4. f(x) is a continuous function on [0, 1] and So f (x)dx = a, where...
Please show as much work as you can to receive full credit. You may turn this sheet in or work on a separate sheet of paper (Relevant Section: 15.2) Problem. (This one is a bit tough) Evaluate the following improper integral sin(a) dr. e" sin(r) dy dx. Apply Fubini's theorem to reverse the order (Hint: Consider the iterated integral of integration and evaluate this integral in two different ways. With respect to a, you will have to integrate by parts!)...
Evaluate the integral Z π 0 Z π x cos(y) y dy dx. Hint: Since cos(y) y doesn’t have an elementary antiderivative in y, the integral can only be evaluated by reversing the order of integration using Fubini’s theorem.
Find f(x), assuming that f(x) ex dx = f(x) e' - 8x-1 ex dx. (Use C for the constant of integration.) Evaluate the integral. (Use C for the constant of integration.) cos 498(3y) sin?(3y) dy
Find fY(y) from the domain: Consider the domain D={(x,y): 0 < x < 1,-x < y < x} and let fix, y)=cx,where c is a constant. 1.1 (4.6 marks) To start with, we wish you to determine c such that f(x, y) a joint density of random vector (X, Y) that takes values on D. order to do that, you must first calculate fix, y) dA where dA is an area element of D, and then deduce c Hence you...
Problem 3. Evaluate the integral co sinx dx. Hint: Apply residue theorem to the function f(z) = and the contour y of the following shape:
QUESTION 4 Evaluate the double integral. 6x2 - 3y) da, where R = [(x, y)/05 x 54 and 1sys 3) -304 304 208 -208 QUESTION 5 T F(x, ) dx dy 1. Change the order of integration of S F(x, y) dy dx Click Save and Submit to save and submit. Click Save All Answers to save all ans esc
6. Let S CR be the tetrahedron having vertices (0,0,0), (0, 1, 1), (1, 2, 3), and (-1,0,1). Let f:R3 → R be the function defined by f(x, y, x) = x – 2y + 3z. Using the change of variables theorem, rewrite Ss f as an integral over a 3-rectangle, then use Fubini's theorem to evaluate the integral (8 points).
there is first question E then there is the question of the value of the line integral ,then quwstion A, then question 1, and the last two pictures are one question Question E (5 points) By Green's theorem, the value of the line integral y 4 is: , where C is the curve given by a) 3 c) 12t d) 27T e) If none of the above is correct, write your answer here in a box rover the line segment...
Suppose f is continuous, f(0)=0, f(2)=2, f'(x)>0 and f (x) dx = 1. Find the value of the integral fro f-?(x) dx =?
Change the order of integration. 6" | vx2 + 16 dx dy The answer should be in the form See f(x, y) dy dx, where a sx sb and g1(x) < y = 82(x) are the bounds of the integration region. (Use symbolic notation and fractions where needed.) a= b= 81(x) = 82(x) = Evaluate the integral with new limits of integration. (Use symbolic notation and fractions where needed.) 6" Sv Vx3 + 16 dx dy =