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Question

Prove that

(i)sec2 θ+cosec2 θ=sec2 θ cosec2 θ

(ii)tan2 θsin2 θ=tan2 θ sin2 θ

(iii)tan2 θ+cot2 θ+2=sec2 θ cosec2 θ [3 MARKS]

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Solution

Solution: 1 Mark each

(i)sec2 θ+cosec2 θ

=1cos2 θ+1sin2 θ=sin2 θ+cos2 θcos2 θ sin2 θ

=1cos2 θ sin2 θ [sin2 θ+cos2 θ=1]

=sec2 θ cosec2 θ

LHS = RHS


(ii)tan2 θsin2 θ

=sin2 θcos2 θsin2 θ=sin2 θsin2 θ cos2 θcos2 θ

=sin2 θ(1cos2 θ)cos2 θ=sin2 θcos2 θ.sin2 θ

=tan2 θ sin2 θ

LHS = RHS


(iii)tan2 θ+cot2 θ+2

=(1+tan2 θ)+(1+cot2 θ)=sec2 θ+cosec2 θ

=1cos2 θ+1sin2 θ=sin2 θ+cos2 θcos2 θ sin2 θ

=1cos2 θ sin2 θ=sec2 θ cosec2 θ

LHS = RHS

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