- ...ius <math>r > s</math> is tangent to both axes and to the second and third circles. What is <math>r/s</math>?13 KB (1,971 words) - 13:03, 19 February 2020
- ...ly tangent to each other, and internally tangent to circle <math>D</math>. Circles <math>B</math> and <math>C</math> are congruent. Circle <math>A</math> has13 KB (1,953 words) - 00:31, 26 January 2023
- ...t circle is tangent to the six circles that surround it, and each of those circles is tangent to the large circle and to its small-circle neighbors. Find the Let <math>C_1</math> and <math>C_2</math> be circles defined by <math>(x-10)^2 + y^2 = 36</math> and <math>(x+15)^2 + y^2 = 81</12 KB (1,792 words) - 13:06, 19 February 2020
- ...in a plane. What is the maximum number of points where at least two of the circles intersect?10 KB (1,547 words) - 04:20, 9 October 2022
- An annulus is the region between two concentric circles. The concentric circles in the figure have radii <math>b</math> and <math>c</math>, with <math>b>c13 KB (2,049 words) - 13:03, 19 February 2020
- ...h>1</math> foot. Each tile has a pattern consisting of four white quarter circles of radius <math>1/2</math> foot centered at each corner of the tile. The r12 KB (1,781 words) - 12:38, 14 July 2022
- .../math> and <math> \overline{BC}</math> are common external tangents to the circles. What is the area of hexagon <math> AOBCPD</math>? ...> and <math>\angle ADP</math> are right angles due to being tangent to the circles, and the altitude creates <math>\angle OHD</math> as a right angle. <math>A3 KB (458 words) - 16:40, 6 October 2019
- ...y tangent [[circle]]s, as shown. What is the sum of the areas of the three circles?1 KB (184 words) - 13:57, 19 January 2021
- ...[[common internal tangent line | common internal tangent]] intersects the circles at <math>C</math> and <math>D</math>, respectively. Lines <math>AB</math> a2 KB (286 words) - 10:16, 19 December 2021
- ...ctively. The equation of a common external [[tangent line|tangent]] to the circles can be written in the form <math>y=mx+b</math> with <math>m>0</math>. What2 KB (253 words) - 22:52, 29 December 2021
- ...h>1</math> foot. Each tile has a pattern consisting of four white quarter circles of radius <math>1/2</math> foot centered at each corner of the tile. The r2 KB (223 words) - 14:30, 15 December 2021
- ...in the coordinate plane. To find the circle enclosing these <math>4</math> circles, notice that if you connect the <math>4</math> centers as a square, the dia2 KB (364 words) - 04:54, 16 January 2023
- ...le of radius 2. The sides of <math>\triangle ABC</math> are tangent to the circles as shown, and the sides <math>\overline{AB}</math> and <math>\overline{AC} ...and <math>8</math>, respectively. A common internal tangent intersects the circles at <math>C</math> and <math>D</math>, respectively. Lines <math>AB</math> a13 KB (2,028 words) - 16:32, 22 March 2022
- ...<math>2</math>. The sides of <math>\triangle ABC</math> are tangent to the circles as shown, and the sides <math>\overline{AB}</math> and <math>\overline{AC} Let the centers of the smaller and larger circles be <math>O_1</math> and <math>O_2</math> , respectively.5 KB (732 words) - 23:19, 19 September 2023
- ...math> C_2 </math> are 4 and 10, respectively, and the centers of the three circles are all collinear. A chord of <math> C_3 </math> is also a common external Let <math> w_1 </math> and <math> w_2 </math> denote the circles <math> x^2+y^2+10x-24y-87=0 </math> and <math> x^2 +y^2-10x-24y+153=0, </ma7 KB (1,119 words) - 21:12, 28 February 2020
- ...> C_2 </math> are 4 and 10, respectively, and the [[center]]s of the three circles are all [[collinear]]. A [[chord]] of <math> C_3 </math> is also a common e ...e the centers and <math>r_1 = 4, r_2 = 10,r_3 = 14</math> the radii of the circles <math>C_1, C_2, C_3</math>. Let <math>T_1, T_2</math> be the points of tang4 KB (693 words) - 13:03, 28 December 2021
- ...from another school asked me for my formula sheets. In my local and state circles, students’ formula sheets were the source of knowledge, the source of pow6 KB (1,039 words) - 17:43, 30 July 2018
- Contrary to the belief in some circles, "mathematician" is not synonymous with "professor of mathematics", althoug918 bytes (123 words) - 10:42, 30 July 2006
- ...e area of the region inside circle <math> C </math> and outside of the six circles in the ring. Find <math> \lfloor K \rfloor. </math>6 KB (983 words) - 05:06, 20 February 2019
- ...e area of the region inside circle <math> C </math> and outside of the six circles in the ring. Find <math> \lfloor K \rfloor</math> (the [[floor function]]). Define the radii of the six congruent circles as <math>r</math>. If we draw all of the radii to the points of external ta1 KB (213 words) - 13:17, 22 July 2017
- ...th> have center <math>(x,y)</math> and radius <math>r</math>. Now, if two circles with radii <math>r_1</math> and <math>r_2</math> are externally tangent, th .... In particular, the locus of points <math>C</math> that can be centers of circles must be an ellipse with foci <math>F_1</math> and <math>F_2</math> and majo12 KB (2,000 words) - 13:17, 28 December 2020
- ...>. Thus, they enclose the area of the square minus the area of the quarter circles, which is <math>4-\pi \approx 0.86</math>, so <math>100k = \boxed{086}</mat3 KB (532 words) - 09:22, 11 July 2023
- ...circle contained within the trapezoid is [[tangent]] to all four of these circles. Its radius is <math> \frac{-k+m\sqrt{n}}p, </math> where <math> k, m, n, <3 KB (431 words) - 23:21, 4 July 2013
- ...h> A circle contained within the trapezoid is tangent to all four of these circles. Its radius is <math> \frac{-k+m\sqrt{n}}p, </math> where <math> k, m, n, <9 KB (1,410 words) - 05:05, 20 February 2019
- In the adjoining figure, two circles with radii <math>8</math> and <math>6</math> are drawn with their centers <7 KB (1,104 words) - 12:53, 6 July 2022
- ...one side of the line is equal to the total area of the parts of the three circles to the other side of it. What is the absolute value of the slope of this li6 KB (933 words) - 01:15, 19 June 2022
- ...</math>. Let <math>R\,</math> and <math>S\,</math> be the points where the circles inscribed in the triangles <math>ACH\,</math> and <math>BCH^{}_{}</math> ar8 KB (1,275 words) - 06:55, 2 September 2021
- ...th>9</math> has a chord that is a common external tangent of the other two circles. Find the square of the length of this chord.6 KB (1,000 words) - 00:25, 27 March 2024
- Circles of radii 5, 5, 8, and <math>m/n</math> are mutually externally tangent, whe7 KB (1,098 words) - 17:08, 25 June 2020
- ...congruent circles arranged in three rows and enclosed in a rectangle. The circles are tangent to one another and to the sides of the rectangle as shown in th8 KB (1,374 words) - 21:09, 27 July 2023
- ...circle of radius 1 is colored red, and each region bounded by consecutive circles is colored either red or green, with no two adjacent regions the same color6 KB (965 words) - 16:36, 8 September 2019
- ...he line <math>y = mx</math>, where <math>m > 0</math>, are tangent to both circles. It is given that <math>m</math> can be written in the form <math>a\sqrt {b7 KB (1,177 words) - 15:42, 11 August 2023
- Find the area of rhombus <math>ABCD</math> given that the radii of the circles circumscribed around triangles <math>ABD</math> and <math>ACD</math> are <m7 KB (1,127 words) - 09:02, 11 July 2023
- In the adjoining figure, two circles with radii <math>8</math> and <math>6</math> are drawn with their centers < ...math>QP = PR = x</math>. Extend the line containing the centers of the two circles to meet <math>R</math>, and to meet the other side of the large circle at a13 KB (2,149 words) - 18:44, 5 February 2024
- ...side of the line is equal to the total [[area]] of the parts of the three circles to the other side of it. What is the [[absolute value]] of the [[slope]] of ...e [[midpoint]] of <math>\overline{AC}</math> (the centers of the other two circles), and call it <math>M</math>. If we draw the feet of the [[perpendicular]]s6 KB (1,022 words) - 19:29, 22 January 2024
- Circles of diameter <math>1</math> inch and <math>3</math> inches have the same cen1 KB (172 words) - 10:47, 19 December 2021
- ...en we found <math>AP</math>, the segment <math>OB</math> is tangent to the circles with diameters <math>AO,CO</math>.8 KB (1,270 words) - 23:36, 27 August 2023
- ...es must be tangent on the larger circle. Now consider two adjacent smaller circles. This means that the line connecting the radii is a segment of length <math ...3})^{2} = \pi (7 - 4 \sqrt {3})</math>, so the area of all <math>12</math> circles is <math>\pi (84 - 48 \sqrt {3})</math>, giving an answer of <math>84 + 484 KB (740 words) - 19:33, 28 December 2022
- ...ique area of the two circles. We can do this by adding the area of the two circles and then subtracting out their overlap. There are two methods of finding th 2. Consider that the circles can be converted into polar coordinates, and their equations are <math>r =2 KB (323 words) - 12:05, 16 July 2019
- ...at <math>AD</math> and <math>BC</math> are common external tangents to the circles. What is the area of the [[concave]] [[hexagon]] <math>AOBCPD</math>?4 KB (558 words) - 14:38, 6 April 2024
- ...</math>. Let <math>R\,</math> and <math>S\,</math> be the points where the circles inscribed in the triangles <math>ACH\,</math> and <math>BCH^{}_{}</math> ar3 KB (449 words) - 21:39, 21 September 2023
- ...he respective conditions for <math>P</math> is the region inside the (semi)circles with diameters <math>\overline{AB}, \overline{BC}, \overline{CA}</math>. ...</math> (shaded region below) is simply the sum of two [[segment]]s of the circles. If we construct the midpoints of <math>M_1, M_2 = \overline{AB}, \overline4 KB (717 words) - 22:20, 3 June 2021
- ...th>9</math> has a chord that is a common external tangent of the other two circles. Find the square of the length of this chord. We label the points as following: the centers of the circles of radii <math>3,6,9</math> are <math>O_3,O_6,O_9</math> respectively, and3 KB (605 words) - 11:30, 5 May 2024
- ...</math> with radius <math>\sqrt{2+\sqrt{3}}</math>. The equations of these circles are <math>(x-1)^2 = 1</math> and <math>x^2 + y^2 = 2 + \sqrt{3}</math>. Sol5 KB (874 words) - 22:30, 1 April 2022
- ...f the circle in question and the segment connecting the centers of the two circles of radii <math>5</math>. By the [[Pythagorean Theorem]], we now have two eq ...give the curvature for the circle internally tangent to each of the other circles. Using Descartes' theorem, we get <math>k_4=\frac15+\frac15+\frac18+2\sqrt{2 KB (354 words) - 22:33, 2 February 2021
- 3 KB (496 words) - 13:02, 5 August 2019
- To find the area between the circles (actually, parts of the circles), we need to figure out the [[angle]] of the [[arc]]. This could be done by2 KB (354 words) - 16:42, 20 July 2021
- ...way in a circle with this radius centered at <math>(x,0)</math>. All these circles are [[homothety|homothetic]] with respect to a center at <math>(5,0)</math>3 KB (571 words) - 00:38, 13 March 2014
- ...gruent [[circle]]s arranged in three rows and enclosed in a rectangle. The circles are tangent to one another and to the sides of the rectangle as shown in th Let the [[radius]] of the circles be <math>r</math>. The longer dimension of the rectangle can be written as2 KB (287 words) - 19:54, 4 July 2013
- ...dius <math>1</math> is colored red, and each region bounded by consecutive circles is colored either red or green, with no two adjacent regions the same color To get the green area, we can color all the circles of radius <math>100</math> or below green, then color all those with radius4 KB (523 words) - 15:49, 8 March 2021
- ...he line <math>y = mx</math>, where <math>m > 0</math>, are tangent to both circles. It is given that <math>m</math> can be written in the form <math>a\sqrt {b ...respectively. We know that the point <math>(9,6)</math> is a point on both circles, so we have that7 KB (1,182 words) - 09:56, 7 February 2022
- ...that tangent point is equal to A to the other tangent point (explained in circles) and etc for B and C. After doing it for B and C, C (the hypotenuse) should2 KB (336 words) - 00:44, 23 April 2024
- 1 KB (227 words) - 22:47, 1 March 2008
- Circles of diameter 1 inch and 3 inches have the same center. The smaller circle is ...at <math>AD</math> and <math>BC</math> are common external tangents to the circles. What is the area of the concave hexagon <math>AOBCPD</math>?14 KB (2,059 words) - 01:17, 30 January 2024
- ...h> 1</math> foot. Each tile has a pattern consisting of four white quarter circles of radius <math> 1/2</math> foot centered at each corner of the tile. The r12 KB (1,874 words) - 21:20, 23 December 2020
- ...is of length 2 (from equilateral triangles). Let the radius of each of the circles be <math> r. </math> Drawing <math> r </math> to the tangents of the circle9 KB (1,364 words) - 15:59, 21 July 2006
- If 3 circles of radius 1 are mutually tangent as shown, what is the area of the gap they ...gap in question. The area of the three gaps is half the area of one of the circles, and is thus <math>\frac{\pi}{2}</math>. The area of the whole triangle is1 KB (173 words) - 17:09, 4 October 2016
- ...ngent to the circle <math>x^2 + y^2 = 4</math> at <math>(0,2)</math>? (Two circles are tangent at a point <math>P</math> if they intersect at <math>P</math> a1 KB (172 words) - 00:11, 16 February 2016
- If 3 circles of radius 1 are mutually tangent as shown, what is the area of the gap they ...ngent to the circle <math>x^2 + y^2 = 4</math> at <math>(0,2)</math>? (Two circles are tangent at a point <math>P</math> if they intersect at <math>P</math> a14 KB (2,102 words) - 22:03, 26 October 2018
- ...t <math>A'</math>, <math>B'</math>, and <math>C'</math>, respectively. Let circles <math>A''</math>, <math>B''</math>, <math>C''</math>, and <math>I</math> ha1 KB (236 words) - 23:58, 24 April 2013
- ...t <math>A'</math>, <math>B'</math>, and <math>C'</math>, respectively. Let circles <math>A''</math>, <math>B''</math>, <math>C''</math>, and <math>I</math> ha8 KB (1,355 words) - 14:54, 21 August 2020
- ...as an endpoint. Find, with proof, the expected value of the number of full circles formed, in terms of <math>n</math>.5 KB (789 words) - 20:56, 10 May 2024
- ...ents <math>AM </math> and <math>MB </math> as their respective bases. The circles about these squares, with respective centers <math>P </math> and <math>Q </3 KB (480 words) - 11:57, 17 September 2012
- ...e around this new point going through O and M. The intersection of the two circles is the desired third vertex of the triangle with the given hypotenuse c.6 KB (939 words) - 17:31, 15 July 2023
- ...ents <math>AM </math> and <math>MB </math> as their respective bases. The circles about these squares, with respective centers <math>P </math> and <math>Q </2 KB (408 words) - 01:40, 2 January 2023
- We use the lemma that given two non-coplanar circles in space that intersect at two points, there exists a point P such that P i ...ore, <math>l_1</math> and <math>l_2</math> lie on one plane. Since our two circles are not coplanar, <math>l_1</math> and <math>l_2</math> must intersect at o3 KB (509 words) - 23:22, 15 August 2012
- 1 KB (122 words) - 16:25, 18 May 2021
- ==Tangents to Circles== ...the [[radius]] that passes through the point of tangency. Any two disjoint circles have four tangents in common, two internal and two external.2 KB (332 words) - 21:54, 11 March 2024
- * All circles are similar.2 KB (261 words) - 20:42, 25 November 2023
- 4 KB (597 words) - 18:39, 9 May 2024
- ...et <math>q_1, q_2</math>, and <math>q</math> be the radii of the exscribed circles of the same triangles that lie in <math>\angle ACB</math>. Prove that3 KB (558 words) - 00:17, 10 December 2022
- ...et <math>q_1, q_2</math>, and <math>q</math> be the radii of the exscribed circles of the same triangles that lie in the angle <math>ACB</math>. Prove that2 KB (380 words) - 22:12, 19 May 2015
- ...hin one of the smaller squares, it also lands completely within one of the circles. Let <math>P</math> be the probability that, when flipped onto the grid, th8 KB (1,370 words) - 21:52, 27 February 2007
- Three congruent circles have a common point <math> \displaystyle O </math> and lie inside a given t3 KB (379 words) - 15:09, 29 October 2006
- ...h>, and sides <math>a,b,c</math>, respectively, and let the centers of the circles inscribed in the [[angle]]s <math>A,B,C</math> be denoted <math>O_A, O_B, O Suppose 3 congruent circles with centres P,Q,R lie inside ABC and are such that the circle with centre2 KB (373 words) - 23:09, 29 January 2021
- 190 bytes (28 words) - 20:07, 3 November 2006
- [[File:3 circles Euler line.png|500px|right]] ...ough <math>A, A_1</math> and is tangent to the radius AO. Similarly define circles <math>\omega_2</math> and <math>\omega_3.</math>59 KB (10,203 words) - 04:47, 30 August 2023
- Two distinct lines pass through the center of three concentric circles of radii 3, 2, and 1. The area of the shaded region in the diagram is <math ...ly tangent to each other, and internally tangent to circle <math>D</math>. Circles <math>B</math> and <math>C</math> are congruent. Circle <math>A</math> has15 KB (2,092 words) - 20:32, 15 April 2024
- ...circle. Then we have <math>R^2-r^2=300</math>. If the center of these two circles is <math>O</math>, the [[vertex | vertices]] are <math>A, B</math> and <mat1 KB (221 words) - 19:38, 6 February 2010
- (i) The circumscribed circles of the triangles <math>PP_{1}\Delta</math> and <math>PP_{2}\Gamma</math> in2 KB (294 words) - 15:12, 17 December 2006
- 1 KB (247 words) - 20:36, 11 December 2020
- Use the [[Two Tangent Theorem]] on <math>\triangle BEF</math>. Since both circles are inscribed in congruent triangles, they are congruent; therefore, <math>5 KB (818 words) - 11:05, 7 June 2022
- Three circles are mutually externally tangent. Two of the circles have radii <math>3</math> and <math>7</math>. If the area of the triangle f Circles <math>\omega_1</math> and <math>\omega_2</math> are centered on opposite si7 KB (1,135 words) - 23:53, 24 March 2019
- Three circles are mutually externally tangent. Two of the circles have radii <math>3</math> and <math>7</math>. If the area of the triangle f795 bytes (129 words) - 10:22, 4 April 2012
- Circles <math>\omega_1</math> and <math>\omega_2</math> are centered on opposite si Let <math>r_1</math> and <math>r_2</math> be the radii of circles <math>\omega_1</math> and <math>\omega_2</math> respectively.3 KB (563 words) - 02:05, 25 November 2023
- ...ent to the hypotenuse and to the extension of leg <math>CB</math>, and the circles are externally tangent to each other. The length of the radius of either c7 KB (1,218 words) - 15:28, 11 July 2022
- ...to the hypotenuse and to the extension of [[leg]] <math>CB</math>, and the circles are externally tangent to each other. The length of the radius either circ ...tangents is <math>2.4x</math>. Note that if we connect the centers of the circles we have a rectangle with sidelengths 8x and 4x. So, <math>8x+2.4x+x=34</mat11 KB (1,851 words) - 12:31, 21 December 2021
- Circles <math> \displaystyle S_1 </math> and <math> \displaystyle S_2 </math> inter ...stay fixed, at half the measure of arc <math> \displaystyle QP </math> on circles <math> \displaystyle S_1 </math> and <math> \displaystyle S_2 </math>, resp3 KB (470 words) - 07:32, 28 March 2007
- ...and <math>O_C</math>. Let the center of the circle tangent to those three circles be <math>O</math>. The [[homothety]] <math>\mathcal{H}\left(I, \frac{4-r}{4 ...h>, <math>B'</math>, <math>C'</math>, and <math>O</math> be the centers of circles <math>\omega_{A}</math>, <math>\omega_{B}</math>, <math>\omega_{C}</math>,11 KB (2,099 words) - 17:51, 4 January 2024
- 9 KB (1,435 words) - 01:45, 6 December 2021
- ...e with radius greater than <math>\frac{1}{\sqrt{2}}</math> between those 3 circles. ...ath> must decrease in radius. Hence it is sufficient to consider 3 tangent circles. By lemma 1, there is always a circle of radius greater than <math>\frac{1}5 KB (754 words) - 03:41, 7 August 2014
- ...and <math>Q_{A}</math> lie on <math>AO</math> since for a pair of tangent circles, the point of tangency and the two centers are [[collinear]].7 KB (1,274 words) - 15:11, 31 August 2017
- Circles <math>\omega_{1}</math> and <math>\omega_{2}</math> intersect at <math>P</m3 KB (519 words) - 20:59, 24 May 2007
- ...ath> be positive integers. There are given <math> \displaystyle n </math> circles in the plane. Every two of them intersect at two distinct points, and all ...rcles a distinct color, which we use for both points common to the pair of circles.5 KB (861 words) - 10:05, 5 June 2007
- '''Lemma.''' Let <math> \displaystyle \omega_1 , \omega_2 </math> be two circles with centers <math> \displaystyle O_1, O_2 </math>, and common points <math10 KB (1,539 words) - 23:37, 6 June 2007
- ...The curved parts of the band add up to a full circumference of one of the circles, so their sum is <math>20\pi\,\mathrm{ cm}</math>. The total length of the1 KB (175 words) - 22:21, 23 July 2020
- '''Lemma.''' Let <math>\omega_1, \omega_2 </math> be two circles which intersect at <math>M, N </math>, let <math>AB </math> be a chord of <4 KB (712 words) - 21:57, 25 April 2020
- Because two different circles intersect in at most two points, any polygon can be inscribed in at most on2 KB (291 words) - 05:30, 16 August 2011
- ...ent of both circles that intersects the segment joining the centers of two circles. ...ommon internal tangent line | common internal tangent]] [[intersect]]s the circles at <math>C</math> and <math>D</math>, respectively. [[Line]]s <math>AB</mat703 bytes (106 words) - 16:23, 10 March 2019
- 3 KB (553 words) - 10:45, 26 August 2015
- Circles <math> \mathcal{C}_1, \mathcal{C}_2, </math> and <math> \mathcal{C}_3 </mat8 KB (1,350 words) - 12:00, 4 December 2022
- The larger circle has radius 12 cm. Each of the six identical smaller circles smaller circles?9 KB (1,449 words) - 20:49, 2 October 2020
- ...otated in the plane, they are different from one another. At most how many circles are painted with all three colors?11 KB (1,738 words) - 19:25, 10 March 2015
- Two distinct lines pass through the center of three concentric circles of radii 3, 2, and 1. The area of the shaded region in the diagram is <math3 KB (476 words) - 03:50, 23 January 2023
- ...ega_{A}</math> denote the circle with <math>AI_{A}</math> as its diameter. Circles <math>\omega</math> and <math>\omega_{A}</math> meet at <math>P</math> othe5 KB (843 words) - 03:02, 1 July 2020
- ...e that the problem describes! We do this similarly for the others pairs of circles.2 KB (347 words) - 08:13, 26 August 2021
- ...e. Prove that the distance <math>d</math> between the centers of these two circles is3 KB (431 words) - 21:17, 20 August 2020
- The de Longchamps point of a triangle is the radical center of the power circles of the triangle. Prove that De Longchamps point lies on Euler line. ...h> point <math>A'</math> with radius <math>R_A = AA'.</math> The other two circles are defined symmetrically.10 KB (1,780 words) - 09:23, 17 November 2022
- Four circles of radius <math>1</math> are each tangent to two sides of a square and exte ...2}</math>. Segments <math>OC</math> and <math>OD</math> are tangent to the circles centered at <math>A</math> and <math>B</math>, respectively, and <math>EF</13 KB (2,058 words) - 17:54, 29 March 2024
- On the same side of a straight line three circles are drawn as follows: a circle with a radius of <math>4</math> inches is ta ...tangent to the line and to the other two circles. The radius of the equal circles is:22 KB (3,345 words) - 20:12, 15 February 2023
- ...</math> feet, a possible value for the distance between the centers of the circles, expressed in feet, is:19 KB (3,159 words) - 22:10, 11 March 2024
- ...ne <math>AB</math> at points <math>D_a,D_b</math>, respectively; let these circles touch <math>CD</math> at <math>C_a</math>, <math>C_b</math>, respectively;5 KB (953 words) - 12:18, 4 September 2018
- ...[[plane]]. What is the maximum number of points where at least two of the circles intersect?<!-- don't remove the following tag, for PoTW on the Wiki front p ...ath>2</math> times. Since there are <math>{4\choose 2} = 6</math> pairs of circles, the maximum number of possible intersections is <math>6 \cdot 2 = 12</math2 KB (282 words) - 14:04, 12 July 2021
- Four circles of radius <math>1</math> are each tangent to two sides of a square and exte ...eter of the big circle of radius <math>2</math> and two radii of the small circles of radius <math>1</math>. Therefore, the side length of this square is <cma2 KB (326 words) - 10:29, 4 June 2021
- ...ith straight edge and compass (i.e. the ability to mark off segments, draw circles and arcs, and draw straight lines) are a branch of [[geometry]] that rely o A '''compass''' is a tool that can draw circles and arcs of circles.3 KB (443 words) - 20:52, 28 August 2014
- Amanda draws five circles with radii <math>1, 2, 3,12 KB (1,800 words) - 20:01, 8 May 2023
- ...2}</math>. Segments <math>OC</math> and <math>OD</math> are tangent to the circles centered at <math>A</math> and <math>B</math>, respectively, and <math>EF</3 KB (439 words) - 15:39, 3 June 2021
- Let <math>A'</math> be the intersection of the two circles (other than <math>A</math>). <math>AA'</math> is perpendicular to both <mat ...AA'B</math> are both <math>90^{\circ}</math>, <math>A'</math> lies on the circles with diameters <math>AC</math> and <math>AB</math>.3 KB (604 words) - 20:52, 24 October 2018
- ==Circles== Point <math>M</math> lies on circles <math>APD</math> and <math>AEP' \implies </math> spiral similarity centered54 KB (9,416 words) - 08:40, 18 April 2024
- ...th>, and <math>\overline{CD}</math> bisects the right angle. The inscribed circles of <math>\triangle ADC</math> and <math>\triangle BCD</math> have radii <ma13 KB (2,025 words) - 13:56, 2 February 2021
- Ratio of areas of circles is ratio of radii squared, so the answer is <math>\left(\frac{1}{3}\right)^ ...and <math>D</math>, respectively. Since line <math>CD</math> is tangent to circles <math>O</math> and <math>P</math>, it must be perpendicular to <math>ON</ma4 KB (630 words) - 20:32, 4 June 2021
- ...closest analogue to lines on a sphere is a great circle, and any two great circles on a sphere must intersect.685 bytes (113 words) - 12:22, 20 November 2012
- ...th>, and <math>\overline{CD}</math> bisects the right angle. The inscribed circles of <math>\triangle ADC</math> and <math>\triangle BCD</math> have radii <ma6 KB (951 words) - 16:31, 2 August 2019
- A circle of radius <math>1</math> is surrounded by <math>4</math> circles of radius <math>r</math> as shown. What is <math>r</math>? ...circles to get <math>r+1.</math> You can also add the radius of two outer circles and use a <math>45-45-90</math> triangle to get <math>\frac{2r}{\sqrt{2}} =2 KB (385 words) - 14:17, 4 June 2021
- ...ly tangent to each other, and internally tangent to circle <math>D</math>. Circles <math>B</math> and <math>C</math> are congruent. Circle <math>A</math> has The four circles have curvatures <math>-\frac{1}{2}, 1, \frac{1}{r}</math>, and <math>\frac{5 KB (785 words) - 00:29, 31 July 2023
- As the red circles move about segment <math>AB</math>, they cover the area we are looking for.3 KB (434 words) - 22:25, 22 November 2021
- ...ing <math>(0,1)</math> to <math>(2,1)</math>. What is the probability that circles <math>A</math> and <math>B</math> intersect?14 KB (2,199 words) - 13:43, 28 August 2020
- ...ing <math>(0,1)</math> to <math>(2,1)</math>. What is the probability that circles <math>A</math> and <math>B</math> intersect? ...sqrt{3}</math> horizontally. Thus, if <math>|A_x-B_x|<\sqrt{3}</math>, the circles intersect.6 KB (1,008 words) - 11:46, 24 December 2020
- ...f the six whole numbers <math>10\text{--}15</math> is placed in one of the circles so that the sum, <math>S</math>, of the three numbers on each side of the t12 KB (1,670 words) - 17:42, 24 November 2021
- ...ing <math>S_2</math>, we find that <math>S</math> is the union of six unit circles centered at <math>\text{cis}\, \frac{k\pi}{6}</math>, <math>k = 0,1,2,3,4,56 KB (894 words) - 18:56, 25 December 2022
- ...<math>3 \times 6</math>, and three <math>120^{\circ}</math> degree arcs of circles of [[radius]] <math>3</math>. Thus the answer is <cmath>3(3 \times 6) + 3 \2 KB (348 words) - 19:59, 4 June 2021
- We know that these two circles already intersect at <math>O</math> so we can reflect over the line between ...ges under the inversion of lines <math>BDF</math> and <math>CFE</math> are circles that intersect in <math>A</math> and <math>F'</math>, it follows that <math20 KB (3,565 words) - 11:54, 1 May 2024
- ...0</math> is obviously referring to the x-coordinate of the point where the circles intersect at the origin, <math>D</math>, so the second value must be referr6 KB (1,026 words) - 22:35, 29 March 2023
- ...</math> feet, a possible value for the distance between the centers of the circles, expressed in feet, is: The distance between the centers of the circles (points <math>P</math> and <math>O</math>) is the sum of the heights of <ma2 KB (256 words) - 01:45, 26 June 2016
- Let <math>R</math> be a rectangle. How many circles in the plane of <math>R</math> have a diameter both of whose endpoints are15 KB (2,222 words) - 10:40, 11 August 2020
- Consider 2 concentric circles with radii <math>R</math> and <math>r</math> (<math>R>r</math>) with center3 KB (545 words) - 11:32, 30 January 2021
- ...MT = \frac{1}{2} AM \cdot UN</math> because of the equivalence of radii in circles. Hence <math>[ANM] = [DMN]</math>, so <math>A</math> and <math>D</math> are4 KB (750 words) - 23:49, 29 January 2021
- ...ion of circle <math>B</math> with the line <math>AB</math>. Thus, the two circles are externally tangent to each other. ...reasoning that we found circles <math>A,B</math> are tangent, we find that circles <math>P,A</math> and <math>P,B</math> are externally tangent also.4 KB (771 words) - 11:57, 30 January 2021
- ...<math>A,B,C,D</math> be four distinct points on a line, in that order. The circles with diameters <math>AC</math> and <math>BD</math> intersect at <math>X</ma ...h>BD</math> is line <math>DN</math>. Since the pairwise radical axes of 3 circles are concurrent, we have <math>AM,DN,XY</math> are concurrent as desired.5 KB (847 words) - 19:03, 12 October 2021
- ...passing through <math>A_1</math> and <math>A_2.</math> Suppose there exist circles <math>\omega_2, \omega_3, \dots, \omega_7</math> such that for <math>k = 2,3 KB (495 words) - 19:02, 18 April 2014
- ...passing through <math>A_1</math> and <math>A_2.</math> Suppose there exist circles <math>\omega_2, \omega_3, \dots, \omega_7</math> such that for <math>k = 2, ...heta_{1} = \theta_{7}</math> implies that <math>O_1 \equiv O_7</math>, and circles <math>\omega_1</math> and <math>\omega_7</math> are the same circle since t3 KB (609 words) - 09:52, 20 July 2016
- ...in a plane. What is the maximum number of points where at least two of the circles intersect?'' Tony realizes that he can draw the four circles such that each pair of circles intersects in two points. After careful doodling, Tony finds the correct an71 KB (11,749 words) - 01:31, 2 November 2023
- ===Common point for 6 circles=== ...math> so these circles contain point <math>O</math>. Similarly for another circles.28 KB (4,863 words) - 00:29, 16 December 2023
- ...t circle is tangent to the six circles that surround it, and each of those circles is tangent to the large circle and to its small-circle neighbors. Find the11 KB (1,733 words) - 11:04, 12 October 2021
- Circles of radius <math>2</math> and <math>3</math> are externally tangent and are ...in a plane. What is the maximum number of points where at least two of the circles intersect?10 KB (1,540 words) - 22:53, 19 December 2023
- Let <math>r_1</math> and <math>r_2</math> be the radii of circles <math>A</math> and<math> B</math>, respectively. ...rough and simplify to get <math>\frac{r_1}{r_2}=\frac{2}{3}</math>. As all circles are similar to one another, the ratio of the areas is just the square of th3 KB (492 words) - 14:46, 31 January 2024
- An annulus is the region between two concentric circles. The concentric circles in the figure have radii <math>b</math> and <math>c</math>, with <math>b>c Three circles of radius <math>1</math> are externally tangent to each other and internall13 KB (1,988 words) - 23:06, 7 March 2024
- ...<math>AB</math> passing through <math>P</math> and terminating on the two circles such that <math>AP\cdot PB</math> is a maximum. Let <math>E</math> and <math>F</math> be the centers of the small and big circles, respectively, and <math>r</math> and <math>R</math> be their respective ra2 KB (410 words) - 15:13, 13 August 2014
- ...e. Prove that the distance <math>d</math> between the centers of these two circles is2 KB (308 words) - 06:29, 16 December 2023
- In order for these two circles to be part of the same sphere and also tangent to line <math>AB</math>, the The only way these to circles can share the same tangent point on edge <math>AB</math> is if <math>|AP_{A11 KB (1,928 words) - 20:52, 21 November 2023
- ...<math>X</math>, the total locus is the union of the circumferences of all circles that have a diameter <math>AX</math>, where <math>X</math> is some point on2 KB (306 words) - 04:49, 19 February 2019
- ...<math>AB</math> passing through <math>P</math> and terminating on the two circles such that <math>AP\cdot PB</math> is a maximum.2 KB (332 words) - 18:57, 3 July 2013
- ...grid has 16 circles with radius of <math>\frac{1}{2}</math> such that all circles have vertices of the square as center. Assume that the diagram continues on11 KB (1,695 words) - 14:33, 7 March 2022
- Both sets of points are quite obviously circles. To show this, we can rewrite each of them in the form <math>(x-x_0)^2 + (y ...distance between the two centers is <math>5</math>, and therefore the two circles intersect if <math>2\leq r \leq 12</math>.1 KB (193 words) - 09:12, 2 December 2018
- Let <math>R</math> be a rectangle. How many circles in the plane of <math>R</math> have a diameter both of whose endpoints are929 bytes (132 words) - 14:29, 5 July 2013
- ...number|whole numbers]] <math>10-15</math> is placed in one of the [[circle|circles]] so that the sum, <math>S</math>, of the three numbers on each side of the3 KB (430 words) - 09:06, 22 January 2023
- ...the ratio of the area of the shaded region to the area of one of the small circles?14 KB (2,054 words) - 15:41, 8 August 2020
- ...the ratio of the area of the shaded region to the area of one of the small circles?2 KB (277 words) - 21:32, 3 July 2013
- Three circles of radius <math>1</math> are externally tangent to each other and internall ...1}{r}</math> (b/c the bigger circle is externally tangent to all the other circles, the radius of the bigger circle is negative). Then, we can solve:2 KB (287 words) - 14:05, 5 January 2022
- ...a circumscribed circle. What is the distance between the centers of those circles?5 KB (700 words) - 13:46, 6 April 2024
- ...ture, that is outside the smaller circle and inside each of the two larger circles? Let <math>C</math> and <math>D</math> be the intersections of the two large circles. Connect them to <math>A</math> and <math>B</math> to get the picture below4 KB (703 words) - 22:37, 2 November 2022
- An annulus is the region between two concentric circles. The concentric circles in the figure have radii <math>b</math> and <math>c</math>, with <math>b>c<2 KB (340 words) - 14:35, 23 April 2023
- ...around the pentagon, and calculated the area of the region between the two circles. Bethany did the same with a regular heptagon (7 sides). The areas of the13 KB (2,105 words) - 13:13, 12 August 2020
- ...s it rolls once around the circumference of circle <math>A</math>. The two circles have the same points of tangency at the beginning and end of circle <math>B ...les is four. What is the ratio of the sum of the areas of the four smaller circles to the area of the larger circle?14 KB (2,130 words) - 11:32, 7 November 2021
- ...around the pentagon, and calculated the area of the region between the two circles. Bethany did the same with a regular heptagon (7 sides). The areas of the ...itude we dropped to the side of each polygon) are the radii of the smaller circles.4 KB (630 words) - 21:27, 30 December 2023
- ...e total number of students be <math>100</math>. Draw a venn diagram with 2 circles encompassing these 4 regions:3 KB (402 words) - 10:29, 2 August 2021
- ...les is four. What is the ratio of the sum of the areas of the four smaller circles to the area of the larger circle? Draw some of the radii of the small circles as in the picture below.3 KB (474 words) - 12:50, 29 September 2023
- ...s it rolls once around the circumference of circle <math>A</math>. The two circles have the same points of tangency at the beginning and end of circle <math>B2 KB (276 words) - 09:57, 8 June 2021
- ...>\overline{AC}</math>. Moreover, the small circle is tangent to both other circles, hence we have <math>SA=1+r</math> and <math>SB=4+r</math>. ...e: This case corresponds to the other circle that is tangent to both given circles and the common tangent line. By coincidence, due to the <math>4:1</math> ra5 KB (822 words) - 01:35, 7 February 2024
- ...t circle is tangent to the six circles that surround it, and each of those circles is tangent to the large circle and to its small-circle neighbors. Find the ...s radius <math>1+1+1=3</math>, and thus area <math>9\pi</math>. The little circles have area <math>\pi</math> each; since there are 7, their total area is <ma1 KB (192 words) - 12:35, 8 November 2021
- ...hat is inscribed in it. Double means that <math>2</math> of the small full circles will be able to fit the larger semi-circle. So, therefore, the area that is2 KB (380 words) - 09:21, 8 June 2021
- Let <math>C_1</math> and <math>C_2</math> be circles defined by <math>(x-10)^2 + y^2 = 36</math> and <math>(x+15)^2 + y^2 = 81</ Line PQ is tangent to both circles, so it forms a right angle with the radii (6 and 9). This, as well as the t3 KB (485 words) - 03:13, 1 September 2023
- ...gent to circle <math>A</math> at the other two vertices of <math>T</math>. Circles <math>B</math>, <math>C</math>, and <math>D</math> are all externally tange8 KB (1,366 words) - 21:33, 3 January 2021
- ...und the region shown. Arcs <math>AB</math> and <math>AD</math> are quarter-circles, and arc <math>BCD</math> is a semicircle. What is the area, in square unit15 KB (2,165 words) - 03:32, 13 April 2024
- ...gent to circle <math>A</math> at the other two vertices of <math>T</math>. Circles <math>B</math>, <math>C</math>, and <math>D</math> are all externally tange ...B</math> and <math>E</math>, and <math>Y</math> be the intersection of the circles with centers <math>C</math> and <math>E</math>. Since the radius of <math>B2 KB (372 words) - 20:54, 9 August 2020
- Given circles <math>\omega_1</math> and <math>\omega_2</math> intersecting at points <mat2 KB (290 words) - 13:16, 17 April 2021
- ...ical axis is the line that one gets when you subtract the equations of two circles). a. The radical axis is a line perpendicular to the line connecting the circles' centers (line <math>l</math>).10 KB (1,797 words) - 02:05, 24 October 2023
- ...es, a circle is inscribed. Find the sum of the areas of all four inscribed circles (in terms of <math>a,b,c</math>).3 KB (414 words) - 12:38, 29 January 2021
- ...es, a circle is inscribed. Find the sum of the areas of all four inscribed circles (in terms of <math>a,b,c</math>).2 KB (414 words) - 12:48, 29 January 2021
- ...alpha </math>. If <math>\triangle ABD</math> is acute, prove that the four circles of radius <math>1</math> with centers <math>A</math>, <math>B</math>, <math3 KB (522 words) - 12:40, 29 January 2021
- ==Circles== ...everal useful pre defined paths for drawing things like unit squares, unit circles, etc. Just use the unit- paths!3 KB (433 words) - 22:13, 26 April 2024
- Given circles <math>\omega_1</math> and <math>\omega_2</math> intersecting at points <mat4 KB (718 words) - 18:16, 17 September 2012
- Remember, you can still draw normal functions, so you can create lines, circles and ellipses.2 KB (299 words) - 17:09, 15 March 2016
- Four circles of radius <math>3</math> are arranged as shown. Their centers are the vert17 KB (2,346 words) - 13:36, 19 February 2020
- *(E) Finding the intersection point(s) of two previously constructed circles. *(iii) <math>\theta</math> is the intersection of circles with centers <math>z</math> and <math>z'</math> and radii <math>r</math> an8 KB (1,305 words) - 08:39, 21 August 2009
- Two circles lie outside regular hexagon <math>ABCDEF</math>. The first is tangent to <m12 KB (1,817 words) - 22:44, 22 December 2020
- Let <math>\omega_1</math> and <math>\omega_2</math> be circles of radii 5 and 7, respectively, and suppose that the distance between their7 KB (1,297 words) - 01:29, 25 November 2016
- 14 KB (2,210 words) - 13:14, 11 January 2024
- ...}{54}=\frac{b^2z}{58}</math>. This equation determines the radical axis of circles <math>ANM</math> and <math>AED</math>, on which points <math>P</math> and <9 KB (1,523 words) - 15:24, 21 November 2023
- Three congruent circles with centers <math>P</math>, <math>Q</math>, and <math>R</math> are tangent14 KB (2,096 words) - 18:29, 2 January 2023
- ...math>. The larger sections trisect a "ring" which is the difference of two circles, one with radius <math>3</math>, the other radius <math>6</math>. So, the a3 KB (516 words) - 13:40, 23 January 2024
- ...either circle's center (symmetry, you chose!). The intersection of the two circles should form a geometrical lens shape. By sectors, ...}{2}x^2</math> and <math>x^2</math> are tangent. The area ratio of the two circles is <cmath>\frac{\pi}{4\pi} = \boxed{\frac{1}{4} \text{(C)}}</cmath>.6 KB (1,105 words) - 13:39, 9 January 2024
- ...he perpendicular from <math>C</math> to <math>AB</math>. We consider three circles, <math>\gamma_1, \gamma_2, \gamma_3</math>, all tangent to the line <math>A3 KB (428 words) - 13:34, 29 January 2021
- ...th>. Circle <math> Z </math> has an area of <math> 9 \pi </math>. List the circles in order from smallest to largest radius.16 KB (2,215 words) - 19:18, 10 April 2024
- Two circles lie outside regular hexagon <math>ABCDEF</math>. The first is tangent to <m3 KB (483 words) - 18:41, 4 May 2024
- Circles <math>A, B,</math> and <math>C</math> each have radius 1. Circles <math>A</math> and <math>B</math> share one point of tangency. Circle <math Circles with radii <math>1</math>, <math>2</math>, and <math>3</math> are mutually13 KB (1,994 words) - 13:52, 3 July 2021
- Circles <math>A, B,</math> and <math>C</math> each have radius 1. Circles <math>A</math> and <math>B</math> share one point of tangency. Circle <math ...requested area is the area of <math>C</math> minus the area shared between circles <math>A</math>, <math>B</math> and <math>C</math>.3 KB (515 words) - 19:56, 10 August 2023
- Circles with radii <math>1</math>, <math>2</math>, and <math>3</math> are mutually The centers of these circles form a 3-4-5 triangle, which has an area equal to 6.3 KB (462 words) - 17:49, 3 February 2024
- Circles <math>A, B,</math> and <math>C</math> each have radius 1. Circles <math>A</math> and <math>B</math> share one point of tangency. Circle <math13 KB (1,903 words) - 18:09, 19 April 2021
- ...of radius 1 that are in the same plane and tangent to each other. How many circles of radius 3 are in this plane and tangent to both <math>C_1</math> and <mat20 KB (2,814 words) - 08:15, 27 June 2021
- ==Solution 5 (Circles)==14 KB (2,269 words) - 00:43, 2 January 2023
- Amanda Reckonwith draws five circles with radii <math>1, 2, 3,2 KB (332 words) - 12:22, 16 August 2021
- Circles of radius <math>2</math> and <math>3</math> are externally tangent and are A line going through the centers of the two smaller circles also goes through the diameter. The length of this line within the circle i2 KB (247 words) - 17:30, 5 January 2021
- Descartes' Circle Formula is a relation held between four mutually tangent circles. ...tangent to circle B of radius <math>r_b</math>. Then the curvatures of the circles are simply the reciprocals of their radii, <math>\frac{1}{r_a}</math> and <2 KB (288 words) - 21:00, 24 December 2017
- Let <math>{\cal C}_1</math> and <math>{\cal C}_2</math> be concentric circles, with <math>{\cal C}_2</math> in the interior of <math>{\cal C}_1</math>.3 KB (486 words) - 06:11, 24 November 2020
- Two circles <math>\omega_1,\omega_2</math> have center <math>O_1,O_2</math> and radius ...h>7x+y=28.</math> Suppose that one of the tangent lines from the origin to circles <math>\omega_1</math> and <math>\omega_2</math> meets <math>\omega_1</math>8 KB (1,349 words) - 19:10, 14 June 2022
- ...).</math> What is the area of the intersection of the interiors of the two circles? A circle of radius <math>1</math> is surrounded by <math>4</math> circles of radius <math>r</math> as shown. What is <math>r</math>?15 KB (2,297 words) - 12:57, 19 February 2020
- ...s of the smaller circles, and <math>b+6</math> be the radius of the larger circles. The length of the inner edge will be <math>2a+2b \pi </math> and the lengt ...will take Keiko the same time to walk that length for both inner and outer circles. Instead, focus on the circular part. If the diameter of the smaller circle2 KB (337 words) - 15:15, 24 August 2021
- ...- '''San Gaku''' - '''Problem''' book (it contains lots of theorems about circles).17 KB (2,261 words) - 00:30, 22 April 2024
- ...).</math> What is the area of the intersection of the interiors of the two circles?898 bytes (142 words) - 20:42, 15 February 2024
- ...circles' common chord, then the other two chords cut by these lines on the circles are parallel.''<br /> ...lemma is always <math>\Omega</math>, while the other is one of three other circles from the problem statement. Applying the lemma to the lines <math>FDH</math3 KB (502 words) - 23:58, 5 October 2015
- .... If <math>S_n</math> is the sum of the areas of the first <math>n</math> circles so inscribed, then, as <math>n</math> grows beyond all bounds, <math>S_n</m In this diagram semi-circles are constructed on diameters <math>\overline{AB}</math>, <math>\overline{AC20 KB (3,108 words) - 14:14, 20 February 2020
- The following figures are composed of squares and circles. Which figure has a shaded region with largest area?16 KB (2,236 words) - 12:02, 19 February 2024
- ''The Zen of Magic Squares, Circles, and Stars'' by Clifford A. Pickover666 bytes (109 words) - 22:53, 30 June 2021
- ...g their centers. We know that <math>H</math> is on the radical axis of the circles centered at <math>M_B</math> and <math>M_C</math>, so <math>A</math> is too2 KB (415 words) - 01:08, 19 November 2023
- Regardless, the circumcenter and an intersection of the circles are collinear with (0,0), so it is a tangency.2 KB (317 words) - 01:22, 19 November 2023
- ...und the region shown. Arcs <math>AB</math> and <math>AD</math> are quarter-circles, and arc <math>BCD</math> is a semicircle. What is the area, in square unit ...here <math>O</math> is the center of the semicircle. You have two quarter circles on top, and two quarter circle-sized "bites" on the bottom. Move the piece2 KB (383 words) - 16:58, 12 January 2024
- ...er circle meaning the set of points are equidistant from the center of the circles to the outside of the big circle.2 KB (270 words) - 20:03, 26 May 2021
- Three congruent circles with centers <math>P</math>, <math>Q</math>, and <math>R</math> are tangent If circle <math>Q</math> has diameter <math>4</math>, then so do congruent circles <math>P</math> and <math>R</math>. Draw a diameter through <math>P</math>2 KB (409 words) - 00:15, 5 July 2013
- Two circles that share the same center have radii <math>10</math> meters and <math>20</2 KB (210 words) - 13:37, 19 October 2020
- ...ircle. Any polygon can be inscribed in at most one circle (because any two circles can intersect at no more than two points), and any polygon can have at most732 bytes (123 words) - 05:35, 16 August 2011
- ...and radius <math>\overline{PO}.</math> Lines <math>OA,OB</math> go to the circles <math>(O_1),(O_2)</math> passing through <math>P,O</math> and the line <mat3 KB (568 words) - 12:24, 11 March 2018
- ...th>1</math> has center at <math>(5,0)</math>. A line is tangent to the two circles at points in the first quadrant. Which of the following is closest to the <15 KB (2,343 words) - 13:39, 19 February 2020
- ...th>1</math> has center at <math>(5,0)</math>. A line is tangent to the two circles at points in the first quadrant. Which of the following is closest to the < The two circles are tangent to each other at the point <math>(4,0)</math>, since it is both2 KB (415 words) - 14:43, 5 June 2016
- The spheres now become circles with centers at <math>(1,0)</math> and <math>(\frac{21}{2},0)</math>. They ...d <math>B</math> and third point at the first quadrant intersection of the circles. Let's call that altitude <math>h</math>.7 KB (1,046 words) - 11:42, 30 September 2023
- Four circles of radius <math>3</math> are arranged as shown. Their centers are the vert ...2=36</math>. The unshaded region of the square is composed of four quarter circles, and has the area of one circle, which is <math>9\pi</math>. The area of th1 KB (191 words) - 00:10, 5 July 2013
- Sterling draws 6 circles on the plane, which divide the plane into regions (including the unbounded Sterling draws 6 circles on the plane, which divide the plane into regions (including the unbounded22 KB (3,694 words) - 23:58, 3 June 2022
- ...textbf{(D)}\ \text{Cuts neither axis}\qquad\\ \textbf{(E)}\ \text{Cuts all circles whose center is at the origin} </math>22 KB (3,306 words) - 19:50, 3 May 2023
- ...th>. Circle <math> Z </math> has an area of <math> 9 \pi </math>. List the circles in order from smallest to the largest radius. Using the formulas of circles, <math> C=2 \pi r </math> and <math> A= \pi r^2 </math>, we find that circl868 bytes (153 words) - 19:35, 14 January 2024
- ...\triangle ABC</math> with legs <math>5</math> and <math>12</math>, arcs of circles are drawn, one with center <math>A</math> and radius <math>12</math>, the o17 KB (2,488 words) - 03:26, 20 March 2024
- ...\triangle ABC</math> with legs <math>5</math> and <math>12</math>, arcs of circles are drawn, one with center <math>A</math> and radius <math>12</math>, the o ...> and <math>BN = BC = 5</math> since they are both radii of the respective circles. Thus <math>MB = AB-AM = 13-12 = 1</math>, and so <math>MN = BN-BM = 5-1 =1 KB (207 words) - 18:40, 19 March 2024
- ...of a <math>12</math>-inch pizza when placed. If a total of <math>24</math> circles of pepperoni are placed on this pizza without overlap, what fraction of the ...ne{AD}</math> has length <math>16</math>. What is the area between the two circles?18 KB (2,768 words) - 21:05, 9 January 2024
- ...of a <math>12</math>-inch pizza when placed. If a total of <math>24</math> circles of pepperoni are placed on this pizza without overlap, what fraction of the ...c{12}{6} = 2</math>. From that we see that the area of the <math>24</math> circles of pepperoni is <math>\left ( \frac{2}{2} \right )^2 (24\pi) = 24\pi</math>955 bytes (141 words) - 23:55, 22 January 2024
- <i><b>Circles</b></i> The radical axis of two circles given by equations of this form is:25 KB (5,067 words) - 22:15, 31 March 2024
- ...des. What is the ratio of the sum of the areas of all <math>4</math> small circles to the area of the large circle? (Proposed by SP343) ...the four circles. If the radius of a circle is <math>5</math> and all the circles are congruent, what is the length of the rope? (Proposed by SP343)15 KB (2,444 words) - 21:46, 1 January 2012
- Two circles <math>\omega_1,\omega_2</math> have center <math>O_1,O_2</math> and radius .../math>, such that <math>CD</math> is the smallest distance connecting both circles. Then <math>O_1C+CD+DO_2 \geq O_1O_2</math>; they are both paths from <math3 KB (522 words) - 21:25, 3 January 2012
- ...h>7x+y=28.</math> Suppose that one of the tangent lines from the origin to circles <math>\omega_1</math> and <math>\omega_2</math> meets <math>\omega_1</math>2 KB (324 words) - 22:28, 26 December 2022
- \textbf{(E)}\ \text{Cuts all circles whose center is at the origin}</math> ...he graph of <math>y=\log x</math>, one can clearly see that there are many circles centered at the origin that do not intersect the graph of <math>y=\log x</m1 KB (188 words) - 16:16, 9 May 2015
- .../math> and <math>3</math>, respectively. A line externally tangent to both circles intersects ray <math>AB</math> at point <math>C</math>. What is <math>BC</m Let <math>D</math> and <math>E</math> be the points of tangency on circles <math>A</math> and <math>B</math> with line <math>CD</math>. <math>AB=8</ma2 KB (291 words) - 18:41, 22 April 2024
- .../math> and <math>3</math>, respectively. A line externally tangent to both circles intersects ray <math>AB</math> at point <math>C</math>. What is <math>BC</m ...math>\frac{2\pi}{3}</math>, where each of the centers of the corresponding circles is among the vertices of a regular hexagon of side <math>2</math>. What is13 KB (1,994 words) - 01:31, 22 December 2023
- ...math>\frac{2\pi}{3}</math>, where each of the centers of the corresponding circles is among the vertices of a regular hexagon of side 2. What is the area encl Draw the hexagon between the centers of the circles, and compute its area <math>(6)(0.5)(2\sqrt{3})=6\sqrt{3}</math>. Then add5 KB (775 words) - 22:33, 22 October 2023
- ...math>\frac{2\pi}{3}</math>, where each of the centers of the corresponding circles is among the vertices of a regular hexagon of side <math>2</math>. What is ...> has its center <math>O</math> lying on circle <math>C_2</math>. The two circles meet at <math>X</math> and <math>Y</math>. Point <math>Z</math> in the ext14 KB (2,197 words) - 13:34, 12 August 2020
- The circles have radii of <math>1</math> and <math>2</math>. Draw the triangle shown in3 KB (574 words) - 20:42, 3 January 2020
- ...> has its center <math>O</math> lying on circle <math>C_2</math>. The two circles meet at <math>X</math> and <math>Y</math>. Point <math>Z</math> in the ext9 KB (1,496 words) - 02:40, 2 October 2022
- ...circles with radius 2 are mutually tangent. What is the total area of the circles and the region bounded by them, as shown in the figure?18 KB (2,350 words) - 18:48, 9 July 2023
- ...ne{AD}</math> has length <math>16</math>. What is the area between the two circles? ...the Pythagorean Theorem, <math>CB=6</math>. Thus the area between the two circles is2 KB (279 words) - 09:04, 10 March 2023
- At each of the sixteen circles in the network below stands a student. A total of <math>3360</math> coins a Three concentric circles have radii <math>3,</math> <math>4,</math> and <math>5.</math> An equilater10 KB (1,617 words) - 14:49, 2 June 2023
- At each of the sixteen circles in the network below stands a student. A total of <math>3360</math> coins a6 KB (1,058 words) - 01:49, 25 November 2023
- Three concentric circles have radii <math>3,</math> <math>4,</math> and <math>5.</math> An equilater ...ea. We have two cases to consider; either the center <math>O</math> of the circles lies in the interior of triangle <math>ABC</math> or it does not (and we sh11 KB (1,889 words) - 20:42, 25 January 2023
- ...math>\gamma</math> be the circle with diameter <math>\overline{DE}</math>. Circles <math>\omega</math> and <math>\gamma</math> meet at <math>E</math> and a se7 KB (1,228 words) - 12:16, 13 March 2020
- ...math>\gamma</math> be the circle with diameter <math>\overline{DE}</math>. Circles <math>\omega</math> and <math>\gamma</math> meet at <math>E</math> and a se Finally, we notice there's circles! Classic setup for inversion! Since we're involving an angle-bisector, the13 KB (2,298 words) - 12:56, 10 September 2023
- Let two circles <math>O_1, O_2</math> with radii <math>3, 5</math> in the plane be centered7 KB (1,309 words) - 11:13, 8 April 2012
- Let two circles <math>O_1, O_2</math> with radii <math>3, 5</math> in the plane be centered ...ell, so it follows that <math>P</math> lies on the radical axis of the two circles. However, <math>X, Q, Y</math> also lie on this radical axis, so <math>P, X2 KB (380 words) - 17:38, 7 April 2012
- Let <math>{\cal C}_1</math> and <math>{\cal C}_2</math> be concentric circles, with <math>{\cal C}_2</math> in the interior of <math>{\cal C}_1</math>.4 KB (656 words) - 17:26, 20 June 2019
- ...ass through <math>R</math> and <math>S</math>, so the radical axis of both circles is <math>RS</math>. Hence, <math>A</math> lies on <math>RS</math>, which i4 KB (613 words) - 20:50, 19 December 2023
- ...us of a third circle that is tangent to one line and tangent to both other circles?5 KB (837 words) - 12:22, 27 May 2012
- ...</math> must lie on circle <math> X </math>. We now want the area between circles <math> X </math> and <math> Y </math>. Let <math> M </math> be the midpoint First, let's try to find the radii of the circles. <math> \angle AYB=30^\circ\implies \angle AYM=15^\circ </math>. From the h4 KB (622 words) - 15:07, 28 May 2012
- Two equal circles in the same plane cannot have the following number of common tangents.23 KB (3,556 words) - 15:35, 30 December 2023
- ...ric circles. It is <math>10</math> feet wide. The circumference of the two circles differ by about: The diameters of two circles are <math>8</math> inches and <math>12</math> inches respectively. The rati21 KB (3,123 words) - 14:24, 20 February 2020
- ...rline{AB}</math> is divided at <math>C</math> so that <math>AC=3CB</math>. Circles are described on <math>\overline{AC}</math>23 KB (3,535 words) - 16:29, 24 April 2020
- The ratio of the areas of two concentric circles is <math>1: 3</math>. If the radius of the smaller is <math>r</math>, then22 KB (3,509 words) - 21:29, 31 December 2023
- The following figures are composed of squares and circles. Which figure has a shaded region with largest area? ...f{B}</math> the area of the shaded region is the sum of the areas of the 4 circles subtracted from the area of the square. That is <math>2^2-4 \left( \left(3 KB (441 words) - 20:09, 15 January 2024
- ...circles with radius 2 are mutually tangent. What is the total area of the circles and the region bounded by them, as shown in the figure? ...find the area of this triangle to include the figure formed in between the circles. Since the equilateral triangle has two 30-60-90 triangles inside, we can f4 KB (675 words) - 03:58, 23 January 2023
- Two distinct circles <math>K_1</math> and <math>K_2</math> are drawn in the plane. They intersec3 KB (500 words) - 19:00, 23 October 2019
- ...center of the circle using two chords). The intersection point of the two circles other than X is the center of spiral similarity, and hence is O, which repr4 KB (712 words) - 21:57, 12 November 2023
- Two circles that share the same center have radii <math>10</math> meters and <math>20</14 KB (2,035 words) - 15:23, 26 January 2024
- ...e with radius <math> 2 </math>, meaning that the total area of the quarter circles is <math> 4\pi </math>. The area of the square is <math> 16 </math>. Thus,2 KB (310 words) - 16:18, 10 November 2023
- The area also includes <math>4</math> circular segments. Two are quarter-circles centered at <math>P</math> of radii <math>\sqrt{2}</math> (the segment boun4 KB (603 words) - 16:51, 3 April 2020
- Let <math>J</math> be the three circles radical center, meaning <math>JX</math> and <math>JZ</math> are tangent seg3 KB (524 words) - 16:08, 11 July 2018
- Two circles are externally tangent. Lines <math>\overline{PAB}</math> and <math>\overli16 KB (2,451 words) - 04:27, 6 September 2021
- ...ath>, while the other is centered at <math>B</math>. The equations of the circles are:8 KB (1,268 words) - 14:10, 31 January 2024
- If <math>\Delta ABD</math> is acute, prove that the four circles of radius <math>1</math> with centers <math>A</math>, <math>B</math>, <math ...th of <math>a</math> must not exceed 2 (the radius for each circle) or the circles will not meet and thus not cover the parallelogram.2 KB (360 words) - 00:10, 10 December 2022
- *Three concentric circles have radii <math>3,</math> <math>4,</math> and <math>5.</math> An equilater3 KB (432 words) - 23:22, 13 January 2021
- 4) The number of curved lines (enclosed circles)+ number of lines+ number of intersection points -1= number of sections cre1 KB (237 words) - 17:21, 4 June 2013
- Since the center of <math>\Gamma</math> lies on <math>BC</math>, the three circles above are coaxial to line <math>CD</math>.2 KB (437 words) - 08:30, 20 November 2023
- The larger circle has radius 12 cm. Each of the six identical smaller circles986 bytes (153 words) - 19:15, 6 October 2013
- Consider two circles of different sizes that do not intersect. The smaller circle has center <m7 KB (1,173 words) - 21:04, 7 December 2018
- ...externally tangent and all internally tangent to a large circle. The small circles have radii <math>r</math>, <math>r</math>, and <math>3r</math>, and the big ...rcle <math>E</math> over <math>\overline{AB}</math>. Now, we have our four circles to apply that theorem. First, lets scale our image down such that Circle <m6 KB (826 words) - 21:31, 9 January 2024
- .... If <math>S_n</math> is the sum of the areas of the first <math>n</math> circles so inscribed, then, as <math>n</math> grows beyond all bounds, <math>S_n</m ...he circles. On the other hand, the areas of the squares (and areas of the circles) form a geometric sequence with common ratio <math>R^2</math>.2 KB (390 words) - 01:40, 16 August 2023
- We want to find the area of the intersection of the circles in this figure: Lets call the radius of each of the circles 1, because we are calculating probability.23 KB (3,182 words) - 12:30, 5 April 2014
- ...</math>), let its circumcircle be <math>\omega_3</math>. Then each pair of circles' radical axises, <math>BN, TW,</math> and <math>MC</math>, must concur at t11 KB (1,991 words) - 01:31, 19 November 2023
- ...with center <math>Q</math> is externally tangent to each of the other two circles. What is the area of triangle <math>PQR</math>?14 KB (2,104 words) - 22:26, 16 September 2022
- ...,Z</math> are a permutation of <math>A,B,C</math>. Now construct the three circles <math>\mathcal C_A=(B_0PC_0),\mathcal C_B=(C_0PA_0),\mathcal C_C=(A_0PB_0)<2 KB (368 words) - 13:15, 29 January 2021
- ...be <math>E</math>. Let the height of the triangle be <math>h</math>. Draw circles around points <math>B</math> and <math>C</math> with radius <math>\frac{h}{3 KB (502 words) - 23:48, 12 December 2022
- Two equal circles in the same plane cannot have the following number of common tangents. Two congruent coplanar circles will either be tangent to one another (resulting in <math> 3 </math> common1 KB (211 words) - 15:42, 2 January 2014
- In this diagram semi-circles are constructed on diameters <math>\overline{AB}</math>, <math>\overline{AC2 KB (232 words) - 01:40, 16 August 2023
- ...<math>\dfrac{1}{3}</math> of a circle with radius 3. There are 2 of these circles in total, so the total area of them would be <math>18\pi</math>. Now, we have to subtract the area of the circles from the total area of the hexagon, but we see that only answer (C) has <ma3 KB (482 words) - 11:50, 7 September 2021
- ...math> and <math>O_2</math> respectively. One of the common tangents to the circles touches <math>C_1</math> at <math>P_1</math> and <math>C_2</math> at <math> ...be one of the two distinct points of intersection of two unequal coplanar circles <math>C_1</math> and <math>C_2</math> with centers <math>O_1</math> and <ma7 KB (1,267 words) - 23:35, 29 January 2021
- The locus of the centers of all circles of given radius <math>a</math>, in the same plane, passing through a fixed \textbf{(E) }\text{two circles} </math>21 KB (3,242 words) - 21:27, 30 December 2020
- Two circles intersect at points <math>A</math> and <math>B</math>. The minor arcs <mat12 KB (1,863 words) - 19:04, 11 April 2024
- Two circles intersect at points <math>A</math> and <math>B</math>. The minor arcs <mat Let the radius of the larger and smaller circles be <math>x</math> and <math>y</math>, respectively. Also, let their centers7 KB (1,191 words) - 23:37, 23 June 2022
- ...a cross section and you will see that h is made up of the two radii of the circles plus some radical expression. The only choice satisfying this condition is4 KB (602 words) - 02:42, 13 June 2022
- Two concentric circles have radii <math>1</math> and <math>2</math>. Two points on the outer circl13 KB (2,011 words) - 21:54, 8 November 2022
- Two concentric circles have radii <math>1</math> and <math>2</math>. Two points on the outer circl Let the center of the two circles be <math>O</math>. Now pick an arbitrary point <math>A</math> on the bounda2 KB (383 words) - 19:44, 28 April 2021
- ...of radius 1 that are in the same plane and tangent to each other. How many circles of radius 3 are in this plane and tangent to both <math>C_1</math> and <mat ...other touching the bottoms and encircling upward. There are two radius 3 circles passing through the point where <math>C_1</math> and <math>C_2</math> are t1 KB (208 words) - 20:59, 27 May 2021
- The ratio of the radii of two concentric circles is <math>1:3</math>. If <math>\overline{AC}</math> is a diameter of the lar2 KB (324 words) - 12:02, 24 November 2016
- The ratio of the radii of two concentric circles is <math>1:3</math>. If <math>\overline{AC}</math> is a diameter of the lar16 KB (2,548 words) - 13:40, 19 February 2020
- Two circles are externally tangent. Lines <math>\overline{PAB}</math> and <math>\overli ...PA'=A'B'=4</math>. We can then drop perpendiculars from the centers of the circles to the points of tangency and use similar triangles. Let us let the center2 KB (295 words) - 19:09, 11 October 2016
- The lines have to be tangent to both of these circles.878 bytes (132 words) - 04:39, 4 February 2016
- The area of the ring between two concentric circles is <math>12\tfrac{1}{2}\pi</math> square inches. The length of a chord of t1 KB (187 words) - 03:29, 7 June 2018
- The area of the ring between two concentric circles is <math>12\tfrac{1}{2}\pi</math> square inches. The length of a chord of t16 KB (2,662 words) - 14:12, 20 February 2020
- (Pretend the paper forms <math>600</math> concentric circles with diameters evenly spaced from <math>2</math> cm to <math>10</math> cm.)16 KB (2,291 words) - 13:45, 19 February 2020
- In the adjoining figure the five circles are tangent to one another consecutively and to the lines15 KB (2,309 words) - 23:43, 2 December 2021
- <math>O, N</math>, and <math>P</math>, respectively. Circles <math>O, N</math>, and <math>P</math> all have radius <math>15</math> and t17 KB (2,500 words) - 19:05, 11 September 2023
- Circles with centers <math>A ,~ B</math>, and <math>C</math> each have radius <math17 KB (2,664 words) - 01:34, 19 March 2022
- ...t to the other two, and each side of the triangle is tangent to two of the circles. If each circle has radius three, then the perimeter of the triangle is ...ath>, and let <math>P,Q,R</math>, and <math>S</math> be the centers of the circles15 KB (2,412 words) - 05:09, 27 November 2020
- ...B) }\text{equal to the length of an external common tangent if and only if circles }\mathit{O}\text{ and }\mathit{O'} \text{have equal radii}\\17 KB (2,835 words) - 14:36, 8 September 2021
- ...he perpendicular from <math>C</math> to <math>AB</math>. We consider three circles, <math>\gamma_1, \gamma_2, \gamma_3</math>, all tangent to the line <math>A ...math>c = AB</math>. Let <math>R, S, T</math> be the tangency points of the circles <math>K_1, K_2, K_3</math> with the line AB. In an inversion with the cente5 KB (904 words) - 13:42, 29 January 2021
- ...hin one of the smaller squares, it also lands completely within one of the circles. Let <math>P</math> be the probability that, when flipped onto the grid, th853 bytes (134 words) - 21:18, 8 October 2014
- The ratio of the area of the first circle to the sum of areas of all other circles in the sequence, is18 KB (2,703 words) - 20:50, 11 September 2023
- In the diagram, the two circles are tangent to the two parallel lines. The distance between the centers of the circles is 8, and both circles have11 KB (1,648 words) - 09:55, 20 December 2021
- In the diagram, the two circles are tangent to the two parallel lines. The distance between the centers of the circles is <math>8</math>, and both circles have1 KB (162 words) - 14:13, 24 February 2022
- and both circles are tangent to a line. Find the area of the shaded region that lies between the two circles and the line.6 KB (1,018 words) - 15:05, 20 August 2020
- and both circles are tangent to a line. Find the area of the shaded region that lies between the two circles and the line.2 KB (336 words) - 12:57, 2 January 2020
- forever what is the total area of all the circles? Express6 KB (890 words) - 22:14, 7 November 2014
- forever what is the total area of all the circles? Express ...let <math>A_1B_1</math> be the internal common tangent of the two largest circles, with the points <math>A_1</math> and <math>B_1</math> laying on the sides3 KB (412 words) - 18:49, 29 January 2018
- (Pretend the paper forms <math>600</math> concentric circles with diameters evenly spaced from <math>2</math> cm to <math>10</math> cm.) ...h of the paper is equal to the sum of the circumferences of the concentric circles, which is <math>\pi</math> times the sum of the diameters. Now the, the dia1 KB (199 words) - 14:24, 1 March 2018
- ...with center <math>Q</math> is externally tangent to each of the other two circles. What is the area of triangle <math>PQR</math>?15 KB (2,348 words) - 17:20, 19 January 2024
- Find the smallest and largest possible distances between the centers of two circles of radius the circles and the third vertex on the second circle.5 KB (774 words) - 06:07, 29 January 2019
- Find the smallest and largest possible distances between the centers of two circles of radius the circles and the third vertex on the second circle.2 KB (315 words) - 22:44, 17 November 2019
- ...osest to the area of the region inside the rectangle but outside all three circles?13 KB (1,957 words) - 12:08, 13 January 2024
- ...frac{5280}{40} =132</math> semicircles in total. Were the semicircles full circles, their circumference would be <math>2\pi\cdot 20=40\pi</math> feet; as it i2 KB (395 words) - 12:16, 17 January 2024
- ...osest to the area of the region inside the rectangle but outside all three circles? ...es is the area of the rectangle minus the area of all three of the quarter circles in the rectangle.2 KB (249 words) - 20:36, 2 January 2023
- ...er circle has radius <math>3</math>. The shaded region is outlined by half circles whose radii are <math>1</math> and <math>2</math> and whose centers lie on7 KB (1,151 words) - 15:11, 20 August 2020
- ...er circle has radius <math>3</math>. The shaded region is outlined by half circles whose radii are <math>1</math> and <math>2</math> and whose centers lie on1 KB (154 words) - 09:47, 6 March 2024
- ...dius <math>3</math>, and all possible lines simultaneously tangent to both circles. Isabella notices that she has drawn exactly <math>k \ge 0</math> lines. Ho ...s in the pair. Layer <math>L_k</math> consists of the <math>2^{k-1}</math> circles constructed in this way. Let <math>S=\bigcup_{j=0}^{6}L_j</math>, and for e13 KB (2,117 words) - 12:33, 24 August 2023
- ...dius <math>3</math>, and all possible lines simultaneously tangent to both circles. Isabella notices that she has drawn exactly <math>k \ge 0</math> lines. H Isabella can get <math>0</math> lines if the circles are concentric, <math>1</math> if internally tangent, <math>2</math> if ove823 bytes (123 words) - 13:24, 29 March 2015
- ...us (like there always is) that I think was mentioned above, something with circles (since the thing under the square root is just <math>x^2+y^2 = \frac{1}{4}<12 KB (1,981 words) - 18:33, 3 September 2023
- ...s in the pair. Layer <math>L_k</math> consists of the <math>2^{k-1}</math> circles constructed in this way. Let <math>S=\bigcup_{j=0}^{6}L_j</math>, and for e // draw the big circles and the bottom line8 KB (1,340 words) - 14:24, 23 November 2023
- ...ath>D</math>, and points <math>P</math> and <math>Q</math> lie on all four circles. The radius of circle <math>A</math> is <math>\tfrac{5}{8}</math> times the13 KB (2,064 words) - 13:39, 1 October 2022
- ...n of the shapes inside the triangle, so we think of things associated with circles and think of cyclic quads. We then notice that quadrilateral <math>WXYZ</ma11 KB (1,898 words) - 22:42, 16 June 2023
- ...ath>D</math>, and points <math>P</math> and <math>Q</math> lie on all four circles. The radius of circle <math>A</math> is <math>\tfrac{5}{8}</math> times the ...Suppose that <math>O_1</math> and <math>O_2</math> are the centers of two circles <math>C_1</math> and <math>C_2</math> that intersect exactly at <math>P</ma7 KB (1,188 words) - 19:18, 19 October 2023
- ...D (from the top perspective) is 10:6. Using 30-60-90 triangles and partial circles, the area of the base between AB and CD is calculated to be <math>18\sqrt{39 KB (1,407 words) - 19:37, 17 February 2024
- ...}</math> such that <math>BC</math> is a common external tangent of the two circles. A line <math>\ell</math> through <math>A</math> intersects <math>\mathcal{8 KB (1,326 words) - 19:15, 13 January 2024
- ...math> so that line <math>BC</math> is a common external tangent of the two circles. A line <math>\ell</math> through <math>A</math> intersects <math>\mathcal{ ...we have <math>AM = BM</math> and <math>BM = CM</math> by equal tangents to circles, and since <math>BM = CM, M</math> is the midpoint of <math>\overline{BC},<31 KB (5,086 words) - 19:15, 20 December 2023
- ...</math> intersects <math>m</math> of the squares and <math>n</math> of the circles. Find <math>m + n</math>. Circles <math>\omega_1</math> and <math>\omega_2</math> intersect at points <math>X8 KB (1,360 words) - 12:19, 29 January 2022
- ...tangent to the line and to the other two circles. The radius of the equal circles is: <math>\textbf{(A)}\ 24 \qquad\textbf{(B)}\ 20\qquad\textbf{(C)}\ 18\qqu599 bytes (108 words) - 15:44, 28 December 2017
- ...tangent to the line and to the other two circles. The radius of the equal circles is: <math>\textbf{(A)}\ 24 \qquad\textbf{(B)}\ 20\qquad\textbf{(C)}\ 18\qqu596 bytes (108 words) - 15:44, 28 December 2017
- ...radius <math>3</math> cm. The maximum number of intersection points of two circles is <math>\boxed{\textbf{(B)} \ 2}</math>.620 bytes (98 words) - 00:39, 20 February 2019
- ...diameters of circle <math>O, N</math>, and <math>P</math>, respectively. Circles <math>O, N</math>, and <math>P</math> all have radius <math>15</math> and t1 KB (248 words) - 22:35, 16 August 2022
- <!--(to editors: this looks really weird)Venn Diagram (I couldn't make circles),2 KB (333 words) - 01:41, 15 January 2024
- ...with center <math>Q</math> is externally tangent to each of the other two circles. What is the area of triangle <math>PQR</math>?8 KB (1,255 words) - 09:05, 5 September 2022
- ...region, shaded in the figure, inside the larger circle but outside all the circles of radius <math>1</math>? Circles <math>\omega</math> and <math>\gamma</math>, both centered at <math>O</math14 KB (2,180 words) - 22:25, 25 April 2024
- tangent to the leftmost circle. The three circles in the horizontal line. The leftmost and rightmost circles are6 KB (1,055 words) - 12:37, 30 July 2021
- tangent to the leftmost circle. The three circles in the horizontal line. The leftmost and rightmost circles are973 bytes (148 words) - 02:13, 14 January 2019
- ...equal to <math>\dfrac{3}{2}</math>, which is the ratio of the radii of the circles. Thus, we are looking for a point <math>(x,y)</math> such that <math>\dfrac Using the ratios of radii of the circles, <math>\frac{3}{2}</math>, we find that the scale factor is <math>1.5</math8 KB (1,011 words) - 11:57, 28 February 2024
- ...e quadrants, you get a square of area <math>2</math>, along with four half-circles of diameter <math>\sqrt{2}</math>, for a total area of <math>2+2\cdot(\tfra5 KB (761 words) - 23:26, 7 September 2022
- ...</math> intersects <math>m</math> of the squares and <math>n</math> of the circles. Find <math>m + n</math>. ...one square and one circle, hence this counts <math>288</math> squares and circles. Thus <math>m + n = 286 + 288 = \boxed{574}</math>.6 KB (967 words) - 21:08, 22 November 2022
- Circles <math>\omega_1</math> and <math>\omega_2</math> intersect at points <math>X ...math>\omega_{1},\omega_{2}</math>, it has equal power with respect to both circles, thus <cmath>AZ^{2}=\text{Pow}_{\omega_{1}}(Z)=ZX\cdot ZY=\text{Pow}_{\omeg14 KB (2,427 words) - 17:12, 8 January 2024
- ...ric circles. It is <math>10</math> feet wide. The circumference of the two circles differ by about: ...f a circle is directly proportional to its diameter, the difference in the circles' diameters is simply <math>20\pi </math> feet. Using <math>\pi \approx 3</m814 bytes (124 words) - 12:23, 22 April 2020
- The diameters of two circles are <math>8</math> inches and <math>12</math> inches respectively. The rati ...}</math> where <math>r</math> is the radius. We know that the radii of the circles are <math>4</math> and <math>6</math> inches (half the diameter) so the rat850 bytes (134 words) - 20:49, 1 April 2017
- Two distinct circles <math>K_1</math> and <math>K_2</math> are drawn in the plane. They intersec845 bytes (142 words) - 09:59, 19 July 2016
- ...is then constructed, such that each side of the triangle is tangent to two circles, as shown below. Find the perimeter of the triangle. ...the circles to the sides of the triangle, and lines from the radii of the circles to the vertices of the triangle. Because the triangle is equilateral, the l1 KB (200 words) - 21:30, 1 May 2024
- ...to intersect the circles at points <math>C</math> and <math>D</math>. The circles intersect at two points, one of which is <math>E</math>. What is the degree12 KB (1,665 words) - 12:37, 1 April 2024
- ...to intersect the circles at points <math>C</math> and <math>D</math>. The circles intersect at two points, one of which is <math>E</math>. What is the degree2 KB (337 words) - 19:37, 28 December 2023
- <math>10</math> lines and <math>10</math> circles divide the plane into at most <math>n</math> disjoint regions. Compute <mat7 KB (1,094 words) - 15:39, 24 March 2019
- Connect the centers of the tangent circles! (call the center of the large circle <math>C</math>) Notice that we don't even need the circles anymore; thus, draw triangle <math>\Delta ABP</math> with cevian <math>PC</13 KB (1,982 words) - 17:12, 20 December 2022
- ...idpoint of <math>\overline{BC}</math>. What is the sum of the radii of the circles inscribed in <math>\triangle ADB</math> and <math>\triangle ADC</math>?12 KB (1,930 words) - 20:23, 9 September 2022
- ...idpoint of <math>\overline{BC}</math>. What is the sum of the radii of the circles inscribed in <math>\triangle ADB</math> and <math>\triangle ADC</math>? ...using Heron’s formula. We can use that area to find the inradius of the circles by the inradius formula <math>A=sr.</math> Therefore, we get <math>\boxed{\4 KB (601 words) - 00:34, 8 August 2023
- ...cles <math>2</math> and <math>3</math> must be the same, and the colors of circles <math>4</math> and <math>6</math> must be the same. This gives us <math>4</ ...th>4</math>, and <math>6</math> will be the same. Similarly, the colors of circles <math>2</math>, <math>3</math>, and <math>5</math> will be the same. This i7 KB (1,057 words) - 23:27, 27 August 2022
- .../math>. The line passing through the two points of intersection of the two circles has equation <math>x + y = c</math>. What is <math>c</math>?15 KB (2,343 words) - 18:26, 25 December 2020
- .../math>. The line passing through the two points of intersection of the two circles has equation <math>x+y=c</math>. What is <math>c</math>? The equations of the two circles are <math>(x+10)^2+(y+4)^2=169</math> and <math>(x-3)^2+(y-9)^2=65</math>.2 KB (366 words) - 13:54, 15 February 2021
- Two circles of radius <math>5</math> are externally tangent to each other and are inter14 KB (2,171 words) - 21:10, 4 November 2023
- Two circles <math>C_1</math> and <math>C_2</math>, each of unit radius, have centers <m955 bytes (172 words) - 00:05, 5 March 2017
- ...in the figure below. There is one point <math>B</math> inside all of these circles. When <math>r = \frac{11}{60}</math>, the distance from the center <math>C_7 KB (1,200 words) - 15:02, 8 September 2020
- ...in the figure below. There is one point <math>B</math> inside all of these circles. When <math>r = \frac{11}{60}</math>, the distance from the center <math>C_6 KB (908 words) - 02:35, 23 January 2024
- ...rsion can be a very useful tool in solving problems involving many tangent circles and/or lines. ...h>. Extend the three semicircles to full circles. Label the resulting four circles as shown in the diagram:16 KB (2,516 words) - 23:48, 15 January 2024
- ...e measure, but they point to the same line <math>BC</math>! Hence, the two circles must be congruent. (This is also a well-known result) ...bisector, it must also hit the circle at the point <math>P</math>. The two circles are congruent, which implies <math>MN=MP\implies ND=DP\implies</math> NDP i5 KB (805 words) - 18:31, 21 September 2021
- ...e has radius 24, a second circle has radius 15, and the centers of the two circles are 52 units apart. A line tangent to both circles crosses the line connecting the two centers at a point7 KB (1,192 words) - 15:14, 20 August 2020
- ...e has radius 24, a second circle has radius 15, and the centers of the two circles are 52 units apart. A line tangent to both circles crosses the line connecting the two centers at a point1 KB (211 words) - 18:16, 16 January 2023
- Let the centers of the circles containing arcs <math>\overarc{SR}</math> and <math>\overarc{TR}</math> be ...e UXY]</math> minus the combined area of the <math>2</math> sectors of the circles (in red). Using the area formula for an equilateral triangle, <math>\frac{a4 KB (711 words) - 21:00, 16 January 2024
- ...math> and <math>N</math>. Let <math>AB</math> be the line tangent to these circles at <math>A</math> and <math>B</math>, respectively, so that <math>M</math> ...ct <math>AB</math> at <math>X</math>. By our lemma, <math>\textit{(the two circles are tangent to AB)}</math>, <math>X</math> bisects <math>AB</math>. Since <3 KB (451 words) - 00:04, 19 November 2023
- ...ne{AB}</math> is divided at <math> C</math> so that <math> AC=3CB</math>. Circles are described on <math> \overline{AC}</math> and <math> \overline{CB}</math ...e radius of the small circle. Draw the line from the center of each of the circles to the point of contact of the tangent of the circle. By similar triangles,1 KB (184 words) - 17:31, 19 September 2022
- ==Solution 2 - Circles== ...th>20,</math> that each contribute <b>two</b> integer lengths (since these circles intersect the hypotenuse twice) from <math>B</math> to <math>\overline{AC}<3 KB (541 words) - 03:32, 23 January 2023
- Two circles of radius <math>5</math> are externally tangent to each other and are inter2 KB (342 words) - 17:10, 15 October 2023
- //Draws a polar grid that goes out to a number of circles10 KB (1,662 words) - 12:45, 13 September 2021
- Circles <math>\omega_1</math>, <math>\omega_2</math>, and <math>\omega_3</math> eac14 KB (2,118 words) - 15:36, 28 October 2021
- //Draws a polar grid that goes out to a number of circles11 KB (1,708 words) - 12:01, 18 March 2023
- Circles <math>\omega_1</math>, <math>\omega_2</math>, and <math>\omega_3</math> eac ..., the distances between the centers of any two of the <math>3</math> given circles are each <math>8</math>.13 KB (2,080 words) - 19:09, 21 October 2023
- ...frac{1}{4}</math> inch and so on indefinitely. The sum of the areas of the circles is: Note the areas of these circles is <math>1\pi</math>, <math>\frac{\pi}{4}</math>, <math>\frac{\pi}{16}, \do907 bytes (147 words) - 01:38, 4 February 2020
- The locus of the centers of all circles of given radius <math>a</math>, in the same plane, passing through a fixed \textbf{(E) }\text{two circles} </math>923 bytes (144 words) - 18:59, 17 May 2018
- The wheel shown below consists of two circles and five spokes, with a label at each point where a spoke meets a circle. A8 KB (1,284 words) - 14:35, 9 August 2021
- The wheel shown below consists of two circles and five spokes, with a label at each point where a spoke meets a circle. A ...counter-clockwise, and an <math>S</math> switching between inner and outer circles. An example string of length fifteen that gets the bug back to <math>A</ma11 KB (1,934 words) - 12:18, 29 March 2024
- There exists 4 circles, <math> a,b,c,d</math>, such that <math> a</math> is tangent to both <math> ...</math> and <math>d</math> be <math>Y</math>, and let the tangent point of circles <math>d</math> and <math>a</math> be <math>Z</math>. Finally, let <math>\a2 KB (343 words) - 12:02, 5 August 2018
- ...ath>, and let <math>P,Q,R</math>, and <math>S</math> be the centers of the circles2 KB (305 words) - 08:38, 28 June 2018
- ..., B, F, and A, B, G. Points F and G may be repositioned to allow for these circles to coincide; also, point H may be repositioned so that point C falls on the4 KB (792 words) - 01:44, 19 November 2023
- Point <math>X</math> is the point of intersection of circles <math>ACE</math> and <math>\Omega = BDF.</math> The circles <math>BDF</math> and <math>BDE</math> are orthogonal to the circle <math>\o8 KB (1,407 words) - 01:47, 19 November 2023
- ...in a plane. What is the maximum number of points where at least two of the circles intersect?'' Tony realizes that he can draw the four circles such that each pair of circles intersects in two points. After careful doodling, Tony finds the correct an2 KB (319 words) - 19:50, 12 July 2018
- ...[coordinate geometry]] to find the y-values of the intersection of the two circles.7 KB (1,092 words) - 19:05, 17 December 2021
- Given the larger of two circles with center <math>P</math> and radius <math>p</math> and the smaller with c ...math>P</math>, and the intersection of <math>\overline{PQ}</math> with the circles be <math>R</math> and <math>S</math> respectively. <math>PR = p</math> and3 KB (575 words) - 10:23, 19 July 2018
- There exists 4 circles, <math> a,b,c,d</math>, such that <math> a</math> is tangent to both <math>3 KB (478 words) - 13:45, 28 July 2018
- ...ctively. Let <math>BB'</math> and <math>CC'</math> be diameters in the two circles, and let <math>M</math> be the midpoint of <math>B'C'</math>. Prove that th2 KB (271 words) - 13:13, 25 August 2018
- ...e two smaller circles is a radius of the larger circle. If the two smaller circles have a combined area of <math>1</math> square unit, then what is the area o14 KB (2,191 words) - 03:19, 2 April 2024
- ...e two smaller circles is a radius of the larger circle. If the two smaller circles have a combined area of <math>1</math> square unit, then what is the area o ...therefore the shaded region is equal to the combined area of the 2 smaller circles, which is <math>\boxed{\textbf{(D) } 1}</math>.3 KB (454 words) - 10:15, 10 April 2024
- ...and <math> B</math>, such that <math>AB=42</math>. If the radii of the two circles are <math>54</math> and <math>66</math>, find <math>R^2</math>, where <math2 KB (250 words) - 18:53, 23 November 2018
- ...ctively. Let <math>BB'</math> and <math>CC'</math> be diameters in the two circles, and let <math>M</math> be the midpoint of <math>B'C'</math>. Prove that th2 KB (291 words) - 16:04, 17 December 2018
- ...}B_{2}</math>. Let <math>M_{1}</math>, <math>M_{2}</math> be points on the circles of centers <math>O_{1}</math> and <math>O_{2}</math> respectively, such tha Let circumradii of the 2 circles be <math>R_{1}</math> and <math>R_{2}</math> respectively.3 KB (429 words) - 16:38, 9 December 2018
- ...region, shaded in the figure, inside the larger circle but outside all the circles of radius <math>1 ?</math>13 KB (2,024 words) - 16:07, 22 April 2024
- ...ath>AB</math> at <math>A.</math> Let <math>K</math> be the intersection of circles <math>\omega_1</math> and <math>\omega_2</math> not equal to <math>A.</math Let the centers of the circles be <math>O_{1}</math> and <math>O_{2}</math> where the <math>O_{1}</math> h12 KB (1,985 words) - 19:52, 28 January 2024
- Suppose we draw circles of radius <math>r</math> with centers at every point in the plane with inte common with at least one of these circles?4 KB (604 words) - 03:48, 12 January 2019
- ...ections written in the form <math>ax^2 + bx + cy^2 + dy + e = 0</math> are circles if and only if <math>a = c</math>, which is true in our equation. Therefore868 bytes (152 words) - 13:29, 21 January 2024
- Suppose we draw circles of radius <math>r</math> with centers at every point in the plane with inte common with at least one of these circles?380 bytes (61 words) - 03:54, 12 January 2019
- ...in pairs and boxes in threes." Wendy continues, "Now, suppose that I draw circles with <math>X</math>'s in the middle." Wendy shows them examples of such row2 KB (271 words) - 05:21, 28 January 2019
- In the adjoining figure the five circles are tangent to one another consecutively and to the lines Consider three consecutive circles, as shown in the diagram above; observe that their centres <math>P</math>,3 KB (483 words) - 01:01, 20 February 2019
- Circles with centers <math>A ,~ B</math>, and <math>C</math> each have radius <math The circles can be described in the cartesian plane as being centered at <math>(-1,0),(2 KB (413 words) - 12:29, 27 May 2023
- So the radical axis (<math>AC</math>) of circles <math>ABC</math> and <math>ACC'</math> passes through <math>O1</math>. Also Similarly, radical axis (<math>AB</math>) of circles <math>ABC</math> and <math>ABB'</math> passes through <math>O2</math>. Also2 KB (348 words) - 19:40, 2 February 2019
- Circles <math>\omega</math> and <math>\gamma</math>, both centered at <math>O</math3 KB (536 words) - 17:03, 30 July 2022
- ...region, shaded in the figure, inside the larger circle but outside all the circles of radius <math>1 ?</math> ...eft(13+4\sqrt{3}\right)\pi</math>, and the sum of the areas of the smaller circles is <math>13\pi</math>, so the area of the dark region is <math>\left(13+4\s6 KB (871 words) - 08:20, 20 November 2023
- ...math> and <math>P</math> and is internally tangent to <math>\omega</math>. Circles <math>\omega_1</math> and <math>\omega_2</math> intersect at points <math>P8 KB (1,331 words) - 06:57, 4 January 2021
- ...ath>AB</math> at <math>A.</math> Let <math>K</math> be the intersection of circles <math>\omega_1</math> and <math>\omega_2</math> not equal to <math>A.</math7 KB (1,254 words) - 14:45, 21 August 2023
- ...math> and <math>P</math> and is internally tangent to <math>\omega</math>. Circles <math>\omega_1</math> and <math>\omega_2</math> intersect at points <math>P Note that the tangents to the circles at <math>A</math> and <math>B</math> intersect at a point <math>Z</math> on13 KB (2,252 words) - 11:32, 1 February 2024
- ...a sphere is the dihedral angle between the planes determined by the great circles. Most people mesure angles useing degrees. Degrees are out of 360. For exam35 KB (5,882 words) - 18:08, 28 June 2021
- The centers of two circles are <math>41</math> inches apart. The smaller circle has a radius of <math> Since the centers of the two circles are <math>41</math> inches apart, <math>AB=41</math>. Also, <math>BE=4+5=9<2 KB (264 words) - 01:59, 14 February 2020
- ...ual tangential distance to any point of both spheres. In particular to the circles (https://en.wikipedia.org/wiki/Radical_axis.)5 KB (819 words) - 07:54, 15 December 2023
- ...ends up being <math>12-(11-x) = x+1</math> people not marked on the right. Circles represent those in the committee.7 KB (1,023 words) - 23:56, 13 February 2023
- ...the circumcircle of <math>\triangle BCP</math> is <math>\omega</math>, the circles <math>\omega</math> and <math>\omega'</math> have the same radius <math>R</ ...rline{AH}</math> is parallel to the line connecting the centers of the two circles, <math>\Phi</math> must send <math>H</math> to <math>A</math>, meaning <mat16 KB (2,678 words) - 22:45, 27 November 2023
- By Miquel's theorem, <math>P=(AEF)\cap(BFD)\cap(CDE)</math> (intersection of circles)<math>\text{*}</math>. The law of cosines can be used to compute <math>DE=4 The equations of the two circles are <cmath>\begin{align*}(BFD)&:\left(x+\tfrac{7}{2}\right)^{2}+\left(y-\tf16 KB (2,592 words) - 15:40, 13 April 2024
- ...4159265358979 pieces. EDIT EDIT EDIT: When Almighty Gmaas ate Pi, all the circles became squares, so he spat it out. EDIT EDIT EDIT EDIT: He spat it out as a85 KB (13,954 words) - 17:25, 22 March 2024
- ...has used them all. She knows that Pete's is closed on Sundays, but as she circles the <math>6</math> dates on her calendar, she realizes that no circled date17 KB (2,585 words) - 15:27, 4 May 2024
- ...has used them all. She knows that Pete's is closed on Sundays, but as she circles the <math>6</math> dates on her calendar, she realizes that no circled date6 KB (903 words) - 16:23, 30 December 2023
- ...uld be <math>0.5</math>. Because of this, and the fact that there are four circles, we write ..., <math>4(n-1)</math> semicircles on the sides, and <math>4</math> quarter circles for the corners.10 KB (1,316 words) - 01:08, 11 November 2023
- //Draws a polar grid that goes out to a number of circles4 KB (696 words) - 12:38, 13 September 2021
- ...right), C(s,0)</math>. Then, we want to find the intersection of the three circles <cmath>x^2+y^2=1, (x-s)^2+y^2=4, \left(x-\frac{s}{2}\right)^2+\left(y-\frac16 KB (2,509 words) - 17:49, 8 February 2024
- Two circles in a plane intersect. <math>A</math> is one of the points of intersection.3 KB (448 words) - 17:10, 29 January 2021
- ...he circle containing <math>B</math> with center <math>Q</math>. Call these circles <math>\omega_1</math> and <math>\omega_2</math>, respectively. ...must be these intersections, and since a point is good iff it lies on both circles, we are done.7 KB (1,437 words) - 19:14, 6 October 2023
- ...nt <math>P</math> in <math>S</math>, let <math>d_P</math> be the number of circles it's on. ...since any pair of two points shares at most 2 circles (otherwise we have 3 circles with centers on their perpendicular bisector, which is not allowed), <math>3 KB (580 words) - 11:56, 30 January 2021
- Let the circles <math>k_1</math> and <math>k_2</math> intersect at two points <math>A</math Let <math>O_1</math> and <math>O_2</math> be the centers of circles <math>k_1</math> and <math>k_2</math> respectively. Also let <math>P</math>2 KB (392 words) - 15:47, 11 January 2021
- ...>\frac{1}{2}</math> with center <math>P</math>. Since homotheties preserve circles, the image of the midpoint as <math>Q</math> varies over the circle is a ci1 KB (250 words) - 16:18, 5 July 2020
- ...P</math> are both line segments passing through an intersection of the two circles with one endpoint on each circle. By Fact 5, we know then that there exists23 KB (3,640 words) - 18:16, 25 January 2024
- Circles <math>\omega_1</math> and <math>\omega_2</math> with radii <math>961</math> ...</math> and <math>\omega_2</math>, it has equal power with respect to both circles, so17 KB (2,852 words) - 03:59, 7 February 2024
- == Solution 1 (Inequalities and Circles) == For equations of circles, the coefficients of <math>x^2</math> and <math>y^2</math> must be the same10 KB (1,742 words) - 02:31, 13 November 2023
- The ratio of the areas of two concentric circles is <math>1: 3</math>. If the radius of the smaller is <math>r</math>, then1 KB (177 words) - 10:44, 15 February 2021
- ...ber of points of intersection that can occur when <math>2</math> different circles and <math>2</math> different straight lines are drawn on the same piece of ...rcles in <math>4</math> points. Draw another line which intersects the two circles in <math>4</math> points and also intersects the first line. There are <mat1 KB (188 words) - 17:11, 7 August 2020
- Circles <math>\omega_1</math> and <math>\omega_2</math> with radii <math>961</math>7 KB (1,182 words) - 14:54, 13 March 2023
- Circles <math>\omega_1</math> and <math>\omega_2</math> intersect at two points <ma8 KB (1,370 words) - 21:34, 28 January 2024
- ...math> and <math>O_2</math> respectively. One of the common tangents to the circles touches <math>C_1</math> at <math>P_1</math> and <math>C_2</math> at <math>2 KB (396 words) - 17:49, 10 August 2021
- ...</math> consists of all the points that lie inside exactly one of the four circles. What is the maximum possible area of region <math>S</math>?17 KB (2,418 words) - 12:52, 5 November 2023
- Some examples of closed regions are rectangles with boundary and circles with boundary.792 bytes (126 words) - 22:28, 13 September 2020
- ...he lengths. We can do this by doing two different things for two different circles. For the radius <math>3</math> circle, we can subtract two right angles and2 KB (360 words) - 22:07, 16 August 2020
- ...and <math>\omega_C</math> meet in six points---two points for each pair of circles. The three intersection points closest to the vertices of <math>\triangle A ...id is a third of the height). Therefore, the radius of each of the smaller circles is <math>12</math>.12 KB (1,955 words) - 21:11, 31 January 2024
- ...ally externally tangent. A plane intersects the spheres in three congruent circles centered at <math>A</math>, <math>B</math>, and <math>C</math>, respectivel Because the plane cuts out congruent circles, they have the same radius and from the given information, <math>AB = \sqrt7 KB (1,195 words) - 15:19, 1 February 2024
- ...e triangular region bounded by the three common tangent lines of these two circles. Two externally tangent circles <math>\omega_1</math> and <math>\omega_2</math> have centers <math>O_1</mat8 KB (1,397 words) - 09:18, 15 August 2022
- ...he locus of all points <math>\frac{i}{z}</math> is the intersection of two circles and has area <math>75\pi+50</math>. The greatest integer less than or equal887 bytes (154 words) - 17:37, 4 October 2020
- ...wo nonintersecting parabolas} \qquad \textbf{(C) }\ \text{two intersecting circles} \qquad</math> ...>, and <math>(x-5)^{2}+y^{2}=3</math>. What is the sum of the areas of all circles in <math>S</math>?15 KB (2,233 words) - 13:02, 10 November 2023
- .../math>, <math>BC=60</math>, and <math>BD=50</math>. Two externally tangent circles of radius <math>r</math> are positioned in the interior of the parallelogra8 KB (1,298 words) - 18:32, 7 January 2021
- Let the circles <math>k_1</math> and <math>k_2</math> intersect at two points <math>A</math1 KB (247 words) - 21:42, 27 September 2020
- //Draws a polar grid that goes out to a number of circles9 KB (1,484 words) - 02:25, 21 September 2023
- We can write the equation of the two circles as: <cmath>\odot\Gamma : x^{2}+y^{2}=7^{2}...(1)</cmath>16 KB (2,539 words) - 07:30, 30 December 2023
- Let <math>D</math> be the second point of intersection of the circles <math>AB_1B</math> and <math>AA_1C.</math> Then:1 KB (202 words) - 13:32, 25 December 2023
- Let <math>\Gamma_1</math> and <math>\Gamma_2</math> be two circles of unequal radii, with centres <math>O_1</math> and <math>O_2</math> respec2 KB (385 words) - 12:56, 5 November 2020
- ...center of one is inside the other. If the radii of two internally tangent circles is <math>r_1, r_2</math>, then the distance of their centers to each other342 bytes (58 words) - 03:14, 6 November 2020
- Two circles <math>C_1</math> and <math>C_2</math>, each of unit radius, have centers <m7 KB (1,149 words) - 17:16, 15 December 2020
- Since this contains <math>x^2 + y^2</math>, assume that there are circles. Therefore, we can guess that there is a center square with area <math>6 \c This problem asks for the area of <b>the union of these four circles</b>:5 KB (829 words) - 20:05, 29 October 2023
- <math>\textbf{(A)}</math> Two overlapping circles with each area <math>2\pi</math>. <math>\textbf{(B)}</math> Four not overlapping circles with each area <math>4\pi</math>.15 KB (2,366 words) - 17:45, 19 September 2021
- ...a radius of <math>4</math>, four arcs are drawn inside the circle. Smaller circles are inscribed inside the eye-shape diagrams. Let <math>x</math> denote the12 KB (1,915 words) - 17:38, 29 April 2021
- ...ave an overlap area of <math>7\pi</math> and the total area covered by the circles is <math>25\pi</math>. What is the value of <math>r</math>?5 KB (776 words) - 09:35, 8 August 2023
- .... Some common examples of geometric plane figures are squares, rectangles, circles, triangles, etc.352 bytes (53 words) - 23:33, 21 February 2024
- ...ave an overlap area of <math>7\pi</math> and the total area covered by the circles is <math>25\pi</math>. What is the value of <math>r</math>? The area of one of the circles is <cmath>\frac{25\pi+7\pi}{2}=16\pi.</cmath> The radius of a circle with a879 bytes (135 words) - 21:48, 3 January 2021
- Let <math>\Gamma_1</math> and <math>\Gamma_2</math> be two circles intersecting at <math>P</math> and <math>Q</math>. The common tangent, clos635 bytes (111 words) - 12:48, 11 January 2021
- ...</math> consists of all the points that lie inside exactly one of the four circles. What is the maximum possible area of region <math>S</math>? ...h circle lies either north or south to <math>\ell.</math> We construct the circles one by one:2 KB (363 words) - 18:22, 16 August 2022
- ...square, forming four quarter circles and four rectangles. The four quarter circles combine to make a full circle of radius <math>\frac{1}{2}</math>, so the ar6 KB (860 words) - 17:22, 11 November 2022
- ...>n = 6</math>, along with a ninja path in that triangle containing two red circles.991 bytes (164 words) - 17:38, 30 April 2024
- Two circles in a plane intersect. <math>A</math> is one of the points of intersection. ..._1), (O_2)</math>, recpectively. Let A' be the other intersection of the 2 circles different from the point A. Since the angles <math>\angle BO_1A = \angle CO8 KB (1,485 words) - 22:55, 29 January 2021
- ..., each of the six whole numbers <math>10-15</math> is placed in one of the circles so that the sum, <math>S</math>, of the three numbers on each side of the t ...h> must be <math>75</math> (this is the sum of the possible values for the circles). From this, we have that <math>a + c + e + (a + b + c + d + e + f) = a + c3 KB (439 words) - 13:42, 4 April 2024
- ...der sense" to mean the following: the set of points between two concentric circles, a disk without its center, and the exterior of a circle not including <mat8 KB (1,471 words) - 22:02, 12 April 2022
- We prove that circles <math>ACD, EXD</math> and <math>\Omega_0</math> centered at <math>P</math> Consider the circles <math>\omega = ACD</math> centered at <math>O_1, \omega' = A'BD,</math>7 KB (1,145 words) - 10:29, 18 June 2023
- ...xagon which includes that vertex. Prove that if the common part of all six circles (including the edge) is not empty, then the hexagon is regular.2 KB (377 words) - 18:08, 4 July 2022
- ...and <math>\omega_C</math> meet in six points---two points for each pair of circles. The three intersection points closest to the vertices of <math>\triangle A ...ally externally tangent. A plane intersects the spheres in three congruent circles centered at <math>A,</math> <math>B,</math> and <math>C,</math> respectivel9 KB (1,520 words) - 19:06, 2 January 2023
- ...ers that are <math>\tfrac{4}{3}</math> units apart. Two externally tangent circles <math>\omega_1</math> and <math>\omega_2</math> of radius <math>r_1</math>2 KB (377 words) - 15:56, 1 April 2021
- We first claim that the three circles <math>(BCC_1B_2),</math> <math>(CAA_1C_2),</math> and <math>(ABB_1A_2)</mat1 KB (236 words) - 04:12, 10 April 2024
- <math>\textbf{(A)}</math> Two overlapping circles with each area <math>2\pi</math>. <math>\textbf{(B)}</math> Four not overlapping circles with each area <math>4\pi</math>.14 KB (2,226 words) - 23:39, 12 September 2021
- ...hen, we can calculate the area of shaded region. It is made of two quarter circles and two right triangles. The total area would be <math>2\cdot25\pi+2\cdot\f3 KB (520 words) - 14:04, 26 April 2021
- ...The area of the outer semicircles would form two big circles and two small circles. <math>A_{semicircles}=2\cdot(\sqrt{2})^2\cdot\pi+2\cdot(2)^2\cdot\pi=12\pi3 KB (599 words) - 14:05, 26 April 2021
- <math>\textbf{(A)}</math> Two overlapping circles with each area <math>2\pi</math>. <math>\textbf{(B)}</math> Four not overlapping circles with each area <math>4\pi</math>.1 KB (223 words) - 13:54, 26 April 2021
- ...a radius of <math>4</math>, four arcs are drawn inside the circle. Smaller circles are inscribed inside the eye-shape diagrams. Let <math>x</math> denote the13 KB (2,097 words) - 17:38, 29 April 2021
- ...grid has 16 circles with radius of <math>\frac{1}{2}</math> such that all circles have vertices of the square as center. Assume that the diagram continues on11 KB (1,691 words) - 18:56, 25 April 2022
- ...l, <math>J</math> be Jon, and <math>S</math> be Sergey. The <math>4</math> circles represent the <math>4</math> players, and the arrow is from the winner to t4 KB (673 words) - 16:15, 24 January 2023
- ...e triangular region bounded by the three common tangent lines of these two circles.7 KB (991 words) - 20:43, 1 January 2024
- Two externally tangent circles <math>\omega_1</math> and <math>\omega_2</math> have centers <math>O_1</mat ...= O_2A' = r_1</math> and <math>O_2D = O_1B' = r_2</math>; the tangency of circles <math>\omega_1</math> and <math>\omega_2</math> implies <math>r_1 + r_2 =14 KB (2,217 words) - 00:28, 29 June 2023
- Let circles <math>\omega_1</math> and <math>\omega_2</math> with centers <math>Q</math> Let circles <math>O_1</math>,<math>O_2</math>, and <math>O_3</math> concur at <math>E</9 KB (1,577 words) - 23:28, 28 June 2021
- ...>, and <math>(x-5)^{2}+y^{2}=3</math>. What is the sum of the areas of all circles in <math>S</math>?15 KB (2,224 words) - 13:10, 20 February 2024
- ...truct with ruler and compass all the circles that are tangent to these two circles and pass through the point <math>P</math>.260 bytes (45 words) - 10:13, 30 June 2021
- ...me line, then they are on the same line. For example, the three red shaded circles count as one such set.) ...triangle that the circles make. There are <math>3</math> ways to pick the circles so that the row they make is parallel to each side of the equilateral trian1 KB (207 words) - 10:53, 16 July 2021
