In Questions 1-2, determine whether the definition gives an inner product. 1. (p(x), q(x)) = p(0) q(l) + p(l) q(0) for p(x), q(x) in P1 2. (A, B) = tr(ATB) for A, B in M22
In Questions 1-2, determine whether the definition gives an inner product.
1. (p(x), q(x)) = p(0) q(l) + p(l) q(0) for p(x), q(x) in P1
2. (A, B) = tr(ATB) for A, B in M22
1. (p(x), q(x)) = p(0) q(l) + p(l) q(0) for p(x), q(x) in P1
2. (A, B) = tr(ATB) for A, B in M22
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