Question 1
The longest professional tennis match lasted a total of 11 hours and 5 minutes. How many minutes was that?
Solution
Question 2
In rectangle 
, 
and 
. Point 
is the midpoint of 
. What is the area of 
?
Solution
Question 3
Four students take an exam. Three of their scores are 
and 
. If the average of their four scores is 
, then what is the remaining score?
Solution
Question 4
When Cheenu was a boy he could run 
miles in 
hours and 
minutes. As an old man he can now walk 
miles in 
hours. How many minutes longer does it take for him to travel a mile now compared to when he was a boy?
Solution
Question 5
The number 
is a two-digit number.
??? When is divided by 
, the remainder is 
.
??? When is divided by , the remainder is .
What is the remainder when is divided by 
?
Solution
Question 6
The following bar graph represents the length (in letters) of the names of 19 people. What is the median length of these names? 
Solution
Question 7
Which of the following numbers is not a perfect square?
Solution
Question 8
Find the value of the expression 
Solution
Question 9
What is the sum of the distinct prime integer divisors of 
?
Solution
Question 10
Suppose that 
means 
What is the value of 
if 
Solution
Question 11
Determine how many two-digit numbers satisfy the following property: when the number is added to the number obtained by reversing its digits, the sum is 
Solution
Question 12
Jefferson Middle School has the same number of boys and girls. 
of the girls and 
of the boys went on a field trip. What fraction of the students on the field trip were girls?
Solution
Question 13
Two different numbers are randomly selected from the set 
and multiplied together. What is the probability that the product is 
?
Solution
Question 14
Karl's car uses a gallon of gas every 
miles, and his gas tank holds 
gallons when it is full. One day, Karl started with a full tank of gas, drove 
miles, bought 
gallons of gas, and continued driving to his destination. When he arrived, his gas tank was half full. How many miles did Karl drive that day?
Solution
Question 15
What is the largest power of 
that is a divisor of 
?
Solution
Question 16
Annie and Bonnie are running laps around a 
-meter oval track. They started together, but Annie has pulled ahead because she runs 
faster than Bonnie. How many laps will Annie have run when she first passes Bonnie?
Solution
Question 17
An ATM password at Fred's Bank is composed of four digits from to , with repeated digits allowable. If no password may begin with the sequence 
then how many passwords are possible?
Solution
Question 18
In an All-Area track meet, 
sprinters enter a 
meter dash competition. The track has 
lanes, so only sprinters can compete at a time. At the end of each race, the five non-winners are eliminated, and the winner will compete again in a later race. How many races are needed to determine the champion sprinter?
Solution
Question 19
The sum of 
consecutive even integers is 
. What is the largest of these consecutive integers?
Solution
Question 20
The least common multiple of 
and 
is 
, and the least common multiple of and 
is . What is the least possible value of the least common multiple of and ?
Solution
Question 21
A top hat contains 3 red chips and 2 green chips. Chips are drawn randomly, one at a time without replacement, until all 3 of the reds are drawn or until both green chips are drawn. What is the probability that the 3 reds are drawn?
Solution
Question 22
Rectangle 
below is a 
rectangle with 
. What is the area of the "bat wings" (shaded area)? 
Solution
Question 23
Two congruent circles centered at points 
and 
each pass through the other circle's center. The line containing both and is extended to intersect the circles at points 
and 
. The circles intersect at two points, one of which is 
. What is the degree measure of 
?
Solution
Question 24
The digits , , , , and 
are each used once to write a five-digit number 
. The three-digit number 
is divisible by , the three-digit number 
is divisible by , and the three-digit number 
is divisible by . What is 
?
Solution
Question 25
A semicircle is inscribed in an isosceles triangle with base 
and height so that the diameter of the semicircle is contained in the base of the triangle as shown. What is the radius of the semicircle?
Solution
Answer Keys
Question 1: C
Question 2: A
Question 3: A
Question 4: B
Question 5: E
Question 6: B
Question 7: B
Question 8: C
Question 9: B
Question 10: D
Question 11: B
Question 12: B
Question 13: D
Question 14: A
Question 15: C
Question 16: D
Question 17: D
Question 18: C
Question 19: E
Question 20: A
Question 21: B
Question 22: C
Question 23: C
Question 24: A
Question 25: B