2.1 Prove that \( \frac{\cos ^{4} x+\sin ^{2} x \cos ^{2} x}{1+\sin x}=1-\sin x \)

To prove the equation \( \frac{\cos ^{4} x+\sin ^{2} x \cos ^{2} x}{1+\sin x}=1-\sin x \), we will start by simplifying the left-hand side. 1. Notice that we can factor \( \cos^2 x \) out of the numerator: \[ \cos^4 x + \sin^2 x \cos^2 x = \cos^2 x (\cos^2 x + \sin^2 x) \] Since \( \cos^2 x + \sin^2 x = 1 \), we have: \[ \cos^4 x + \sin^2 x \cos^2 x = \cos^2 x \] 2. Now the equation becomes: \[ \frac{\cos^2 x}{1 + \sin x} \] 3. We can rewrite \( \cos^2 x \) using the identity \( \cos^2 x = 1 - \sin^2 x \): \[ \frac{1 - \sin^2 x}{1 + \sin x} \] 4. Next, we can factor the numerator: \[ 1 - \sin^2 x = (1 - \sin x)(1 + \sin x) \] Thus, we rewrite our expression: \[ \frac{(1 - \sin x)(1 + \sin x)}{1 + \sin x} \] 5. Cancel out the \( 1 + \sin x \) terms (valid as long as \( \sin x \neq -1 \)): \[ 1 - \sin x \] 6. Therefore, we have proved that: \[ \frac{\cos ^{4} x+\sin ^{2} x \cos ^{2} x}{1+\sin x} = 1 - \sin x \] This completes the proof.