Question
Given the p.d.f. (probability density function) of a continuous random variable $x$ as:
$\begin{aligned}
f(x) & =\frac{x^2}{3}, & -1& =0, & \text { otherwise }
\end{aligned}$
Determine the c.d.f. (cumulative distribution function) of $x$ and hence find
$P (x<1), P (x \leq-2), P (x>0), P (1
$\begin{aligned}
f(x) & =\frac{x^2}{3}, & -1
\end{aligned}$
Determine the c.d.f. (cumulative distribution function) of $x$ and hence find
$P (x<1), P (x \leq-2), P (x>0), P (1