Consider the m x n homogeneous sustem of linear equations Ax

Consider the m x n homogeneous sustem of linear equations

Ax = 0

(a) if x = [x₁, x₂ ... x_n]^T and y = [y₁, y₂ ... y_n]^T are solutions to Ax = 0,

show that z = x + y and w = cx are solutions, where c is an arbitrary scalar

(b) is the result to (a) true when x and y are solutions to the nonhomogeneous system Ax = b? Explain.

Note: the answer to (b) is no... I just don\'t know how to get that or the proof for (a)

z = x + y = [(x1+y1),(x2+y2),...,(xn+yn)]^T

Ax = 0 => a11x1 + a12x2 + a13x3 + .... + a1nxn = 0

Ay = 0 => a11y1 + a12y2 + a13y3 + .... + a1nyn = 0

Az = a11(x1+y1) + a12(x2+y2) + ... a1n(xn+yn) = (a11x1 + a12x2 + .. + a1nxn) + (a11y1 + a12y2 + ... + a1nyn) = 0

Hence z = (x+y) is the solution to Ax=0

w = cx

Aw = 0 => ca11x1 + ca12x2 + ca13x3 + .... + ca1nxn = c(a11x1 + a12x2 + a13x3 + .... + a1nxn) = c(0) = 0

Hence w=cx is the solution to Ax=0

z = x + y = [(x1+y1),(x2+y2),...,(xn+yn)]^T

Ax = b => a11x1 + a12x2 + a13x3 + .... + a1nxn = b

Ay = b => a11y1 + a12y2 + a13y3 + .... + a1nyn = b

Az = a11(x1+y1) + a12(x2+y2) + ... a1n(xn+yn) = (a11x1 + a12x2 + .. + a1nxn) + (a11y1 + a12y2 + ... + a1nyn) = b + b = 2b

Hence z = (x+y) is not the solution of Ax=b

w = cx

Aw => ca11x1 + ca12x2 + ca13x3 + .... + ca1nxn = c(a11x1 + a12x2 + a13x3 + .... + a1nxn) = c(b) = cb

Hence w=cx is not the solution to Ax=b