Question

In: Advanced Math

Consider the linear transformation T: R^4 to R^3 defined by T(x, y, z, w) = (x...

Consider the linear transformation T: R^4 to R^3 defined by T(x, y, z, w) = (x +2y +z, 2x +2y +3z +w, x +4y +2w)

a) Find the dimension and basis for Im T (the image of T)

b) Find the dimension and basis for Ker ( the Kernel of T)

c) Does the vector v= (2,3,5) belong to Im T? Justify the answer.

d) Does the vector v= (12,-3,-6,0) belong to Ker? Justify the answer.

Solutions

Expert Solution


Related Solutions

Consider the linear transformation T: R2x2 -> R2x2 defined by T(A) = AT - A. Determine...
Consider the linear transformation T: R2x2 -> R2x2 defined by T(A) = AT - A. Determine the eigenvalues of this linear transformation and their algebraic and geometric multiplicities.
For problems 1-4 the linear transformation T/; R^n - R^m  is defined by T(v)=AV with A=[-1 -2...
For problems 1-4 the linear transformation T/; R^n - R^m  is defined by T(v)=AV with A=[-1 -2 -1 -1 2 1 0 -4 4 6 1 15] 1.   Find the dimensions of R^n and R^m (3 pts) 2.   Find T(<-2, 1, 4, -1>) (5 pts) 3.   Find the preimage of <-6, 12, 4> (8 pts) 4.   Find the Ker(T) (8 pts)
Consider the linear transformation T : P1 → R^3 given by T(ax + b) = [a+b...
Consider the linear transformation T : P1 → R^3 given by T(ax + b) = [a+b a−b 2a] a) find the null space of T and a basis for it (b) Is T one-to-one? Explain (c) Determine if w = [−1 4 −6] is in the range of T (d) Find a basis for the range of T and its dimension (e) Is T onto? Explain
Consider the linear transformation T which transforms vectors x C) in the y-axis. a) Express the...
Consider the linear transformation T which transforms vectors x C) in the y-axis. a) Express the vector X = T(x), the result of the linear transformation T on x in terms of the components x and y of X. by reflection [10 Marks] b) Find a matrix T such that T(x) = TX, using matrix multiplication. Calculate the matrix product T2 represent? Explain geometrically (or logically) why it should be this. c) T T . What linear transformation does this...
1a) Find all first and second partial derivatives of f(x,y)=x^4−3x^2y^2+y^4 1b) w=xycosz, x=t, y=t^2, and z=t^3....
1a) Find all first and second partial derivatives of f(x,y)=x^4−3x^2y^2+y^4 1b) w=xycosz, x=t, y=t^2, and z=t^3. Find dw/dt using the appropriate Chain Rule. 1c) Find equation of the tangent plane and find a set of parametric equations for the normal line to the surface z = ye^(2xy) at the point (0, 2, 2).
(8) Suppose T : R 4 → R 4 with T(x) = Ax is a linear...
(8) Suppose T : R 4 → R 4 with T(x) = Ax is a linear transformation such that • (0, 0, 1, 0) and (0, 0, 0, 1) lie in the kernel of T, and • all vectors of the form (x1, x2, 0, 0) are reflected about the line 2x1 − x2 = 0. (a) Compute all the eigenvalues of A and a basis of each eigenspace. (b) Is A invertible? Explain. (c) Is A diagonalizable? If yes,...
Consider the functionT:R3→R3defined byT(x,y,z) = (3x,x−y,2x+y+z).(i) Prove thatTis a linear transformation. (T’nin bir lineer d ̈on...
Consider the functionT:R3→R3defined byT(x,y,z) = (3x,x−y,2x+y+z).(i) Prove thatTis a linear transformation. (T’nin bir lineer d ̈on ̈u ̧s ̈um oldu ̆gunu g ̈osteriniz)(ii) Find the representing matrix ofTrelative to the basisβ={α1= (1,0,0),α2= (1,1,0),α3=(1,1,1)}ofR3.(R3 ̈unβ={α1= (1,0,0),α2= (1,1,0),α3= (1,1,1)}tabanına g ̈oreTnin matris g ̈osterimini bulunuz.)
. Let T : R n → R m be a linear transformation and A the...
. Let T : R n → R m be a linear transformation and A the standard matrix of T. (a) Let BN = {~v1, . . . , ~vr} be a basis for ker(T) (i.e. Null(A)). We extend BN to a basis for R n and denote it by B = {~v1, . . . , ~vr, ~ur+1, . . . , ~un}. Show the set BR = {T( r~u +1), . . . , T( ~un)} is a...
Let T: V →W be a linear transformation from V to W. a) show that if...
Let T: V →W be a linear transformation from V to W. a) show that if T is injective and S is a linearly independent set of vectors in V, then T(S) is linearly independent. b) Show that if T is surjective and S spans V,then T(S) spans W. Please do clear handwriting!
1. Let U = {r, s, t, u, v, w, x, y, z}, D = {s,...
1. Let U = {r, s, t, u, v, w, x, y, z}, D = {s, t, u, v, w}, E = {v, w, x}, and F = {t, u}. Use roster notation to list the elements of D ∩ E. a. {v, w} b. {r, s, t, u, v, w, x, y, z} c. {s, t, u} d. {s, t, u, v, w, x, y, z} 2. Let U = {r, s, t, u, v, w, x, y, z},...
ADVERTISEMENT
ADVERTISEMENT
ADVERTISEMENT