The waiting time at which 10 percent of the people would continue to hold is given as 2.3
<h3>How to solve for the waiting time</h3>
We have to solve for X ~ Exponential(λ).
then E(X) = 1/λ = 3,
= 0.3333
Remember that the cumulative distribution function of X is F(x) = 1 - e^(-λx). ; x is equal to the time in over case
For 10 percent of the people we would have a probability of
10/100 = 0.1
we are to find
P(X ≤ t)
= 1 - e^(0.3333)(t) = 0.1
Our concern is the value of t
Then we take the like terms
1-0.1 = e^(0.3333)(t)
1/0.9 = e^(0.3333)(t)
t = 3 * ln(1/0.9)
= 0.3157
Answer:
networkers
Explanation:
Corporate managers who supervise, coach, and guide lower-level employees and serve as their organizational sponsors are called: networkers.
Answer:
to know what the other people are interested in, for example they do a survey to see how much of each product they need and the popularity of how many people like the stuff, those are 2 reasons, quantity and I would say popularity 3: get the people to know that enreprenuer cares 4 and five just think about it, I cant really think of anymore
Explanation:
Answer:
=112.785
Explanation:
Average days in inventory is financial ratio that shows the average number of days a company takes to turn its inventory.
The formula for calculating the average days in inventory is as below.
Days in inventory = Average inventory /cost of goods sold x 365
for Re-UP Enterprises: average inventory = $189,880
cost of goods sold =$613,500,
Days in inventory
= $189,880/613,000 x 365
=0.309 X 365
=112.785
Answer:
Suppose that the number of students with an allergy to pencil erasers increases, causing more students to switch from pencils to pens in school.
- This will shift the demand curve to the right, increasing the total demand at all price levels.
Moreover, the price of ink, an important input in pen production, has increased considerably.
- This will shift the supply curve to the left, increasing the price of pens at every demand level.
What is sure is that the price of pens will increase. It is likely that the quantity demanded increases, but the extent by which the quantity demanded will increase is unknown.
