Question: => Define an inner product on C[-1, 1] by (f,g) = ff(x)g(x) dx Show that if f is odd and g is even function

=> Define an inner product on C[-1, 1] by (f,g) = ff(x)g(x)

=> Define an inner product on C[-1, 1] by (f,g) = ff(x)g(x) dx Show that if f is odd and g is even function then and g are ortho- If S = {1, x, x2}. Construct an orthogonal basis for P2.

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