Notice that \ln(100|x|)=\ln(100)+\ln|x| Thus, derivative is simply given as \frac d{dx}\ln(100|x|)=\frac1x

\displaystyle{8}{x} = \displaystyle{200} Explanation: We can logic here: \displaystyle{8}{x} is twice of \displaystyle{4}{x} , hence \displaystyle{8}{x} = \displaystyle{2}\times{4}{x} ...

You will have a two-way contingency table and the classic chi-square test of independence will provide a good answer.

This is equivalent to X having the Schur property (i.e., each weakly convergent sequence converges strongly). A prominent non-finite-dimensional example is X=l_1 . If B(X)=B_{00}(X) then \operatorname{Id}\in B_{00}(X) ...

I believe you have done ok. We need to compute the Jacobian. So J=\begin{pmatrix} \cos\alpha & \sin\alpha & 0\\ -r\sin\alpha &r\cos\alpha&0\\ 0&0&1\end{pmatrix}. The determinant is \det J=r\not =0 ...

We focus our attention on counting length 6 sequences with available entries \{0,1,2,\dots,9,X\}. Simply fix the far left entry of the sequence to be X. As there is only ever the one entry with ...