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10 Nov 2019
Let V = M_2(R) and let W be the subset of V consisting of all 2 times 2 matrices whose four entries add up to zero. Show that W is a subspace of V. Find a set of vectors that span W. Find the general solution: dy/ds = 4x+y/x-4y. Let V:= P_2 (R). Let W denote the set of polynomials in V whose coefficients sum to zero. Show that W is a subspace of V. Find a set of vectors that span W.
Let V = M_2(R) and let W be the subset of V consisting of all 2 times 2 matrices whose four entries add up to zero. Show that W is a subspace of V. Find a set of vectors that span W. Find the general solution: dy/ds = 4x+y/x-4y. Let V:= P_2 (R). Let W denote the set of polynomials in V whose coefficients sum to zero. Show that W is a subspace of V. Find a set of vectors that span W.
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Patrina SchowalterLv2
10 Nov 2019