| 1341 |
AMC 12 2021 Fall B Q10 |
What is the sum of all possible values of \(t\) be... |
1500.00 |
| 1342 |
AMC 12 2021 Fall B Q14 |
Suppose that \(P(z), Q(z)\), and \(R(z)\) are poly... |
1500.00 |
| 1343 |
AMC 12 2021 Fall B Q15 |
Three identical square sheets of paper each with s... |
1500.00 |
| 1344 |
AMC 12 2021 Fall B Q16 |
Let \(a, b,\) and \(c\) be positive integers such ... |
1500.00 |
| 1345 |
AMC 12 2021 Fall B Q17 |
A bug starts at a vertex of a grid made of equilat... |
1500.00 |
| 1346 |
AMC 12 2021 Fall B Q18 |
Set \(u_0 = \frac{1}{4},\) and for \(k \geq 0\) le... |
1500.00 |
| 1347 |
AMC 12 2021 Fall B Q19 |
Regular polygons with \(5, 6, 7, \) and \(8\) side... |
1500.00 |
| 1348 |
AMC 12 2021 Fall B Q20 |
A cube is constructed from \(4\) white unit cubes ... |
1500.00 |
| 1349 |
AMC 12 2021 Fall B Q22 |
Right triangle \(ABC\) has side lengths \(BC=6\), ... |
1500.00 |
| 1350 |
AMC 12 2021 Fall B Q24 |
Triangle \(ABC\) has side lengths \(AB = 11, BC=24... |
1500.00 |
| 1351 |
AMC 12 2001 A Q5 |
What is the product of all odd positive integers l... |
1500.00 |
| 1352 |
AMC 12 2001 A Q14 |
Given the nine-sided regular polygon \( A_1 A_2 A_... |
1500.00 |
| 1353 |
AMC 12 2001 A Q16 |
A spider has one sock and one shoe for each of its... |
1500.00 |
| 1354 |
AMC 12 2001 A Q17 |
A point \( P\) is selected at random from the inte... |
1500.00 |
| 1355 |
AMC 12 2001 A Q18 |
A circle centered at \( A\) with a radius of 1 and... |
1500.00 |
| 1356 |
AMC 12 2001 A Q19 |
The polynomial \( P(x) = x^3 + ax^2 + bx + c\) has... |
1500.00 |
| 1357 |
AMC 12 2001 A Q20 |
Points \( A = (3,9), B = (1,1), C = (5,3),\) and \... |
1500.00 |
| 1358 |
AMC 12 2001 A Q22 |
In rectangle \( ABCD\), points \( F\) and \( G\) l... |
1500.00 |
| 1359 |
AMC 12 2001 A Q24 |
In \( \triangle ABC\), \( \angle ABC = 45^\circ\).... |
1500.00 |
| 1360 |
AMC 12 2001 A Q25 |
Consider sequences of positive real numbers of the... |
1500.00 |