Question
In the question, assuming the given statements to be
true, find which of the conclusion(s) among given three conclusions is /are definitely true and then give your answer accordingly. Statements: A = B > C > D; E ≥ F = G ≤ H; A ≤ G Conclusions: I. E ≥ B II. D < H III. B ≤ FSolution
E ≥ F = G ≥ A = B > C > D              E ≥ B. Hence conclusion I is true. H ≥ G ≥ A = B > C > D                    H > D. Hence conclusion II is true. F = G ≥ A = B                       B ≤ F. Hence conclusion III is true.
The HCF of any set of 10 co-prime numbers is always:
Let N be the greatest number that will divide 85, 112, 139 leaving the same remainder in each case. Then sum of the digits in N is:
Let N be the greatest number that will divide 92, 114, 136 leaving the same remainder in each case. Then sum of the digits in N is:
Find the HCF of two numbers if LCM and product of those two numbers are 45 and 630 respectively.
The HCF of 108 and 144 is ______
The product of the two prime numbers is 187. What will the L.C.M of these two numbers?
If total number of factors of 1,800 is 'x', then find the value of (x - 8) (x + 4).
What is the HCF of  (x4  - x2  - 6)   and  (x4  - 4x2  + 3) ?
(a)Â x2 Â - 3Â Â Â Â Â Â Â Â Â Â Â Â Â Â Â Â Â Â Â Â Â Â Â (b)...
- The sum and difference of L.C.M and H.C.F of two numbers is 216 and 184. If one of the numbers is 25, then find the other number.