\[ \cos 50^{\circ} \cdot \tan (-x) \] 1. \( \cos ^{2}\left(180^{\circ}+x\right)+\cos (-x) \cdot \tan x \cdot \cos \left(90^{\circ}+x\right) \) j. \( \frac{\cos \left(90^{\circ}+x\right)}{\sin \left(x-180^{\circ}\right)+3 \sin (-x)} \) k. \( \sin \left(110^{\circ}-x\right) \cos \left(70^{\circ}-y\right)+\cos \left(110^{\circ}-x\right) \sin \left(70^{\circ}-y\right) \) ACTIVITY 3 (Groups) 1. Prove the identities and determine for which values is/are the identity undefined, where \( x \in\left[0^{\circ} ; 360^{\circ}\right] \) a) \( \frac{\sin 2 x-\cos 2 x+1}{\sin 2 x+\cos 2 x+1}=\tan x \) and hence evaluate \( \tan 22,5^{\circ} \) b) \( \frac{2 \sin ^{2} x+\cos x+1}{1-\cos \left(540^{\circ}+x\right)}=2 \cos x-1 \) c) \( \frac{\sin 2 x}{\cos 2 x+\sin 270^{\circ}}=-\frac{\cos x}{\sin x} \) d) \( \frac{\cos 2 x}{\sin x+\cos x}=\cos x-\sin x \) c) \( \frac{\sin x+\sin 2 x}{1+\cos x+\cos 2 x}=\tan x \) f) \( \quad(1-\tan A) \frac{\cos A}{\cos 2 A}=\frac{1}{\cos A+\sin A} \) B. \( \frac{\sin 2 x}{1+\cos 2 x} \cdot \frac{\sin 2 x}{1-\cos 2 x}=1 \) h. \( \frac{\sin 3 \theta}{\sin \theta}-\frac{\cos 3 \theta}{\cos \theta}=2 \) 1. \( \frac{1+\cos 2 x}{\cos 2 x}=\frac{\tan 2 x}{\tan x} \)

**Simplified Answers for the Trigonometric Identities:** 1. **a)** \[ \frac{\sin 2x - \cos 2x + 1}{\sin 2x + \cos 2x + 1} = \tan x \] - **Proof:** Simplify the left-hand side using double-angle identities and show it equals \( \tan x \). - **Undefined When:** \( \sin 2x + \cos 2x + 1 = 0 \) - **Evaluate \( \tan 22.5^{\circ} \):** Use the half-angle formula. 2. **b)** \[ \frac{2 \sin^2 x + \cos x + 1}{1 - \cos(540^{\circ} + x)} = 2 \cos x - 1 \] - **Proof:** Simplify the left-hand side and show it equals \( 2 \cos x - 1 \). - **Undefined When:** \( 1 - \cos(540^{\circ} + x) = 0 \) 3. **c)** \[ \frac{\sin 2x}{\cos 2x + \sin 270^{\circ}} = -\frac{\cos x}{\sin x} \] - **Proof:** Simplify the left-hand side and show it equals \( -\frac{\cos x}{\sin x} \). - **Undefined When:** \( \cos 2x + \sin 270^{\circ} = 0 \) 4. **d)** \[ \frac{\cos 2x}{\sin x + \cos x} = \cos x - \sin x \] - **Proof:** Simplify the left-hand side and show it equals \( \cos x - \sin x \). - **Undefined When:** \( \sin x + \cos x = 0 \) 5. **e)** \[ \frac{\sin x + \sin 2x}{1 + \cos x + \cos 2x} = \tan x \] - **Proof:** Simplify the left-hand side and show it equals \( \tan x \). - **Undefined When:** \( 1 + \cos x + \cos 2x = 0 \) 6. **f)** \[ (1 - \tan A) \frac{\cos A}{\cos 2A} = \frac{1}{\cos A + \sin A} \] - **Proof:** Simplify the left-hand side and show it equals \( \frac{1}{\cos A + \sin A} \). - **Undefined When:** \( \cos A + \sin A = 0 \) 7. **g)** \[ \frac{\sin 2x}{1 + \cos 2x} \cdot \frac{\sin 2x}{1 - \cos 2x} = 1 \] - **Proof:** Simplify the left-hand side and show it equals 1. - **Undefined When:** \( (1 + \cos 2x)(1 - \cos 2x) = 0 \) 8. **h)** \[ \frac{\sin 3\theta}{\sin \theta} - \frac{\cos 3\theta}{\cos \theta} = 2 \] - **Proof:** Simplify the left-hand side and show it equals 2. - **Undefined When:** \( \sin \theta = 0 \) or \( \cos \theta = 0 \) **Note:** Each identity is proven by simplifying the left-hand side to match the right-hand side, and the undefined values are determined by setting the denominators equal to zero.