Hello everyone, So we were given this lab to do in class, they are problems from our book but they need to be done through mat-lab or octave...wants to the see the code..I gave up on that instead I just want to work through the problems...Please help me, work through these problems! Just basically answer them..Thanks! #1: (a) Confirm that the set of vectors {v1,v2,v3,v4,v5} defined below is linearly dependent. Write down all the linear dependence relations you get by solving the equation. (CONFUSED) c1v1+c2v2+c3v3+c4v4+c5v5=0 v1={-4 -2 -1 4 7} v2={7 1 -2 -6 -8} v3={-3 3 0 2 4} v4={-6 -6 -1 -2 3} v5={1 3 4 -2 -6} M = {v1 v2 v3 v4 v5 + zero vector of 5 components} ________ Let L be a letter L matrix, which is a aquare matrix of )\'s and 1\'s in which the 1\'s form the shape of the letter \"L\". For any matrix A, experiment with product AL for A and L of various sizes, such as 4 by 4, 5 by 5 and 6 by 6 to help you answer the following questions. Your answers must be valid fo rletter L matrices of every possible size. (i) Describe the product Al. That is what does L do to a when it is multiplied on the right A? Explain. (ii) What is L^2? (ii)Find a general formula for L^p in terms of p and n, where L is n by n. *I am REALLY COFUSED ON THIS ONE! ______ Explain why, for every square matrix A, the rows of A will be linearly independent if and only if the columns are? (HINT:the transpose of A) - (WHAT?) Solution PM the answer, glad I could help! .