Statements: M ≤ N; O < R; O = N; S ≥ Q; N > S
(i) Q < M
(ii) N ≥ Q
(iii) M > R
Given statements: M ≤ N; O < R; O = N; S ≥ Q; N > S On combining: M ≤ N = O < R; Q ≤ S < N Conclusions: (i) Q < M False since either Q≤M OR Q>M (ii) N ≥ Q False since N≠Q (iii) M > R False since M<R Hence, option 1 is the answer.
Find the greatest number 23a68b, which is divisible by 3 but NOT divisible by 9.
Find the greatest value of (a + b) such that an 8-digit number 4523a60b is divisible by 15.
A sum of ₹4,360 was to be divided among A,B, C and D in the ratio of 1/3 : 1/4: 1/5 : 1/8, but it was divided in the ratio of by mistake. As a result:
If the seven-digit number 52A6B7C is divisible by 33 and A, B, C are primes then the maximum value of 3A+2B+5C?
What will be the remainder when 742 is divided by 48?
The greatest number that will divide 398, 437 and 5425 leaving 7, 12 and 2 as remainders, respectively, is:
What is the largest common divisor of the numbers 1026, 2268 and 2430?
476xy0 is divisible by both 3 and 11. The non-zero digits in the hundreds and tens places are respective.
If the number 1005x4 is completely divisible by 8, then the smallest integer in place of x will be: