Set S is given as S = {1,3,5,7,9,11,13,15,17}. In how many ways can three numbers be chosen from Set S such that the sum of those three numbers is 18?
Which of the following statements must be true?
I. The product of first 100 prime numbers is even
II. The sum of first 100 prime numbers is odd.
III. The sum of first five non-negative even numbers is divisible by both 4 and 5
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If x, y, z and w are positive integers, is x odd?
(1) 7x + 8y + 4z + 5w is odd
(2) 3x + 2y + 8z + 2w is even
If x and y are positive integers and x is odd, is xy even?
(1) x3y = 6a3 + 23 where a is a positive integer
(2) x2+y = 3k + 7 where k is a positive integer
If n is an integer, then which of the following statements is/are FALSE?
I. n3 – n is always even.
II. 8n3 +12n2 +6n +1 is always even.
III. √ (4n2 – 4n +1) is always odd.
If x and y are integers, is 3x4 + 4y even?
(1) x3 is even
(2) y2x + 3 is even
If X is a positive integer, is X2 + 1 an odd number?
(1) X is the smallest integer that is divisible by all integers from 11 to 15, inclusive.
(2) 3X is an odd number.
If a, b, and k are positive integers, is the sum (a + b) an even number or an odd number?
(1) a = ( k3 + 3k2 + 3k + 6)
(2) b = (k2 + 4a +5)
If x and y are integers, is y even?
(1) (x + 2) * (y2 + 7) is even
(2) (x3 + 8) * (y2 -4) is even
If x, y, and z are positive integers, where x is an odd number and z = x2 + y2 + 4. Is y2 divisible by 4?
(1) Z = 8k -3 where k is a positive integer
(2) When (z-x+1) is divided by 2, it leaves a remainder.
If A is a positive integer, then which of the following statements is true?
1. A2 + A -1 is always even.
2. (A4+1)(A4+2) + 3A is even only when A is even.
3. (A-1)(A+2)(A+4) is never odd.
If a, b, c, d, and e are integers and the expression (ab2c2 /d2e) gives a positive even integer, which of the following options must be true?
I. abc is even
II. a/e is positive
III. a/d2 is positive
If r and s are positive integers, and r2 + r/s is an odd integer, which of the following cannot be even?