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k a May Highlights and 2025 AoPS Online Class Information
jlacosta   0
May 1, 2025
May is an exciting month! National MATHCOUNTS is the second week of May in Washington D.C. and our Founder, Richard Rusczyk will be presenting a seminar, Preparing Strong Math Students for College and Careers, on May 11th.

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0 replies
jlacosta
May 1, 2025
0 replies
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Pertenacious Polynomial Problem
BadAtCompetitionMath21420   2
N 32 minutes ago by Tetra_scheme
Let the polynomial $P(x) = x^3-x^2+px-q$ have real roots and real coefficients with $q>0$. What is the maximum value of $p+q$?

This is a problem I made for my math competition, and I wanted to see if someone would double-check my work (No Mike allowed):

solution
Is this solution good?
2 replies
+1 w
BadAtCompetitionMath21420
Today at 3:13 AM
Tetra_scheme
32 minutes ago
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2022 MARBLE - Mock ARML I -8 \frac{a}{b+c}+\frac{b}{c+a}+\frac{c}{a+b}=32
parmenides51   2
N an hour ago by Kempu33334
Let $a,b,c$ complex numbers with $ab+ +bc+ca = 61$ such that
$$\frac{1}{b+c}+\frac{1}{c+a}+\frac{1}{a+b}= 5$$$$\frac{a}{b+c}+\frac{b}{c+a}+\frac{c}{a+b}=32.$$Find the value of $abc$.
2 replies
parmenides51
Jan 14, 2024
Kempu33334
an hour ago
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Inequalities
sqing   13
N 2 hours ago by sqing
Let $ a,b,c>0 , a+b+c +abc=4$. Prove that
$$ \frac {a}{a^2+2}+\frac {b}{b^2+2}+\frac {c}{c^2+2} \leq 1$$Let $ a,b,c>0 , ab+bc+ca+abc=4$. Prove that
$$ \frac {a}{a^2+2}+\frac {b}{b^2+2}+\frac {c}{c^2+2} \leq 1$$
13 replies
sqing
May 15, 2025
sqing
2 hours ago
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Geomettry ez
AnhIsGod   1
N 4 hours ago by Soupboy0
Let two circles (O) and (O') intersect at two points (one of which is called A). The common tangent CD (with C belonging to (O) and D belonging to (O')) lies on the same side as A with respect to the line OO', intersecting OO' at S. The line segment SA intersects circle (O) at E (different from A). Prove that EC is parallel to AD.
1 reply
AnhIsGod
5 hours ago
Soupboy0
4 hours ago
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Trapezium problem very nice
manlio   0
Today at 11:00 AM
Given trapezium ABCD with basis AB and CD parallel. Choose a point E on side BC and a point F on side AD such that AE Is parallel to FC . Prove that DE Is parallel to FB.
0 replies
manlio
Today at 11:00 AM
0 replies
J
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Minimum and Maximum of Complex Numbers
pythagorazz   1
N Today at 8:39 AM by alexheinis
Let $a,b,$ and $c$ be complex numbers. For a complex number $z=p+qi$ where $i=\sqrt(-1)$, define the norm $|z|$ to be the distance of $z$ from the origin, or $|z|=\sqrt(p^2+q^2 )$. Let $m$ be the minimum value and $M$ be the maximum value of $\frac{(|a+b|+|b+c|+|c+a|)}{(|a|+|b|+|c| )}$ for all complex numbers $a,b,c$ where $|a|+|b|+|c|\ne 0$. Find $M+m$.
1 reply
pythagorazz
Apr 14, 2025
alexheinis
Today at 8:39 AM
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Folklore
Osim_09   2
N Today at 8:36 AM by pigeon123
Let ABCD be a circumscribed quadrilateral, which is also cyclic. Let I be the incenter, O the circumcenter, and E the intersection point of the diagonals of the quadrilateral. Prove that the points O, I, and E are collinear.
2 replies
Osim_09
Jan 21, 2025
pigeon123
Today at 8:36 AM
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Bounding With Powers
Shreyasharma   5
N Today at 2:20 AM by jacosheebay
Is this a valid solution for the following problem (St. Petersburg 1996):

Find all positive integers $n$ such that,

$$ 3^{n-1} + 5^{n-1} | 3^n + 5^n$$
Solution
5 replies
Shreyasharma
Jul 11, 2023
jacosheebay
Today at 2:20 AM
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2021 SMT Guts Round 5 p17-20 - Stanford Math Tournament
parmenides51   7
N Yesterday at 8:05 PM by Rombo
p17. Let the roots of the polynomial $f(x) = 3x^3 + 2x^2 + x + 8 = 0$ be $p, q$, and $r$. What is the sum $\frac{1}{p} +\frac{1}{q} +\frac{1}{r}$ ?


p18. Two students are playing a game. They take a deck of five cards numbered $1$ through $5$, shuffle them, and then place them in a stack facedown, turning over the top card next to the stack. They then take turns either drawing the card at the top of the stack into their hand, showing the drawn card to the other player, or drawing the card that is faceup, replacing it with the card on the top of the pile. This is repeated until all cards are drawn, and the player with the largest sum for their cards wins. What is the probability that the player who goes second wins, assuming optimal play?


p19. Compute the sum of all primes $p$ such that $2^p + p^2$ is also prime.


p20. In how many ways can one color the $8$ vertices of an octagon each red, black, and white, such that no two adjacent sides are the same color?


PS. You should use hide for answers. Collected here.
7 replies
parmenides51
Feb 11, 2022
Rombo
Yesterday at 8:05 PM
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2024 Mock AIME 1 ** p15 (cheaters' trap) - 128 | n^{\sigma (n)} - \sigma(n^n)
parmenides51   6
N Yesterday at 7:32 PM by NamelyOrange
Let $N$ be the number of positive integers $n$ such that $n$ divides $2024^{2024}$ and $128$ divides
$$n^{\sigma (n)} - \sigma(n^n)$$where $\sigma (n)$ denotes the number of positive integers that divide $n$, including $1$ and $n$. Find the remainder when $N$ is divided by $1000$.
6 replies
parmenides51
Jan 29, 2025
NamelyOrange
Yesterday at 7:32 PM
J
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Minimum number of points
Ecrin_eren   6
N Yesterday at 6:01 PM by Ecrin_eren
There are 18 teams in a football league. Each team plays against every other team twice in a season—once at home and once away. A win gives 3 points, a draw gives 1 point, and a loss gives 0 points. One team became the champion by earning more points than every other team. What is the minimum number of points this team could have?

6 replies
Ecrin_eren
May 15, 2025
Ecrin_eren
Yesterday at 6:01 PM
J
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b+c <=a/sin(A/2)
lgx57   4
N Yesterday at 4:27 PM by cosinesine
Prove that: In $\triangle ABC$,$b+c \le \dfrac{a}{\sin \frac{A}{2}}$
4 replies
lgx57
Yesterday at 1:11 PM
cosinesine
Yesterday at 4:27 PM
J
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2014 preRMO p10, computational with ratios and areas
parmenides51   11
N Yesterday at 3:16 PM by MATHS_ENTUSIAST
In a triangle $ABC, X$ and $Y$ are points on the segments $AB$ and $AC$, respectively, such that $AX : XB = 1 : 2$ and $AY :YC = 2:1$. If the area of triangle $AXY$ is $10$, then what is the area of triangle $ABC$?
11 replies
parmenides51
Aug 9, 2019
MATHS_ENTUSIAST
Yesterday at 3:16 PM
J
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Graphs and Trig
Math1331Math   7
N Yesterday at 2:43 PM by BlackOctopus23
The graph of the function $f(x)=\sin^{-1}(2\sin{x})$ consists of the union of disjoint pieces. Compute the distance between the endpoints of any one piece
7 replies
Math1331Math
Jun 19, 2016
BlackOctopus23
Yesterday at 2:43 PM
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trigonometric functions
VivaanKam   16
N Yesterday at 1:03 AM by Shan3t
Hi could someone explain the basic trigonometric functions to me like sin, cos, tan etc.
Thank you!
16 replies
VivaanKam
Apr 29, 2025
Shan3t
Yesterday at 1:03 AM
J
trigonometric functions
G H J
Reveal topic tags
trigonometry
geometry
function
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G H BBookmark kLocked kLocked NReply
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VivaanKam
167 posts
VivaanKam
#1 Apr 29, 2025, 8:29 PM • 2 Y
Y by PikaPika999, linjiah
Hi could someone explain the basic trigonometric functions to me like sin, cos, tan etc.
Thank you!
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Lijin
225 posts
Lijin
#2 Apr 29, 2025, 8:43 PM • 2 Y
Y by PikaPika999, linjiah
Are you talking about graphing them or just the basic ratios?
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Yiyj1
1266 posts
Yiyj1
#4 Apr 29, 2025, 8:57 PM • 2 Y
Y by PikaPika999, linjiah
Basic ratios: draw a right triangle. I'm terrible at asy so i can't draw one D:. Anyways, label one of the angles $\theta$. Then, label the hypotenuse with $H$, the leg adjacent to $\theta$ as $A$ (for adjacent) and the other leg $O$ (for opposite). Then, just remember this: SOH CAH TOA:\[\sin\theta=\dfrac{O}{H}, \cos\theta=\dfrac{A}{H}, \tan\theta=\dfrac{O}{A}.\]Then there are like $\sec, \csc, \cot$, which are the reciprocals of $\cos, \sin, \tan$. IMPORTANT: $\sec$ is the reciprocal of $\cos$ and $\csc$ is the reciprocal of $\sin$, not the other way around.
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aok
348 posts
aok
#5 Apr 29, 2025, 10:08 PM • 1 Y
Y by linjiah
To solve things such as $\sin 150$ or $\cos 270$ you can draw a circle of radius 1 around the origin, rotate a line from the positive x line counterclockwise by $\theta^\circ$ to form a new line. To solve for cos,sin, and tan $\theta,$ where the $(x,y)$ hits circle after rotation and $x = \cos\theta$,$y = \sin\theta$, and $\frac{y}{x} = \tan\theta.$
This post has been edited 4 times. Last edited by aok, Apr 29, 2025, 10:48 PM
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VivaanKam
167 posts
VivaanKam
#6 Apr 30, 2025, 6:25 PM • 1 Y
Y by linjiah
Yiyj1 wrote:
Basic ratios: draw a right triangle. I'm terrible at asy so i can't draw one D:. Anyways, label one of the angles $\theta$. Then, label the hypotenuse with $H$, the leg adjacent to $\theta$ as $A$ (for adjacent) and the other leg $O$ (for opposite). Then, just remember this: SOH CAH TOA:\[\sin\theta=\dfrac{O}{H}, \cos\theta=\dfrac{A}{H}, \tan\theta=\dfrac{O}{A}.\]Then there are like $\sec, \csc, \cot$, which are the reciprocals of $\cos, \sin, \tan$. IMPORTANT: $\sec$ is the reciprocal of $\cos$ and $\csc$ is the reciprocal of $\sin$, not the other way around.

So like this?

[asy] draw((0,0)--(3,0)--(0,2)--cycle); label("$\theta$", (2.7,0.1),W); label("$A$", (1.5,0), S); label("$O$", (0,1.205), W); label("$H$", (1.2,1.1), NE); [/asy]
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VivaanKam
167 posts
VivaanKam
#7 Apr 30, 2025, 6:26 PM • 1 Y
Y by linjiah
That’s cool! So if you have the lengths of a triangle you can find its angles?
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VivaanKam
167 posts
VivaanKam
#8 Apr 30, 2025, 6:31 PM • 1 Y
Y by linjiah
aok wrote:
To solve things such as $\sin 150$ or $\cos 270$ you can draw a circle of radius 1 around the origin, rotate a line from the positive x line counterclockwise by $\theta^\circ$ to form a new line. To solve for cos,sin, and tan $\theta,$ where the $(x,y)$ hits circle after rotation and $x = \cos\theta$,$y = \sin\theta$, and $\frac{y}{x} = \tan\theta.$

are they like polar quardinits ?
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VivaanKam
167 posts
VivaanKam
#9 Apr 30, 2025, 6:34 PM • 1 Y
Y by linjiah
but the wouldn't $\cos x$ have 2 values because on a circle there are two quordinates with the same $x$ position?
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lpieleanu
3001 posts
lpieleanu
#10 Apr 30, 2025, 6:38 PM • 1 Y
Y by linjiah
Yes, you can find the side lengths of a triangle given its angles. (If it is right, you can just use the standard ratio definitions of $\sin, \cos, \tan$ and use inverse trigonometric functions, and if it is not right, then you can use the Law of Cosines to find each angle.)

The point in rectangular coordinates $(\cos(\theta), \sin(\theta))$ corresponds to the point in polar coordinates $(1, \theta),$ i.e. $(\cos(\theta), \sin(\theta))$ is the point on the unit circle at an angle of $\theta$ radians counterclockwise of the positive $x$-axis.

Yes, the equation $\cos(x)=a$ has two solutions in $[0, 2\pi)$ for all $-1<a<1.$

Also, reminder that you can combine all of your questions into the same post. :)
This post has been edited 1 time. Last edited by lpieleanu, Apr 30, 2025, 6:39 PM
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aok
348 posts
aok
#11 Apr 30, 2025, 7:12 PM • 1 Y
Y by linjiah
that is correct, cos x = a has 2 solutions (generally)
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aok
348 posts
aok
#12 May 2, 2025, 12:43 AM • 1 Y
Y by linjiah
for x btw
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aok
348 posts
aok
#13 May 3, 2025, 5:50 PM • 1 Y
Y by linjiah
VivaanKam wrote:
That’s cool! So if you have the lengths of a triangle you can find its angles?

Correct, use the opposite of those functions.
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aok
348 posts
aok
#14 May 5, 2025, 11:06 PM • 1 Y
Y by linjiah
*use the cos theorem to find cos(x) then use the cos^-1
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BlackOctopus23
132 posts
BlackOctopus23
#15 May 15, 2025, 3:05 PM • 1 Y
Y by linjiah
The Unit Circle is also vital in trigonometry and in understanding the functions. This video helped me understand it a lot! Click to reveal hidden text. The unit circle is basically a circle of radius one. Remember that $cos$ is the $x$ and $sin$ is the $y$ if we are viewing it in the perspective of a graph.
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aok
348 posts
aok
#16 Yesterday at 12:42 AM
Y by
Using unit circle as stated.
aok wrote:
To solve things such as $\sin 150$ or $\cos 270$ you can draw a circle of radius 1 around the origin, rotate a line from the positive x line counterclockwise by $\theta^\circ$ to form a new line. To solve for cos,sin, and tan $\theta,$ where the $(x,y)$ hits circle after rotation and $x = \cos\theta$,$y = \sin\theta$, and $\frac{y}{x} = \tan\theta.$
This post has been edited 1 time. Last edited by aok, Yesterday at 12:42 AM
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Shan3t
379 posts
Shan3t
#17 Yesterday at 12:59 AM
Y by
might be a bit advanced but Ceva's Theorem, and Extended LoS
This post has been edited 1 time. Last edited by Shan3t, Yesterday at 1:03 AM
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Shan3t
379 posts
Shan3t
#18 Yesterday at 1:03 AM
Y by
Shan3t wrote:
might be a bit advanced but Ceva's Theorem, and Extended LoS

also SAS(for area, side angle side), and Ceva's branches off to Menelaus's
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