L(x,y,z)=(x+y+2z, x-z, 2x+3y-9z) f={(1,2,3) (-1,1,7), (3,0,5)} determine change of basis matrices

w+x+y+z=6, 2w+2x-2y-2z=4, 7w-2x+2y+z=24, w-x+3y+7z=4

w+x+y+z=6, 2w+2x-2y-2z=4, 7w-2x+2y+z=24, w-x+3y+7z=4

Is the set of all x, y, z such x+ 3y + 2z = 0 a...

Is the set of all x, y, z such x+ 3y + 2z = 0 a subspace of R^3 ? If so find a basis for the space.

Solve the following system of equations. {−x+4y−z=-4 3x−y+2z=6 2x−3y+3z=−2 Give your answer as an ordered triple...

Solve the following system of equations. {−x+4y−z=-4 3x−y+2z=6 2x−3y+3z=−2 Give your answer as an ordered triple (x,y,z).

#7 Solve for x, y and z 6x+3y+z=-27 x-3y+2z+10 17x-2y+3z=-65

#7 Solve for x, y and z 6x+3y+z=-27 x-3y+2z+10 17x-2y+3z=-65

Solve the system of equations using an inverse matrix -4x-2y+z= 6 -x-y-2z= -3 2x+3y-z= -4 Choose...

Solve the system of equations using an inverse matrix -4x-2y+z= 6 -x-y-2z= -3 2x+3y-z= -4 Choose one: a. (-1, 0, -2) b. (1, 0, -2) c. (1, 0, 2) d. (-1, 0, 2)

z= f(x,y) = xy-2x-3y+6 has one critical point (x,y,z). Please find it 2) f(xx)= 3) f(xy)=

z= f(x,y) = xy-2x-3y+6 has one critical point (x,y,z). Please find it 2) f(xx)= 3) f(xy)=

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)

elementary linear algebra Solve the system. x+y+z=1 x+y-2z=3 2x+y+z=2

elementary linear algebra Solve the system. x+y+z=1 x+y-2z=3 2x+y+z=2

show that L: x=-1+t , y=3+2t ,z=-t and the plane P : 2x-xy-2z=-3 are parallel then...

show that L: x=-1+t , y=3+2t ,z=-t and the plane P : 2x-xy-2z=-3 are parallel then find the distance btween them

1. f(x, y, z) = 2x-1 − 3xyz2 + 2z/ x4 2. f(s, t) = e-bst...

1. f(x, y, z) = 2x-1 − 3xyz2 + 2z/ x4 2. f(s, t) = e-bst − a ln(s/t) {NOTE: it is -bst2 } Find the first and second order partial derivatives for question 1 and 2. 3. Let z = 4exy − 4/y and  x = 2t3 , y = 8/t Find dz/dt using the chain rule for question 3.