it is known that W=x2y+y+xz where x=cos A, y=sin A, and z=A2. find DW/DA and calculate...

Let w(x,y,z) = x^2+y^2+z^2 where x=sin(8t), y=cos(8t) , z= e^t Calculate dw/dt by first finding dx/dt,...

Let w(x,y,z) = x^2+y^2+z^2 where x=sin(8t), y=cos(8t) , z= e^t Calculate dw/dt by first finding dx/dt, dy/dt, and dz/dt and using the chain rule dx/dt = dy/dt= dz/dt= now using the chain rule calculate dw/dt 0=

2. Is the vector field F = < z cos(y), −xz sin(y), x cos(y)> conservative? Why...

2. Is the vector field F = < z cos(y), −xz sin(y), x cos(y)> conservative? Why or why not? If F is conservative, then find its potential function.

Use the Chain Rule to find dw/dt. w = ln x2 + y2 + z2 ,    x...

Use the Chain Rule to find dw/dt. w = ln x2 + y2 + z2 ,    x = 9 sin(t),    y = 4 cos(t),    z = 5 tan(t) dw dt =

Find dw/dt using the appropriate chain rule for w=x^2+y^2+z^2 where x=8tsin(s), y=8tcos(s) and z=5st^2

Find dw/dt using the appropriate chain rule for w=x^2+y^2+z^2 where x=8tsin(s), y=8tcos(s) and z=5st^2

Let w = (x 2 -z)/ y4 , x = t3+7, y = cos(2t), z =...

Let w = (x 2 -z)/ y4 , x = t3+7, y = cos(2t), z = 4t. Use the Chain Rule to express dw/ dt in terms of t. Then evaluate dw/ dt at t = π/ 2

2 If w =exp(x2y) and x = sin(11t) and y = 21cos(-33t), find δw/δt in two...

2 If w =exp(x2y) and x = sin(11t) and y = 21cos(-33t), find δw/δt in two ways, once by plugging in, and once by the chain rule. 3. Show why it is true that, if f(x, y) = 0 implicitly defines y as a function of x, we can compute the derivative dy/dx as the negative of the quotient of δf/δx and δf/δy. 4. Find the directional derivative of the function f(x,y) = (x+1)4 cos(-5y) at the point (0,1) in...

double integral f(x,y)dA. f(x,y) = cos(x) +sin(y). D is the triangle with vertices (-1,-2), (1,0) and...

double integral f(x,y)dA. f(x,y) = cos(x) +sin(y). D is the triangle with vertices (-1,-2), (1,0) and (-1,2). You might notice cos(x) is an even function, sin(y) is an odd function.

Identify the surface with parametrization x = 3 cos θ sin φ, y = 3 sin...

Identify the surface with parametrization x = 3 cos θ sin φ, y = 3 sin θ sin φ, z = cos φ where 0 ≤ θ ≤ 2π and 0 ≤ φ ≤ π. Hint: Find an equation of the form F(x, y, z) = 0 for this surface by eliminating θ and φ from the equations above. (b) Calculate a parametrization for the tangent plane to the surface at (θ, φ) = (π/3, π/4).

Find the flux of the vector field F (x, y, z) =< y, x, e^xz >...

Find the flux of the vector field F (x, y, z) =< y, x, e^xz > outward from the z−axis and across the surface S, where S is the portion of x^2 + y^2 = 9 with x ≥ 0, y ≥ 0 and −3 ≤ z ≤ 3.

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...