3) Determine the kernel and the range of the linear operator on R': L(*)=(x, + x,x2,0)
on 3) Determine the kernel and the range of the linear operator L(*) = (x + x3,x2,0) R:
(1 point) Let L be the linear operator in R? defined by L(x) = (4x1 – 2x2, -6x1 + 3x2) Find bases of the kernel and image of L. 00 Kernel: * Image: [-2,3] To enter a basis into WebWork, place the entries of each vector inside of brackets, and enter a list of these vectors, separated by commas. For instance, if your basis is 1 2,1l/, then you would enter [1,2,3], 31 [1,1,1) into the answer blank.
3. Find the Kernel and the Range for the projection operator onto the plane z = 0 in the basis 7,J,K 3. Find the Kernel and the Range for the projection operator onto the plane z = 0 in the basis 7,J,K
R3 defined by 2. Let L be the linear operator on X21 X3X2 [x3- X1 L(x) and let S Span((1, 0, 1)) (a) Find the kernel of L (b) Determine L(S) (c) Determine L(R3). jes (d) Is L an onto mapping?
a. Let be an differential operator. Show that L is a linear operator. b. Let be an differential operator. Show that the kernel of L is a vector space c. Let . Show that the set of functions which satisfy L(u) = g(x,t) form an affine linear subspace. L=(a252 -2) L=(a252 -2) L=(a252 -2) L=(a252 -2) L=(a252 -2) L=(a252 -2)
5. Characterize the vectors (X.X.2) in the range T (R) and those in the kernel ker(T) in terms of concrete relations among the coordinates xyz for the linear transformation T: (847) ER3 7—(x - y + 22, 2x + y -x - 2y + 2x) ER3. What are the dimensions of the range and the kernel of T?
for a linear operator T ∈ L(V), V is finite-dimensional. let C={r(T)(v): r(x) ∈ F[x], v non zero} show that C is an invariant of T for the subspace of V.
Let L : R2 → R3 be a linear transformation such that L 1 1 = 1 2 3 and L 1 2 = 2 1 3 . Find L 2 1 Find the standard matrix representing L. Find the dimensions of the kernel and the range of L and their bases. 12. Let L : R² + RP be a linear transformation such that L | (3) - -(5)-(1) Find I (*) Find the standard matrix representing L. Find...
Find the relation between ab.c, and d such that the kernel of the operator A:R? R?given by Alx.yax+by. cx+dy, is the the line ya Bu, leker(A) = {(x,y): y = 3x}. The relation can be given by b C d
7. (1 pt) Find a basis {p(x),q(x)} for the kernel of the linear transformation L:E P3 x + R defined by L(f(x)) = f'(5) - f(1) where P3 x) is the vector space of polynomials in x with degree less than 3. p(x) = — , 9(x) = Answer(s) submitted: . x