I just picked this question up from another forum... I want to know if what i'm doing is the correct approach to these kinds of problems. Here goes:
1. Is |x+y|>|x-y|?
(1) |x| > |y|
(2) |x-y| < |x|
My way of approaching this problem:
x or y can either be positive or negative, x will always have the same sign (pos/neg), so it can be canceled out.
1. -x-y>-x+y <=> 0>2y <=> y < 0
2. -x+y > -x-y <=> 2y > 0 <=> y > 0
3. x+y > x-y <=> 2y > 0 <=> y > 0
4. x-y > x+y <=> 0 > 2y <=> y < 0
So, essentially they are asking:is y<0 or y>0 ?
Which would be the same as saying: Does y = 0 ?
Statement 1 doesn't give me much.
Statement 2 tells me (i just cancel out the x's because they will have the same sign anyway)
either y < 0, or y > 0.
Hence B
Am i right or is there another, more efficient, way to solve these kinds of problems?
Thanks for your help
1. Is |x+y|>|x-y|?
(1) |x| > |y|
(2) |x-y| < |x|
My way of approaching this problem:
x or y can either be positive or negative, x will always have the same sign (pos/neg), so it can be canceled out.
1. -x-y>-x+y <=> 0>2y <=> y < 0
2. -x+y > -x-y <=> 2y > 0 <=> y > 0
3. x+y > x-y <=> 2y > 0 <=> y > 0
4. x-y > x+y <=> 0 > 2y <=> y < 0
So, essentially they are asking:is y<0 or y>0 ?
Which would be the same as saying: Does y = 0 ?
Statement 1 doesn't give me much.
Statement 2 tells me (i just cancel out the x's because they will have the same sign anyway)
either y < 0, or y > 0.
Hence B
Am i right or is there another, more efficient, way to solve these kinds of problems?
Thanks for your help
