. 0 -15.55 points ZiICAnalysis3 5.1.011 Evaluate the line integrals G(x, y) dx, G(x, y) dy,...
show all work EvaluateG(x, y) dx,G(x, y) dy, and G(x, y) ds on the indicated curve C G(x, y) 2xy: x- 5 cos(t), y 5 sin(t), o s t sT 4 25 G(x, y) dy- 125 2 G(x, y) ds eBook
6. -1.25 points My Notes Evaluate (y 3 sin x) dx + (z2 +7 cos y) dy x3 dz COS JC where C is the curve r(t) - (sin t, cos t, sin 2t), 0 s t s 27. (Hint: Observe that C lies on the surface z - 2xy.) F dr- 6. -1.25 points My Notes Evaluate (y 3 sin x) dx + (z2 +7 cos y) dy x3 dz COS JC where C is the curve r(t) -...
Evaluate. Line x = e Curve y = sqrt(ln(x)) xy dx dy y=0 y g = 4² Hey4
Evaluating using Green's theorem (4x^3+sin(y^2))dy-(4y^3+cos(x^2))dx where C is the boundary of the region x^2+y^24 Please be detail thanks. We were unable to transcribe this image3. EVALUATE USING GREEN'S THEOREM (4x++sinyydy –(4y+cosx2) dx, WHERE C IS THE BOUNDARY OF THE REGION X+Y24.
Use Stokes' Theorem to evaluate sta curl F. ds. F(x, y, z) = xyzi + xyj + x2yzk, S consists of the top and four sides (but not the bottom of the cube with vertices (+3, +3, +3), oriented outward. Need Help? Read It Watch It Talk to a Tutor Submit Answer 33. [-/2.5 Points] DETAILS SCALC8 16.8.018. MY NOTES ASK YOUR Evaluate le (y + 5 sin(x)) dx + (z2 + 3 cos(y)) dy + x3 dz where C...
[2xy cos (x+y) – sin x) dx + x2 cos (x+y) dy o
Use Green's Theorem to evaluate the line integral sin x cos y dx + xy + cos a sin y) dy where is the boundary of the region lying between the graphs of y = x and y = 22.
Evaluate the iterated integral. (x+y-2xy) dy dx
please respond with explanations for each step. thank you Problem 4 Evaluate the line integrals (a) (10 points) y da 2ax dy, where C is the curve r(t) (2t + 1) i+ 3t2 j, 0t 1. (b) (10 points) (ryz) ds, where C is the line segment from the point (2, 1,0) to the point (4,3,6) (c) (10 points) F.dr,where F is the vector field F(x, y) = yi - rj and C is the curve given by r(t) t2i+...
Use Green's Theorem to evaluate the line integral dos sin x cos y dx + xy + cos x sin y) dy where is the boundary of the region lying between the graphs of y = x and y = 22.