\displaystyle\frac{{{4}{x}}}{{3}}\times\frac{{{8}{x}}}{{2}}=\frac{{{16}{x}^{{2}}}}{{3}} Explanation: Such fractions may be mulitplied directly, \displaystyle\text{numerator}\times\text{numerator} ...

Your calculation of the marginal distribution f_U(u) appears to be incorrect. I get f_U(u) = \int_{v=0}^u f_{U,V}(u,v) \, dv = \frac{u^3 e^{-u/a}}{6a^4}. Note that the interval of integration ...

I hope that the following comments settle some of your questions. Unfortunately, it is not clear what notation you use for the Chain Rule. 1) Suppose that H(x)=\ln(5x). We want to find H'(x). ...

The problem is with your algebra: \frac{3x+1}{2x(3x+1)+1}\ne\frac1{2x+1}\;, as you can check by verifying that (3x+1)(2x+1)\ne 2x(3x+1)+1. It’s true that f isn’t defined everywhere and ...

You have a \times (b+c)= (a \times b)+(a\times c) from the field axioms (distributivity of multiplication over addition). Now let a=-1, b=x, c=1. Alternatively, if -(x+2) is the additive inverse ...

I would only prove it for the open interval (a,b), (using e.g. a modification of f:\mathbb{R}\to (-\pi/2,\pi/2), \; x\mapsto \arctan x) and then you have |\mathbb{R}| = \vert (a,b) \vert \leq \vert (a,b] \vert \leq \vert \mathbb{R} \vert \quad \Rightarrow \quad \vert (a,b] \vert = \vert \mathbb{R} \vert, ...