Calculating Average Waiting time in SJF algorithm [closed]

I understand how preemptive SJF Scheduling works but I dont know how to calculate the average waiting time..
This example is taken from 'OS Principles' by Galvin, Gagne and Silberschatz.
They calculate the average waiting time as:
`((10-1)+(1-1)+(17-2)+(5-3)) / 4 = 6.5ms`
How is this calculated? Please simplify.
Also, it would be great if you could solve the same using RR algorithm with time quantum of say... 5ms (for simple calculation) and explain how to calculate the avg waiting time

-

closed as off topic by the Tin Man, jonsca, Aziz Shaikh, Jeroen Moons, Sergey K.Sep 26 '12 at 7:21

Questions on Stack Overflow are expected to relate to programming within the scope defined by the community. Consider editing the question or leaving comments for improvement if you believe the question can be reworded to fit within the scope. Read more about reopening questions here. If this question can be reworded to fit the rules in the help center, please edit the question.

Just look at the diagram and calculate for every process, how much time he have been waiting:

P1 run at the beginning 1 time (he is the only one) thus he wait 0 here. Than, he wait from time 1 until time 10 -> total waiting time = (10-1).

P2 arrive in time 1, and start running right away. So he didn't wait at all -> (1-1).

P3 arrive in time 2, and begin running in time 17 -> (17-2).

P4 arrive in time 3, and start running in time 5 -> total waiting time = (5-3).

Thus, the average waiting time = ((10-1)+(1-1)+(17-2)+(5-3))/4 = 6.5ms.

EDIT : For RR with 5 quanta, that's what gonna happen:

P1 arrives, and get quanta of 5ms -> in time 5, he stops with remaining burst of 3. Next, P2 will start running from time 5 to time 9. (his burst is only 4). So you get P2 waited for (5-1).

P3 will start running, from time 9 to time 14 with remaining burst of 4. Next, P4 will start running from time 14 to time 19 and will end. Total waiting time for P4 is (14-3).

Than P1 will continue running from time 19 to time 22 and will end. Total waiting time for P1 is (19-5). Than, P3 continue running from time 22 to time 26. Total waiting time for P3 is (9-2) + (22-14).

So you get average running time = ((5-1)+(14-3)+(19-5)+(9-2)+(22-14))/4 = 10.5ms

-
and if you could do the same in RR algo please –  Dummy Derp Aug 8 '12 at 19:04
I mean the logic behind it, the way you explained for SJF –  Dummy Derp Aug 8 '12 at 19:07
I wrote you some explanation so you can learn the logic. –  barak1412 Aug 8 '12 at 19:21
P1 executes from 0 to 5 (REM=3ms). P2 executes from 5 to 9(REM=0ms). P3 executes from 9 to 14(REM=4ms). P4 executes from 14 to 19(REM=0). Now P1 reenters from 19 to 22. P3 reenters and goes from 22 to 27. Correct? –  Dummy Derp Aug 10 '12 at 6:56
I edited my question. All you wrote is correct, except for last one - P3 will run from 22 to 26 and to to 27. –  barak1412 Aug 10 '12 at 7:30