Answer:
D. Whether to pay office workers a wage or a salary
Explanation:
Compensation refers to the regular payments that employers extend to employees for work done. It is the reward employees get for rendering services to the employer.
The compensation scheme is an organization is managed by the Human resources department ( HR). The HR manager, in consultation with other managers, set the amount of compensation and benefits that each employee in the organization is entitled to.
It is the HR that decides the contracts to award employees, whether permanent or temporary. HR determines whether to pay wages or salaries.
Answer: True
Explanation: The above statement relates to the importance of logic studying in day to day life and the value of critical thinking in making decisions affecting one's personal and professional life.
An individual having ability to think logically and construct good arguments can have strong impacts on others around him or her by showing an attractive and strong personality.
Thus, from the above points we can conclude that the given statement is true.
The answer is d. If he is addressing it publicly. ?
<span>Profit needs to be maximized.
Profit = 30x+45y where x and y are respectively the number of model A and model B fax machines manufactured.
Objective function:
max(30x+45y)
Constraints:
x≥0 ---------------(1)
y≥0 ---------------(2)
x+y ≤ 2500 since the demand is capped at 2500 -----------(3)
100x+150y≤600000 since manufacturing costs cannot exceed $600000-----(4)
Solve the following two equations to identify where the two boundary lines (3) and (4) intersect.
x+y=2500-----(3)
100x+150y=600000---(4)
Multiplying (3) by 100
100x+100y=250000----(5)
(5)-(4)
50y=350000
y=7000
x=-4500
since the constraint states that x≥0, only three vertices are considered viz (0,0), (0,2500),(2500,0).
applying the profit function at each of the three vertices:
(0,0) ----- 30(0)+45(0) = 0
(0,2500) ---- 30(0)+45(2500)=112500
(2500,0) ---- 30(2500)+45(0)=75000
Hence by applying the max function, x=0, y=2500.
i.e. Dont produce any 'a' model machine. Manufacture 2500 units of model 'b' to maximise profit</span>
