If ∫43f(x)dx=−5 and ∫−1−2g(x)dx=3, what is the value of ∫∫Df(x)g(y)dA where D is the rectangle: 3≤x≤4, −2≤y≤−1?
If ∫43f(x)dx=−5 and ∫−1−2g(x)dx=3, what is the value of ∫∫Df(x)g(y)dA where D is the rectangle: 3≤x≤4,...
(1 point) i * f(x) dx = 3 and ' s(x) dx = 4, what is the value of [ f(xBC) da where D is the rectangle: 3 < x < 4, 3 sy s 7?
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
i? (x, y) dA over the rectangle R - [a, b] x [c, d can Problem 1 Show that the integral be computed in terms of the numbers f(a, c), f(a, d), f (b, c) and f(b, d) 5 marks] i? (x, y) dA over the rectangle R - [a, b] x [c, d can Problem 1 Show that the integral be computed in terms of the numbers f(a, c), f(a, d), f (b, c) and f(b, d) 5 marks]
1.Z=f(x,y)=6x+7y where i) x=g(x)=x^2 y=h(x)=x^4 and ii )x=g(x)=x and y=h(x)=x^3. Please calculate Total derivative by applying this formula dZ=Zx dx/dx +Zy dy/dx
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
...HELPPPP....Use Green’s theorem to evaluate Z C (−y + √3 x 2 )dx + (x 3 − ln (y 2 ))dy where C is the rectangle with vertices (0, 0), (1, 0), (0, 2), and (1, 2). 4. Use Green's theorem to evaluate vertices (0,0), (1,0), (0, 2), and (1,2). Sc(-y + V 22)dx + (z? – In (y?))dy where C is the rectangle with
Find dy dx if y = In(x2/x + 5). dy dx Find dp da if p = In 91 9 in(92-5). dp bp Find if p = In(94 + + 5). da dp da II
Evaluate: vr y-x dA , y + 2x+1 where R is the parallelogram bounded by y-x-2, y-x-3, y + 2x = 0, andy+2x=4. Evaluate: vr y-x dA , y + 2x+1 where R is the parallelogram bounded by y-x-2, y-x-3, y + 2x = 0, andy+2x=4.
The answer is neither 1152π nor 1008π (1 point) Vx2 +y2 dA, where D is the domain in Figure 4 I Evaluate F D G:(x- 6)2y2 = 36 Fx2y2 = 144 -R R¢ -R Rf 12 Rg = 6 FIGURE 4 Slp Vx2 +y dA = 1008pi (1 point) Vx2 +y2 dA, where D is the domain in Figure 4 I Evaluate F D G:(x- 6)2y2 = 36 Fx2y2 = 144 -R R¢ -R Rf 12 Rg = 6 FIGURE...
Please show steps. Given 3 dy/dx + 2xy^2 = 5x^2 - x + 1, where y(0) = 5 and using a step size of dx = 1, the value of y(1) using Euler's method is most nearly 5.333 1.010 -0.499 17.822 Given 3 dy/dx + 2xy^2 = 5x^2 - x + 1, where y(0) = 5 and using a step size of dx = 1, the value of y(1) using Runge-Kutta 4^th order method is most nearly 5.333 1.010 -0.499...