| 581 |
AIME 2000 II Q15 |
Find the least positive integer \(n\) such that \[... |
1516.00 |
| 582 |
AIME 2014 I Q5 |
Let the set \(S = \{P_1, P_2, \cdots, P_{12}\}\) c... |
1516.00 |
| 583 |
AIME 2014 I Q8 |
The positive integers \(N\) and \(N^2\) both end i... |
1516.00 |
| 584 |
AIME 2001 I Q14 |
A mail carrier delivers mail to the nineteen house... |
1516.00 |
| 585 |
AIME 2001 II Q2 |
Each of the 2001 students at a high school studies... |
1516.00 |
| 586 |
AIME 2019 I Q5 |
A moving particle starts at the point \(\left(4,4\... |
1516.00 |
| 587 |
AIME 1992 I Q10 |
Consider the region \(A\) in the complex plane tha... |
1516.00 |
| 588 |
AIME 1992 I Q11 |
Lines \(l_1\) and \(l_2\) both pass through the or... |
1516.00 |
| 589 |
AIME 1990 I Q15 |
Find \(ax^5 + by^5\) if the real numbers \(a\), \(... |
1516.00 |
| 590 |
AIME 1988 I Q4 |
Suppose that \(|x_i| < 1\) for \(i = 1, 2, \dots, ... |
1516.00 |
| 591 |
AIME 2016 I Q11 |
Let \(P(x)\) be a nonzero polynomial such that \((... |
1516.00 |
| 592 |
AIME 2016 II Q4 |
An \(a\times b\times c\) rectangular box is built ... |
1516.00 |
| 593 |
AIME 2016 II Q6 |
For polynomial \(P(x)=1-\frac{1}{3}x+\frac{1}{6}x^... |
1516.00 |
| 594 |
AIME 2016 II Q8 |
Find the number of sets \(\{a,b,c\}\) of three dis... |
1516.00 |
| 595 |
AIME 2016 II Q12 |
The figure below shows a ring made of six small se... |
1516.00 |
| 596 |
AIME 2016 II Q15 |
For \(1\leq i\leq 215\) let \(a_i=\frac{1}{2^i}\) ... |
1516.00 |
| 597 |
AIME 2012 I Q5 |
Let \(B\) be the set of all binary integers that c... |
1516.00 |
| 598 |
AIME 2012 I Q9 |
Let \(x\), \(y\), and \(z\) be positive real numbe... |
1516.00 |
| 599 |
AIME 2012 I Q12 |
Let \(\triangle ABC\) be a right triangle with rig... |
1516.00 |
| 600 |
AIME 2012 II Q5 |
In the accompanying figure, the outer square has s... |
1516.00 |