Let T(x,y,z) = (13x − 9y + 4z,6x + 5y − 3z) and v = (1,−2,1)....

show that L: x=1-2t .y=t .z=-t and the plane P: 6x-3y+3z=1 are parpeudicular then find the...

show that L: x=1-2t .y=t .z=-t and the plane P: 6x-3y+3z=1 are parpeudicular then find the point of intersect

Solve each system by elimination. 1) -x-5y-5z=2 4x-5y+4z=19 x+5y-z=-20 2) -4x-5y-z=18 -2x-5y-2z=12 -2x+5y+2z=4 3) -x-5y+z=17 -5x-5y+5z=5...

Solve each system by elimination. 1) -x-5y-5z=2 4x-5y+4z=19 x+5y-z=-20 2) -4x-5y-z=18 -2x-5y-2z=12 -2x+5y+2z=4 3) -x-5y+z=17 -5x-5y+5z=5 2x+5y-3z=-10 4) 4x+4y+z=24 2x-4y+z=0 5x-4y-5z=12 5) 4r-4s+4t=-4 4r+s-2t=5 -3r-3s-4t=-16 6) x-6y+4z=-12 x+y-4z=12 2x+2y+5z=-15

a. Let →u = (x, y, z) ∈ R^3 and define T : R^3 → R^3...

a. Let →u = (x, y, z) ∈ R^3 and define T : R^3 → R^3 as T( →u ) = T(x, y, z) = (x + y, 2z − y, x − z) Find the standard matrix for T and decide whether the map T is invertible. If yes then find the inverse transformation, if no, then explain why. b. Let (x, y, z) ∈ R^3 be given T : R^3 → R^2 by T(x, y, z) = (x...

1. Let T(x, y, z) = (x + z, y − 2x, −z + 2y) and...

1. Let T(x, y, z) = (x + z, y − 2x, −z + 2y) and S(x, y, z) = (2y − z, x − z, y + 3x). Use matrices to find the composition S ◦ T. 2. Find an equation of the tangent plane to the graph of x 2 − y 2 − 3z 2 = 5 at (6, 2, 3). 3. Find the critical points of f(x, y) = (x 2 + y 2 )e −y...

Determine whether the planes x−2y+3z−4 = 0 and −2x+5y+4z = −1 are orthogonal.

Determine whether the planes x−2y+3z−4 = 0 and −2x+5y+4z = −1 are orthogonal.

Let the linear transformation T: V--->W be such that T (u) = u2 If a, b...

Let the linear transformation T: V--->W be such that T (u) = u2 If a, b are Real. Find T (au + bv) , if u = (x, y) v = (z, w) and uv = (xz-yw, xw + yz) Let the linear transformation T: V---> W be such that T (u) = T (x, y) = (xy, 0) where u = (x, y), with 2, -3. Then, if u = ( 1.0) and v = (0.1). Find the value...

(a) Let T be any linear transformation from R2 to R2 and v be any vector...

(a) Let T be any linear transformation from R2 to R2 and v be any vector in R2 such that T(2v) = T(3v) = 0. Determine whether the following is true or false, and explain why: (i) v = 0, (ii) T(v) = 0. (b) Find the matrix associated to the geometric transformation on R2 that first reflects over the y-axis and then contracts in the y-direction by a factor of 1/3 and expands in the x direction by a...

for 10-12 you will solve the following system of equations: 2x+y+z=-2 2x-y+3z=6 3x-5y+4z=7 10) what is...

for 10-12 you will solve the following system of equations: 2x+y+z=-2 2x-y+3z=6 3x-5y+4z=7 10) what is the solution for x? a)2 b)-3 c)infinitely many solutions d)no solution 11) what is the solution for y? a)2 b)0 c)inifinitely many solution d)no solution 12) what is the solution for z? a)4 b)-8 c)infinitely many solutions d)no solutions

Given the LDE : 2y''' - 5y'' + y' - 6x y = 1 + x...

Given the LDE : 2y''' - 5y'' + y' - 6x y = 1 + x lnx (1) , identify the Homogeneous LDE associated with (1). Answer choices: A) Both equations are correct . B) None of these C) 2y''' - 5y'' + y' - 6x y = 0 D) 2y''' - 5y'' + y' - 6x y = 1 - x lnx

Find the minimum sum of 9x + 5y + 3z + 8 if x, y, and...

Find the minimum sum of 9x + 5y + 3z + 8 if x, y, and z are positive numbers such that xyz = 25.