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Simplify cos⁶θ + sin⁶θ + 3 cos²θ sin²θ

Answer:

1

Step by Step Explanation:

Expression can be rewritten as following
= (cos²θ)³ + (sin²θ)³ + 3 cos²θ sin²θ
Since x³ + y³ = ( x + y ) ( x² + y² - xy)
= (cos²θ + sin²θ ) [ (cos²θ)² + (sin²θ)² - cos²θ sin²θ ] + 3 cos²θ sin²θ
Since cos²θ + sin²θ =1 and x² + y² = (x+y)² - 2 xy)
= (cos²θ + sin²θ ) [ (cos²θ + sin²θ)² - 2 cos²θ sin²θ - cos²θ sin²θ] + 3 cos²θ sin²θ
= [ 1 - 3 cos²θ sin²θ ] + 3 cos²θ sin²θ
= 1

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