A packet needs to traverse two Internet Service Provider net

A packet needs to traverse two Internet Service Provider networks x and y (e.g., AT&T and Verizon) to make it from its source A to its destination B. You are told that the number of hops (i.e., the length of the paths) for messages traversing network x is uniformly random in the range from 3 to 5 and that the number of hops for messages traversing network y is also uniformly random in the range from 2 to 6. Answer the following questions:

(a) Compute the probability mass function for the total number of hops for a message going from A to B. Show your work.

(b) Compute the mean, median, and standard deviation for the total number of hops for a message going from A to B. Show your work.

(c) Compute the probability mass function for the maximum number of hops that a message will spend in either networks when going from A to B. Show your work.

(d) Compute the mean, median, and standard deviation for the maximum number of hops that a message will spend in either networks when going from A to B. Show your work.

Solution

Assuming 0 hops between networks , any other number if available can be added in the below calculation .

Given : In network X number of hops 3 or 4 or 5 with equal Probability (P) of 1/3

Given : In network Y number of hops 2 or 3 or 4 or 5 or 6 with equal Probability(P) of 1/5

a.

Taking all possible combinations both from Network X and Network Y with equal probability .

Nunber hops would be (3+2) , (3+3) , (3+4) , (3+5) ,(3+6) with equal probability of ((1/3)*(1/5)) .... 1

Nunber hops would be (4+2) , (4+3) , (4+4) , (4+5) ,(4+6) with equal probability of ((1/3)*(1/5)) ..... 2

Nunber hops would be (5+2) , (5+3) , (5+4) , (5+5) ,(5+6) with equal probability of ((1/3)*(1/5)) ..... 3

Grouping number of hops from 1 , 2, 3 . Overall number of hops would be :

5 hops with 1/15 P , 6 hops with 2*1/15 P , 7 with 3*1/15 P , 8 with 3*1/15 P , 9 with 3*1/15 P , 10 hops with 2*1/15 P , 11 hops with 1/15 P

b.

The set of number of hops can be represented by using the probability value and replacing 1/15 P by , 2/15 P by 2 and 3/15 P by 3 entries of the number of hops

we have ( 5 , 6 , 6 , 7 , 7, 7, 8, 8, 8, 9, 9 ,9 , 10 , 10 , 11)

so mean = ( 5 + 12 + 21 + 24 + 27 + 20 + 11 ) / 15 = 120 /15 = 8 hops

median = 8 ( Central element )

variance =( ( 5 - 8 )² + 2*( 6- 8 )² + 3*( 7- 8 )² + 3*( 8- 8 )² + 3*( 9- 8 )² + 2*( 10- 8 )² + ( 11- 8 )² ) / 15 =   40/15 = = 2.6667

standard deviation = SquareRoot(variance) = 2.6667^1/2 = 1.633

c .

Taking the networks separately :

The Probability function in X = 3 or 4 or 5 hops with equal Probability (P) of 1/3

The Probability function in Y = 2 or 3 or 4 or 5 or 6 hops with equal Probability(P) of 1/5

d.

For network X : Mean = (3+4+5)/ 3 = 4

Mode = 5

variance = ((3-4)²+(4-4)²+(5-4)²))/3 =2/3

standard deviation = (2/3)^1/2 = 0.8165

For network Y : Mean = (2+3+4+5+6)/ 5 = 4

Mode = 5

variance = ((2-4)²+(3-4)²+(4-4)²)+(4-5)²+(4-6)²)/5 =10/5 = 2

standard deviation = (2)^1/2 = 1.414