Find a nonzero vector U with initial point P (-7,-2,6) such that: a. U has the...

Find vector and parametric equations for: a) the line that passes through the point P(9,-9,6) parallel...

Find vector and parametric equations for: a) the line that passes through the point P(9,-9,6) parallel to the vector u = <3,4,-2> b) the line passing through the point P(6,-2,6) parallel to the line x=2t, y = 2 - 3t, z = 3 +6t c) the line passing through the point P(5, -2,1) parallel to the line x = 3 - t, y = -2 +4t, z = 4 + 8t

A) Find a vector that measures 3 in the direction of the vector 2i + 3j...

A) Find a vector that measures 3 in the direction of the vector 2i + 3j - k B) Given the vectors a = 2i + 3j - k and b = -2i + 3j + k. Find 2a 3 b and |a-b| C) Find the vector that goes from point P (2, -1,4) to point Q (3, -2,6)

Let f = sin(yz) + ln(x) a) Find the derivative of F at P(1,1,Pi) in the...

Let f = sin(yz) + ln(x) a) Find the derivative of F at P(1,1,Pi) in the direction of v = i+j-k b) Find a vector u in the direction where f increases the fastest c) Find a nonzero vector w with the property that the derivative of f in the direction of w at P(1,1,pi) is 0

For f(x, y) = x2 + 4xy - y2 at the point P(2, 1), a) find...

For f(x, y) = x2 + 4xy - y2 at the point P(2, 1), a) find the unit vector u in the direction of steepest ascent; b) find the unit vector u in the direction of steepest descent; and c) find a unit vector u that points in the direction of no change in the function. show all work please a) b) c)

Consider the following. u = −6, −4, −7 ,    v = 3, 5, 2 (a) Find the...

Consider the following. u = −6, −4, −7 ,    v = 3, 5, 2 (a) Find the projection of u onto v. (b) Find the vector component of u orthogonal to v.

f(x, y, z) = xe4yz, P(1, 0, 3), u = <2/3, -1/3, 2/3> (a) Find the...

f(x, y, z) = xe4yz, P(1, 0, 3), u = <2/3, -1/3, 2/3> (a) Find the gradient of f. ∇f(x, y, z) = <   ,   ,   > (b) Evaluate the gradient at the point P. ∇f(1, 0, 3) = <   ,   ,   > (c) Find the rate of change of f at P in the direction of the vector u. Duf(1, 0, 3) =

1. Which describes the vector calculation of the Biot-Savart law?    a. The length element in...

1. Which describes the vector calculation of the Biot-Savart law?    a. The length element in the direction of the current is crossed into a vector directed from that element toward the point of measurement.    b. The length element in the direction of the current is dotted into a vector directed from that element toward the point of measurement.    c. The magnetic field vector is crossed into a vector directed from a current-length element toward the point of...

Consider the following. f(x, y) = x/y,    P(4, 1),    u = 3 5  i + 4 5  j...

Consider the following. f(x, y) = x/y,    P(4, 1),    u = 3 5  i + 4 5  j (a) Find the gradient of f. (b) Evaluate the gradient at the point P. (c) Find the rate of change of f at P in the direction of the vector u.

Find the directional derivative of the function at the given point, in the vector direction v...

Find the directional derivative of the function at the given point, in the vector direction v 1- f(x, y) = ln(x^2 + y^2 ), (2, I), v = ( - 1, 2) 2- g(r, 0) = e^-r sin ø, (0, ∏/ 3), v = 3 i - 2 j

Differential Geometry   3. In each case, express the given vector field V in the standard form...

Differential Geometry   3. In each case, express the given vector field V in the standard form (b) V(p) = ( p1, p3 - p1, 0)p for all p. (c) V = 2(xU1 + yU2) - x(U1 - y2 U3). (d) At each point p, V(p) is the vector from the point ( p1, p2, p3) to the point (1 + p1, p2p3, p2). (e) At each point p, V(p) is the vector from p to the origin.