| 561 |
AIME 2005 I Q14 |
Consider the points \(A(0,12)\), \(B(10,9)\), \(C(... |
1516.00 |
| 562 |
AIME 2006 I Q3 |
Find the least positive integer such that when its... |
1516.00 |
| 563 |
AIME 2006 I Q7 |
An angle is drawn on a set of equally spaced paral... |
1516.00 |
| 564 |
AIME 2006 I Q9 |
The sequence \(a_1, a_2, \ldots\) is geometric wit... |
1516.00 |
| 565 |
AIME 2006 II Q6 |
Square \(ABCD\) has sides of length 1. Points \(E\... |
1516.00 |
| 566 |
AIME 1999 I Q1 |
Find the smallest prime that is the fifth term of ... |
1516.00 |
| 567 |
AIME 1999 I Q3 |
Find the sum of all positive integers \(n\) for wh... |
1516.00 |
| 568 |
AIME 1999 I Q6 |
A transformation of the first quadrant of the coor... |
1516.00 |
| 569 |
AIME 1999 I Q13 |
Forty teams play a tournament in which every team ... |
1516.00 |
| 570 |
AIME 2008 I Q2 |
Square \( AIME\) has sides of length \( 10\) units... |
1516.00 |
| 571 |
AIME 2008 I Q5 |
A right circular cone has base radius \( r\) and h... |
1516.00 |
| 572 |
AIME 2008 I Q15 |
A square piece of paper has sides of length \( 100... |
1516.00 |
| 573 |
AIME 2008 II Q2 |
Rudolph bikes at a constant rate and stops for a f... |
1516.00 |
| 574 |
AIME 2008 II Q13 |
A regular hexagon with center at the origin in the... |
1516.00 |
| 575 |
AIME 1993 I Q13 |
Jenny and Kenny are walking in the same direction,... |
1516.00 |
| 576 |
AIME 1985 I Q10 |
How many of the first 1000 positive integers can b... |
1516.00 |
| 577 |
AIME 1985 I Q14 |
In a tournament each player played exactly one gam... |
1516.00 |
| 578 |
AIME 2000 I Q8 |
A container in the shape of a right circular cone ... |
1516.00 |
| 579 |
AIME 2000 I Q9 |
The system of equations
\begin{eqnarray*}\log_{10... |
1516.00 |
| 580 |
AIME 2000 II Q6 |
One base of a trapezoid is 100 units longer than t... |
1516.00 |