Using derivatives, the equation for the marginal product of labor is given by:
Q'(L) = 5 - 2L.
<h3>What is the marginal product equation?</h3>
As stated in the problem, the “marginal product of labor” is the change in the total product as we change the amount of hired labor, hence it is given by the derivative of the <u>production as a function of labor</u>.
For this problem, the production function is given by:
Q(L) = 5L - L².
Hence the marginal product of labor is given by:
Q'(L) = 5 - 2L.
Which is the derivative of Q(L), found applying the derivative of a power of x, as follows:
[x^n]' = nx^(n-1).
More can be learned about derivatives at brainly.com/question/2256078
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Answer:
The height of the curve at every point is the line value of the sine. In the language of functions, y = sin x is an odd function.
Step-by-step explanation:
The answer is 18 .
All you have to do is swich the numbers
Answer:
4
Step-by-step explanation:
We want xy=54=2*3^3 such that x is at least 2 and y is at least 5. Thus, the possible combinations (x,y) are (2,27), (3,18), (6,9), and (9,6). There are 4 such combinations.