please answer Asap.within 15 mins....
please answer Asap.within 15 mins.... 1. Find the nullity of the linear map T:R? --R3 x...
Please put the solution in the
form of a formal proof, Thank You.
Let T: R3-R2 be the linear map given by a 2c (a) Find a basis of the range space. (Be sure to justify that it spans and is linearly independent.) (b) Find a basis of the null space. (Be sure to justify that it spans and is linearly independent.) (c) Use parts (a) and (b) to verify the rank-nullity theorem.
Let T: R3-R2 be the linear map...
Finding the Nullity and Describing the Kernel and Range In Exercises 33–40, let T: R3→R3 be a linear transformation. Find the nullity of T and give a geometric description of the kernel and range of T. T is the reflection through the yz-coordinate plane: T(x, y, z) = (−x, y, z)
Let T be a linear map from R3[z] to R2[z] defined as (T p)(z) =
p'(z). Find the matrix of T in the basis:
4 points] Let T be a linear map from Rals] to R12] defined as (TP)(z) = p,(z). Find the matrix of T in the basis: in R2[-]; ~ _ s, r2(z) (z-s)2 in R2 [2], where t and 8 are real numbers. T1(2 Find coordinates of Tp in the basis lo, 1, 12 (if p is...
Consider the linear map T: M2,2 → R3 defined by [26] = (a-d, b+c, a+b) Find either the nullity or the rank of T and then use the Rank Plus Nullity Theorem to find the other: nullity(T) = rank(T) -
Let T. R3 R3 be a linear transformation. Use the given information to find the nullity of T. rank(7) - 1 nullity(T) - Give a geometric description of the kernel and range of T. The kernel of T is a plane, and the range of T is a line. o The kernel of T is all of R3, and the range of T is all of R. The kernel of T is the single point {(0, 0, 0)), and the...
Let A= and 6 = Define the linear transformation T:R? +R by T'(X) = Ai. Find a vector # whose image under T' is 6. Is the vector i unique choose choose unique Submit answer not unique
Let T: R3 → R3 be the linear transformation that projects u onto v = (9, -1, 1). (a) Find the rank and nullity of T. rank nullity (b) Find a basis for the kernel of T.
Please give a detailed
explanation. I really need help understanding this. Thank you.
(eigenvalues, eigenvectors) Let TA :R3-R3 be a linear transformation where 「1-4 TA(X)41-X. (1) Please find an ordered basis B of R3 such that the matrix M of Y' - TA(X') is a diagonal matrix. (2) Find the matrix M.
(eigenvalues, eigenvectors) Let TA :R3-R3 be a linear transformation where 「1-4 TA(X)41-X. (1) Please find an ordered basis B of R3 such that the matrix M of Y'...
Q1: If (u,v) = (((,,a,,a,), (1;,6,63)) = a,b – a,b, + a,b; show that (u, v) is inner product or not. Q2: Find a basis and dimension for the Kernel and Image of linear transformation T:R — > R3 given by the formula T(x,y,z) = (x + y, x – y + x,y + 22), and show that dim(ker T) + dim(Im T) = n Q3: Find the matrix P that diagonalize A and then compute P-AP and A20. 1...
Hint: Apply the rank-nullity theorem to the linear map Pn → Rn+1
that sends p ?→
(p(x0), . . . , p(xn)). Then use the fact that if polynomial of
degree ≤ n has n + 1 distinct roots, then it is the zero
polynomial.
(3 points) Application: polynomial interpolation. Let (20; yo), ..., (In; Yn) be n +1 points R2 with distinct x-coordinates. Show that there exists a unique polynomial p(t) of degree <n such that p(xi) = yi...