The value of 'x' for which f(x)=|x| - |x+1| is discontinuos is ?

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The value of 'x' for which f(x)=|x| - |x+1| is discontinuos is ?

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Answer 1 · 2018-06-27T11:18:49

None

Explanation:

This function is continous. In fact, $f(x)=|x|$ is a continuous function, and $g(x)=|x+1|$ is simply $f(x+1)$ , which means that it is a translated version of $f$ , and thus is still continuous.

Finally, the sum (or difference) of continuous functions is still continuous.

Answer 2 · 2018-06-27T11:25:43

The function is continuous but not differentible at $(-1,1)$ and $(0,-1)$

Explanation:

The function is $f(x)=|x|-|+1|$

The changing values occur when

$x=0$ and $x+1=0$

Therefore,

In the interval $(-oo, -1)$ ,

$f(x)=-x-(-x-1)=1$

In the interval $(-1, 0)$ ,

$f(x)=-x-(x+1)=-2x-1$

In the interval $( 0, +oo)$ ,

$f(x)=x-(x+1)=-1$

The function is continuous but not differentiable at $(-1,1)$ and $(0,-1)$

graph{|x|-|x+1| [-5.55, 5.55, -2.773, 2.776]}

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The value of 'x' for which f(x)=|x| - |x+1| is discontinuos is ?

2 Answers

Explanation:

Explanation:

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