Find dz/dy implicitly. ln(xy2) + zy4 + z3y2x3 + z5x-3 + z2y = 0

The product of two metric spaces (Y, dY ) and (Z, dZ) is the metric space...

The product of two metric spaces (Y, dY ) and (Z, dZ) is the metric space (Y × Z, dY ×Z), where dY ×Z is defined by dY ×Z((y, z),(y 0 , z0 )) = dY (y, y0 ) + dZ(z, z0 ). Assume that (Y, dY ) and (Z, dZ) are compact. Prove that (Y × Z, dY × dZ) is compact.

find dx/dx and dz/dy z^3 y^4 - x^2 cos(2y-4z)=4z

find dx/dx and dz/dy z^3 y^4 - x^2 cos(2y-4z)=4z

Use this equation to find dy/dx. 8 tan−1(x2y) = x + xy2

Use this equation to find dy/dx. 8 tan−1(x2y) = x + xy2

Find the first derivative of each   Y=3Z1/2+2Z-1/2-5Z-4/5        dY/dZ = Y=4X3/4+3X-1/3-2X3/2 dY/dX = R=3S1/2(3-2S+5S^2) dR/dS=

Find the first derivative of each   Y=3Z1/2+2Z-1/2-5Z-4/5        dY/dZ = Y=4X3/4+3X-1/3-2X3/2 dY/dX = R=3S1/2(3-2S+5S^2) dR/dS=

a) find dy/dx for each of the following i. y = 4ex (1 + ln x)...

a) find dy/dx for each of the following i. y = 4ex (1 + ln x) [9 marks] ii. y = ex ln (5x 3 + x 2 )

Consider the following line integral of the conservative vector field: ZC(y2 sinz−z)dx + 2xy sinz dy...

Consider the following line integral of the conservative vector field: ZC(y2 sinz−z)dx + 2xy sinz dy + (xy2 cosz−x)dz where C is the contour given by r(t) = ht3,2t2 −1,πti, 0 ≤ t ≤ 1/2. a. [4] Find the potential f of the vector field satisfying the condition f(1,1,0) = 0. b. [5] Compute the line integral.

Evaluate Integral (subscript c) z dx + y dy − x dz, where the curve C...

Evaluate Integral (subscript c) z dx + y dy − x dz, where the curve C is given by c(t) = t i + sin t j + cost k for 0 ≤ t ≤ π.

(dx/dt) = x+4z (dy/dt) = 2y (dz/dt) = 3x+y-3z

(dx/dt) = x+4z (dy/dt) = 2y (dz/dt) = 3x+y-3z

Find extrema of f(x,y) = 2x4 −xy2 +2y2, on R = {(x,y) : 0 ≤ x...

Find extrema of f(x,y) = 2x4 −xy2 +2y2, on R = {(x,y) : 0 ≤ x ≤ 4, 0 ≤ y ≤ 2}

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 =