T1202s Maths N3 2.1. Differentiate the following function from the first principle: \[ f(x)=-2 t \pi-9 t^{2} x^{2}+4 t^{3} x \] 2.2. Determine \( \frac{d y}{d x} \) of the following function by making use of the rules of differentiation. Att flnat answers must be whth a poshtive exponent and in a surd form whore appticatole. \[ y=\frac{2}{3 x^{4}}-\frac{1}{2 x^{3}}-4 \sqrt[3]{x}+8 \] 2.3. Make use of differentiation to determine the co-ordinates of the turming points of the given function below. \[ f(x)=x\left(x^{2}-6 x+9\right) \] Question 3 3.1. In the following trigonometric equation without the use of a calculator solve for \( x \); where \( 0^{\circ} \leq x \leq 360^{\circ} \) \[ \sqrt{2} \sin x=1 \] 3.2. Prove that: \( (\tan \alpha+\cot \alpha)^{2}=\operatorname{cosec}^{2} \alpha \cdot \sec ^{2} \alpha \) (4)

**2.1 Differentiation from First Principle** The derivative of the function \( f(x) = -2t\pi - 9t^2x^2 + 4t^3x \) is: \[ f'(x) = -18t^2x + 4t^3 \] **2.2 Differentiation Using Rules** The derivative of \( y = \frac{2}{3x^4} - \frac{1}{2x^3} - 4\sqrt[3]{x} + 8 \) is: \[ \frac{dy}{dx} = -\frac{8}{3}x^{-5} + \frac{3}{2}x^{-4} - \frac{4}{3}x^{-2/3} \] **2.3 Turning Points** The turning points of \( f(x) = x(x^2 - 6x + 9) \) are at \( (0, 0) \) and \( (3, 0) \). **3.1 Trigonometric Equation Solution** The solutions for \( \sqrt{2} \sin x = 1 \) in the interval \( 0^\circ \leq x \leq 360^\circ \) are: \[ x = 45^\circ \quad \text{and} \quad x = 135^\circ \] **3.2 Trigonometric Identity Proof** \[ (\tan \alpha + \cot \alpha)^2 = \csc^2 \alpha \cdot \sec^2 \alpha \] Proof: \[ (\tan \alpha + \cot \alpha)^2 = \left(\frac{\sin \alpha}{\cos \alpha} + \frac{\cos \alpha}{\sin \alpha}\right)^2 = \frac{1}{\sin^2 \alpha \cos^2 \alpha} = \csc^2 \alpha \cdot \sec^2 \alpha \]