Suppose T: M2,2 P2 is a linear transformation whose action is defined by s and that...
Suppose T: M2,2-P2 is a linear transformation whose action on the standard basis for M2,2 is as follows: 1 0 0 1 0 0 0 0 T | = x2+x+2 = -x2+2x-3 x2–2x+4 T -2x2+x-4 0 0 o 0 1 Describe the action of T on a general matrix, using x as the variable for the polynomial and a, b, c, and d as constants. Use the '"' character to indicate an exponent, e.g. ax^2=bx+c. a b T = 0...
Suppose T: M22-R3 is a linear transformation whose action on a basis for M2.2 is as follows: 6 1 -3 -3 0 1 1 1 T T T T -3 -3 0 1 1 2 1 Give a basis for the kernel of T and the image of T by choosing which of the original vector spaces each is a subset of, and then giving a set of appropriate vectors. Basis of Kernel is a Subset of M2,2 Number of...
Question 1 [10 points] Suppose T: M2.2-R3 is a linear transformation whose action on a basis for M2,2 is as follows: Give a basis for the kernel of T and the image of T by choosing which of the original vector spaces each is a subset of, and then giving a set of appropriate vectors. Basis of Kernel is a Subset of M22 Number of Matrices: 1 Bier = {0} Basis of Image is a Subset of M2.2 Number of...
Question 8 [10 points] Suppose T: RM22 is a linear transformation whose action on a basis for R4 is as follows -1 1 -11 4 4 0 1 1 0 1 -1 1 -45 1 2-2 1 -1 7 0 Determine whether T is one-to-one andlor onto. If it is not one-to-one, show this by providing two vectors that have the same image under T. If T is yt onto, show this by providing a matrix in M22 that is...
7. Consider the linear transformation T : (R) → M2x2 (R) defined by ao 2a2 ao- 3a1 4a0 - 12a1 2ao Find the matrix for T, Ts, where 0 00 00 1 are bases for P2R) and M2x2(R) respectively. Find bases for ker(T) and range(T). Is T one-to-one, onto, neither, or both?
Is T: M2,2 → ℝ defined by T(A) =|A| a linear transformation? Provide a proof or counterexample.
Suppose T: R3–M2.2 is a linear transformation whose action on a basis for R3 is as follows: 0 -7 -7 -10 -10 T]01- T TI? 2 2 -7 -6 -10 -9 0 1 Give a basis for the kernel of T and the image of T by choosing which of the original vector spaces each is a subset of, and then giving a set of appropriate vectors. Basis of Kernel is a Subset of R3 Number of Vectors: 1 Bker...
Suppose T: P3-R is a linear transformation whose action on a basis for Pa is as follows 45 0 -3 0 0 T(-2x-2) T(-2x3-2x2-2x-2) T(x3+2x2+2x+2) = 12 T(1) 1 4 -13 |-2 -3 2 Determine whether T is one-to-one and/or onto. If it is not one-to-one, show this by providing two polynomials that have the same image under T If T is not onto, show this by providing a vector in R that is not in the image of T...
QUESTION 4 Let T R3-P2 be defined by T(a, b, c) - (a + b + e) +(a+b)a2 (4.1) Show that T is a linear transformation (4.2) Fınd the matrix representation [T]s, B, of T relative to the basıs in R3 and the basis in P2, ordered from left to right Determine the range R(T of T Is T onto? In other words, is it true that R(T)P2 Let x, y E R3 Show that x-y ker(T) f and only...
Let T: P1 → P2 be a linear transformation defined by T(a + bx) = 3a – 2bx + (a + b)x². (a) Find range(T) and give a basis for range(T). (b) Find ker(T) and give a basis for ker(T). (c) By justifying your answer determine whether T is onto. (d) By justifying your answer determine whether T is one-to-one. (e) Find [T(7 + x)]], where B = {-1, -2x, 4x2}.