Evaluate ∂2f∂z∂y∂2f∂z∂y for the function f(x,y,z)=ln(5x2y−2xzy3)

For f(x,y)=ln(x^2−y+3). -> Find the domain and the range of the function z=f(x,y). -> Sketch the...

For f(x,y)=ln(x^2−y+3). -> Find the domain and the range of the function z=f(x,y). -> Sketch the domain, then separately sketch three distinct level curves. -> Find the linearization of f(x,y) at the point (x,y)=(4,18). -> Use this linearization to determine the approximate value of the function at the point (3.7,17.7).

write and evaluate the triple integral for the function f(x,y,z) = z^2 bounded above by the...

write and evaluate the triple integral for the function f(x,y,z) = z^2 bounded above by the half-sphere x^2+y^2+z^2=4 and below by the disk x^2+y^4=4. Use spherical coordinates.

Find a unit normal vector for the following function at the point P(−1,3,−10): f(x,y)=ln(−x/(−3y−z))

Find a unit normal vector for the following function at the point P(−1,3,−10): f(x,y)=ln(−x/(−3y−z))

Find the directional derivative of the function f(x,y,z)=ln(x2+y2−1)+y+6z at the point (1,1,0) in the direction of...

Find the directional derivative of the function f(x,y,z)=ln(x2+y2−1)+y+6z at the point (1,1,0) in the direction of the vector v→=i→−2j→+2k→

Find the directional derivative of the function f(x,y,z)=ln(x2+y2−1)+y+6z at the point (1,1,0) in the direction of...

Find the directional derivative of the function f(x,y,z)=ln(x2+y2−1)+y+6z at the point (1,1,0) in the direction of the vector v→=i→−2j→+2k→.

Show the following: a) Let there be Y with the cumulative distribution function F(y). Let F(Y)=Z....

Show the following: a) Let there be Y with the cumulative distribution function F(y). Let F(Y)=Z. Show that Z~U(0,1) for F(y). b) Let X~U(0,1), and let Y := -ln(X). Show that Y~exp(1)

Consider the following function. f (x, y)  =  [(y + 2) ln x] − xe7y −...

Consider the following function. f (x, y)  =  [(y + 2) ln x] − xe7y − x(y − 5)7 (a) Find  fx(1, 0) . (b) Find  fy(1, 0) .

Find the first- and second-order partial derivatives for the following function. z = f (x, y)...

Find the first- and second-order partial derivatives for the following function. z = f (x, y) = (ex +1)ln y.

Use Stokes" Theorem to evaluate (F-dr where F(x, y, z)=(-y , x-z , 0) and the...

Use Stokes" Theorem to evaluate (F-dr where F(x, y, z)=(-y , x-z , 0) and the surface S is the part of the paraboloid : z = 4- x^2 - y^2 that lies above the xy-plane. Assume C is oriented counterclockwise when viewed from above.

Let F(x, y, z) = z tan−1(y^2)i + z^3 ln(x^2 + 7)j + zk. Find the...

Let F(x, y, z) = z tan−1(y^2)i + z^3 ln(x^2 + 7)j + zk. Find the flux of F across S, the part of the paraboloid x^2 + y^2 + z = 29 that lies above the plane z = 4 and is oriented upward.