1 Evaluate (x2 + cos y) dx dy by rectangle rule, tripezoidal rule and Simpson's rule...
Q3/ Evaluate the following double integral by using Simpson's Rule Method 2 2 3xy) etx dx dy (x3 -2 0 Number interval 2 ? of (7 Marks)
Q3/ Evaluate the following double integral by using Simpson's Rule Method 2 2 3xy) etx dx dy (x3 -2 0 Number interval 2 ? of (7 Marks)
Calculus 3
Evaluate
SOLVE NUMBER 30
Evaluate x2 dx dy (x + 4y3) dx dy x + 4y dx dy cos(2x + y) dy dx e-3x-4y dy dx
2. Convert to cylindrical coordinates. Do not evaluate. V5 10-22-y2 cos(.x2 + y²) dz dx dy. 22+y?
[2xy cos (x+y) – sin x) dx + x2 cos (x+y) dy o
Problem 13. (1 point) Use Green's theorem to evaluate [4(-y +y)dx +4(x + 2xy)] dy. where C is the rectangle with vertices (0, 0), (5, 0) (5, 2) and (0, 2). A.1-20 B. I 160 DEI 40
Problem 13. (1 point) Use Green's theorem to evaluate [4(-y +y)dx +4(x + 2xy)] dy. where C is the rectangle with vertices (0, 0), (5, 0) (5, 2) and (0, 2). A.1-20 B. I 160 DEI 40
(a) [1[*(2x*y + 4y2) dy dx (b) ["" ["(y cos(x) + 6) dy dx cos [**(buye* * *) ay ox (a) LiS.*r-* log(4) dy dx (-x log(y)) dy dx -Il
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.
25 2 6 Evaluate the integral S SS 3 cos (x2) -dx dy dz by changing the order of integration in an appropriate way. 417 o o Зу
Use Simpson's rule with n = 6 to approximate 3 si cos(c) -dx х Keep at least 2 decimal places accuracy in your final answer
hw help
Consider the equation exin(y)+5x +1=y? Find dy dx in terms of X and y. Evaluate dx at (x,y) = (0,1). Select the correct answer. -5 5 ООО 2 Suppose that 3 xy2 = x²y + y2 + 14. dy Use implicit differentiation to find an expression for in terms of both X and y. dx dy Now give the value of when x = 3 and y = 2 dx -36 13 3 0 24 41 о ....