[Solved] 18.06 Unit 2 Exercise 3- projection matrices and least squares

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Problem 16.1: (4.3 #17. Introduction to Linear Algebra: Strang) Write down three equations for the line b = C + Dt to go through b = 7 at t = 1, b = 7 at t = 1, and b = 21 at t = 2. Find the least squares solution x = (C, D) and draw the closest line.

Problem 16.2: (4.3 #18.) Find the projection p = Ax in the previous problem. This gives the three heights of the closest line. Show that the error vector is e = (2, 6, 4). Why is Pe = 0?

Problem 16.3: (4.3 #19.) Suppose the measurements at t = 1,1,2 are the errors 2, -6, 4 in the previous problem. Compute x and the closest line to these new measurements. Explain the answer: b = (2, 6, 4) is perpendicular to so the projection is p = 0.

Problem 16.4: (4.3 #20.) Suppose the measurements at t = 1,1,2 are b = (5, 13, 17). Compute x and the closest line and e. The error is e = 0 because this b is .

Problem 16.5: (4.3 #21.) Which of the four subspaces contains the error vector e? Which contains p? Which contains x? What is the nullspace of A?

Problem 16.6: (4.3 #22.) Find the best line C + Dt to fit b = 4, 2, 1,0,0 at times t = 2, 1, 0, 1, 2.

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[Solved] 18.06 Unit 2 Exercise 3- projection matrices and least squares
$25