If `r` is the remainder when each of 7654, 8506 and 9997 is divided by the greatest number `d\ (d >1)` , then `d-r` is equal to (a) 14 (b) 18 (c) 24 (d) 28

If r is the remainder when each of 7654,8506 and 9997 is divided by the greatest number d backslash(d>1), then d-r is equal to ( a )14 (b) 18 (c) 24 (d) 28

If r is the remainder when each of 6454, 7306 and 8797 is divided by the greatest number d(d > 1), then (d—r) is equal to:

If r is the remainder when each of 4749, 5601 and 7092 is divided by the greatest possible number d(gt1) , then the value of (d + r) will be:

sqrt(176+sqrt(2401)) is equal to (a) 14 (b) 15 (c) 18 (d) 24

If r is the remainder when each of 1059,1417 and 2312 is divided by k,where is an integer greater than 1, then the value of d+k is

Let R=gS-4, when S=8 and R=16. If S=10, then R is equal to (a)11 (b) 14 (c) 20 (d) 21

If sqrt(18xx14xx x)=84, then x equals (a)22 (b) 24(c)28 (d) 32

In Figure, P R= (a) 20cm (b) 26cm (c) 24cm (d) 28cm

If 2x^(2) + ax + 2b , when divided by x-1 , leaves a remainder of 16 and x^(2) + bx + 2a , when divided by x+1 , leaves a remainder of -1. then a + b equals: (a)14 (b) -8 (c) -14 (d)8

The remainder when 2^(60) is divided by 5 equals 0( b) 1 (c) 2 (d) 3