What is the formula to compute net rate change of the population of the i^th level?(a) \(\frac {dN_i}{dt}\) = Pi + 1, i ZNi + 1 + Pi – 1, i ZNi – 1 – Pi, i + 1 ZNi – Pi, i – 1 ZNi(b) \(\frac {dN_i}{dt}\) = – Pi + 1, i ZNi + 1 + Pi – 1, i ZNi – 1 + Pi, i + 1 ZNi + Pi, i – 1 ZNi(c) \(\frac {dN_i}{dt}\) = Pi + 1, i ZNi + 1 – Pi, i + 1 ZNi(d) \(\frac {dN_i}{dt}\) = + Pi – 1, i ZNi – 1 – Pi, i – 1 ZNiThe question was asked by my college professor while I was bunking the class.Query is from Vibrational Rate Equations topic in division Properties of High Temperature Gases of Aerodynamics

What is the formula to compute net rate change of the population of th

1.	What is the formula to compute net rate change of the population of the i^th level?(a) \(\frac {dN_i}{dt}\) = Pi + 1, i ZNi + 1 + Pi – 1, i ZNi – 1 – Pi, i + 1 ZNi – Pi, i – 1 ZNi(b) \(\frac {dN_i}{dt}\) = – Pi + 1, i ZNi + 1 + Pi – 1, i ZNi – 1 + Pi, i + 1 ZNi + Pi, i – 1 ZNi(c) \(\frac {dN_i}{dt}\) = Pi + 1, i ZNi + 1 – Pi, i + 1 ZNi(d) \(\frac {dN_i}{dt}\) = + Pi – 1, i ZNi – 1 – Pi, i – 1 ZNiThe question was asked by my college professor while I was bunking the class.Query is from Vibrational Rate Equations topic in division Properties of High Temperature Gases of Aerodynamics
Answer» The correct option is (a) \(\FRAC {dN_i}{DT}\) = Pi + 1, i ZNi + 1 + Pi – 1, i ZNi – 1 – Pi, i + 1 ZNi – Pi, i – 1 ZNi The EXPLANATION: The rate of CHANGE of population of the molecules in i^th level is computed by adding rate of increase of NI (population of i^th level) and rate of decrease of Ni. Thus the formula is: \(\frac {dN_i}{dt}\) = Pi + 1, i ZNi + 1 + Pi – 1, i ZNi – 1 – Pi, i + 1 ZNi – Pi, i – 1 ZNi Where, Pi + 1, i ZNi + 1 + Pi – 1, i ZNi – 1 is the rate of increase of population in i^th level due to the molecules jumping up from i – 1 and down from i + 1 levels. Pi, i + 1 ZNi – Pi, i – 1 ZNi is the rate of decrease of population in the i^th level due to the molecules jumping from i^th level to i + 1 and i – 1 levels.

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