5. Suppose xey + yez + 2lnx−2−3ln2 = 0. (a) Find ∂z ∂x. (b) Find ∂z...

f(x,y,z) = xey+z. (a) Find the gradient of f, ∇f. (b) Find the directional derivative of...

f(x,y,z) = xey+z. (a) Find the gradient of f, ∇f. (b) Find the directional derivative of f at the point (2, 1, 2) in the direction of ? = 3? + 4?.

Find all lambda such that the system of equations -6⋅x+(-10)⋅y+6⋅z= lambda ⋅x, 5⋅x+9⋅y+1⋅z= lambda ⋅y, 0⋅x+0⋅y+5⋅z=...

Find all lambda such that the system of equations -6⋅x+(-10)⋅y+6⋅z= lambda ⋅x, 5⋅x+9⋅y+1⋅z= lambda ⋅y, 0⋅x+0⋅y+5⋅z= lambda ⋅z has a non-zero solution (x,y,z).

Find the derivative of the function. (a) f(x) = ln (x) + 6x^(2) – 5 (b)...

Find the derivative of the function. (a) f(x) = ln (x) + 6x^(2) – 5 (b) f(x) = ln (x + 1) (c) f(x) = 5 ln x (d) f(x) = ln(x^(3) – 5x^(2) – 2x + 5) (e) 2lnx / x (f) x^(2) ln x

use Lagrange multipliers to find the maximum of F(x,y,z)=xyz with the constraint H(x,y,z)=x^2+y^2+z^2-8=0

use Lagrange multipliers to find the maximum of F(x,y,z)=xyz with the constraint H(x,y,z)=x^2+y^2+z^2-8=0

Find the equation of the tangent plane at the given point. (x^2)(y^2)+z−45=0 at x=2, y=3 z=?

Find the equation of the tangent plane at the given point. (x^2)(y^2)+z−45=0 at x=2, y=3 z=?

(1) Sketch the given surfaces ( for Question (a) and (b) graph x=0, y=0 and z=2...

(1) Sketch the given surfaces ( for Question (a) and (b) graph x=0, y=0 and z=2 traces) (a) x2-4y2=z (b) y2-4x2-z2=4 (2) state the type of the quadric surface and describe the trace obtained by intersecting with the given plane. (x/2)2+(y/5)2-5z2=1, x=0

make a contour map with x=0, y=0, z=0, z=1, z=2, and z=4 for z=x^2+y^2 then sketch...

make a contour map with x=0, y=0, z=0, z=1, z=2, and z=4 for z=x^2+y^2 then sketch the graph

1- find the divergence of F(x,y,z) = <e^x(y),x^2(z),xyz> at (1,-1,3). 2- find the curl of F(x,y,z)=...

1- find the divergence of F(x,y,z) = <e^x(y),x^2(z),xyz> at (1,-1,3). 2- find the curl of F(x,y,z)= <xyz,y^2(z),x^2(y)z^3> at (0,-2,2)

Suppose that X, Y, and Z are independent, with E[X]=E[Y]=E[Z]=2, and E[X2]=E[Y2]=E[Z2]=5. Find cov(XY,XZ). (Enter a...

Suppose that X, Y, and Z are independent, with E[X]=E[Y]=E[Z]=2, and E[X2]=E[Y2]=E[Z2]=5. Find cov(XY,XZ). (Enter a numerical answer.) cov(XY,XZ)= Let X be a standard normal random variable. Another random variable is determined as follows. We flip a fair coin (independent from X). In case of Heads, we let Y=X. In case of Tails, we let Y=−X. Is Y normal? Justify your answer. yes no not enough information to determine Compute Cov(X,Y). Cov(X,Y)= Are X and Y independent? yes no not...

Suppose X, Y, and Z are random variables with the joint density function f(x, y, z)...

Suppose X, Y, and Z are random variables with the joint density function f(x, y, z) = Ce−(0.5x + 0.2y + 0.1z) if x ≥ 0, y ≥ 0, z ≥ 0, and f(x, y, z) = 0 otherwise. (a) Find the value of the constant C. (b) Find P(X ≤ 0.75 , Y ≤ 0.5). (Round answer to five decimal places). (c) Find P(X ≤ 0.75 , Y ≤ 0.5 , Z ≤ 1). (Round answer to six decimal...