I need some help with this quantum mechanics problem. Orthogonality and inner products. Consider the following 3 state vectors:1214/₁): |+) +√5√2|+) +:-)ના114/₂):14/3)= |+) +√2Use bra-ket notation in your calculations (not matrix notation, please)Use orthogonality and normalization of our basis: (+|+) = (−|−) = 1, (+1−) = (−1+) = 0.i|-)√31√žeein/4|-)a) [3] For each of the 3 states above, find some vector that is orthogonal to it.(Use our convention that we keep the coefficient of the | +) basis ket positive and real.)b) [1] Calculate the inner products (2|43) and (312).How are these two results related to one another?

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Orthogonality and inner products. Consider the following 3 state vectors: 2 1 14/₁) √5 1 14/2) :i|-) √3 1 14/3) |+) + √2 ein/4|-) Use bra-ket notation in your calculations (not matrix notation, please) Use orthogonality and normalization of our basis: (+|+) = (−|−) = 1, (+|−) = (−|+) = 0. చ|| నహ |+) + |+) + 1-) a) [3] For each of the 3 states above, find some vector that is orthogonal to it. (Use our convention that we keep the coefficient of the | +) basis ket positive and real.) b) [1] Calculate the inner products (23) and (342). How are these two results related to one another?

Orthogonality and inner products. Consider the following 3 state vectors: 2 1 14/₁) √5 1 14/2) :i|-) √3 1 14/3) |+) + √2 ein/4|-) Use bra-ket notation in your calculations (not matrix notation, please) Use orthogonality and normalization of our basis: (+|+) = (−|−) = 1, (+|−) = (−|+) = 0. చ|| నహ |+) + |+) + 1-) a) [3] For each of the 3 states above, find some vector that is orthogonal to it. (Use our convention that we keep the coefficient of the | +) basis ket positive and real.) b) [1] Calculate the inner products (23) and (342). How are these two results related to one another?