- #1
TensorCalculus
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- Homework Statement
- Derive the formula ##v_mp = \sqrt{\frac{2k_bT}{m}}##
- Relevant Equations
- ##f(v)=4\pi(\frac{m}{2k_BT})^{\frac 3 2} v^2 e^{\frac{-E}{k_BT}}##
product rule: ##\frac{d}{dx} (uv) = u'v + v'u##
This wasn't really a homework problem: I just randomly realised that I had been using the formula ##v_{mp} = \sqrt{\frac{2k_bT}{m}}## without actually knowing where it came from, so I decided to try and derive it. I got pretty close but I think I made some sort of silly mistake because the answer I got was the negative of what I should have gotten. I spent quite a while staring at it yesterday trying to figure out what went wrong, to no avail, and tried the same thing today... I fear I have tunnel vision. The mistake is probably a really small and dumb one, but I'm having quite a bit of trouble finding it 
Using the idea that ##v_mp## would be when the plot of the Maxwell-Boltzmann distribution is at a maximum for that given temperature and mass, and the derivative is 0 at maxima:
$$ \frac{d[f(v)]}{dv} = 0$$
$$\frac d {dv} (4\pi(\frac{m}{2k_BT})^{\frac 3 2} v^2 e^{\frac{-mv^2}{2k_BT}}) = 0$$
$$\frac d{dv} (v^2 e^{\frac{-mv^2}{2k_BT}}) = 0$$
$$v^2(\frac{-mv}{k_BT})(e^{\frac{-mv^2}{2k_BT}}) + 2v(e^{\frac{-mv^2}{2k_BT}}) = 0$$
$$v(-\frac{mv}{k_BT}) + 2 = 0$$
$$v^2 = \frac{2}{-\frac{m}{k_BT}} = -\frac{2k_BT}{m}$$
$$v=\sqrt{-\frac {2k_BT}{m}}$$
Somehow I got a negative inside the square root: where did I go wrong?
Using the idea that ##v_mp## would be when the plot of the Maxwell-Boltzmann distribution is at a maximum for that given temperature and mass, and the derivative is 0 at maxima:
$$ \frac{d[f(v)]}{dv} = 0$$
$$\frac d {dv} (4\pi(\frac{m}{2k_BT})^{\frac 3 2} v^2 e^{\frac{-mv^2}{2k_BT}}) = 0$$
$$\frac d{dv} (v^2 e^{\frac{-mv^2}{2k_BT}}) = 0$$
$$v^2(\frac{-mv}{k_BT})(e^{\frac{-mv^2}{2k_BT}}) + 2v(e^{\frac{-mv^2}{2k_BT}}) = 0$$
$$v(-\frac{mv}{k_BT}) + 2 = 0$$
$$v^2 = \frac{2}{-\frac{m}{k_BT}} = -\frac{2k_BT}{m}$$
$$v=\sqrt{-\frac {2k_BT}{m}}$$
Somehow I got a negative inside the square root: where did I go wrong?