[5marks] letT:C3→C3bealinearmapsuchthat T(v1) = 2v1, T(v2) = v1 + 2v2, T(v3) = v2 + 2v3. A) Find the matrix 􏰓T􏰔 , i.e., the matrix of the linear map T with respect to B,B the basis B in the domain and the basis B in the co-domain. B) Find 􏰋T􏰀e2􏰁􏰌 . B C) Find T􏰀e2􏰁.

Let T : R3 → R3 be a linear transformation such that T (1, 0, 0) = (1, 0, 0), T (1, 1, 0) =(1, 1, 1) and T (1, 1, 1) = (1, 1, 0). Find (a) T (x, y, z), (b) ker(T ), (c) R(T ). Alsoshow that T 3 = T.

Find the linear transformation T : ℝ2 → ℝ2 that has the values given below on the given basis.T 2 1 = 4 6,    T 1 1 = 3 7(a) First write a general vector v as a linear combination of the basis vectors.v =v1 v2 =  v1​−v2​ 2 1 +  2v2​−v1​ 1 1(b) This implies the following.T(v) = T v1 v2= 2v1​ v1​+6v2​ = v

Find the linear transformation T : ℝ3 → ℝ2 that has the values given below on the given basis.T 1 00 = 3 8,    T 1 10 = 2 6,    T 1 11 = 7 5(a) First write a general vector v as a linear combination of the basis vectors.

Find the matrix representation of the linear transformation T : R3 → R2 givenby the mapxyz 7 →( x + yx + z), where B =111 ,110 ,100and D ={( 10),( 02)}are bases for R3 and R2 respectively

Find a linear transformation 7: R2 R2 such that 7(1,-2) = (1, 1) and T(0, 1) = (2,3), where B = {(1,-2), (0, 1)) is a basis of IR2.