
I've been told properties of commutators are the method of solving this, I'm just unsure of the implementation.
Properties such as: [AB, C] = A[B, C] + [A,C]B and [A, B] = AB - BA and [x, p] = i * h(bar) and [p, x2 ] = -2i(hbar)x
The property we can use here is that
and
and
.................(1)
Since it is not equal to zero so it is not Hermitian.
Now solving for the other combination.
![\frac{1}{2}[x^kp_x^l+p_x^lx^k]=\frac{1}{2}[x^kp_x^l]+\frac{1}{2}[p_x^l,x^k]](http://img.homeworklib.com/questions/afeb1030-c545-11ea-ba48-f1194f14e250.gif?x-oss-process=image/resize,w_560)
Now we can use the same formulation as above. The first term is the same as equation (1) multiplied by 1/2. And in second term x and px are interchanged. In that case, using the property mention above we will come out with a minus sign. Therefore

Therefore it is Hermitian.
I've been told properties of commutators are the method of solving this, I'm just unsure of...
An operator A is Hermitian if it satisfies | dx V AV = dr (AW)*v for all v. (a) Show that pl is not Hermitian, where I, k are positive integers. (Hint: First, show that p and are Hermitian. Then show that if A is Hermitian, A" is Hermitian. The remaining piece involves commutators of rand p.] (b) Show that the symmetric combination (c'p + x)/2 is Hermitian.
Need help solving this questions. I know it's a lot (I'm sorry
in advance). I've solved a couple but I'm not sure if I'm correct.
Please show all your work so I can follow along.
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I've figured out A-C, I'm just not sure how to start D and E
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