| 561 |
AIME 2020 I Q14 |
Let \(P(x)\) be a quadratic polynomial with comple... |
1516.00 |
| 562 |
AIME 2020 II Q4 |
Triangles \(\triangle ABC\) and \(\triangle A'B'C'... |
1516.00 |
| 563 |
AIME 2020 II Q12 |
Let \(m\) and \(n\) be odd integers greater than \... |
1516.00 |
| 564 |
AIME 2013 I Q11 |
Ms. Math's kindergarten class has \(16\) registere... |
1516.00 |
| 565 |
AIME 2013 II Q8 |
A hexagon that is inscribed in a circle has side l... |
1516.00 |
| 566 |
AIME 1995 I Q7 |
Given that \((1+\sin t)(1+\cos t)=5/4\) and \[ (1-... |
1516.00 |
| 567 |
AIME 1996 I Q8 |
The harmonic mean of two positive numbers is the r... |
1516.00 |
| 568 |
AIME 1996 I Q9 |
A bored student walks down a hall that contains a ... |
1516.00 |
| 569 |
AIME 1996 I Q11 |
Let \(P\) be the product of the roots of \(z^6+z^4... |
1516.00 |
| 570 |
AIME 1996 I Q15 |
In parallelogram \(ABCD,\) let \(O\) be the inters... |
1516.00 |
| 571 |
AIME 2021 I Q15 |
Let \(S\) be the set of positive integers \(k\) su... |
1516.00 |
| 572 |
AIME 2021 II Q7 |
Let \(a, b, c,\) and \(d\) be real numbers that sa... |
1516.00 |
| 573 |
AIME 2021 II Q11 |
A teacher was leading a class of four perfectly lo... |
1516.00 |
| 574 |
AIME 1991 I Q2 |
Rectangle \(ABCD\) has sides \(\overline {AB}\) of... |
1516.00 |
| 575 |
AIME 1991 I Q3 |
Expanding \((1+0.2)^{1000}\) by the binomial theor... |
1516.00 |
| 576 |
AIME 2010 I Q5 |
Positive integers \( a\), \( b\), \( c\), and \( d... |
1516.00 |
| 577 |
AIME 2010 I Q7 |
Define an ordered triple \( (A, B, C)\) of sets to... |
1516.00 |
| 578 |
AIME 2005 I Q2 |
For each positive integer \(k\), let \(S_k\) denot... |
1516.00 |
| 579 |
AIME 2005 I Q10 |
Triangle \(ABC\) lies in the Cartesian Plane and h... |
1516.00 |
| 580 |
AIME 2005 I Q14 |
Consider the points \(A(0,12)\), \(B(10,9)\), \(C(... |
1516.00 |