Answer:
Step-by-step explanation:
Let X(t) denote the number of machines breakdown at time t.
The givenn problem follows birth-death process with finite space
S={0, 1, 2, 3} with
The birth-death process having balance equations
since, state rate at which leave = rate at which enter
0
1
2
Since
a)
Average number not in use equals the mean of the stationary distribution
b)
Proportion of time both repairmen are busy
Equation: F = MA
F = 250 * 10 = 2,500 N
Answer:
Rises to the left and rises to the right.
Step-by-step explanation:
Since, the given function is f(x)=, and the end behavior of the given function is determined as:
Consider the given function f(x)=, identify the degree of the function:
The degree of the function is : 4 which is even
And then identify the leading coefficient of the given function that is +2 which is positive in nature.
Hence, the function is positive and even in nature, therefore, the end behavior of the function will be rising to the left and rising to the right.
ANSWER: -9
I used a graphing calculator.
Sorry if this is incorrect. Weird calculator I have.
Answer:
∠AQS ≅ ∠BQS when segments AQ and BQ are equal.
Step-by-step explanation: