| 1301 |
AMC 12 2008 A Q12 |
A function \( f\) has domain \( [0,2]\) and range ... |
1500.00 |
| 1302 |
AMC 12 2008 A Q16 |
The numbers \( \log(a^3b^7)\), \( \log(a^5b^{12})\... |
1500.00 |
| 1303 |
AMC 12 2008 A Q18 |
Triangle \( ABC\), with sides of length \( 5\), \(... |
1500.00 |
| 1304 |
AMC 12 2008 A Q19 |
In the expansion of
\[ \left(1 + x + x^2 + \cdots... |
1500.00 |
| 1305 |
AMC 12 2008 A Q20 |
Triangle \( ABC\) has \( AC=3\), \( BC=4\), and \(... |
1500.00 |
| 1306 |
AMC 12 2008 A Q21 |
A permutation \( (a_1,a_2,a_3,a_4,a_5)\) of \( (1,... |
1500.00 |
| 1307 |
AMC 12 2008 A Q23 |
The solutions of the equation \( z^4 + 4z^3i - 6z^... |
1500.00 |
| 1308 |
AMC 12 2008 B Q4 |
On circle \( O\), points \( C\) and \( D\) are on ... |
1500.00 |
| 1309 |
AMC 12 2008 B Q11 |
A cone-shaped mountain has its base on the ocean f... |
1500.00 |
| 1310 |
AMC 12 2008 B Q14 |
A circle has a radius of \( \log_{10}(a^2)\) and a... |
1500.00 |
| 1311 |
AMC 12 2008 B Q15 |
On each side of a unit square, an equilateral tria... |
1500.00 |
| 1312 |
AMC 12 2008 B Q17 |
Let \( A\), \( B\), and \( C\) be three distinct p... |
1500.00 |
| 1313 |
AMC 12 2008 B Q18 |
A pyramid has a square base \( ABCD\) and vertex \... |
1500.00 |
| 1314 |
AMC 12 2008 B Q19 |
A function \( f\) is defined by \( f(z) = (4 + i) ... |
1500.00 |
| 1315 |
AMC 12 2008 B Q21 |
Two circles of radius 1 are to be constructed as f... |
1500.00 |
| 1316 |
AMC 12 2008 B Q22 |
A parking lot has \( 16\) spaces in a row. Twelve ... |
1500.00 |
| 1317 |
AMC 12 2008 B Q25 |
Let \( ABCD\) be a trapezoid with \( AB||CD\), \( ... |
1500.00 |
| 1318 |
AMC 12 2021 Fall A Q1 |
What is the value of \(\frac{(2112-2021)^2}{169}\)... |
1500.00 |
| 1319 |
AMC 12 2021 Fall A Q2 |
Menkara has a \(4 \times 6\) index card. If she sh... |
1500.00 |
| 1320 |
AMC 12 2021 Fall A Q3 |
Mr. Lopez has a choice of two routes to get to wor... |
1500.00 |