$$\frac{|x+y|}{1+|x+y|}\leq \frac{|x|}{1+|x|} +\frac{|y|}{1+|y|}$$
How can i solve this inequality? I have solved it in a long way but i guess there should be an easier way
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Hi, welcome to MSE, please use mathjax when asking your question: https://math.meta.stackexchange.com/questions/5020/mathjax-basic-tutorial-and-quick-reference. – Floris Claassens Feb 04 '19 at 14:35
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What is your "long way" solution? – Arthur Feb 04 '19 at 14:37
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Thank you..previously answered question solved my problem – Sanjupanawala Feb 04 '19 at 14:53
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The easy way is to get rid of the absolute values by considering the cases $x\geq 0$ and $x<0$ for $|x|$, $y\geq 0$ and $y<0$ for $|y|$, and $x+y\geq 0$ and $x+y<0$ for $|x+y|$.
Hence, you get $8$ cases.
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