<span>A zero pair is created when a pair of numbers, one positive and the other negative, equals a sum of zero.The main purpose of a zero pair is to simplify the process of addition and subtraction in complex mathematical equations featuring multiple numbers and variables. For example, in the problem 2+6-3-2, the positive 2 and the negative 2 cancel each other out because they are a zero pair, thus reducing the problem to 6-3.
Examples of Zero Pair:
-9 + 9 = 0</span>
14/112 = 7/56 = 1/8
Hope it helps
Answer:
The stationary matrix is:
S = [0.2791, 0.7209]
Step-by-step explanation:
The transition matrix, <em>P</em> is:
The stationary matrix S for the transition matrix P would be obtained by computing <em>k</em> powers of <em>P</em> until all the two rows of <em>P</em> are identical.
Compute P² as follows:
Compute P³ as follows:
Compute P⁴ as follows:
Compute P⁵ as follows:
For <em>k</em> = 5, we get both the rows identical.
The stationary matrix is:
S = [0.2791, 0.7209]