Let f(x)=| |. then, 1. f(x) is everywhere differentiable. 2. f(x) is everywhere continuous but not differentiable at x=n ,n 3. f(x) is everywhere continuous but not differentiable at x=(2n+1) 2 ,n . 4. None of these.

2. f(x) is everywhere continuous but not differentiable at x=n ,n Solution: f(x)=| | Given function is continuous and differentiable on (2n ,(2n+1) ) But not differentiable at x=n ,n . As =0 for n .

Let f(x)=| |. then, 1. f(x) is everywhere differentiable. 2. f(x)…

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Let $\text{f(x)}=|\sin\text{x}|.$ then,

f(x) is everywhere differentiable.
f(x) is everywhere continuous but not differentiable at $\text{x}=\text{n}\pi,\text{n}\in\text{Z}$
f(x) is everywhere continuous but not differentiable at $\text{x}=(2\text{n}+1)\frac{\pi}{2},\text{n}\in\text{Z}.$
None of these.

✓

Answer

f(x) is everywhere continuous but not differentiable at $\text{x}=\text{n}\pi,\text{n}\in\text{Z}$

Solution:

$\text{f(x)}=|\sin\text{x}|$

Given function is continuous and differentiable on $(2\text{n}\pi,(2\text{n}+1)\pi)$

But not differentiable at $\text{x}=\text{n}\pi,\text{n}\in\text{Z}.$

As $\sin\text{n}\pi=0$ for $\text{n}\in\text{Z}.$

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