Give an example of a matrix, A, whose column space is in R3 and whose null...

If E is an elimination matrix, then the column space of EA always equals the column...

If E is an elimination matrix, then the column space of EA always equals the column space of A. Is this statement True or False?

true/false : if a system of linear equations has a 3x5 augmented matrix whose fifth column...

true/false : if a system of linear equations has a 3x5 augmented matrix whose fifth column has a leading term, then the system is consistent. I know the answer is false, but why? This is all the information provided in the question.

Suppose A is an mxn matrix of real numbers, suppose x is in the null space...

Suppose A is an mxn matrix of real numbers, suppose x is in the null space of A and suppose y is in the column space of AT. prove that x is orthogonal to y

Give an example of a matrix equation representing a linear combination of three vectors in R1,...

Give an example of a matrix equation representing a linear combination of three vectors in R1, and two vectors in R3.

please choose your favorite, unique plane in R3 that passes though the origin (0,0,0). (An example...

please choose your favorite, unique plane in R3 that passes though the origin (0,0,0). (An example plane is: x + 5y – z = 0. You can use your Module Four Discussion Forum plane through the origin if desired.) What is the equation for your plane? (4 points) What is a basis for the subspace of R3 formed by your plane? Hint: (y and z are free variables.) (8 points) Identify three non-zero vectors on the plane. Do not choose...

Find a basis for the null space of a matrix A. 2 2 0 2 1...

Find a basis for the null space of a matrix A. 2 2 0 2 1 -1 2 3 0 Give the rank and nullity of A.

Give an example of the described object or explain why such an example does not exist....

Give an example of the described object or explain why such an example does not exist. •An orthogonal linear transformation T: R2→R2. •An orthogonal linear transformation T: R3→R3. •A basis B for R2 and an orthogonal linear transformation T: R2→R2 such that [T]B is an orthogonal matrix. •A basis B for R2 and an orthogonal linear transformation T: R2→R2 such that [T]B is NOT an orthogonal matrix. •A non-orthogonal linear transformation that takes an orthogonal basis to an orthogonal basis.

Find a basic for the null space(or kernel), NS(A), the row space, RS(A), and the column...

Find a basic for the null space(or kernel), NS(A), the row space, RS(A), and the column space (or image), CS(A). All of these can be read off of rref(A). x1+2x2+2x3 − 2x4+2x5 = 5 −2x1 − 4x3+ x4 − 10x5 = −11 x1+2x2 − x3+3x5 = 4

9. Either give an example of each of the following or explain why it would be...

9. Either give an example of each of the following or explain why it would be impossible. (a) [2 points] Two orthogonal vectors in R 3 that are linearly dependent. (b) [2 points] Three orthonormal vectors in R 3 that are linearly dependent. (c) [2 points] A 3 × 2 matrix Q whose column vectors are orthonormal and QQT 6= I. (d) [2 points] A 3 × 3 matrix Q whose column vectors are orthonormal and QQT 6= I. (e)...

Can you give an example of three perpendicular planes in R3 that are not the xy,...

Can you give an example of three perpendicular planes in R3 that are not the xy, yz,and xz planes.