xy <> 0 implies x can be -ve or +ve, and y can be -ve or +ve.
st(1) x>y, Obviously not sufficient as x=-2 and y=-3, x>y BUT x=3 and y=2 again x>y
st(2) x>-y, This is Not Sufficient, as y can be any number -ve or +ve, y=-2 OR y=2 then x=3 or -3 --> x>-y, 3>2 OR -3<-2, -3<2
Combined st(1&2): as x is greater of both +ve and -ve y we can write down x>|y| which means that y is always +ve and x>y And if y>0 y could be 1/2 or 1/100 still x>y could be less than 1 BUT when y=1 or 2 x>y, x>1 Not Sufficient
IOM E
For the second drill the answer would be C, as x>0 is our condition given with the combined statements (1&2)mariah wrote:1. xy not equal to 0 is x >1?
1. x>y
2. x>-y
mariah wrote: 2. xy not equal to 0 is x>0?
1. x>y
2. x>-y
