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- ! scope="row" | '''Mock AMC O'''51 KB (6,175 words) - 20:58, 6 December 2023
- triple O=(0,0,0),T=(0,0,5),C=(0,3,0),A=(-3*3^.5/2,-3/2,0),B=(3*3^.5/2,-3/2,0); draw(T--S--B--T--C--B--S--C);draw(B--A--C--A--S,ddash);draw(T--O--M,ddash);6 KB (980 words) - 21:45, 31 March 2020
- If a number is in the form <math>N=2^k+2^{R}O</math> where <math>O</math> is a positive odd number, <math>R<k</math>: <math>N<2^{k+1}=2^k+2^k\Longrightarrow O<2^{k-R}</math> so there are <math>2^{k-R-1}</math> numbers that satisfy thi10 KB (1,702 words) - 00:45, 16 November 2023
- |<math>{\oe}</math>||{\oe}||<math>{\ae}</math>||{\ae}||<math>{\o}</math>||{\o} ...<math>{\AE}</math>||{\AE}||<math>{\AA}</math>||{\AA}||<math>{\O}</math>||{\O}16 KB (2,324 words) - 16:50, 19 February 2024
- ...s <math> A</math> and <math> B</math> are on the circle centered at <math> O</math>, and points <math> C</math> and <math> D</math> are on the circle ce pair[] O;13 KB (2,058 words) - 12:36, 4 July 2023
- pair O=(0,0), C=(-1/3.0), B=(1,0), A=(-1,0); dot(O);13 KB (1,971 words) - 13:03, 19 February 2020
- ...2001 </math>. What is the largest possible value of the sum <math>I + M + O</math>? A [[circle]] centered at <math>O</math> has [[radius]] <math>1</math> and contains the point <math>A</math>.13 KB (1,948 words) - 12:26, 1 April 2022
- pair O = (15*15/17,8*15/17), C = (17,0), D = (0,0), P = (25.6,19.2), Q = (25.6, 18 pair A = 2*O-C, B = 2*O-D;13 KB (1,987 words) - 18:53, 10 December 2022
- pair O=(0,0); path inner=Circle(O,r1), outer=Circle(O,r2);13 KB (2,049 words) - 13:03, 19 February 2020
- ...s <math> A</math> and <math> B</math> are on the circle centered at <math> O</math>, and points <math> C</math> and <math> D</math> are on the circle ce pair[] O;3 KB (458 words) - 16:40, 6 October 2019
- Call the center <math>O</math>, and the two endpoints of the arc <math>A</math> and <math>B</math>,2 KB (343 words) - 15:39, 14 June 2023
- ...the faces of <math> O, </math> and that the ratio of the volume of <math> O </math> to that of <math> C </math> is <math> \frac mn, </math> where <math Square <math> ABCD </math> has center <math> O, AB=900, E </math> and <math> F </math> are on <math> AB </math> with <math7 KB (1,119 words) - 21:12, 28 February 2020
- [[Square]] <math>ABCD </math> has [[center]] <math> O,\ AB=900,\ E </math> and <math> F </math> are on <math> AB </math> with <ma ...abel("\(x\)",E/2+G/2,(0,1));label("\(y\)",G/2+F/2,(0,1)); label("\(450\)",(O+G)/2,(-1,1));13 KB (2,080 words) - 21:20, 11 December 2022
- ...the faces of <math> O, </math> and that the ratio of the volume of <math> O </math> to that of <math> C </math> is <math> \frac mn, </math> where <math3 KB (436 words) - 03:10, 23 September 2020
- ...oints at which the "corners" of the semicircle touch the square. Let <math>O</math> be the center of the semicircle. ...of the semicircle as <math>r</math>. Draw the [[perpendicular]] from <math>O</math> to <math>AB</math>, which forms a <math>45-45-90</math> triangle. Th4 KB (707 words) - 11:11, 16 September 2021
- label("$O$",(0,0),NW,fontsize(9)); ...icular, as <math>\angle OF_1T=\angle OF_2T</math>, this implies that <math>O, F_1, F_2</math>, and <math>T</math> are concyclic.12 KB (2,000 words) - 13:17, 28 December 2020
- ...-8,4), B=(0,-8,h), C=(Cxy.x,Cxy.y,0), D=(A.x,A.y,0), E=(B.x,B.y,0), O=(O.x,O.y,h); draw(circle(O,8));4 KB (729 words) - 01:00, 27 November 2022
- ...= 36/5</math>. Since <math>\triangle AOR \sim \triangle AED</math> (<math>O</math> is the center of the circle), we find that <math>AR = 5</math> since5 KB (836 words) - 07:53, 15 October 2023
- ...of the center circle be <math>r</math> and its center be denoted as <math>O</math>. pair A=(0,0), B=(6,0), D=(1, 24^.5), C=(5,D.y), O = (3,(r^2 + 6*r)^.5);3 KB (431 words) - 23:21, 4 July 2013
- pair O=(0,0), A=r*dir(45),B=(A.x,A.y-r); path P=circle(O,r);7 KB (1,104 words) - 03:13, 27 May 2024
