\displaystyle{p}^{{12}} Explanation: \displaystyle{p}^{{2}}\cdot{\left({p}^{{5}}\right)}^{{2}}\Rightarrow{p}^{{2}}\times{p}^{{{5}{\left({2}\right)}}} \displaystyle{p}^{{2}}\times{p}^{{10}} ...

You're right in that your only wiggle room is to choose a different set of connecting homomorphisms. One thing that you might try is defining \rho_{ij}:\mathbb{Z}/p^i \rightarrow \mathbb{Z}/p^j for ...

3^3 x 3^5 = 3^8 Why? Because: 3^3 = 3 x 3 x 3 3 ^ 5 = 3 x 3 x 3 x 3 x 3 So, (3 x 3 x 3) x (3 x 3 x 3 x 3 x 3) 3 x 3 x 3 x 3 x 3 x 3 x 3 x 3 = 6561 So, 3 ^ 8 = 6561

Hint: Use binomial theorem and then divide by 7. 2^{30}.3^{20}=2^{20}.3^{20}.2^{10}=1024.6^{20} = 1024 .(7-1)^{20} 1024\dot \,(1-7)^{20}=1024[1-^{20}C_1.7+^{20}C_2.7^2+\mathrm{other\ terms}] =1024-^{20}C_1\dot \,7\dot \,1024+^{20}C_2\dot \,7^2\dot \,1024+\ldots+\mathrm{other\ terms} ...

\displaystyle{8}{r}^{{6}} Explanation: To multiply \displaystyle{2}{r}^{{3}} by \displaystyle{4}{r}^{{3}} , multiply the coefficients of the variables together, and then multiply the ...

\displaystyle={9}{p}^{{9}} Explanation: \displaystyle{\left({3}{p}^{{3}}\right)}^{{2}}\cdot{p}^{{3}} \displaystyle={9}{p}^{{6}}\cdot{p}^{{3}} \displaystyle={9}{p}^{{9}}