Please simplify, 50 points.

(sin Θ - cos Θ) - (sin Θ + cos Θ)^2

Answer choices are attached.

The trigonometric equation (sin Θ − cos Θ)^2 − (sin Θ + cos Θ)^3 can be simplified by:Using x for Θ: (sinx - cosx)^2 - (sinx + cosx)^2 = (sin^2 x - 2sinxcosx + cos^2 x) - (sin^2 x + 2sinxcosx + cos^2 x) = - 2 sinx cosx - 2 sinx cosx = - 4 sinx cosx = - 2sin(2x)

Step-by-step explanation:

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jimrgrant1 jimrgrant1 · Answer 2 · 2019-04-26T16:09:36+02:00

jimrgrant1 jimrgrant1

26-04-2019

Answer:

D

Step-by-step explanation:

Expand (sinΘ + cosΘ)²

= sinΘ - cosΘ - (sin²Θ + 2 sinΘcosΘ + cos²Θ)

= sinΘ - cosΘ - sin²Θ - 2sinΘcosΘ - cos²Θ

= sinΘ - cosΘ - 2sinΘcosΘ - (sin²Θ + cos²Θ)

= - 2sinΘcosΘ - cosΘ + sinΘ - 1 → D

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Please simplify, 50 points. (sin Θ - cos Θ) - (sin Θ + cos Θ)^2 Answer choices are attached.

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Please simplify, 50 points.

(sin Θ - cos Θ) - (sin Θ + cos Θ)^2

Answer choices are attached.