elabed haidar said:
thank you but the definition of the degree is still not clear unconstrained parameters ? what do you mean by that?
how can you the number of degrees needed in each molecule ? i know its different in each type and i know i need to know the molecule but how do i specify it? that is what i am still not understanding it
I don't know what else to tell you besides give examples.
With molecules you can generally start with the 3 coordinates of each of the atoms and then
carefully! count your constraints.
Start with the number of atoms, say 3. Then prior to applying constraints you have 3 spatial coordinates for each of the 3 atoms and that's 9 parameters. Now it's a molecule and not just 3 separate atoms going about their business... so there are constraints... how many depend on the bond. If say the molecules are bonded in a linear configuration that's two bonds between them so two constraints, assuming the bond angle is free to move (imagine a pair of nunchuks flipping around in space.) The constraints are how far apart each bonded pair must be. 9-2 = 7 free parameters.
Consider how these parameters specify the configuration. Use 3 coordinates (x,y,z) to specify the position of the middle atom in space. Now specify the position of each of the other two atoms using spherical coordinates with the middle atom as the origin. That's (r1,theta1, phi1) and (r2,theta2, phi2). But you know the bond length so r1 and r2 are not free parameters but constants. You can specify then exactly the configuration of the atom by giving the seven parameters: (x, y, z, theta1, phi1, theta2, phi2).
If instead you have the three atoms forming a triangular bond, each atom bonding to the other two, (or if the type of bond constrains the bonding angle of the middle atom) then you end up with one more constraint and one less degree of freedom, we're back to the 5 free parameters of a rigid rotator. These may be for example, the position of one atom (x,y,z), the angular position of the second relative to the first, (phi1,theta1) and then
at what angle (about the axis through the first and origin atoms). That's six.
NOTE:
I erred in my earlier post when specifying five degrees of freedom for the rigid rotator. It has six. The diatomic molecule is NOT a rigid rotator as it's symmetry about the axis through the two atoms means rotation about that axis is not a degree of freedom for the molecule.
For the rigid rotator you can always start with a standard orientation centered at the origin. Then specify the translation to its actual position (x,y,z) and the vector rotation angle about its center (theta1, theta2, theta3). These six degrees of freedom are the parameters of the kinematic lie group for the object in question. The generators of this group are the canonical momenta which appear in the Hamiltonian of the system.
For single atoms you have only the 3 position degrees of freedom and for diatomic molecules you have the 5 I mentioned. For 3 or more you should start with the 6 degrees of freedom for a rigid rotator and then add any extras which come from deviations from rigidity, i.e. can atom A pivot freely? Then add one or two degrees of freedom depending on whether part of the "pivot freely" is already covered by rotating the whole molecule.
Well that's about all I can tell you. Each molecule type must be analyzed and double checked to see that you didn't over count and didn't miss any degrees of freedom. You also, as I've mentioned, may need to alter your analysis as energies increase sufficiently to "bend" your constraints. This is an exercise in quantum mechanics, where the elasticity of a constraint will tell you the amount of energy needed to excite the corresponding vibrational mode. When the temperature approaches that excitation energy (kT ~ E) you have to start adding that degree of freedom. See e.g. http://www.pci.tu-bs.de/aggericke/PC4e/Kap_V/H2O_Schwingungen.html" .
