A number when divided by 296 gives a remainder of 75. When the same number is divided by 37, the remainder is:
Answer: A
Let the number be N. N = 296k + 75.
We need to find the remainder when N is divided by 37.
First, check if 296 is divisible by 37. \(296 = 37 \times 8\).
Since the first divisor is a multiple of the second divisor, we can simply divide the first remainder by the second divisor.
Remainder = \(75 \div 37\).
\(75 = 2 \times 37 + 1\).
The remainder is 1.