$X,Y$ and $Z$ are independent uniformly distributed on $[0,1]$
How is random variable $(XY)^Z$ distributed?
I had an idea to logarithm this and use convolution integral for the sum, but I'm not sure it's possible.
$X,Y$ and $Z$ are independent uniformly distributed on $[0,1]$
How is random variable $(XY)^Z$ distributed?
I had an idea to logarithm this and use convolution integral for the sum, but I'm not sure it's possible.