23 select the correct answer from each drop - down menu. a local movie theater is trying to find the best…

23 select the correct answer from each drop - down menu. a local movie theater is trying to find the best price at which to sell popcorn. to reach its goal of making at least $50,000 from popcorn sales this year, the theater decided to hire a consulting firm to analyze its business. the firm determined that the best - case scenario for the theaters revenue generated from popcorn sales, while meeting its revenue goals, is given by this system of inequalities, where r represents the revenue in tens of thousands of dollars and p represents the sale price of popcorn in dollars. r ≤ - 0.23p² + 2.25p r ≥ 5 complete the statements about the systems possible solutions. the point (4,6) is of this system. the point (6,5) is of this system. reset next
Answer
Answer:
The point $(4,6)$ is not a solution of this system. The point $(6,5)$ is a solution of this system.
Explanation:
Step1: Substitute $(4,6)$ into inequalities
For $r\leq - 0.23p^{2}+2.25p$, substitute $r = 6$ and $p = 4$. $6\leq-0.23\times4^{2}+2.25\times4$ $6\leq-0.23\times16 + 9$ $6\leq-3.68+9$ $6\leq5.32$ (False) For $r\geq5$, $6\geq5$ (True), but since one - inequality fails, it's not a solution.
Step2: Substitute $(6,5)$ into inequalities
For $r\leq - 0.23p^{2}+2.25p$, substitute $r = 5$ and $p = 6$. $5\leq-0.23\times6^{2}+2.25\times6$ $5\leq-0.23\times36+13.5$ $5\leq - 8.28+13.5$ $5\leq5.22$ (True) For $r\geq5$, $5\geq5$ (True), so it's a solution.