a+b-c-b-c+2c-a  Final Result :       0  Processing ends successfully

Proving (A-B)-(C-B) = A-(B\cup C) Simple informal proof Starting with the left side, knowing that (A-B)=(A\cap B^c), we can rewrite as: (A\cap B^c)-(C\cap B^c) Applying the same ...

HINT In questions like these, our main goal is to create 2 zeros in a row or column, if possible, along which we can expand the determinant.

Here is a very easy way to prove your identity using basic set algebra: \begin{align} (A-B)-C&\equiv (A\cap B^C)\cap C^C\tag{by definition}\\[0.5em] &\equiv A\cap(B^C\cap C^C)\tag{by assoc. of \cap ...

Working first with y=x and z=-2x, we obtain P(x^2)+ 2 P(-2 x^2) = P(-3 x^2) Let a_n x^n be the highest order term in P(x), this relation implies a_n x^{2n} + 2 (-2)^n a_n x^{2n} = (-3)^n a_n x^{2n} \quad\Longrightarrow\quad 1 + 2 (-2)^n = (-3)^n ...

This is possible. Consider the check matrix H=\begin{pmatrix}1&1&1&1&1&1&1&1&1&1&1&0\\0&1& 2 &3 &4 &5& 6 &7& 8 &9& 10&0\\0^2&1^2& 2^2 &3^2 &4^2 &5^2& 6^2 &7^2& 8^2 &9^2& 10^2&1\end{pmatrix}. We ...