Question 9If tan - - sec -l then prove that sec -l2-1-2l-

Given, tan θ+sec θ=l ...(i) [multiply by (sec θ tan θ) on numerator and denominator of the LHS] ⇒(tan θ+sec θ)(sec θ tan θ)/(sec θ tan θ)=l⇒(sec^2 θ tan^2 θ) ...

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Standard XII

Mathematics

Trigonometric Ratios of Multiples of an Angle

Question 9If ...

Question

Question 9
If $t a n θ + s e c θ = l$ then prove that $s e c θ = \frac{l^{2} + 1}{2 l}$ .

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Solution

Given, $t a n θ + s e c θ = l$ ...(i)

[multiply by $(s e c θ - t a n θ)$ on numerator and denominator of the LHS]

$\Rightarrow \frac{(t a n θ + s e c θ) (s e c θ - t a n θ)}{(s e c θ - t a n θ)} = l \Rightarrow \frac{(s e c^{2} θ - t a n^{2} θ)}{(s e c θ - t a n θ)} = l$

$\Rightarrow \frac{1}{s e c θ - t a n θ} = l [∵ s e c^{2} θ - t a n^{2} θ = 1]$

$\Rightarrow s e c θ - t a n θ = \frac{1}{l} \dots \dots (i i)$

On adding Eq. (i) and (ii), we get

$2 s e c θ = l + \frac{1}{l}$

$\Rightarrow s e c θ = \frac{l^{2} + 1}{2 l}$

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Trigonometric Ratios of Multiples of an Angle

Standard XII Mathematics

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Question 9 If tan θ+sec θ=l then prove that sec θ=l2+12l.

Question 9
If $t a n θ + s e c θ = l$ then prove that $s e c θ = \frac{l^{2} + 1}{2 l}$ .