Question: Urgent help with attached question on last attempt for assignment due in 1 hour, please include answer and briefly show work Given a system y

Urgent help with attached question

on last attempt for assignment due in 1 hour, please include answer and briefly show work

Urgent help with attached questionon last attempt for assignment due in 1

Given a system y = Ax + e. The unknown vector x is 3 X 1, i.e., x ( RX]. A C RNVx3 has singular value decomposition A - UEVT with 100 0 0 E = 0 20 0 0 0 0 The entries of e are independent, identically distributed Gaussian with mean of zero and variance 12 ; ie., e; ~ N(0, vz ) for i - 1, ..., N. You can also assume that |x|is on the order of 1-10. Suppose 1/2 - 10, which of the following methods will likely result in the best estimate of x? O x = (AT A + 61) ATy where o = 10 O x = VEBUTy 1/100 0 where R = 2 and E, = 0 1/20 0 0 O x = (ATA) ATy O No answer text provided

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