Kindly refer to a Proof in the Explanation. Explanation: Given that, \displaystyle{i}{z}^{{3}}+{z}^{{2}}-{z}+{i}={0} , \displaystyle\therefore\underline{{{i}{z}^{{3}}+{z}^{{2}}}}+\underline{{{i}^{{2}}{z}+{i}}}={0}\ldots\ldots\ldots\ldots{\left[\because,{i}^{{2}}=-{1}\right]} ...

\displaystyle{t}=+{4.06} to 2 decimal places Explanation: This is a quadratic in \displaystyle{t} instead of \displaystyle{x} . It behaves in exactly the same way as it would if we had ...

0. Explanation: \displaystyle{i}^{{14}}={i}^{{2}}=-{1} \displaystyle{i}^{{15}}={i}^{{14}}\cdot{i}=-{1}×{i}=-{i} \displaystyle{i}^{{16}}={i}^{{15}}\cdot{i}=-{i}×{i}={1} \displaystyle{i}^{{17}}={i}^{{16}}\cdot{i}={1}×{i}={i} ...

\displaystyle{3}-{i} . Explanation: Remember that \displaystyle{i}^{{4}}={1} . So \displaystyle{i}^{{8}}={i}^{{12}}={i}^{{16}}=\ldots={1} . Then \displaystyle{i}^{{14}}={\left({i}^{{12}}\right)}{\left({i}^{{2}}\right)}={\left({1}\right)}{\left(-{1}\right)}=-{1} ...

Let a,b,c be the p^{\text{th}}, q^{\text{th}},r^{\text{th}} terms of the AP respectively, and let \alpha=\frac ac, \beta=\frac bc. As a,b,c are consecutive terms of a GP, \begin{align} b^2&=ac\\ \left(\frac bc\right)^2&=\frac ac\\ \Longrightarrow \beta^2&=\alpha\end{align} ...

Writting \sum^{10}_{i=1}\frac{i}{i^4+i^2+1} = \frac{1}{2}\sum^{10}_{i=1}\bigg[\frac{(i^2+i+1)-(i^2-i+1)}{(i^2+i+1)(i^2-i+1)}\bigg] = \frac{1}{2}\sum^{10}_{i=1}\bigg[\frac{1}{i^2-i+1}-\frac{1}{i^2+i+1}\bigg] ...