\displaystyle\frac{{{6}{a}^{{2}}+{a}{b}-{b}^{{2}}}}{{{10}{a}^{{2}}+{5}{a}{b}}}\cdot\frac{{{2}{a}^{{3}}+{4}{a}^{{2}}{b}}}{{{3}{a}^{{2}}+{5}{a}{b}-{2}{b}^{{2}}}}\equiv\frac{{{2}{a}}}{{5}} ...

See a solution process below: Explanation: First, factor the numerators and denominators of the fractions: \displaystyle\frac{{{\left({a}-{5}{b}\right)}{\left({a}-{4}{b}\right)}}}{{{\left({a}+{7}{b}\right)}{\left({a}+{b}\right)}}}\cdot\frac{{{a}+{7}{b}}}{{{\left({a}-{4}{b}\right)}{\left({a}-{4}{b}\right)}}} ...

Note that z^n-1=\prod_{k=0}^{n-1}(z-a_k) so that nz^{n-1}=\sum_{k=0}^{n-1}\frac1{z-a_k}\prod_{k=0}^{n-1}(z-a_k) and therefore, \frac{nz^{n-1}}{z^n-1}=\sum_{k=0}^{n-1}\frac1{z-a_k} ...

\frac{(2n)!}{n! 2^{n}} = \frac{\prod\limits_{k=1}^{2n} k}{\prod\limits_{k=1}^{n} (2k)} = \prod_{k=1}^{n} (2k-1) \in \Bbb{Z}.

I suppose that k=\#K and j=\#J are given. The number of all J's is \binom{n}{j}, the number of those J's that don't intersect K is \binom{n-k}{j}, so the probability that K and J ...

I start from what you wrote down: 5d_{k-1}-6d_{k-2}=5\cdot3^{k-1}-6\cdot3^{k-2}-5\cdot2^{k-1}+6\cdot2^{k-2} and I want to get to d_k=3^k-2^k . I rewrite 3^{k-1}=3\cdot3^{k-2} , and ...