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Math · Advanced Math
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1) a) Let A be an nxn matrix. Show that A can be written as the sum of a symmetric and a skew symmetric matrices. b) Suppose t1pW2M5,u, ,u.) be a basis for Rs. If c2e2.c3,QCs are scalars with C3 #0 show that tli, u21 ci utc2u2-c3u3tqu, tc5115, 114, u5}is also a basis for R5. u,uusJ be a basis for R. If c2 c,c3.c,c are scalars with c, *0
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