The number of ways of selecting two numbers a and b , a ∈ 2 , 4 , 6 , … … , 100 and b ∈ 1 , 3 , 5 , … … , 99 such that 2 is the remainder when a + b is divided by 23 is

Question

TestHub · Accepted Answer

Let a = 2 , 4 , 6 , . . . , 100 and b = 1 , 3 , 5 , . . . , 99 Let a + b = 23 λ + 2 If λ = 1 , then a + b = 25 So, 1 , 24 , 3 , 22 , . . . . , 23 , 2 Total ordered pairs = 12 If λ = 2 , then a + b = 48 No ordered pair possible. If λ = 3 , then a + b = 71 So, 1 , 70 , 3 , 68 , 5 , 66 , . . . . , 61 , 10 , 63 , 8 , 65 , 6 , 67 , 4 , 69 , 2 Total 35 ordered pairs. If λ = 5 , then a + b = 117 17 , 100 , 19 , 98 , . . . , 99 , 18 Total 42 ordered pairs. If λ = 7 , then a + b = 163 So, 63 , 100 , 65 , 63 , . . . . 99 , 64 Total 19 pairs. No further case possible. So, required number is = 12 + 35 + 42 + 19 = 108

Mathematics - Permutation & Combination Question with Solution | TestHub

Options:

Doubts & Discussion