Well looking the question, statements and answer, perhaps the question stem should bect18 wrote:if x and y are integer, what is the remainder when x^2 and y^2 is divided by 5?
(1) when x-y is divided by 5, the remainder is 1
(2) when x+y is divided by 5, the remainder is 2
OA: C
how do you solve this problem?
if x and y are integer, what is the remainder when (x^2 - y^2) is divided by 5? . If it is so then...
We wish to find out remainder of (x^2 - y^2)/5.
It can be written as (x^2 - y^2)/5 = (x-y).(x+y)/5.
As remainders are multiplicative so remainder of (x^2 - y^2)/5 = remainder of [(x - y)/5 * (x + y)/5].
Statement 1...
Insuff. as it gives information about (x - y)/5 only.
Statement 2...
Insuff. as it gives information about (x + y)/5 only.
Together we can say
remainder of (x^2 - y^2)/5 = remainder of [(x - y)/5 * (x + y)/5] = 1 * 2 = 2.
Ans C.
