Given that, f(x) = |sinx|

Let g(x) = sinx and h(x) = |x|

Then, f(x) = hog(x)

We know that, modulus function and sine function are continuous everywhere.

Since, composition of two continuous functions is a continuous function.

Hence, f(x) = hog(x) is continuous everywhere.

Now, v(x)=|x| is not differentiable at x=0.

Lv’(0) =

=

= (∵ v(x) = |x|)

=

=

=

Rv’(0) =

=

= (∵ v(x) = |x|)

=

=

=

⇒ Lv’ (0) ≠ Rv’(0)

⇒ |x| is not differentiable at x=0.

⇒ h(x) is not differentiable at x=0.

So, f(x) is not differentiable where sinx = 0

We know that sinx=0 at x = nπ, n ∈ Z

Hence, f(x) is everywhere continuous but not differentiable x = nπ, n ∈ Z