![SOLVED:Question Consider the expectation value of quantum operator Quantum operators describe physical observables. In Quantum Mechanics, quantum operator is Hermitian. The Hamiltionian operator is given by H p? /2m + V( where SOLVED:Question Consider the expectation value of quantum operator Quantum operators describe physical observables. In Quantum Mechanics, quantum operator is Hermitian. The Hamiltionian operator is given by H p? /2m + V( where](https://cdn.numerade.com/ask_images/41fd2c4f7ead41a6aa6a1871acf5f94b.jpg)
SOLVED:Question Consider the expectation value of quantum operator Quantum operators describe physical observables. In Quantum Mechanics, quantum operator is Hermitian. The Hamiltionian operator is given by H p? /2m + V( where
![Berger | Dillon 〉 on Twitter: "In Quantum Mechanics, Ω is called an 𝐨𝐛𝐬𝐞𝐫𝐯𝐚𝐛𝐥𝐞 only if it can be represented by a Hermitian operator acting on the Hilbert space. https://t.co/SLvTZ3SPUT" / Berger | Dillon 〉 on Twitter: "In Quantum Mechanics, Ω is called an 𝐨𝐛𝐬𝐞𝐫𝐯𝐚𝐛𝐥𝐞 only if it can be represented by a Hermitian operator acting on the Hilbert space. https://t.co/SLvTZ3SPUT" /](https://pbs.twimg.com/media/D6dzA3iUcAId7i6.jpg:large)
Berger | Dillon 〉 on Twitter: "In Quantum Mechanics, Ω is called an 𝐨𝐛𝐬𝐞𝐫𝐯𝐚𝐛𝐥𝐞 only if it can be represented by a Hermitian operator acting on the Hilbert space. https://t.co/SLvTZ3SPUT" /
![SOLVED:The general definition of a Hermitian operator, Mt M ,implies that (flmtlg) = (Mflg) = (flmlg) = (fIMg) If If) and Ig) are continuous functions, then the integral representation of the Hermiticity SOLVED:The general definition of a Hermitian operator, Mt M ,implies that (flmtlg) = (Mflg) = (flmlg) = (fIMg) If If) and Ig) are continuous functions, then the integral representation of the Hermiticity](https://cdn.numerade.com/ask_images/d37184bad50c4fe3bdb3bf92c5351091.jpg)
SOLVED:The general definition of a Hermitian operator, Mt M ,implies that (flmtlg) = (Mflg) = (flmlg) = (fIMg) If If) and Ig) are continuous functions, then the integral representation of the Hermiticity
![Sam Walters ☕️ on Twitter: "In #quantum #physics the energy operator H (the Hamiltonian) dictates how states 𝜙 evolve with time according to 𝜙(t) = exp(-itH/ℏ) 𝜙. Stone's theorem gives us a Sam Walters ☕️ on Twitter: "In #quantum #physics the energy operator H (the Hamiltonian) dictates how states 𝜙 evolve with time according to 𝜙(t) = exp(-itH/ℏ) 𝜙. Stone's theorem gives us a](https://pbs.twimg.com/media/EIw3xqBU8AEZr3N.jpg:large)
Sam Walters ☕️ on Twitter: "In #quantum #physics the energy operator H (the Hamiltonian) dictates how states 𝜙 evolve with time according to 𝜙(t) = exp(-itH/ℏ) 𝜙. Stone's theorem gives us a
![quantum mechanics - If eigenstate for a Hermitian operator are orthonormal why are the energy eigenstates not so? - Physics Stack Exchange quantum mechanics - If eigenstate for a Hermitian operator are orthonormal why are the energy eigenstates not so? - Physics Stack Exchange](https://i.stack.imgur.com/tnsji.png)