Hint : Since we have (k+3)(k+4)-(k-2)(k-1)=10k+10 \implies \frac{(k+3)(k+4)-(k-2)(k-1)}{10}=k+1 we get \begin{align}k(k+2)(k+1)^2&=k(k+1)(k+2)\color{red}{(k+1)}\\\\&=k(k+1)(k+2)\cdot\color{red}{\frac{1}{10}((k+3)(k+4)-(k-2)(k-1))}\\\\&=\frac{1}{10}(k(k+1)(k+2)(k+3)(k+4)-(k-2)(k-1)k(k+1)(k+2))\\\\&=\frac1{10}(a_{k+4}-a_{k+2})\end{align} ...

Your proof seems correct to me. But note that where you've written \sigma^{-1}\cdot\sigma\cdot\sigma(i), this is the group element \sigma^{-1}\cdot\sigma applied to \sigma(i), which is an ...

Let G be a finite abelian group of order 36. The fundamental theorem tells us that there exist cyclic subgroups H_1, ... , H_t of prime power order such that G is equal to the (internal) ...

To compute \;3^{999^{100}} faster, use Euler's theorem : \;\varphi(25)=20, so 3^{999^{100}}\equiv3^{999^{100}\bmod20}\equiv3^{(999\bmod20)^{100}}\equiv3^{(-1)^{100}}=3\mod25. As a Bézout's ...

\begin{align*} a^{101101_2} &= a^{1\cdot2^5+0\cdot2^4+1\cdot2^3+1\cdot2^2 + 0\cdot2^1+1\cdot 2^0}\\ &= a^{2^5} \cdot\left(a^{2^4}\right)^0 \cdot a^{2^3} \cdot a^{2^2}\cdot\left(a^{2^1}\right)^0\cdot a^{2^0}\\ &= a^{2^5} \cdot\left(a^0\right)^{2^4} \cdot a^{2^3} \cdot a^{2^2}\cdot\left(a^0\right)^{2^1}\cdot a^{2^0}\\ &= a^{2^5} \cdot 1 \cdot a^{2^3} \cdot a^{2^2}\cdot 1\cdot a^{2^0}\\ &= a^{2^5} \cdot a^{2^3} \cdot a^{2^2}\cdot a^{2^0}\\ \end{align*}

You get the incorrect answer because you overcount. If you pick the suits of spades, clubs and then hearts, your method counts that as different form picking first hearts, then spades, then clubs, ...