Consider the double integral V = f 4r² tan o dA over the region D enclosed between the lines: D 0≤r≤3√ √2 cos, 0≤ ≤л/2. a) Reduce the integral to the repeated integral and show limits of integration. [12 marks] c) Calculate the integral and present your answer in the exact form. [28 marks] Rubric: 12 marks if the double integral is reduced to the repeated integrals correctly; 2 marks if the inner integration was correct; 8 marks if substitution of limits was correct; 8 marks if function of op was correctly simplified; 8 marks if the outer integration was correct; 1 mark if limit substitution was correct; 1 mark if the result was properly presented with two significant figures.