| 3521 |
AIME 2003 I Q6 |
The sum of the areas of all triangles whose vertic... |
1484.00 |
| 3522 |
AIME 2003 I Q14 |
The decimal representation of \(m/n\), where \(m\)... |
1484.00 |
| 3523 |
AIME 2003 II Q12 |
The members of a distinguished committee were choo... |
1484.00 |
| 3524 |
AIME 1998 I Q4 |
Nine tiles are numbered \(1, 2, 3, \ldots, 9,\) re... |
1484.00 |
| 3525 |
AIME 1988 I Q10 |
A convex polyhedron has for its faces 12 squares, ... |
1484.00 |
| 3526 |
AIME 2016 I Q2 |
Two dice appear to be standard dice with their fac... |
1484.00 |
| 3527 |
AIME 2012 I Q14 |
Complex numbers \(a\), \(b\) and \(c\) are the zer... |
1484.00 |
| 3528 |
AIME 2022 I Q2 |
Find the three-digit positive integer \(\underline... |
1484.00 |
| 3529 |
AIME 2022 I Q4 |
Let \(w = \frac{\sqrt{3}+i}{2}\) and \(z=\frac{-1+... |
1484.00 |
| 3530 |
AIME 2022 I Q5 |
A straight river that is \(264\) meters wide flows... |
1484.00 |
| 3531 |
AIME 1983 I Q3 |
What is the product of the real roots of the equat... |
1484.00 |
| 3532 |
AIME 1983 I Q6 |
Let \(a_n = 6^n + 8^n\). Determine the remainder ... |
1484.00 |
| 3533 |
AIME 2009 I Q2 |
There is a complex number \( z\) with imaginary pa... |
1484.00 |
| 3534 |
AIME 1984 I Q8 |
The equation \(z^6 + z^3 + 1\) has one complex roo... |
1484.00 |
| 3535 |
AIME 1984 I Q10 |
Mary told John her score on the American High Scho... |
1484.00 |
| 3536 |
AIME 2015 I Q2 |
The nine delegates to the Economic Cooperation Con... |
1484.00 |
| 3537 |
AIME 2015 II Q2 |
In a new school \(40\) percent of the students are... |
1484.00 |
| 3538 |
AIME 1987 I Q1 |
An ordered pair \((m,n)\) of non-negative integers... |
1484.00 |
| 3539 |
AMC 10 2002 A Q4 |
For how many positive integers \( m\) does there e... |
1484.00 |
| 3540 |
AMC 12 2016 B Q6 |
All three vertices of \(\bigtriangleup ABC\) lie o... |
1483.99 |