3.5. Prove that the renewal function m(t), 0 uniquely determines the interarrival distribution F
3.4. Suppose a and b are positive integers. Prove that, if aſb, then a < b.
For the first equation, prove it is true. For the second equation, prove it is equal to zero. n-3 2 n-3 2
Prove the equation of the parallel axis theorem (derive the equation).
Make an appropriate transformation to fit the model P- aebt using Equation (3.4). Estimate a and b. t 7 14 21 28 35 42 P18 41 133 250 280 297 REFERENCE 9272 (3.4) In N:
Prove that the following equation is exact and solve it
Prove the formulas given in the table at the beginning of Section 3.4 for the Bernoulli, Poisson, Uniform, Exponential, Gamma, and Beta. Here are some hints. For the mean of the Poisson, use the fact that! ea = 2 , a"/x!. To compute the variance, first compute E(X(X - 1)). For the mean of the Gamma, it will help to multiply and divide by [(a+1)/Ba+1 and use the fact that a Gamma density integrates to 1.! For the Beta, multiply...
Prove that the Schrödinger’s equation is not valid for many-electron systems.
Discuss how Biblical worldview principles can facilitate a renewal of the spirit of leadership.
ty A lexitiZ) = e ini prove - Is the function the laplace's equation, or not ?