Answer: The change in revenue for the sale of 1 more doghouse $ 66.67 dollars
Explanation: Differential is a function that can be used to approximate function value with a great degree of accuracy. This is done by the following.
Mathematical definition of derivative: f'(x) = lim f(x+Δx) - f(x)/Δx.
If Δx is very small:
f'(x) . Δx ≅ f(x+Δx) - f(x)
Knowing that Δy ≅ f(x+Δx) - f(x) and the diferential of variable x can be written by dx as the variable y can be dy:
dy = f'(x) dx
which means that the differential dy is approximately equal to the change Δy, if Δx is very small.
For the question, R(x) = y(x) = 14,000ln(0.01x+1)
f'(x) = [tex]\frac{d[14,000.ln(0.01x+1)]}{dx}[/tex]
Using the chain rule, the derivative will be:
f'(x) = 14,000.[tex]\frac{0.01}{0.01x+1}[/tex]
dy = 14,000.[tex]\frac{0.01}{0.01x+1}[/tex].dx
dx is the change in x. For the question, the change is 1 (1 more doghouse) and x is 110:
dy = 14,000[tex]\frac{0.01}{0.01.110+1}.1[/tex]
dy = [tex]\frac{140}{2.1}[/tex]
dy = 66.67
The change in revenue is $66.67 dollars.
