Question 1
The arithmetic mean of the nine numbers in the set is a -digit number , all of whose digits are distinct. The number does not contain the digit
Solution
Question 2
What is the value of
when ?
Solution
Question 3
For how many positive integers is a prime number?
Solution
Question 4
Let be a positive integer such that is an integer. Which of the following statements is not true:
Solution
Question 5
Let and be the degree measures of the five angles of a pentagon. Suppose that and and form an arithmetic sequence. Find the value of .
Solution
Question 6
Suppose that and are nonzero real numbers, and that the equation has solutions and . Then the pair is
Solution
Question 7
The product of three consecutive positive integers is times their sum. What is the sum of their squares?
Solution
Question 8
Suppose July of year has five Mondays. Which of the following must occur five times in August of year ? (Note: Both months have 31 days.)
Solution
Question 9
If are positive real numbers such that form an increasing arithmetic sequence and form a geometric sequence, then is
Solution
Question 10
How many different integers can be expressed as the sum of three distinct members of the set ?
Solution
1. they form a common-diff number sequence with d=3
2. the sum of any 3 numbers in the set also form a common-diff number sequence with d=3, N1=12, and Nl=48.
In the number sequence of the sum of 3 numbers in the set, there are 13 members.
Question 11
The positive integers and are all prime numbers. The sum of these four primes is
Solution
Question 12
For how many integers is the square of an integer?
Solution
Question 13
The sum of consecutive positive integers is a perfect square. The smallest possible value of this sum is
Solution
Question 14
Four distinct circles are drawn in a plane. What is the maximum number of points where at least two of the circles intersect?
Solution
Question 15
How many four-digit numbers have the property that the three-digit number obtained by removing the leftmost digit is one ninth of ?
Solution
Question 16
Juan rolls a fair regular octahedral die marked with the numbers through . Then Amal rolls a fair six-sided die. What is the probability that the product of the two rolls is a multiple of 3?
Solution
Question 17
Andy???s lawn has twice as much area as Beth???s lawn and three times as much area as Carlos??? lawn. Carlos??? lawn mower cuts half as fast as Beth???s mower and one third as fast as Andy???s mower. If they all start to mow their lawns at the same time, who will finish first?
Solution
Question 18
A point is randomly selected from the rectangular region with vertices . What is the probability that is closer to the origin than it is to the point ?
Solution
Question 19
If and are positive real numbers such that and , then is
Solution
Question 20
Let be a right-angled triangle with . Let and be the midpoints of legs and , respectively. Given that and , find .
Solution
Question 21
For all positive integers less than , let
Calculate .
Solution
Question 22
For all integers greater than , define . Let and . Then equals
Solution
Question 23
In , we have and . Side and the median from to have the same length. What is ?
Solution
Question 24
A convex quadrilateral with area contains a point in its interior such that . Find the perimeter of .
Solution
Question 25
Let , and let denote the set of points in the coordinate plane such that The area of is closest to
Solution
Answer Keys
Question 1: A
Question 2: D
Question 3: B
Question 4: E
Question 5: D
Question 6: C
Question 7: B
Question 8: D
Question 9: C
Question 10: A
Question 11: E
Question 12: D
Question 13: B
Question 14: D
Question 15: D
Question 16: C
Question 17: B
Question 18: C
Question 19: D
Question 20: B
Question 21: A
Question 22: B
Question 23: C
Question 24: E
Question 25: E