HF has a bond length of 92 pm. Calculate the moment of inertia of the molecule and hence the energy required to excite it from the J = 0 to the J = 1 energy level. (a) At what temperature does this energy equal the thermal energy kT? (b) At what wavelength could this excitation be induced using electromagnetic radiation?
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HF has a bond length of 92 pm. Calculate the moment of inertia of the molecule...
Calculate the moment(s) of inertia of methyl fluoride, CH3F. The C-H bond length is 108.2 pm. The C-F bond length is 136.5 pm. The HCH bond angle is 110.2°. mH = 1.008mu, mC = 12.01mu, mF = 19.00mu
Give details. 4. Rotational levels of 1602 Calculate the moment of inertia of the 1"02 molecule given that its bond length is 120.8 pm and that the atomic mass of 160 is 15.9949 g/mol. a. b. Calculate the rotational constant B in cm and the energy of the first 3 rotational states in cm Infer the wavenumber of the first two rotational lines c. Sketch the rotational spectrum of 1602 4. Rotational levels of 1602 Calculate the moment of inertia...
(c) Calculate the moment of inertia of a CH35Cl3 molecule around a rotational axis that contains the C-H bond The C-CI bond length is 177 pm and the HCCI angle is 107°, m(35Cl) 34.97 u.
4: Model a water molecule as 2 hydrogen atoms and one oxygen molecule at the ends of an equilateral triangle with sides of length 10-10m. (14 pts) A) Calculate the moment of inertia of this configuration about the center of the triangle. This requires a bit of geometry to get the distance from the ends to the center. (5 pts) B) Calculate the energy and wavelength of a photon released in the 1-2 to 1-1 tran- sition the l-10 to...
Problem 18.37 Part A Calculate the reduced mass for H2, which has a bond length of 75.69 pm . Part B Calculate the moment of inertia for H2, which has a bond length of 75.69 pm . Part C Calculate the angular momentum in the J=1 rotational level for H2, which has a bond length of 75.69 pm . Part D Calculate the energy in the J=1 rotational level for H2, which has a bond length of 75.69 pm .
3. Acetylene is a linear molecule with the C-C bond length of 120.3 pm and C-H bond legth of 106.0 pm. The fundamental frequencies of the mormal modes are vi = 1975 cm , V2 = 3370 cm , v = 3277 cm , VA = 729 cm", and vg = 600 cm . The normal modes V and vg are doubly degenerate. (a) [7 points) Calculate the moment of intertia, rotational temperature and vibra- tional temperature of each normal...
Rotational Dynamics Assignment (200 Points) • Due Friday, July 31 at 5:00 pm Equations are in a separate document entitled “Equations for Rotational Dynamics Assignment” • Moments of inertia formulas are provided on the last page of this document • Show all of your work when solving equations. It is not sufficient to merely have a correct numerical answer. You need to have used legitimate equations and algebra. You also need to have correctly used the data. • Units must...