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Answer to Question #207395 in Quantum Mechanics for Prugs

Question #207395

Consider two eigenstates |𝑒1

⟩ and |𝑒2

⟩ of an observable satisfy the 

condition βŸ¨π‘’1

|𝑒2

⟩ = 4 and βŸ¨π‘’1

|𝑒1

⟩ = βŸ¨π‘’2

|𝑒2

⟩ = 1. Find a normalized 

linear combination of |𝑒1

⟩ and |𝑒2

⟩ ,i.e., (π‘Ž|𝑒1

⟩ +

𝑏|𝑒2

⟩, where a and b are real constant) which is orthogonal to (|𝑒1

⟩ βˆ’

|𝑒2

⟩).


1
Expert's answer
2021-06-15T12:51:46-0400
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