3. a) Find the area under the graph of y = sin x over the interval [0, 1] b) Evaluate: J² cos(4x) dx 2 c) Evaluate: S sec2(x) dx ес

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### Educational Website Content --- ### Advanced Calculus and Differential Equations Problems #### 1. Area under Curve Find the area under the graph of \( y = \sin x \) over the interval \([0, \pi]\). #### 2. Integration Problems Evaluate the following integrals: a) \(\int_{0}^{\frac{\pi}{3}} \cos(4x) \, dx\) b) \(\int_{0}^{\frac{\pi}{3}} \sec(x) \, dx\) c) \(\int_{0}^{\pi} (50 + 25 \sin(2 \pi - 3 x)) \, dx\) #### 3. Separable Differential Equations Solve the following differential equations: a) \((y')^2 - 3x = 0\) if \( x = 0 \) when \( y = 9 \) b) \( \sqrt y \frac{dy}{dx} = x^2 \) c) \((1 + x)y' = xy\) d) \(y' = 4x^3 + 2x + 5\) if \( x = 1 \) when \( y = 10 \) e) Solve \(\frac{dy}{dx} = 3x + xy\) if \( x = 0\) when \( y = 2 \) #### 4. Differential Equations a) Let \( y'' - 2y = 0 \). Show that: i) \(y = e^{2x}\) is a particular/exact solution. ii) \(y = C e^{2x}\) is a general solution. What is the value of \( C \) in the above question? b) Let \( y'' + 6y - 16y = 0 \). Show that: i) \(y = C_{1}e^{3x} + C_{2}e^{-2x}\) is a general solution. ii) Provide 3 particular/exact solutions to i). #### 5. Elasticity of Demand Find the demand function \( q = D(x) \) if the Elasticity of Demand is \( E(x) \): \[ E(x) = - \frac{xd D(x)}{D(x)} \] a