Observe that (1+i)^{2n}=[(1+i)^2]^n=(1+i^2+2i)^n=(2i)^n=2^n.i^n Therefore, \dfrac{2^n}{(1+i)^{2n}}+\dfrac{(1+i)^{2n}}{2^n} =\dfrac{2^n}{2^n.i^n}+\dfrac{2^n.i^n}{2^n} =\dfrac{1}{i^n}+i^n ...

\displaystyle-{102} Explanation: \displaystyle-{50}-{4}{\left(\frac{{-{10}-{4}{\left(-{3}+{1}\right)}^{{2}}}}{{-{2}}}\right)} To simplify this, we will use PEMDAS, shown here: This is a ...

Let us start with \frac{2u^2 +4}{u^4+4u^2+5}=\frac{2u^2 +4}{(u^2-a)(u^2-b)} where a=-2-i and b=-2+i. Now, using partial fraction decomposition, \frac{2u^2 +4}{(u^2-a)(u^2-b)}=\frac{2 (a+2)}{(a-b) \left(u^2-a\right)}-\frac{2 (b+2)}{(a-b) \left(u^2-b\right)} ...

{1\over225}(10^{n+1}+5)^2 = {1\over9}(2\cdot10^{n}+1)^2= {1\over9}(4\cdot10^{2n}+4\cdot10^{n}+1)=\\ {1\over9}(4(10^{2n}-1)+4(\cdot10^{n}-1)+9)= 4{10^{2n}-1\over9}+4{10^{n}-1\over9}+1=\\ 4{10^{2n}-1\over10-1}+4{10^{n}-1\over10-1}+1= 4\sum_{k=0}^{2n-1}10^k+4\sum_{k=0}^{n-1}10^k+1=\\ \sum_{k=n}^{2n-1}4\cdot10^k+\sum_{k=1}^{n-1}8\cdot10^k+9=\underbrace{44\ldots4}_\text{n}\underbrace{88\ldots8}_\text{n-1}9.

The force of static friction is the minimum of the net force applied(excluding friction) and \mu R. Since in your situation, the friction only need be as large to keep the two blocks together, and ...

For the first problem \frac{\frac{5^{k+1}}{3^{k+1}+4^{k+1}}}{\frac{5^k}{3^k+4^k}} =\frac{5^{k+1}(3^k+4^k)}{5^k(3^{k+1}+4^{k+1})} =5\cdot\frac{\left(\frac34\right)^k+1}{3\cdot\left(\frac34\right)^k+4} ...