Statement-1 The digits A,B and C re such that the three digit number A88, 6B8, 86C are divisible by 72, then determinat `|{:(A,6,8),(8,B,6),(8,8,C):}|` is divisible by 288.
Statement-2 A=B=?

The digits A,B,C are such that the three digit numbers A88, 6B8, 86 C are divisible by 72 the determinant |{:(A,6,8),(8,B,6),(8,8,C):}| is divisible by

The digits A,B,C are such that the three digit numbers A88, 6B8, 86 C are divisible by 72 the determinant |{:(A,6,8),(8,B,6),(8,8,C):}| is divisible by

If a 679b is a five digit number that is divisible by 72, then a+b is equal to

Suppose that digit numbers A28,3B9 and 62 C, where A,B and C are integers between 0 and 9 are divisible by a fixed integer k, prove that the determinant |{:(A,3,6),(8,9,C),(2,B,2):}| is also divisible by k.

If 3 digit numbers A28, 3B9 and 62C are divisible by a fixed constant 'K' where A, B, C are integers lying between 0 and 9, then determinant |(A,3,6),(8,9,C),(2,B,2)| is always divisible by

Determine the smallest 3-digit number which is exactly divisible by 6, 8 and 12.

Determine the greatest 3-digit number exactly divisible by 8, 10 and 12. and 6 ,8 and 10

5 * 2 is a three digit number with * as a missing digit. If the number is divisible by 6, the missing digit is (a) 2 (b) 3 (c) 6 (d) 7

Statement 1: Total number of five-digit numbers having all different digit sand divisible by 4 can be formed using the digits {1,3,2,6,8,9}i s192. Statement 2: A number is divisible by 4, if the last two digits of the number are divisible by 4.

The largest three digit number formed by the digit 8, 5, 9 is (a) 859 (b) 985 (c) 958 (d) 589