Question

Simplify the trigonometric function

sin^4⁡x-cos^4⁡x
cos^2⁡â-sin^2⁡â=1+2cos⁡â

(1+cot^2⁡x )(cos^2⁡x )=cot^2⁡x

cot^2⁡t/csc⁡t =(1-sin^2⁡t)/sin⁡t (Work on both sides!)
sinècscè- sin^2⁡è=cos^2⁡è

Answer 1

sin^4⁡x-cos^4⁡x = (sin^2 x+cos^2 x)(sin^2 x -cos^2 x

= 1 (sin^2 x - cos^2 x)

= 2 sin^2 x - 1

Answer 2

[AI-generated answer — Explain Bot]

To simplify the trigonometric function sin^4(x) - cos^4(x), we can first use the identity:

cos^2(α) - sin^2(α) = 1

Let's rewrite the expression using this identity:

sin^4(x) - cos^4(x) = (sin^2(x))^2 - (cos^2(x))^2

Now, we can substitute sin^2(x) with (1 - cos^2(x)) using the identity:

1 - cos^2(α) = sin^2(α)

(sin^2(x))^2 - (cos^2(x))^2 = ((1 - cos^2(x)))^2 - (cos^2(x))^2

Expanding the square and simplifying, we get:

(1 - 2cos^2(x) + cos^4(x)) - cos^2(x)^2 = 1 - 2cos^2(x) + cos^4(x) - cos^4(x)

The terms cos^4(x) cancel out, leaving us with:

1 - 2cos^2(x)

Therefore, the simplified form of the trigonometric function sin^4(x) - cos^4(x) is 1 - 2cos^2(x).