Problem 1: Tangent line
Find an equation of the tangent line to graph of
y = x3 – 2x +1 at the point (1,0). Graph
both the function and the tangent line on the same screen.
Problem 2: Consumption function
If the consumption function is given by:
C = 20
I + 0.5
I 3 – 0.4I
Determine the marginal propensity to consume and the marginal propensity to consume to save when I = 100
Problem 3: Marginal cost
If the total cost function for a manufacturer is given by
6q2
c = + 6000
q + 2
Find the marginal cost function.
Problem 4: Marginal revenue
If the demand function is given by
p = 25
ln(q + 2)
Find the marginal revenue function.
Problem 5: Rate of return
To erect an office building, fixed cost are $1.44 million and include land, architect’s fee, a basement, a foundation and so on. If x floors are constructed, the cost (excluding fixed cost) is:
c = 10x éë120, 000 + 300 ( x -1)ùû
The revenue per month is $60,000 per floor. How many floors will yield a maximum rate of return on investment? (Rate of return = total revenue/ total cost)
Problem 6: Elasticity of Demand
The sole producer of a product has determined that the marginal revenue function is:
dr = 100 – 3q2
dq
Determine the point elasticity of demand for the product when q = 5 (Hint: First find the demand function).
Problem 7: Total cost
A manufacturer’s marginal cost function is
dc = 0.004q2 – 0.5q + 50
dq
If c in dollars, determine the cost involved to increase production from 90 to 180 units.