If you want a graph similar to the official answer, try to stop thinking about how things run concurrently and instead concentrate on the generations of processes (parents, children, grandchildren and so on).
At the start, there is one process
p0, with three forks to go. When doing those three forks, it creates
p1 with two forks to go,
p2 with one fork to go and
p3 with no forks left. Then
p0 exits (only
We can toss away
p3 since it has no forks left, leaving just
p1 then executes its second fork producing
p4 with one fork left, then executes the third fork making
p5 with no forks left.
p1 is now done and exits (
p5 can be tossed because it has no forks left. This leaves
p2 had one fork left so it creates
p6 with no forks left. Then both
p6 exit due to having no forks left, leaving
p4 had one fork left so it creates
p7 with no forks, and they both then exit.
By drawing the chart with the depth based on parentage rather than when processes are started (although the starting time(a) controls where the process exists horizontally at a specific depth, eg, see
p3), your diagram should match the one given.
So think of it this way:
Sequence within generation -------->
n / | \
e p01 p02 p03
r / \ |
a p04 p05 p06
(a) Keep in mind that starting time as defined here is when the process comes into existence - the order in which processes do actual useful work also depends on the vagaries of scheduling.