Answer:
(a) See attachment 1.
(b) Cost to supply 25% C = $8,333
Cost to supply 50% C = $25,000
Cost to supply 85% C = $141,667
(c) b. No
d. The function is undefined at p = 100
Step-by-step explanation:
Given function:
[tex]C=\dfrac{25000p}{100-p} \quad \quad 0 \leq p < 100[/tex]
where:
- C is the cost (in dollars)
- p is the percentage of the population
Part (a)
See attachment 1 for the graph of the function.
Part (b)
To find the costs of supplying bins to 25%, 50%, and 85% of the population, find the y-values of the points on the graph when p = 25, p = 50 and p = 85. (See attachment 2).
- Cost to supply 25% C = $8,333
- Cost to supply 50% C = $25,000
- Cost to supply 85% C = $141,667
Part (c)
According to this model, it would NOT be possible to supply bins to 100% of the residents.
As the function is a rational function, the function is undefined when p = 100, as when p = 100 the denominator is zero.
