Question 1

It is possible to have decreasing marginal products for all inputs,and yet have increasing returns to scale.

Accepted Answer

Decreasing marginal products for all inputs means that each additional unit of input added to the production process results in a smaller increase in output. However, increasing returns to scale occur when a proportional increase in all inputs leads to a larger increase in output. This can happen because the increase in scale allows for greater specialization, more efficient use of resources, or other benefits that outweigh the decreasing marginal products of individual inputs.

Question 2

The production function f(x,y)=x^2/3+ y^2/3 has increasing returns to scale.

Accepted Answer

The production function $f(x, y) = x^{2/3} + y^{2/3}$ exhibits constant returns to scale, not increasing returns to scale, because if you scale both inputs by any positive constant $k$, the output increases by the same proportion $k^{2/3}$, not more than $k$.

Question 3

The production function f(x,y)=x + y has constant returns to scale.

Accepted Answer

A production function has constant returns to scale if doubling the inputs results in a doubling of output. In this case, if we replace x with 2x and y with 2y, we get: f(2x,2y) = F1(2x)F1S1 + F10(2y) = 2F1(x)F1S1 + 2F10(y) = 2[f(x,y)], which shows that output has indeed doubled. Therefore, the production function has constant returns to scale.

Question 4

Which of the following production functions exhibit constant returns to scale? In each case y is output and K and L are inputs.(1)y = K^1/2 L^1/3.(2)y = 3K^1/2 L^1/2.(3)y =K^1/2 = L^1/2.(4)y + 2K = 3L.

A) 1,2,and 4
B) 2,3,and 4
C) 1,3,and 4
D) 2 and 3
E) 2 and 4

Accepted Answer

The answer of Which of the following production functions exhibit...

Question 5

If the production function is f(x,y)=min{12x,3y},then there is convexity in production.

Accepted Answer

A production function is considered convex if it satisfies the condition of increasing marginal rates of technical substitution, which means that as one input is substituted for another while holding output constant, the marginal rate of substitution between the inputs increases. In this case, the partial derivative of the function with respect to x and y are:

∂f/∂x = 12F1(x,y)
∂²f/∂x² = 24F1(x,y) > 0
∂f/∂y = 9F1(x,y)
∂²f/∂y² = 0

Since the second partial derivative with respect to x is positive, the production function is convex in x. Similarly, since the partial derivative with respect to y is constant and the second partial derivative with respect to y is zero, the production function is also convex in y. Therefore, the overall production function is convex.

Question 6

A production isoquant is a locus of combinations of inputs that are equally profitable.

Accepted Answer

A production isoquant is a locus of combinations of inputs that produce a certain level of output, not necessarily equally profitable. Profitability depends on the prices of inputs and the price of output.

Question 7

A firm has the production function f(x,y)=x.₅ + y,where x is the amount of factor x it uses and y is the amount of factor y.On a diagram we put x on the horizontal axis and y on the vertical axis.We draw some isoquants.Now we draw a straight line on the graph and we notice that the slopes of all the isoquants that it meets have the same slope at the point where they meet this line.The straight line we drew was

A) vertical.
B) horizontal.
C) diagonal through the origin with slope 0.5.
D) diagonal with slope 2.
E) diagonal with slope greater than 2.

Accepted Answer

The answer of A firm has the production function f(x,y)=x.₅...

Question 8

If the production function is f(x,y)=min{2x+y,x +2y},then there are constant returns to scale.

Accepted Answer

To test for constant returns to scale, we need to check whether doubling the inputs (i.e. x and y) results in exactly double the output.

If we replace x with 2x and y with 2y in the production function, we get:

f(2x, 2y) = min{2x + 2y, 2x + 2y, 2x + 4y}

= 2(min{x+y, x+y, x+2y})

= 2f(x,y)

Since doubling the inputs results in exactly double the output, this production function exhibits constant returns to scale.

Question 9

If there is one input used in production and if there are decreasing returns to scale,then the marginal product for the input will be diminishing.

Accepted Answer

Decreasing returns to scale means that as the quantity of input used increases, the output increases at a decreasing rate. This means that the marginal product of the input will also decrease as more of it is used.

Question 10

In any production process,the marginal product of labor equals&#10;A) the value of total output minus the cost of the fixed capital stock.&#10;B) the change in output per unit change in labor input for &#34;small&#34; changes in the amount of input.&#10;C) total output divided by total labor inputs.&#10;D) total output produced with the given labor inputs.&#10;E) the average output of the least-skilled workers employed by the firm.

Accepted Answer

Marginal product of labor is the additional output produced when one unit of labor is added, while holding all other inputs constant. It is calculated as the change in output divided by the change in labor input for "small" changes in the amount of input. Therefore, the best choice is B.

Question 11

If there are constant returns to scale,then doubling the amount of any input will exactly double the amount of output.

Accepted Answer

The answer of If there are constant returns to scale,then...

Question 12

A production function has well-defined marginal products at every input combination.If factor x is shown on the horizontal axis and factor y is shown on the vertical axis,the slope of the isoquant through a point (x*,y*)is the negative of the ratio of the marginal product of x to the marginal product of y.

Accepted Answer

The answer of A production function has well-defined marginal products...

Question 13

The economist's distinction between the long run and the short run captures the idea that quantities of some factor inputs can be varied in the short run but not in the long run.

Accepted Answer

The answer of The economist's distinction between the long run...

Question 14

If the marginal product of each factor decreases as the amount of that factor used increases,then there must be decreasing returns to scale.

Accepted Answer

The answer of If the marginal product of each factor...

Question 15

If the production function is f(x₁,x₂)=x₁x₂,then there are constant returns to scale.

Accepted Answer

The answer of If the production function is f(x₁,x₂)=x₁x₂,then there...

Question 16

A firm has two variable factors and a production function f(x₁,x₂)=(2x₁ + 4x₂)^1/2.The technical rate of substitution between x₁ and x₂ is constant.

Accepted Answer

The answer of A firm has two variable factors and...

Question 17

If the production function is f(x,y)= x+min{x,y},then there are constant returns to scale.

Accepted Answer

The answer of If the production function is f(x,y)= x+min{x,y},then...

Question 18

A firm's production function is f(x₁,x₂)=x₁ + 2x₂.This means that x₂ is twice as expensive as x₁.

Accepted Answer

The answer of A firm's production function is f(x₁,x₂)=x₁ +...

Question 19

If a firm moves from one point on a production isoquant to another point on the same isoquant,which of the following will certainly not happen?&#10;A) A change in the level of output&#10;B) A change in the ratio in which the inputs are combined&#10;C) A change in the marginal products of the inputs&#10;D) A change in the rate of technical substitution&#10;E) A change in profitability

Accepted Answer

The answer of If a firm moves from one point...

Question 20

The production set of a firm is the set of all products the firm can produce.

Accepted Answer

The answer of The production set of a firm is...

Question 21

A firm has the production function f(X,Y)=X^3/4 Y^1/4,where X is the amount of factor x used and Y is the amount of factor y used.On a diagram we put X on the horizontal axis and Y on the vertical axis.We draw some isoquants.Now we draw a straight line on the graph and we notice that wherever this line meets an isoquant,the isoquant has a slope of -.The straight line we drew

A) is a ray through the origin with slope 3.
B) is a ray through the origin with slope 4.
C) is vertical.
D) is horizontal.
E) has a negative slope.

Accepted Answer

The answer of A firm has the production function f(X,Y)=X^3/4...

Question 22

A firm has a production function f(x,y)=1.80(x^0.80 +y^0.80)³ whenever x $\gt$0 and y $\gt$ 0.When the amounts of both inputs are positive,this firm has A) increasing returns to scale if x + y $\gt$1 and decreasing returns to scale otherwise. B) decreasing returns to scale. C) constant returns to scale. D) increasing returns to scale. E) increasing returns to scale if output is less than 1 and decreasing returns to scale if output is greater than 1.

Accepted Answer

The answer of A firm has a production function f(x,y)=1.80(x^0.80...

Question 23

The production function Q=50K^0.25L^0.25 exhibits A) increasing returns to scale. B) constant returns to scale. C) decreasing returns to scale. D) increasing,then diminishing returns to scale. E) negative returns to scale.

Accepted Answer

The answer of The production function Q=50K^0.25L^0.25 exhibits A) increasing returns...

Question 24

A firm has a production function f(x,y)=1.80(x^0.80 + y^0.80)2 whenever x $\gt$ 0 and y $\gt$ 0.When the amounts of both inputs are positive,this firm has A) decreasing returns to scale. B) constant returns to scale. C) increasing returns to scale if x +y $\gt$ 1 and decreasing returns to scale otherwise. D) increasing returns to scale. E) increasing returns to scale if output is less than 1 and decreasing returns to scale if output is greater than 1.

Accepted Answer

The answer of A firm has a production function f(x,y)=1.80(x^0.80...

Question 25

A firm has the production function f(X,Y)= X ^1/2 Y ^1/2,where X is the amount of factor x used and Y is the amount of factor y used.On a diagram we put X on the horizontal axis and Y on the vertical axis.We draw some isoquants.Now we draw a straight line on the graph and we notice that wherever this line meets an isoquant,the isoquant has a slope of 23.The straight line we drew

A) is vertical.
B) is horizontal.
C) is a ray through the origin with slope 3.
D) is a ray through the origin with slope 4.
E) has a negative slope.

Accepted Answer

The answer of A firm has the production function f(X,Y)=...

Question 26

Suppose that the production function is f(x₁,x₂)=(x^a₁ +x^a₂)b,where a and b are positive constants.For what values of a and b is there a diminishing technical rate of substitution? A) For any value of a if b $\lt$ 1 B) For any values of a and b if ab $\lt$ 1 C) For any values of a and b if a $\gt$b D) For any value of b if a $\lt$1 E) None of the above.

Accepted Answer

The answer of Suppose that the production function is f(x₁,x₂)=(x^a₁...

Question 27

A firm has the production function f(x,y)= 60x ^4/5 y^1/5.The slope of the firm's isoquant at the point (x,y)=(40,80)is (pick the closest one) A) -0.50. B) -4. C) -0.25. D)-8.

Accepted Answer

The answer of A firm has the production function f(x,y)=...

Question 28

A firm has the production function f(X,Y)=X^3/4 Y^1/4,where X is the amount of factor x used and Y is the amount of factor y used.On a diagram we put X on the horizontal axis and Y on the vertical axis.We draw some isoquants.Now we draw a straight line on the graph and we notice that wherever this line meets an isoquant,the isoquant has a slope of -.The straight line we drew

A) is a ray through the origin with slope 3.
B) is a ray through the origin with slope 4.
C) is vertical.
D) is horizontal.
E) has a negative slope.

Accepted Answer

The answer of A firm has the production function f(X,Y)=X^3/4...

Question 29

A firm has a production function f(x,y)=1.40(x^0.60 + y^0.60)² whenever x $\gt$0 and y $\gt$ 0.When the amounts of both inputs are positive,this firm has A) increasing returns to scale. B) decreasing returns to scale. C) constant returns to scale. D) increasing returns to scale if x + y $\gt$ 1 and decreasing returns to scale otherwise. E) increasing returns to scale if output is less than 1 and decreasing returns to scale if output is greater than 1.

Accepted Answer

The answer of A firm has a production function f(x,y)=1.40(x^0.60...

Question 30

A firm has the production function f(x,y)=x.₅ + y,where x is the amount of factor x it uses and y is the amount of factor y.On a diagram we put x on the horizontal axis and y on the vertical axis.We draw some isoquants.Now we draw a straight line on the graph and we notice that the slopes of all the isoquants that it meets have the same slope at the point where they meet this line.The straight line we drew was

A) vertical.
B) horizontal.
C) diagonal through the origin with slope 0.5.
D) diagonal with slope 2.
E) diagonal with slope greater than 2.

Accepted Answer

The answer of A firm has the production function f(x,y)=x^1.40y¹.This...

Question 31

If output is produced with two factors of production and with increasing returns to scale,&#10;A) there cannot be diminishing marginal rate of substitution.&#10;B) all inputs must have increasing marginal products.&#10;C) on a graph of production isoquants,moving along a ray from the origin,output more than doubles as the distance from the origin doubles.&#10;D) the marginal product of at least one input must be increasing.&#10;E) all inputs must have decreasing marginal products.

Accepted Answer

The answer of If output is produced with two factors...

Question 32

A firm has the production function f(x,y)=20x^3/5 y^2/5.The slope of the firm's isoquant at the point (x,y)= (20,40)is (pick the closest one) A) -3. B) -0.67. C) -1.50. D)-0.50. E) -0.25.

Accepted Answer

The answer of A firm has the production function f(x,y)=20x^3/5...

Question 33

A firm uses only two inputs to produce its output.These inputs are perfect substitutes.This firm&#10;A) must have increasing returns to scale.&#10;B) must have constant returns to scale.&#10;C) could have increasing returns to scale,constant returns to scale,or decreasing returns to scale.&#10;D) must have decreasing returns to scale.&#10;E) must have decreasing returns to scale in the short run and constant returns to scale in the long run.

Accepted Answer

The answer of A firm uses only two inputs to...

Question 34

A firm has the production function f(x,y)=20x^3/5 y^2/5.The slope of the firm's isoquant at the point (x,y)=(50,70)is (pick the closest one) A) -1.50. B) -0.67. C) -0.71. D) -2.10. E) -0.36.

Accepted Answer

The answer of A firm has the production function f(x,y)=20x^3/5...

Question 35

A firm has the production function f(x₁,x₂)=x^0.60₁x^0.30₂.The isoquant on which output is 80^3/10 has the equation A) x₂ =80x^-2₁. B) x₂ =80x^3.33₁. C) x₁/x₂ =2. D) x₂ =80x^-0.30₁. E) x₁ =0.30x^-0.70₂.

Accepted Answer

The answer of A firm has the production function f(x₁,x₂)=x^0.60₁x^0.30₂.The...

Question 36

A firm has the production function f(x,y)=x.₅ + y,where x is the amount of factor x it uses and y is the amount of factor y.On a diagram we put x on the horizontal axis and y on the vertical axis.We draw some isoquants.Now we draw a straight line on the graph and we notice that the slopes of all the isoquants that it meets have the same slope at the point where they meet this line.The straight line we drew was

A) vertical.
B) horizontal.
C) diagonal through the origin with slope 0.5.
D) diagonal with slope 2.
E) diagonal with slope greater than 2.

Accepted Answer

The answer of A firm has the production function f(x,y)=x^1.40y^0.90.This...

Question 37

A firm has the production function f(x,y)=x.₅ + y,where x is the amount of factor x it uses and y is the amount of factor y.On a diagram we put x on the horizontal axis and y on the vertical axis.We draw some isoquants.Now we draw a straight line on the graph and we notice that the slopes of all the isoquants that it meets have the same slope at the point where they meet this line.The straight line we drew was

A) vertical.
B) horizontal.
C) diagonal through the origin with slope 0.5.
D) diagonal with slope 2.
E) diagonal with slope greater than 2.

Accepted Answer

The answer of A firm has the production function f(x,y)=...

Question 38

A firm has the production function f(x,y)=x.₅ + y,where x is the amount of factor x it uses and y is the amount of factor y.On a diagram we put x on the horizontal axis and y on the vertical axis.We draw some isoquants.Now we draw a straight line on the graph and we notice that the slopes of all the isoquants that it meets have the same slope at the point where they meet this line.The straight line we drew was

A) vertical.
B) horizontal.
C) diagonal through the origin with slope 0.5.
D) diagonal with slope 2.
E) diagonal with slope greater than 2.

Accepted Answer

The answer of A firm has the production function f(x,y)=x^0.90y^0.80.This...

Question 39

A firm has the production function f(x₁,x₂)=x¹¹x^0.50₂.The isoquant on which output is 30^5/10 has the equation A) x₂ =30x^-21. B) x₂ = 30x²¹. C) x₂ =30x^-0.50₁. D) x₁/x₂ = 2. E) x₁ =0.50x^-0.50₂.

Accepted Answer

The answer of A firm has the production function f(x₁,x₂)=x¹¹x^0.50₂.The...

Question 40

A firm has the production function f(x₁,x₂)=x^0.80₁x^0.20₂.The isoquant on which output is 70^2/10 has the equation A) x₂=70x⁵₁. B) x₁/x₂ =4. C) x₂=70x^-4₁. D) x₂ =70x^-0.20₁. E) x₁ =0.20x^-0.80₂.

Accepted Answer

The answer of A firm has the production function f(x₁,x₂)=x^0.80₁x^0.20₂.The...

Question 41

On separate axes,draw typical production isoquants for each of the following production functions. a.f(x,y)= min{2x,x + y}. b.f(x,y)= xy. c.f(x,y)= x +min{x,y}. d.(x,y)= x + y^1/2.

Accepted Answer

The answer of On separate axes,draw typical production isoquants for...

Question 42

The UJava espresso stand needs two inputs,labor and coffee beans,to produce its only output,espresso.Producing an espresso always requires the same amount of coffee beans and the same amount of time.Which of the following production functions would appropriately describe the production process at UJava,where B represents ounces of coffee beans,and L represents hours of labor?

A) Q = min(2B,60L).
B) Q = B^0.40L^0.60.
C) Q = B/2 + L/30.
D) Q= 0.5B + 0.5L^0.5.
E) None of the above.

Accepted Answer

The answer of The UJava espresso stand needs two inputs,labor...

Question 43

For each of the following production functions,draw a diagram showing the general shape of its corresponding isoquant.Comment on the ease at which labor and capital can be substituted for one another relative to the other two production functions.
a.Q = K + L.
b.Q = K^0.5L^0.5.
c.Q = min(K,L).

Accepted Answer

The answer of For each of the following production functions,draw...

Question 44

The production function Q=50K^0.25L^0.75 exhibits A) increasing returns to scale. B) decreasing returns to scale. C) constant returns to scale. D) increasing,then diminishing returns to scale. E) negative returns to scale.

Accepted Answer

The answer of The production function Q=50K^0.25L^0.75 exhibits A) increasing returns...

Question 45

The UJava espresso stand needs two inputs,labor and coffee beans,to produce its only output,espresso.Producing an espresso always requires the same amount of coffee beans and the same amount of time.Which of the following production functions would appropriately describe the production process at UJava,where B represents ounces of coffee beans,and L represents hours of labor?

A) Q = 0.5B + 0.5L^0.5.
B) Q =B^0.80L^0.20.
C) Q = min(2B,60L).
D) Q =B/2+ L/30.
E) None of the above.

Accepted Answer

The answer of The UJava espresso stand needs two inputs,labor...

Question 46

The UJava espresso stand needs two inputs,labor and coffee beans,to produce its only output,espresso.Producing an espresso always requires the same amount of coffee beans and the same amount of time.Which of the following production functions would appropriately describe the production process at UJava,where B represents ounces of coffee beans,and L represents hours of labor?

A) Q = B^0.60L^0.40.
B) Q =B/2 +L/2.
C) Q = min(2B,60L).
D) Q = 0.5B +0.5L^0.5.
E) None of the above.

Accepted Answer

The answer of The UJava espresso stand needs two inputs,labor...

Question 47

The production function Q =50K^0.25L^0.75 exhibits A) increasing,then diminishing returns to scale. B) increasing returns to scale. C) decreasing returns to scale. D) constant returns to scale. E) negative returns to scale.

Accepted Answer

The answer of The production function Q =50K^0.25L^0.75 exhibits A) increasing,then...

Question 48

For each of the following production functions,comment on the ability to substitute capital for labor. a.Q = K + L. b.Q = K^0.5L^0.5. c.Q = min(K,L).

Accepted Answer

The answer of For each of the following production functions,comment...

Deck 19: A: Technology