![quantum mechanics - How to evaluate Commutator Bracket $\left[x,\frac{\partial}{\partial x}\right]$ indirectly using Poisson Bracket? - Physics Stack Exchange quantum mechanics - How to evaluate Commutator Bracket $\left[x,\frac{\partial}{\partial x}\right]$ indirectly using Poisson Bracket? - Physics Stack Exchange](https://i.stack.imgur.com/9cUsI.jpg)
quantum mechanics - How to evaluate Commutator Bracket $\left[x,\frac{\partial}{\partial x}\right]$ indirectly using Poisson Bracket? - Physics Stack Exchange
![1.31: The Position and Momentum Commutation Relation in Coordinate and Momentum Space - Chemistry LibreTexts 1.31: The Position and Momentum Commutation Relation in Coordinate and Momentum Space - Chemistry LibreTexts](https://chem.libretexts.org/@api/deki/files/178320/clipboard_e2a839e9a719b66e253a940e1f46b68fd.png?revision=1)
1.31: The Position and Momentum Commutation Relation in Coordinate and Momentum Space - Chemistry LibreTexts
![SOLVED: #Problem 4.20 (a) Starting with the canonical commutation relations for position and momentum Equation 4.10, work out the following commutators: [Lg,x] =ihy; [Lz,y] =-ihx [Lz, 2] =0 [4.122, (Lz p | = SOLVED: #Problem 4.20 (a) Starting with the canonical commutation relations for position and momentum Equation 4.10, work out the following commutators: [Lg,x] =ihy; [Lz,y] =-ihx [Lz, 2] =0 [4.122, (Lz p | =](https://cdn.numerade.com/ask_images/f56db407991549709130ad726b31d3e0.jpg)
SOLVED: #Problem 4.20 (a) Starting with the canonical commutation relations for position and momentum Equation 4.10, work out the following commutators: [Lg,x] =ihy; [Lz,y] =-ihx [Lz, 2] =0 [4.122, (Lz p | =
![SOLVED: Derive the following commutator relationships between the components of angular momentum L and of p: [Ly, Pc] ihp- [Ly, p-] = ihpr [Ly, P2] 2ihprp = [Ly; p2] 2ihprp= You can ( SOLVED: Derive the following commutator relationships between the components of angular momentum L and of p: [Ly, Pc] ihp- [Ly, p-] = ihpr [Ly, P2] 2ihprp = [Ly; p2] 2ihprp= You can (](https://cdn.numerade.com/ask_images/d20c7c45a12548a5974045dfbe89d71d.jpg)
SOLVED: Derive the following commutator relationships between the components of angular momentum L and of p: [Ly, Pc] ihp- [Ly, p-] = ihpr [Ly, P2] 2ihprp = [Ly; p2] 2ihprp= You can (
![quantum mechanics - Coefficient of an 1-form in position-representation of momentum operator where configuration space is NOT $\mathbb{R}^m$ - Physics Stack Exchange quantum mechanics - Coefficient of an 1-form in position-representation of momentum operator where configuration space is NOT $\mathbb{R}^m$ - Physics Stack Exchange](https://i.stack.imgur.com/L2jaq.png)