Question on an absolute value inequality

Question

Is it true that, for every $x,y \ge 0$, $|x-y|\le |x+y|$? My geometric intuition says yes, but I might be missing something. Thanks!

Well, either $|x-y|=x-y$ or $|x-y|=y-x$. But either way, $|x+y|=x+y$. — Angina Seng, Nov 30 '19 at 19:15

score 0 · Answer 1 · answered Nov 30 '19 at 19:19

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Yes, because $\lvert x-y\rvert=\lvert x+(-y)\rvert\leqslant\lvert x\rvert+\lvert -y\rvert=x+y$.

answered Nov 30 '19 at 19:19

score 0 · Answer 2 · answered Nov 30 '19 at 19:22

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Say $x\ge y\ge 0$ $$|x-y| = x-y\le x\le x+y$$

answered Nov 30 '19 at 19:22

AgentS

score 0 · Answer 3 · answered Nov 30 '19 at 19:25

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Of course.... for the reasons listed in other answers.

answered Nov 30 '19 at 19:25

David G. Stork

score 0 · Answer 4 · answered Nov 30 '19 at 19:29

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Square it: $$(x-y)^2\le (x+y)^2 \iff 4xy\ge 0 \quad \checkmark$$

answered Nov 30 '19 at 19:29

farruhota

score 0 · Answer 5 · answered Nov 30 '19 at 20:15

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$x,y \ge 0$;

$x+y \ge (x+y) -2y=x-y;$

$x+y \ge (x+y)-2x =y-x;$

Hence $x+y \ge |x-y|$.

answered Nov 30 '19 at 20:15

Peter Szilas

5 Answers5