If tan - i - e i - - where - - R - -2 n -1 -2- n - Z and i -1- thenA- - is an odd multiple of -2-B- - is an even multiple of -2C- - is an odd multiple of 4-D- - is an even multiple of 4

Tan(α+iβ)=e^iθ ⇒tan(α+iβ)=cosθ+isinθ Taking complex conjugate, we get nbsp; tan(α iβ)=cosθ isinθ tan2α=tan[(α+iβ)+(α iβ)] ⇒tan2α=tan(α+iβ)+tan(α iβ)1 tan(α+ ...

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Byju's Answer

Standard XII

Mathematics

Euler's Representation

If tan α+ i β...

Question

If $tan (α + i β) = e^{i θ};$ where $α, β \in R$ , $θ \neq (2 n + 1) \frac{π}{2}, n \in Z$ and $i = \sqrt{- 1}$ , then

α

is an odd multiple of

\frac{π}{2}

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α

is an even multiple of

\frac{π}{2}

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α

is an odd multiple of

\frac{π}{4}

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α

is an even multiple of

\frac{π}{4}

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Solution

The correct option is C $α$ is an odd multiple of $\frac{π}{4}$
$tan (α + i β) = e^{i θ}$
$\Rightarrow tan (α + i β) = cos θ + i sin θ$
Taking complex conjugate, we get
$tan (α - i β) = cos θ - i sin θ$

$tan 2 α = tan [(α + i β) + (α - i β)]$

$\Rightarrow tan 2 α = \frac{tan (α + i β) + tan (α - i β)}{1 - tan (α + i β) tan (α - i β)}$

$\Rightarrow \frac{1}{tan 2 α} = \frac{1 - tan (α + i β) tan (α - i β)}{tan (α + i β) + tan (α - i β)}$

$\Rightarrow cot 2 α = \frac{1 - ({cos}^{2} θ + {sin}^{2} θ)}{2 cos θ}$

$\Rightarrow cot 2 α = 0 [∵ θ \neq (2 n + 1) \frac{π}{2}]$

$\Rightarrow 2 α = \frac{(2 m + 1) π}{2}, m \in Z$

$\Rightarrow α = \frac{(2 m + 1) π}{4}, m \in Z$

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Similar questions

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Q. Question 12

In the given question, out of four options, only one is correct. Write the correct answer.

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If tan(α+iβ)=eiθ ; where α,β∈R, θ≠(2n+1)π2,n∈Z and i=√−1, then

If $tan (α + i β) = e^{i θ};$ where $α, β \in R$ , $θ \neq (2 n + 1) \frac{π}{2}, n \in Z$ and $i = \sqrt{- 1}$ , then