Nice work; the answer is A.
I have two different solutions:
Algebraic:
Given x ¤ y= x/(x+y) = 6
This means that the reciprocal (x+y)/x = 1/6
Aside: Why find the reciprocal? Doing so allows us to use the property that (a+b)/c = a/c + b/c. This property often comes in handy with GMAT questions involving fractions.
If (x+y)/x = 1/6, then x/x + y/x = 1/6, which gives us 1 + y/x = 1/6, which tells us that y/x = -5/6
(or that x/y=-6/5)
y ¤ x= y/(y+x)
Let’s determine (y+x)/y and then find the reciprocal
(y+x)/y = 1 + x/y
= 1+(-6/5)
= -1/5
The reciprocal of -1/5 is -5 (answer choice A)
Plug in numbers:
Given x ¤ y= x/(x+y) = 6
Find values for x and y that make this true. How about x=6 and y=-5
Then y ¤ x= y/(y+x) = -5/(-5+6) = -5
Brent Hanneson - Creator of GMATPrepNow.com
