[College - Linear Algebra] Homework help

**emerald000** · 04-20-2011, 02:41 PM

Re: [College - Linear Algebra] Homework help

I can't help you for the first one, here's how to do the second one:

First you'll need to define what is the "closest" function. I guess it will be the integral of the differences of the absolute values of the functions from 0 to π. It can still be applied to other definitions though. Once you have your function defining that difference, all you will need to do is an optimization problem to find the global minimum.

I hope it makes sense.

EDIT: Wow. Pi is awful in this font.

**iironiic** · 04-20-2011, 02:44 PM

Re: [College - Linear Algebra] Homework help

Originally posted by Jtehanonymous

1) Let A be a 7x5 matrix of rank 4. Let P and Q be the projection matrices which project vectors in R^7 onto R(A) and N(A^T). Find the inverse of P-Q.

2) What is the closest function, a cos(x) + b sin(x), to the function f(x) = sin(2x) on the interval from 0 to pi?

For the first question, I don't understand what is N. Is it a matrix?

EDIT: Actually, can you explain the entire first question? I don't really understand it xD

I'll look into the second one.

**emerald000** · 04-20-2011, 02:49 PM

Re: [College - Linear Algebra] Homework help

Good to know I am not the only one not understanding the first question.

**Jtehanonymous** · 04-20-2011, 03:52 PM

Re: [College - Linear Algebra] Homework help

I'll try to explain the symbols in number one more.

R(A) represents the Range of Matrix A and N(A^T) is the Null space of A transpose. These are orthogonal compliments and when you multiply vectors from these bases together you get 0.

**iironiic** · 04-20-2011, 04:20 PM

Re: [College - Linear Algebra] Homework help

Originally posted by Jtehanonymous

I'll try to explain the symbols in number one more.

R(A) represents the Range of Matrix A and N(A^T) is the Null space of A transpose. These are orthogonal compliments and when you multiply vectors from these bases together you get 0.

Can you take the null space / range of a matrix? I thought you can only do that with the transformation the matrix is associated with. Is that what you are implying?

**Jtehanonymous** · 04-20-2011, 04:43 PM

Re: [College - Linear Algebra] Homework help

Originally posted by iironiic

Can you take the null space / range of a matrix? I thought you can only do that with the transformation the matrix is associated with. Is that what you are implying?

R(A) is the columns that contain lead variables when you reduce A to simplest row echleon form.

N(A^T) is solving the equation (A^T)x = 0. That is, transposing A and then setting this system equal to the trivial solution.

These solution sets form the bases for R(A) and N(A^T).

**SocoNhydro420** · 04-26-2011, 05:28 PM

Re: [College - Linear Algebra] Homework help

Originally posted by iironiic

Can you take the null space / range of a matrix? I thought you can only do that with the transformation the matrix is associated with. Is that what you are implying?

Well, linear transformations have matrix representations. So yes the range and nullspace can be taken for matricies.

**stargroup100** · 06-15-2011, 09:22 PM

Re: [College - Linear Algebra] Homework help

I do realize how late I am to this discussion, but there is a very elegant solution to the second problem that I would like to point out.

Hint: angle sum and difference trigonometric identities

[College - Linear Algebra] Homework help

[College - Linear Algebra] Homework help

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