Find the shortest distance from the point P = (−1, 2, 3) to the line of...

Find the shortest distance between line L1: x = 1 + 2t, y = 3 -...

Find the shortest distance between line L1: x = 1 + 2t, y = 3 - 4t, z = 2 + t and L2: the intersection of the planes x + y + z =1 and 2x + y - 3z = 10

Find the distance from the point P(3,5,6) to the line (x-1)/2 = (y+1)/3 = (z-1)/3

Find the distance from the point P(3,5,6) to the line (x-1)/2 = (y+1)/3 = (z-1)/3

a) Let T be the plane 3x-y-2z=9. Find the shortest distance d from the point P0...

a) Let T be the plane 3x-y-2z=9. Find the shortest distance d from the point P0 = (5, 2, 1) to T, and the point Q in T that is closest to P0. Use the square root symbol where needed. d= Q= ( , , ) b) Find all values of X so that the triangle with vertices A = (X, 4, 2), B = (3, 2, 0) and C = (2, 0 , -2) has area (5/2).

Find the line intersection and the angle between the planes 3x-2y+z=1 and 2x+y-3z=3.

Find the line intersection and the angle between the planes 3x-2y+z=1 and 2x+y-3z=3.

Find a nonzero vector parallel to the line of intersection of the two planes 2z−(2x+5y)=4 and...

Find a nonzero vector parallel to the line of intersection of the two planes 2z−(2x+5y)=4 and y+3z=2

Let T be the plane 2x+y = −4. Find the shortest distance d from the point...

Let T be the plane 2x+y = −4. Find the shortest distance d from the point P0=(−1, −5, −1) to T, and the point Q in T that is closest to P0. Use the square root symbol '√' where needed to give an exact value for your answer.

Find the shortest distance between the point (1, 4, 2) and the paraboloid described by z...

Find the shortest distance between the point (1, 4, 2) and the paraboloid described by z = x^2 + y^2 . Figure out a way to do this without having to deal with square roots.

Use Gaussian Elimination to solve and show all steps: 1. (x+4y=6) (1/2x+1/3y=1/2) 2. (x-2y+3z=7) (-3x+y+2z=-5) (2x+2y+z=3)

Use Gaussian Elimination to solve and show all steps: 1. (x+4y=6) (1/2x+1/3y=1/2) 2. (x-2y+3z=7) (-3x+y+2z=-5) (2x+2y+z=3)

Find the distance from the point (6, 1, −1) to the plane x − 2y +...

Find the distance from the point (6, 1, −1) to the plane x − 2y + 2z + 1 = 0.

(a) Find the volume of the parallelepiped determined by the vectors a =< 2, −1, 3...

(a) Find the volume of the parallelepiped determined by the vectors a =< 2, −1, 3 >, b =< −3, 0, 1 >, c =< 2, 4, 1 >. (b) Find an equation of the plane that passes through the point (2, 4, −3) and is perpendicular to the planes 3x + 2y − z = 1 and x − 2y + 3z = 4.