2201 |
AIME 1997 I Q3 |
Sarah intended to multiply a two-digit number and ... |
1500.00 |
2202 |
AIME 1997 I Q4 |
Circles of radii 5, 5, 8, and \(m/n\) are mutually... |
1500.00 |
2203 |
AIME 1997 I Q6 |
Point \(B\) is in the exterior of the regular \(n\... |
1500.00 |
2204 |
AIME 1997 I Q8 |
How many different \(4\times 4\) arrays whose entr... |
1500.00 |
2205 |
AIME 1997 I Q10 |
Every card in a deck has a picture of one shape - ... |
1500.00 |
2206 |
AIME 1997 I Q11 |
Let \(x=\frac{\displaystyle\sum_{n=1}^{44} \cos n^... |
1500.00 |
2207 |
AIME 1997 I Q12 |
The function \(f\) defined by \(\displaystyle f(x)... |
1500.00 |
2208 |
AIME 1997 I Q13 |
Let \( S\) be the set of points in the Cartesian p... |
1500.00 |
2209 |
AIME 1997 I Q14 |
Let \(v\) and \(w\) be distinct, randomly chosen r... |
1500.00 |
2210 |
AIME 1997 I Q15 |
The sides of rectangle \(ABCD\) have lengths 10 an... |
1500.00 |
2211 |
AIME 2018 I Q2 |
The number \(n\) can be written in base \(14\) as ... |
1500.00 |
2212 |
AIME 2018 I Q3 |
Kathy has \(5\) red cards and \(5\) green cards. S... |
1500.00 |
2213 |
AIME 2018 I Q4 |
In \(\triangle ABC, AB = AC = 10\) and \(BC = 12\)... |
1500.00 |
2214 |
AIME 2018 I Q5 |
For each ordered pair of real numbers \((x,y)\) sa... |
1500.00 |
2215 |
AIME 2018 I Q6 |
Let \(N\) be the number of complex numbers \(z\) w... |
1500.00 |
2216 |
AIME 2018 I Q7 |
A right hexagonal prism has height \(2\). The base... |
1500.00 |
2217 |
AIME 2018 I Q8 |
Let \(ABCDEF\) be an equiangular hexagon such that... |
1500.00 |
2218 |
AIME 2018 I Q9 |
Find the number of four-element subsets of \(\{1,2... |
1500.00 |
2219 |
AIME 2018 I Q10 |
The wheel shown below consists of two circles and ... |
1500.00 |
2220 |
AIME 2018 I Q11 |
Find the least positive integer \(n\) such that wh... |
1500.00 |