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Trigonometric Identities

Prove that i ...

Question

Prove that

$(i) s e c^{2} θ + c o s e c^{2} θ = s e c^{2} θ c o s e c^{2} θ$

$(i i) t a n^{2} θ - s i n^{2} θ = t a n^{2} θ s i n^{2} θ$

$(i i i) t a n^{2} θ + c o t^{2} θ + 2 = s e c^{2} θ c o s e c^{2} θ$ [3 MARKS]

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Solution

Solution: 1 Mark each

$(i) s e c^{2} θ + c o s e c^{2} θ$

$= \frac{1}{c o s^{2} θ} + \frac{1}{s i n^{2} θ} = \frac{s i n^{2} θ + c o s^{2} θ}{c o s^{2} θ s i n^{2} θ}$

$= \frac{1}{c o s^{2} θ s i n^{2} θ}$ $[∵ s i n^{2} θ + c o s^{2} θ = 1]$

$= s e c^{2} θ c o s e c^{2} θ$

$∴$ LHS = RHS

$(i i) t a n^{2} θ - s i n^{2} θ$

$= \frac{s i n^{2} θ}{c o s^{2} θ} - s i n^{2} θ = \frac{s i n^{2} θ - s i n^{2} θ c o s^{2} θ}{c o s^{2} θ}$

$= \frac{s i n^{2} θ (1 - c o s^{2} θ)}{c o s^{2} θ} = \frac{s i n^{2} θ}{c o s^{2} θ} . s i n^{2} θ$

$= t a n^{2} θ s i n^{2} θ$

$∴$ LHS = RHS

$(i i i) t a n^{2} θ + c o t^{2} θ + 2$

$= (1 + t a n^{2} θ) + (1 + c o t^{2} θ) = s e c^{2} θ + c o s e c^{2} θ$

$= \frac{1}{c o s^{2} θ} + \frac{1}{s i n^{2} θ} = \frac{s i n^{2} θ + c o s^{2} θ}{c o s^{2} θ s i n^{2} θ}$

$= \frac{1}{c o s^{2} θ s i n^{2} θ} = s e c^{2} θ c o s e c^{2} θ$

$∴$ LHS = RHS

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Prove that:

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{sec}^{2} θ + c o s e c^{2} θ = {sec}^{2} θ \times c o s e c^{2} θ

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