a stores daily profit, $p$, in dollars, can be modeled by the quadratic function $p(d)=-2d^{2}+20d - 48$…

a stores daily profit, $p$, in dollars, can be modeled by the quadratic function $p(d)=-2d^{2}+20d - 48$, where $d$ represents the number of days since a new marketing campaign started. what does the point $(5, p(5))$ represent in the context of the stores profit? a five days into the campaign, the store will reach its last day of profit. b the store will lose money five days into the campaign. c five days into the campaign, the store will have a profit of $p(5)$ dollars. d the stores profit will increase at a steady rate after five days into the campaign.
Answer
Brief Explanations:
In the function $P(d)=- 2d^{2}+20d - 48$, $d$ is the number of days since the marketing - campaign started and $P(d)$ is the daily profit. When $d = 5$, the point $(5,P(5))$ means that when 5 days have passed since the start of the campaign, the profit of the store is $P(5)$ dollars.
Answer:
C. Five days into the campaign, the store will have a profit of $P(5)$ dollars.