Answer:
The Acquisition Program Baseline (APB) is developed by the Program Manager (PM) before the initiation of a program for all Acquisition Category (ACAT) programs and depicts the current condition of a program.
Explanation:
Answer:
It uses everyday things, items like iPhones or tablets, sensors and market to find the place of physical items and then suggest where to put virtual objects.
This might be a little off since I'm not very familiar with business stuff, but I hope this helps.
Answer:
It is more convenient to produce the sails in house.
Explanation:
Giving the following information:
Riggs purchases sails at $ 250 each, but the company is considering using the excess capacity to manufacture the sails instead. The manufacturing cost per sail would be $ 100 for direct materials, $ 80 for direct labor, and $ 90 for overhead. The $ 90 overhead includes $ 78,000 of annual fixed overhead that is allocated using normal capacity.
Because there will not be an increase in fixed costs, we will not have them into account.
Variable overhead= 90 - (78,000/1,200)= 25
Unitary variable cost= 100 + 80 + 25= 205
It is more convenient to produce the sails in house.
The person who receives financial protection from a life insurance plan is called a beneficiary. I hope that I helped, Have a wonderful day!
Answer:
The greatest number of mangoes which are to be taken out at a time from each basket so that both of them emptied simultaneously is the number of mangoes in each basket which is 120 mangoes for one basket and 168 mangoes for the other basket
Explanation:
Given that the number of mangoes in one basket = 120 mangoes
Also, the number of mangoes in another basket = 168 mangoes
The greatest number of mangoes, X and Y that are to taken out from each basket so that both of them will empty simultaneously is found as follows;
We note that the ratio of the number of mangoes in both baskets are;
120:168 = 5:7
Therefore, we have;
5 × Y = 120
Y = 20/5 = 24
Similarly, we have;
7 × X = 168
X = 168/7 = 24
We can take 5 mangoes from one basket and 7 mangoes from the other basket 24 times, for both mangoes to empty the same time
We can also take 5×12 = 60 mangoes twice from one basket and 7 × 12 = 84 mangoes twice from the other basket to empty the baskets
We can also take 120 mangoes one from one basket and 168 mangoes one from the other basket to empty the baskets.
Therefore, the greatest number of mangoes which are to be taken out at a time from each basket so that both of them emptied simultaneously is the number of mangoes in each basket which is 120 mangoes for one basket and 168 mangoes for the other basket.
