| 361 |
AMC 10 2000 A Q7 |
In rectangle \( ABCD\), \( AD = 1\), \( P\) is on ... |
1516.00 |
| 362 |
AMC 10 2000 A Q14 |
Mrs. Walter gave an exam in a mathematics class of... |
1516.00 |
| 363 |
AMC 10 2000 A Q21 |
If all alligators are ferocious creatures and some... |
1516.00 |
| 364 |
AMC 10 2001 A Q19 |
Pat wants to buy four donuts from an ample supply ... |
1516.00 |
| 365 |
AMC 10 2001 A Q20 |
A regular octagon is formed by cutting an isoscele... |
1516.00 |
| 366 |
AMC 10 2002 A Q12 |
Mr. Earl E. Bird leaves his house for work at exac... |
1516.00 |
| 367 |
AMC 10 2002 A Q24 |
Tina randomly selects two distinct numbers from th... |
1516.00 |
| 368 |
AMC 10 2002 B Q8 |
Suppose July of year \( N\) has five Mondays. Whic... |
1516.00 |
| 369 |
AMC 10 2002 B Q17 |
A regular octagon \( ABCDEFGH\) has sides of lengt... |
1516.00 |
| 370 |
AMC 10 2002 B Q20 |
Let \( a\), \( b\), and \( c\) be real numbers suc... |
1516.00 |
| 371 |
AMC 10 2002 B Q24 |
Riders on a Ferris wheel travel in a circle in a v... |
1516.00 |
| 372 |
AMC 10 2002 B Q9 |
The function \(f\) is given by the table
\[\beg... |
1516.00 |
| 373 |
AMC 10 2002 B Q11 |
Let \(P(x)=kx^3+2k^2x^2+k^3\). Find the sum of al... |
1516.00 |
| 374 |
AMC 10 2002 B Q17 |
There are \(1001\) red marbles and \(1001\) black ... |
1516.00 |
| 375 |
AMC 10 2002 B Q21 |
Let \(f\) be a real-valued function such that \[f(... |
1516.00 |
| 376 |
AMC 10 2002 B Q24 |
What is the maximum value of \(n\) for which there... |
1516.00 |
| 377 |
AMC 10 2003 A Q11 |
The sum of the two \( 5\)-digit numbers \( AMC10\)... |
1516.00 |
| 378 |
AMC 10 2003 A Q16 |
What is the units digit of \( 13^{2003}\)?
$$ \... |
1516.00 |
| 379 |
AMC 10 2003 A Q19 |
A semicircle of diameter \( 1\) sits at the top of... |
1516.00 |
| 380 |
AMC 10 2003 B Q13 |
Let \( \clubsuit(x)\) denote the sum of the digits... |
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