Critique the following "proof": x>y x^2 > y^2 x^2 - y^2 > 0

aflacatn

aflacatn

Answered question

2021-08-10

Critique the following "proof":
x>y
x2>y2
x2y2>0
(x + y)(x - y) > 0
x + y > 0
x > -y

Answer & Explanation

casincal

casincal

Skilled2021-08-11Added 82 answers

Consider any two real numbers x and y.
Given that, x > y.
Now square on both sides of the inequality.
x2>y2
x2y2>y2y2 Subtract y2 from both sides.
x2y2>0
(x + y)(x - y) > 0 Apply the formula.
The above inequality implies that, both the numbers (x + y) and (x - y) must be positive.
That is, (x + y)>0 and (x - y)>0
When (x - y) > 0, then we get x>y which is the given condition.
So consider(x + y)>0. Then,
x+y>0
x+y-y>0-y Subtract from both sides.
x>-y
Hence, the given proof is obtained.
In the proof, x and y is not 0 together. Also, the proof is valid when both x and y are not negative together.
If number y is negative and x is positive, then the absolute value of y should be less than x.

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