2. In the space of internal multiplication P4 with the definition of internal multiplication (x(t), y(t)) = E-0 a;ß; where a; and ß; are polynomial coefficients. Obtain the orthogonal complement for subspace U that defined U = {x(t) e P4 x(0) = x(1) = 0}.

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advanced engineering mathematics - Kreyszig 2. In the space of internal multiplication P4 with the definition of internal multiplication (x(t), y(t)) = E-o a;ß; where a; and ßị are polynomial coefficients. Obtain the orthogonal complement for subspace U that defined U = {x(t) e PĄ |x(0) = x (;) = %3D x(1) = 0}.