The following is a Markov (migration) matrix for three locations [1/5 1/5 2/5
2/5 2/5 1/5
2/5 2/5 2/5]
(a) Initially, there are 130 individuals in location 1, 300 in location 2, and 70 in location 3. How many are in each location after two time periods?
(b) The total number of individuals in the migration process is 500. After a long time, how many are in each location?

(a)

(b)   After an infinite period of time; we will get back to a result similar to after the two time period which will be

Step-by-step explanation:

The Markov Matrix can be interpret as :

From (a) ; we see that the initial population are as follows: 130 individuals in location 1, 300 in location 2, and 70 in location 3.

Le P represent the Population; So ;  

The objective is to find How many are in each location after two time periods;

So, after two time period ; we have the population

where;

Now; Over to after two time period ; when the population

(b) The total number of individuals in the migration process is 500. After a long time, how many are in each location?

After a long time; that is referring to an infinite time (n)

So;

where ;

; if we determine the respective values of we will always result to the value for ; Now if   is said to be a positive integer; then :

After an infinite period of time; we will get back to a result similar to after the two time period which will be

hello, sorry being so rude after all that fighting i found it kind of funny, so as me saying sorry here is an answer!

since the table showed her that   2km = 2000m.

to determine, how many km in 2000m, she would divide by 1000.

= 2000 / 1000 = 2 km.

similarly, for 8000m = 8000 / 1000 = 8 km

cheers to savings

~

your pal papaguy