---------------rupsk wrote:A number when divided by a certain divisor left a remainder of 14 but when then the number was multiplied by 6 and then divided by the same divisor the remainder was 15. Find the divisor if it leaves a remainder of 7 when divided by 8.
A. 23
B. 55
C. 87
D. 47
E. 49
let the no. be N, the quotient be q1 when divided by divisor d to leave a remainder of 14. so we have
N =d*q1+14-------first cond.
6N=d*q2+15--------second cond.
d=8*q3+7----- third cond.
now substitute N from first cond in second cond. and u get...
6d*q1+84 = d*q2+15 =>d(-6q1+q2) = 69 => d*q4=69, so d either can be 1 or 3 or 23. But q3 can be positive only when d is 23 (from third cond.) so the divisor has to be 23.
A. would be the answer.
Cheers
Ami/-
