1- sine 3. sec 0– tan 0 cos 0

Verify each of the following trigonometric identities in the same manner that was modeled in class. This includes taking the most complicated side, and rewriting it in equivalent forms until it is identical to the expression on the other side of the equal sign. Do not assume equality by working both sides of the equation. You are trying to prove equality. 

***Please answer number 3

Transcribed Image Text:

Here is a transcription of the trigonometric equations from the image, intended for educational purposes. 1. \( \csc x \tan x = \sec x \) 2. \( \cos^3 x - \cos^3 x \sin^2 x = \cos^5 x \) 3. \( \frac{1 - \sin \theta}{\cos \theta} = \sec \theta - \tan \theta \) 4. \( \frac{\cos x}{1 + \sin x} = \frac{1 - \sin x}{\cos x} \) 5. \( \cos x \cot x + \sin x = \csc x \) 6. \( \frac{\sin x}{\cos x + 1} + \frac{\cos x - 1}{\sin x} = 0 \) 7. \( \sin^4 t - \cos^4 t = 1 - 2 \cos^2 t \) 8. \( \frac{\sec x + \csc(-x)}{\sec x \csc x} = \sin x - \cos x \) 9. \( \frac{1}{1 + \sin \theta} + \frac{1}{1 - \sin \theta} = 2 + 2 \tan^2 \theta \) 10. \( \cot t + \frac{\sin t}{1 + \cos t} = \csc t \) Each formula represents a unique trigonometric identity or equation that is useful in various mathematical problems and proofs.