If $f(x)=a|\sin x|+be^{|x|}+c|x|^3$ is differentiable at $x=0$, find the values of $a,b,c$.
I know that the derivative exists at $x=0$ iff $f'(0^+)=f'(0^-)$, but I can't find $f'(x)$. Please help. Thanks in advance.
If $f(x)=a|\sin x|+be^{|x|}+c|x|^3$ is differentiable at $x=0$, find the values of $a,b,c$.
I know that the derivative exists at $x=0$ iff $f'(0^+)=f'(0^-)$, but I can't find $f'(x)$. Please help. Thanks in advance.
Hint: We have, for $x \in [-\pi, \pi]$ (which is enough for this problem):
$f(x) = \begin{cases}a \sin(x) + be^x + cx^3,\ \mathrm{if}\ x \ge 0 \\ -a \sin(x) + be^{-x} - cx^3,\ \mathrm{if}\ x < 0\end{cases}, x \in [-\pi, \pi]$
Then differentiate on $[-\pi, 0)$ and $(0, \pi]$.
$f'(0^-)=\displaystyle{\lim_{x\to0^-}\dfrac{f(x)-f(0)}{x}=\lim_{x\to0^-}\dfrac{a|\sin(x)|+be^{|x|}+c|x|^3-b}{x}\displaystyle}=\\\displaystyle{\lim_{x\to0^-}\dfrac{-a\sin(x)+be^{-x}-cx^3-b}{x}=g'(0)}$
where $g(x)=-a\sin(x)+be^{-x}-cx^3.$
Now in a similar way find $f'(0^+)$ and set $f'(0^+)=f'(0^-)$ to find the relation between $a,b,c$ s.t. $f$ is differentiable.
Hint: Deal separately with positive and negative $x$. To deal with positive $x$, replace $|x|$ everywhere by $x$, and differentiate as usual.
If $x$ is negative, then $|x|=-x$. To deal with negative $x$, replace $|x|$ everywhere by $-x$, and differentiate as usual. It will make life simpler if you note that $\sin(-x)=-\sin x$ and $(-x)^3=-x^3$.