If Sin θ + Sin2 θ = 1, then prove that Cos2 θ + Cos4 θ = 1.

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Q) If sin θ + sin² θ = 1, then prove that cos² θ + cos⁴ θ = 1.

Ans:

Given that sin θ + sin² θ = 1

$\therefore$ sin θ = 1 – sin² θ

LHS: cos² θ + cos⁴ θ

= (1- sin² θ) + (1- sin² θ)²

= sin θ + (sin θ)²

= sin θ + sin² θ

= 1

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