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13 Dec 2022
Q15. Let V f.g in V. (a) Verify that u1() P2 be the space of all polynomials of degree at most 2, and let ,-) be the inner product defined by (f,g) ()g(z)dz for all polynomials eglx)dx for all polynomials andu2() are orthogonal to each other (with respect to (,) (b) Let f(x)-ax2 + bx + c. Find a, b, c such that (f, th) = 0 and (f, t4) = 0. (c) Let W span(1, z). Find W
Q15. Let V f.g in V. (a) Verify that u1() P2 be the space of all polynomials of degree at most 2, and let ,-) be the inner product defined by (f,g) ()g(z)dz for all polynomials eglx)dx for all polynomials andu2() are orthogonal to each other (with respect to (,) (b) Let f(x)-ax2 + bx + c. Find a, b, c such that (f, th) = 0 and (f, t4) = 0. (c) Let W span(1, z). Find W
heymannLv2
13 Dec 2022
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