[PoM] Lennard-Jones potential parameters

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BRN
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Hi guys! I need your help!

1. Homework Statement


Use the function of Lennard-Jones V (R) = ε [(σ / R)12 - (σ / R)6] as model for the adiabatic potential energy in function of the separation between the 11B boron and nitrogen nuclei 14N. You determine the parameters ε and σ to reproduce the spectroscopic values of the vibrational quantum, ν = 1514.6 cm-1, and the separation of 1,666 cm-1 between the lines of rotational BN molecule.

The Attempt at a Solution


[/B]
I have

ΔErot2/I=1.666 cm-1=3.3091*10-23 J I=ħ2/ΔErot=3.3603*10-46 Kgm2

and

R0=√(I/μ)=1.8125*10-10 m

At this point, I calculating the minimum oh the potential:

V(0)=∂V(R)/∂R =0 ⇒ R06=2σ6 ⇒ σ=6√(R06/2)=1.6147*10-10 m


For ε, I calculating k by:

k=∂2V(R)/∂R2=6σ6εR-14(26σ6-7R6)

but here I'm lost...

Who can help me? Please!
 
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BRN said:
For ε, I calculating k by:

k=∂2V(R)/∂R2=6σ6εR-14(26σ6-7R6)

but here I'm lost...
You need an equation to relate k to ##\nu##, then the only unknown in there will be ε.
 
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Tanks for your answer,
the only equation i know to relate k to ν is:

ν=1/(2πc)√(k/μ)

so, i have (using R=R0):

ε=[μ(2πcν)2σ7(6√2)14]/(72σ6)

but is dimensional incorrect...
 
BRN said:
For ε, I calculating k by:

k=∂2V(R)/∂R2=6σ6εR-14(26σ6-7R6)
When you let R = Ro, you should then be able to simplify to get a nice expression relating ##k## to ##\varepsilon## and ##\sigma##. This might make it a little easier to get the correct expression for ##\varepsilon## in terms of ##\nu##.
 
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BRN said:
Tanks for your answer,
the only equation i know to relate k to ν is:

ν=1/(2πc)√(k/μ)

so, i have (using R=R0):

ε=[μ(2πcν)2σ7(6√2)14]/(72σ6)

but is dimensional incorrect...
I think your expression for ##\varepsilon## is correct except that you appear to be off by a factor of ##\sigma##. Try to simplify the expression as much as possible.
 
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Oh Damn!
yes, the equation is correct (apart the simplifications), but υ must be convert to m-1 and not to J!

So:

ε=[μ(2πcν)2σ2(6√2)14]/72=1.5192*10-18 J

Now it's ok!

Tanks at all!