Linear Algebra! Practice exam #1 question 1 Thanks for sloving! 1- Transformations (3 points each) a) Given a linear transformation T :N" N" T(x,y)-(x-y,x+y) and B= {< l, 0>.< 1,...
Find the standard matrix for the linear transformation T. T(x, y) = (3x + 2y, 3x – 2y) Submit Answer [-70.71 Points] DETAILS LARLINALG8 6.3.007. Use the standard matrix for the linear transformation T to find the image of the vector v. T(x, y, z) = (8x + y,7y - z), v = (0, 1, -1) T(v)
How was the linear transformation of b1 and b2 were applied
(L(b1) , L(b2))?
NOTE: b1=(1,1)^T , b2=(-1,1)^T
Linear Transformations EXAMPLE 4 Let L be a linear transformation mapping R? into itself and defined by where (bi, b2] is the ordered basis defined in Example 3. Find the matrix A represent- ing L with respect to [bi, b2l Solution Thus, A0 2 onofosmation D defined by D(n n' maps P into P, Given the ordered
Linear Transformations EXAMPLE 4 Let...
(1 point a. The linear transformation T : R2 → R2 is given by: Ti (x, y) = (2x + 9y, 4x + 19y). Find T1x, y). 「-i(x, y) =( x+ y, x+ b. The linear transformation T2 : R' → R' is given by: T2(x, y, z) (x + 2z,2r +y, 2y +z) Find (x, y, z). T2-1(x,y,z)=( x+ y+ z, x+ y+ z, x+ y+ z)
linear algebra
Find the standard matrix for the linear transformation T. T(x, y, z) = (6x – 8z, 8y - z) BE
Linear Algebra:
For each linear transformation, find a basis for Rng(T), find
dim[Rng(T], and state whether or not T is onto.
H.W in a basis for Rng (T), find dim [Rng(T)), and state for For each each linear transformation, find Whether or not. T is onto? OT:M, M, cletined by TCA) = A+AT © T: P2P, clefined by TC ax'sbarc) = (5a-464/00) A++ Carb-c)x+ (56-40). T: RR defined by Tlx,y,z) = (x - 2y + 2 , 32-23 +72 ,...
Question 19: Linear Transformations Let S = {(u, v): 0 <u<1,0 <v<1} be the unit square and let RCR be the parallelogram with vertices (0,0), (2, 2), (3,-1), (5,1). a. Find a linear transformation T:R2 + R2 such that T(S) = R and T(1,0) = (2, 2). What is T(0, 1)? T(0,1): 2= y= b. Use the change of variables theorem to fill in the appropriate information: 1(4,)dA= S. ° Sºf(T(u, v)|Jac(T)| dudv JA JO A= c. If f(x, y)...
Let T : P2 + R2be a linear transformation. If B = {1, x,x?} and D = {(1,1),(0, 1)} and the action is given by 1 MDB low-157 -2 1 2 0 Find T(1 – x+x²)
Find the standard matrix for the linear transformation T. T(x, y, z) = (x - 2z, 2y = z) 11
Consider the linear transformation from R² to Rº given by L(21,3) = (31 +232, 21 – 22). I (a) In the standard basis for R2 and R, what is the matrix A that corresponds to the linear transformation L? (5 points) (b) Let U = {(1,1), (-1,2)}. Find the transition matrix from U to the star dard basis for R. (5 points) (c) Let V = {(1,0), (-1,1)). Find the transition matrix from the standard basis for R2 to V....
Ler L: R4 → R3 be the linear transformation defined by (4p) L(z,y,z, t) = (x – y +t, 2x – 2, Y + 2z – t) a) Find the images of the standard basis of RA L(1,0,0,0) = L(0,1,0,0) = L(0,0,1,0) = L(0,0,0,1) = b) Find a basis and the dimension of the image of L c) Find a basis and the dimension of the kernel of L (8p) (8p)