Let u= -3 2 4 ; and let L denote the line thru the origin of R3 in the direction of u. The proj...
Let u= -3 2 4 ; and let L denote the line thru the origin of R3 in the
direction of u. The projection of R3 onto L — denoted PL : R3 −→ R3 — is definded to be equal to the projection pu onto the vector u.
You may assume that PL is a linear transformation. Find the standard matrix [PL] for PL.
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Let u= -3 2 4 ; and let L denote the line thru the origin of R3 in the direction of u. The proj...
Problem 13. Let l be the line in R' spanned by the vector u = 3...
Problem 13. Let l be the line in R' spanned by the vector u = 3 and let P:R -R be the projection onto line l. We have seen that projection onto a line is a linear transformation (also see page 218 example 3.59). a). Find the standard matrix representation of P by finding the images of the standard basis vectors e, e, and e, under the transformation P. b). Find the standard matrix representation of P by the second...
Let l denote the line through the origin with direction vector (1,1,1). Let r(t) = (t...
Let l denote the line through the origin with direction vector (1,1,1). Let r(t) = (t +1,4, 2t) be a parametrized curve. Compute the point r(to) on the curve which is closest to l, and state the distance from r(to) to l.
Let L be a straight line through the origin and denote by Show that: the angle...
Let L be a straight line through the origin and denote by Show that: the angle from positive r-axis to L. (a) The matrix representing projection to the line L is given by P = ſcos cos O sin sin cos 6] sin0 (b) The matrix representing reflection about the line L is cos 20 sin 20 sin 201 - cos 20
Let L in R 3 be the line through the origin spanned by the vector v...
Let L in R 3 be the line through the origin spanned by the
vector v = 1 1 3 . Find the linear equations that define L,
i.e., find a system of linear equations whose solutions are the
points in L. (7) Give an example of a linear transformation from T
: R 2 → R 3 with the following two properties: (a) T is not
one-to-one, and (b) range(T) = ...
Let L in R 3 be the line through the origin spanned by the vector v...
Let L in R 3 be the line through the origin
spanned by the vector v = 1 1 3 . Find the linear equations
that define L, i.e., find a system of linear equations whose
solutions are the points in L.
lil (6) Let L in R3 be the line through the origin spanned by the vector v= 1. Find the linear equations that define L, i.e., find a system of linear equations whose solutions are...
(4) Let L be a line in R3 and let T = proL be the projection onto L. what are the eigenvectors of T? Is T diagonalizabl...
(4) Let L be a line in R3 and let T = proL be the projection onto L. what are the eigenvectors of T? Is T diagonalizable?
(4) Let L be a line in R3 and let T = proL be the projection onto L. what are the eigenvectors of T? Is T diagonalizable?
Problem l: Let u, v and w be three vectors in R3 (a) Prove that wlv +lvlw bisects the angle betwe...
Problem l: Let u, v and w be three vectors in R3 (a) Prove that wlv +lvlw bisects the angle between v and w. (b) Consider the projection proj, w of w onto v, and then project this projection on u to get proju (proj, w). Is this necessarily equal to the projection proj, w of w on u? Prove or give a counterexample. (c) Find the volume of the parallelepiped with edges formed by u-(2,5,c), v (1,1,1) and w...
4. Let S be a plane in R3 passing through the origin, so that S is...
4. Let S be a plane in R3 passing through the origin, so that S is a two- dimensional subspace of R3. Say that a linear transformation T: R3 R3 is a reflection about Sif T(U) = v for any vector v in S and T(n) = -n whenever n is perpendicular to S. Let T be the linear transformation given by T(x) = Ar, 1 1 А -2 2 2 21 -2 2 3 T is a reflection about...
Let L : R2 → R3 be a linear transformation such that L 1 1 =...
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...
Problem 3 Let L:R4 + R3 be given by L - (C)- [. (3x1 – 422...
Problem 3 Let L:R4 + R3 be given by L - (C)- [. (3x1 – 422 + 11x4) (1522 + 9x3 – 2124) a) [4 pts] Show that L is a linear transformation, and find the matrix representation A of L with respect to the standard bases for R4 and R3. b) [3 pts] Use part a) to find a basis for ker(L). c) [3 pts] Use part a) for find a basis for im(L).
Problem 13. Let l be the line in R' spanned by the vector u = 3 and let P:R -R be the projection onto line l. We have seen that projection onto a line is a linear transformation (also see page 218 example 3.59). a). Find the standard matrix representation of P by finding the images of the standard basis vectors e, e, and e, under the transformation P. b). Find the standard matrix representation of P by the second...
Let l denote the line through the origin with direction vector (1,1,1). Let r(t) = (t +1,4, 2t) be a parametrized curve. Compute the point r(to) on the curve which is closest to l, and state the distance from r(to) to l.
Let L be a straight line through the origin and denote by Show that: the angle from positive r-axis to L. (a) The matrix representing projection to the line L is given by P = ſcos cos O sin sin cos 6] sin0 (b) The matrix representing reflection about the line L is cos 20 sin 20 sin 201 - cos 20
Let L in R 3 be the line through the origin spanned by the
vector v = 1 1 3 . Find the linear equations that define L,
i.e., find a system of linear equations whose solutions are the
points in L. (7) Give an example of a linear transformation from T
: R 2 → R 3 with the following two properties: (a) T is not
one-to-one, and (b) range(T) = ...
Let L in R 3 be the line through the origin
spanned by the vector v = 1 1 3 . Find the linear equations
that define L, i.e., find a system of linear equations whose
solutions are the points in L.
lil (6) Let L in R3 be the line through the origin spanned by the vector v= 1. Find the linear equations that define L, i.e., find a system of linear equations whose solutions are...
(4) Let L be a line in R3 and let T = proL be the projection onto L. what are the eigenvectors of T? Is T diagonalizable?
(4) Let L be a line in R3 and let T = proL be the projection onto L. what are the eigenvectors of T? Is T diagonalizable?
Problem l: Let u, v and w be three vectors in R3 (a) Prove that wlv +lvlw bisects the angle between v and w. (b) Consider the projection proj, w of w onto v, and then project this projection on u to get proju (proj, w). Is this necessarily equal to the projection proj, w of w on u? Prove or give a counterexample. (c) Find the volume of the parallelepiped with edges formed by u-(2,5,c), v (1,1,1) and w...
4. Let S be a plane in R3 passing through the origin, so that S is a two- dimensional subspace of R3. Say that a linear transformation T: R3 R3 is a reflection about Sif T(U) = v for any vector v in S and T(n) = -n whenever n is perpendicular to S. Let T be the linear transformation given by T(x) = Ar, 1 1 А -2 2 2 21 -2 2 3 T is a reflection about...
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...
Problem 3 Let L:R4 + R3 be given by L - (C)- [. (3x1 – 422 + 11x4) (1522 + 9x3 – 2124) a) [4 pts] Show that L is a linear transformation, and find the matrix representation A of L with respect to the standard bases for R4 and R3. b) [3 pts] Use part a) to find a basis for ker(L). c) [3 pts] Use part a) for find a basis for im(L).
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