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MA8402 Important 16 Mark Questions Probability And Queuing Theory Regulation 2017 Anna University

MA8402 Important 16 Mark Questions Probability And Queuing Theory

MA8402 Important 16 Mark Questions Probability And Queuing Theory Regulation 2017 Anna University free download. Probability And Queuing Theory Important 8 Mark Questions MA8402 pdf free download.

Sample MA8402 Important 16 Mark Questions Probability And Queuing Theory:

1. Find the mean and variance of the following distributions:
Binomial, Poisson( Refer B: page no:179,183)

2. Find the mean and variance of the following distributions :
Geometric and Exponential(Refer B : page no:185,212)

3. Prove that Poisson distribution is the limiting form of
Binomial distribution. MA8402 Important 16 Mark Questions Probability And Queuing Theory (Refer B: page no : 181)

4. For a triangular distribution
Find the mean, variance and moment generating function.
(Refer C: page no : 1.122) MA8402 Important 16 Mark Questions Probability And Queuing Theory

5.It is known that the probability of an item produced by a certain
machine will be defective is 0.05. If the produced items are sent to the
market in packets of 20, fine the no. of packets containing at least,
exactly and atmost 2 defective items in a consignment of 1000 packets
using (i) Binomial distribution (ii) Poisson approximation to binomial
distribution. MA8402 Important 16 Mark Questions Probability And Queuing Theory (Refer C: page no : 2.28)

6. The daily consumption of milk in excess of 20,000 gallons is
approximately exponentially distributed with θ = 3000. The city has a
daily stock of 35,000 gallons. What is the probability that of two days
selected at random, the stock is insufficient for both days.
(Refer C: page no : 2.74)

7. Each of the 6 tubes of a radio set has a life length (in yrs) which may
be considered as a RV that follows a weibull distribution with parameters
α = 25 and β = 2. If these tubes function independently of one another, what is the probability that no tube will have to be replaced during the first 2 months of service? (Refer C: page no : 2.82) MA8402 Important 16 Mark Questions Probability And Queuing Theory

Subject name Probability And Queuing Theory
Short Name PQT
Semester 4
Subject Code MA8402
Regulation 2017 regulation

MA8402 Probability And Queuing Theory Important 16 mark Questions Click Here To Download

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