We have f:RR->RR,f(x)=|x|root(3)(1-x^2).How to find maximum domain of differentiability?

1 Answer
Jim H ยท Cesareo R.
May 24, 2017

See below.

Explanation:

f(x)=|x|root(3)(1-x^2) = { (xroot(3)(1-x^2),x >= 0),(-xroot(3)(1-x^2),x < 0) :}

d/dx(xroot(3)(1-x^2)) = root(3)(1-x^2) + x(1/3(1-x^2)^(-2/3)(-2x))

= root(3)(1-x^2) - (2x^2)/(3(1-x^2)^(2/3))

= (3(1-x^2)-2x^2)/(3(1-x^2)^(2/3))

= (3-5x^2)/(3(1-x^2)^(2/3)). " " For x != +-1

So,

f'(x)= { ((3-5x^2)/(3(1-x^2)^(2/3)),x > 0,x != 1),(-(3-5x^2)/(3(1-x^2)^(2/3)),x < 0,x != -1) :}
And f is not differentiable at +-1

Checking the "joint" of the "hinge" of the two parts, we see that the right derivative at 0 is 1 and the left derivative at 0 is -1, so there is no derivative at 0.

Finally, here is the graph of the function: graph{y=(1-x^2)^(1/3)absx [-2.433, 2.436, -1.215, 1.217]}

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