CBSE BoardEnglish MediumSTD 11 ScienceMathsComplex Numbers2 Marks
Question
Evaluate the following:
$\text{i}^{528}$
✓
Answer
We know that
$\text{i}=\sqrt{-1}$
$\text{i}^2 = -1$
$\text{i}^3 = -\text{i}$
$\text{i}^4 = 1$
In order to find $i^n$ Where $n > 4,$ we divide $n$ by $4$ to get quotient $p$ and remainder $q,$ So that $\text{n} = 4\text{p} + \text{q}, \ 0\leq\text{q}<4 $
Then $\text{i}^\text{n} =\text{i}^{4\text{p}+\text{q}}$
$=\text{i}^{4\text{p}}\times\text{i}^\text{q}$
$=\big(\text{i}^{4}\big)^{\text{p}}\times\text{i}^\text{q}$
$=\text{i}^{\text{p}}\times\text{i}^\text{q}$
$=\text{i}^\text{q} \ \big[\therefore \ 1^{\text{p}-1}\big]$
Hence $\text{i}^\text{n} =\text{i}^\text{q},$ where $0\leq\text{q}<4 $
$\therefore \ \text{i}^{528}=\text{i}^{4\times132}$
$=\big(\text{i}^4\big)^{132}$
$=1^{132}$
$=1$
$\therefore \ \big(\text{i}^{528}\big)=1$
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