Q1.) how does the vector (2,3) transform using[[-1,0],[0,1]]
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A: we can use the properties of commutator brackets.
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Q: c) Find the commutator relation 1) [L², Lx] 2) [H,z]
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Q: find the commutator [Lz,cosφ]
A: The commutator of two operators A and B is given by
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Q: hd Px 5. Evaluate the following commutators: (Remember that i dx ). (a) [x.y] (b) [x.px] (c) [px.pyl
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Q: i have the cartesian coordinates x=4, y=3, and z=4. I'm trying to figure out thespherical…
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Q1.) how does the vector (2,3) transform using[[-1,0],[0,1]]
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- 2- find the matrix of two operators L, and L² at l = 1 The given : (e',m'|L²|e, m) = {(l +1)h²8e,e, 8m,m' (l', m'|Lz\e, m) = mh8ge,8m,m'is this right?Find an equation for the plane through the points (-6, 8, – 1) and (-1,3, –8) and perpendicular to the plane -4x – 3y + 8z = 10. An equation for the plane is ...
- 4) [swHW] It turns out that any function that has a finite number of finite-magnitude discontinuities and a finite number of extrema (maximums and minimums) over a finite interval can be represented exactly with an infinite series of cosine and sine functions called a Fourier Series. The conditions that the function must meet, called the "Dirichlet conditions", are not very restrictive, so most functions you will encounter in physics will have an associated Fourier Series. To give you a sense of how this is possible consider a very simple f(x) = x function on the interval -π3