q=L^{0.50}K^{0.50} Assuming K=\bar K q=L^{0.50}\bar {K}^{0.50} \therefore AP_L=\frac{q}{L}=\frac{L^{0.50}\bar {K}^{0.50}}{L}=L^{-0.50}\bar {K}^{0.50} Therefore, the correct option is D. Both a and b: APL = L^-0.50 K(constant)^0.50. APL= q/L. Can you explain how L^-0.50 became negative, I've been trying to figure it out.
q=L^{0.50}K^{0.50} Assuming K=\bar K q=L^{0.50}\bar {K}^{0.50} \therefore AP_L=\frac{q}{L}=\frac{L^{0.50}\bar {K}^{0.50}}{L}=L^{-0.50}\bar {K}^{0.50} Therefore, the correct option is D....
A packaging firm relies on the production function Q(L,K) = KL + L. Assuming the firm’s optimal input combination is interior (i.e. it uses positive amounts of both inputs), what is its long-run marginal cost function? a. ???? = 2√??? b. ???? = √ ?? /? c. ???? = 2√??? – r d. ???? = (2?/ √??) − r
For the following rice production function: Q = 80 ( K 0.6 L 0.4) Beginning with K=5 and L=37, find out if the marginal product of both K and L is decreasing. Show your work. Does the production function exhibit increasing, decreasing, or constant returns to scale? Show your work. Why does it matter to know about what you found in a. and b. above?
Consider the Cobb-Douglas production function Q = 6 L^½ K^½ and cost function C = 3L + 12K. a. Optimize labor usage in the short run if the firm has 9 units of capital and the product price is $3. b. Show how you can calculate the short run average total cost for this level of labor usage? c. Determine “MP per dollar” for each input and explain what the comparative numbers tell in terms of the amount of labor...
Q.3(a) Transfer function model of a plant is, G(s) The controller is Ge(s)-K, where K is a constant. Find the value of K such that steady-state error for unit ramp input is 0.1. Find the gain margin and the phase mar gin (6 marks) (b) What are the effects on gain margin, phase margin and steady-state error, if the gain K is increased? (3 marks (c) Can the closed loop be unstable if the controller of Q.3(a) is implemented digi...
Figure < 1 of 1 Consider, for instance, a bar of initial length L and cross-sectional area A stressed by a force of magnitude F. As a result, the bar stretches by AL (Figure 1) Let us define two new terms: • Tensile stress is the ratio of the stretching force to the cross-sectional area: stress = 5 • Tensile strain is the ratio of the elongation of the rod to the initial length of the bar strain= 41 It...
can you please solve this Q with full explaination.
thanks. the correct answer is A.
6. What is the concentration of Co?"(aq) ions in the solution made by adding water to cobalt(II) nitrate (0.50 mol) and ethylenediamine (3.0 mol) so that the final volume of solution is 3.0 L? The K. of (Coſen), is 1.0 x 10" a) 1.3 x 10M b) 1.5 x 10 "M c) 2.9 x 10M d) 3.3 x 10" e) 8.7 x 10M
Can anyone explain how can you
get the above logic diagram? I have no clue how the answer is like
that. I've been trying to derive the truth table and draw the logic
diagram, but it's not the same as the above answer.
Exercise 9. Design of Sequential Circuits Design the sequential circuit illustrated by Figure 10. The circuit has an input X and an output Z. The out put Z goes high (1) whenever the target sequence 1-1-1 has...
Cheburashka uses kiwi fruits (K) and labour (L) to produce juice (q). His production function 1S: where labour is measured in hours, kiwi fruits in kg, and juice in (large) bottles. For example, if he uses 1 kg of kiwi fruits and 3 hours of labour, he can produce 1 bottle of juice a) Draw isoquants for q, q 2 and q 3 on a diagram with labour on horizontal axis and kiwi fruits on vertical b) Let the price...
FAO Figure 1 2. A thin wire of length L has a uniform charge density +1.A cylindrical Gaussian surface of radius d is drawn with the wire along its central axis, as shown above. Point P is located at the center of one end of the cylinder, a distance d from the end of the wire. Point Q is on the edge of the cylinder directly above the center of the wire, as shown above. A student says, "Gauss's law...
1. A firm uses labor (L) and machine (K) to assemble garden benches. The firm has the pro- duction function Q = F(L,K) = 207LVK, where L is the number of full-time workers the firm hires per day and K is the number of machines the firm uses per day. Both L and K can be non-integers (for example, a worker can work for half a day). Each worker costs $100 a day and each machine costs $200 a day....