1021 |
AMC 8 2011 A Q25 |
A circle with radius \(1\) is inscribed in a squar... |
1500.00 |
1022 |
AMC 8 2012 A Q3 |
On February 13 The Oshkosh Northwester listed the ... |
1500.00 |
1023 |
AMC 8 2012 A Q6 |
A rectangular photograph is placed in a frame that... |
1500.00 |
1024 |
AMC 8 2012 A Q7 |
Isabella must take four 100-point tests in her mat... |
1500.00 |
1025 |
AMC 8 2012 A Q8 |
A shop advertises everything is "half price in tod... |
1500.00 |
1026 |
AMC 8 2012 A Q21 |
Marla has a large white cube that has an edge of 1... |
1500.00 |
1027 |
AMC 8 2013 A Q4 |
Eight friends ate at a restaurant and agreed to sh... |
1500.00 |
1028 |
AMC 8 2013 A Q7 |
Trey and his mom stopped at a railroad crossing to... |
1500.00 |
1029 |
AMC 8 2013 A Q10 |
What is the ratio of the least common multiple of ... |
1500.00 |
1030 |
AMC 8 2013 A Q16 |
A number of students from Fibonacci Middle School ... |
1500.00 |
1031 |
AMC 8 2013 A Q18 |
Isabella uses one-foot cubical blocks to build a r... |
1500.00 |
1032 |
AMC 10 2000 A Q9 |
If \( |x - 2| = p\), where \( x < 2\), then \( x -... |
1500.00 |
1033 |
AMC 10 2000 A Q10 |
The sides of a triangle with positive area have le... |
1500.00 |
1034 |
AMC 10 2000 A Q13 |
There are \(5\) yellow pegs, \(4\) red pegs, \(3\)... |
1500.00 |
1035 |
AMC 10 2000 A Q16 |
The diagram show \(28\) lattice points, each one u... |
1500.00 |
1036 |
AMC 10 2000 A Q20 |
Let \(A\), \(M\), and \(C\) be nonnegative integer... |
1500.00 |
1037 |
AMC 10 2000 A Q25 |
In year \(N\), the \(300^\text{th}\) day of the ye... |
1500.00 |
1038 |
AMC 10 2001 A Q11 |
Consider the dark square in an array of unit squar... |
1500.00 |
1039 |
AMC 10 2001 A Q18 |
The plane is tiled by congruent squares and congru... |
1500.00 |
1040 |
AMC 10 2001 A Q22 |
In the magic square shown, the sums of the numbers... |
1500.00 |