Evaluate by Green’s theorem ∮(cos?sin? − ??)?? + sin?cos??? where ? is the circle ?^2 +...

Use Green’s Theorem to evaluate the integral H C x ln ydx where C is the...

Use Green’s Theorem to evaluate the integral H C x ln ydx where C is the positively oriented boundary curve of the region bounded by x = 1, x = 2, y = e^x and y = e^(x^2) .

Use Green’s theorem to evaluate the integral: ∫(-x^2y)dx +(xy^2)dy where C is the boundary of the...

Use Green’s theorem to evaluate the integral: ∫(-x^2y)dx +(xy^2)dy where C is the boundary of the region enclosed by y= sqrt(9 − x^2) and the x-axis, traversed in the counterclockwise direction.

2. Use Green’s Theorem to evaluate R C F · Tds, where C is the square...

2. Use Green’s Theorem to evaluate R C F · Tds, where C is the square with vertices (0,0),(1,0),(1,1) and (0,1) in the xy plane, oriented counter-clockwise, and F(x,y) = hx 3 ,xyi. (Please give a numerical answer here.)

Let ? (?, ?) = (? 2 cos ? + cos ?)? + (2? sin ?...

Let ? (?, ?) = (? 2 cos ? + cos ?)? + (2? sin ? − ? sin ?)? . a. Show that ?⃗ is conservative and find a potential function f such that ∇? = ?⃗ b. Evaluate ∫ ? ∙ ?? ? where C is the line segment from (0, ?/4 ) to ( ?/6 , ?/2 )

3. Let P = (a cos θ, b sin θ), where θ is not a multiple...

3. Let P = (a cos θ, b sin θ), where θ is not a multiple of π/2 be a point on the ellipse (x 2/ a2 )+ (y 2/ b 2) = 1, where a ≥ b > 0; and let P1 = (a cos θ, a sin θ) the corresponding on the circle x 2 /a2 + y 2/ a2 = 1. Prove that the tangent to the ellipse at P and the tangent to the circle at...

Part B:1. Verify the Green’s Theorem for ∮ (3? − ?) ?? + (4?) ??, where...

Part B:1. Verify the Green’s Theorem for ∮ (3? − ?) ?? + (4?) ??, where C is a closed curve formed by ? = ?, ? = 4 − ? and x-axis, oriented counter clockwise as shown.

Evaluate C (y + 6 sin(x)) dx + (z2 + 2 cos(y)) dy + x3 dz...

Evaluate C (y + 6 sin(x)) dx + (z2 + 2 cos(y)) dy + x3 dz where C is the curve r(t) = sin(t), cos(t), sin(2t) , 0 ≤ t ≤ 2π. (Hint: Observe that C lies on the surface z = 2xy.) C F · dr =

Use Stokes' Theorem to evaluate the integral ∮CF⋅dr=∮C8z^2dx+8xdy+2y^3dz where C is the circle x^2+y^2=9 in the...

Use Stokes' Theorem to evaluate the integral ∮CF⋅dr=∮C8z^2dx+8xdy+2y^3dz where C is the circle x^2+y^2=9 in the plane z=0 .

On a circle, why is cos(θ)=xrcos(θ)=xr equivalent to cos(θ)=adjacenthypotenusecos(θ)=adjacenthypotenuse ? On a unit circle, is the...

On a circle, why is cos(θ)=xrcos(θ)=xr equivalent to cos(θ)=adjacenthypotenusecos(θ)=adjacenthypotenuse ? On a unit circle, is the x-coordinate the same ascos(θ)cos(θ) and why is the y-coordinate the same as sin(θ)sin(θ) ? Explain how to how to evaluate sin(300∘)sin(300∘) using a reference triangle. Your explanation should include a drawing that shows... The unit circle The angle in standard form The reference angle and reference triangle The coordinates of the point Draw a unit circle from scratch (just like in the video above)....

Let z= 2(cos(160)+ i sin(160)) and w=1(cos(40)+ i sin(40)). write zw in polar form where -180<degree<or...

Let z= 2(cos(160)+ i sin(160)) and w=1(cos(40)+ i sin(40)). write zw in polar form where -180<degree<or equal to 180 zw= ______(cos(_____)+ i sin(______))