Let ?⃗ =(5z+5x3)i→+(6y+7z+7sin(y^3))j→+(5x+7y+6e^z^3)k→. let C be the half circle (?−25)^2+(?−30)^2=1 in the xy-plane with ?>30, traversed...

Let F(x, y, z)  =  (3x2 ln(6y2 + 2) + 8z3) i  +  (  12yx3 6y2...

Let F(x, y, z)  =  (3x2 ln(6y2 + 2) + 8z3) i  +  (  12yx3 6y2 + 2 + 7z) j  +  (24xz2 + 7y − 10π sin πz) k and let  r(t)  =  (t3 + 1) i  +  (t2 + 2) j  +  t3 k ,  0  ≤  t  ≤  1. Evaluate   C ∫ C F · dr .

Let F(x,y,z) = ztan-1(y^2) i + (z^3)ln(x^2 + 8) j + z k. Find the flux...

Let F(x,y,z) = ztan-1(y^2) i + (z^3)ln(x^2 + 8) j + z k. Find the flux of F across the part of the paraboloid x2 + y2 + z = 20 that lies above the plane z = 4 and is oriented upward.

(1 point) Consider the paraboloid z=x2+y2. The plane 5x−3y+z−3=0 cuts the paraboloid, its intersection being a...

(1 point) Consider the paraboloid z=x2+y2. The plane 5x−3y+z−3=0 cuts the paraboloid, its intersection being a curve. Find "the natural" parametrization of this curve. Hint: The curve which is cut lies above a circle in the xy-plane which you should parametrize as a function of the variable t so that the circle is traversed counterclockwise exactly once as t goes from 0 to 2*pi, and the paramterization starts at the point on the circle with largest x coordinate. Using that...

Find the distance from the point (1, 2, 3) to the (a) XY plane         (b) Y...

Find the distance from the point (1, 2, 3) to the (a) XY plane         (b) Y axis Find a unit vector that is perpendicular to both i + j   and   i - k   Find the equation of the plane that contains the point   (1, 2, -1) with normal vector i – j.

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.

Consider F and C below. F(x, y, z) = yz i + xz j + (xy...

Consider F and C below. F(x, y, z) = yz i + xz j + (xy + 12z) k C is the line segment from (2, 0, −3) to (4, 6, 3) (a) Find a function f such that F = ∇f. f(x, y, z) =       (b) Use part (a) to evaluate    C ∇f · dr along the given curve C.

Find the center of mass of region density p(x,y,z)= 1/(25-x^2-y^2) bounded by parabaloid z-25-x^2-y^2 and xy-plane

Find the center of mass of region density p(x,y,z)= 1/(25-x^2-y^2) bounded by parabaloid z-25-x^2-y^2 and xy-plane

Consider F and C below. F(x, y, z) = yz i + xz j + (xy...

Consider F and C below. F(x, y, z) = yz i + xz j + (xy + 18z) k C is the line segment from (1, 0, −3) to (4, 4, 1) (a) Find a function f such that F = ∇f. f(x, y, z) = (b) Use part (a) to evaluate C ∇f · dr along the given curve C.

Let Q1 be a constant so that Q1 = L(−3, 2), where z = L(x, y)...

Let Q1 be a constant so that Q1 = L(−3, 2), where z = L(x, y) is the equation of the tangent plane to the surface z = ln(5x − 7y) at the point (x0, y0) = (2, 1). Let Q = ln(3 + |Q1|). Then T = 5 sin2 (100Q) satisfies:— (A) 0 ≤ T < 1. — (B) 1 ≤ T < 2. — (C) 2 ≤ T < 3. — (D) 3 ≤ T < 4. —...

For V = [2(x^2)y] i-( (z^3) + y) j + (3xyz) k, show that Stokes' theorem...

For V = [2(x^2)y] i-( (z^3) + y) j + (3xyz) k, show that Stokes' theorem holds by calculating both sides of the equation for a square in the x-y plane with corners at (0; 0; 0), (3; 0; 0), (3; 3; 0), (0; 3; 0) . Confirm that Stokes' theorem only depends on the boundary line by integrating over the surface of a cube with an open bottom The bounding line is the same as before.