Find another orthogonal (uncorrelated) basis instead of the fourier basis (sinusoids). Also prove its orthogonality

(3 pts) Let A be a square n × n matrix whose rows are orthogonal. Prove...

(3 pts) Let A be a square n × n matrix whose rows are orthogonal. Prove that the columns of A are also orthogonal. Hint: The orthogonality of rows is equivalent to AAT = I ⇒ ATAAT = AT

Find a basis for the orthogonal complement of the subset U = span{ (1,1,1,0,1), (1,?1,0,1,0), (?1,0,1,0,1)...

Find a basis for the orthogonal complement of the subset U = span{ (1,1,1,0,1), (1,?1,0,1,0), (?1,0,1,0,1) } in R5. please answer clearly

Please only answer if you know the answer. Write clean. Find an orthogonal basis for the...

Please only answer if you know the answer. Write clean. Find an orthogonal basis for the vector space spanned by vectors a_1 = (1,2,2), a_2 = (-1,0,2) and a_3 = (0,0,1)

If R3 has the Euclidean inner product, how can I find the orthogonal basis for the...

If R3 has the Euclidean inner product, how can I find the orthogonal basis for the subspace spanned by (2,1,2) , (-1,0,2) , (-1,1,2)? Do I need to use Gram-Schmidt?

a) Apply the Gram–Schmidt process to find an orthogonal basis for S. S=span{[110−1],[1301],[4220]} b) Find projSu....

a) Apply the Gram–Schmidt process to find an orthogonal basis for S. S=span{[110−1],[1301],[4220]} b) Find projSu. S = subspace in Exercise 14; u=[1010] c) Find an orthonormal basis for S. S= subspace in Exercise 14.

Prove that if an integer is odd, then its square is also odd. Use the result...

Prove that if an integer is odd, then its square is also odd. Use the result to establish that if the square of an integer is known to be even, the integer must be even

Prove that if the relation R is symmetric, then its transitive closure, t(R)=R*, is also symmetric....

Prove that if the relation R is symmetric, then its transitive closure, t(R)=R*, is also symmetric. Please provide step by step solutions

Find a basis for each of the following vector spaces and find its dimension (justify): (a)...

Find a basis for each of the following vector spaces and find its dimension (justify): (a) Q[ √3 2] over Q (b) Q[i, √ 5] (that is, Q[i][√ 5]) over Q;

Find the total value TV of the given income stream and also find its future value...

Find the total value TV of the given income stream and also find its future value FV (at the end of the given interval) using the given interest rate. HINT [See Examples 4, 5.] (Round your answers to the nearest cent.) R(t) = 30,000, 0 ≤ t ≤ 20, at 4% TV = $ FV = $

I need some assistance finding a second preimage attack on a modified CBC Mac. Its a...

I need some assistance finding a second preimage attack on a modified CBC Mac. Its a modified CBC mac where the last 20 bytes is taken instead of the usual 16. The message is also padded with PCKS7 before encryption, with this padding done in 64 byte blocks. I am given the key and IV, so Just need to find another message which gives the same MAC.