Scott delivers 14 newspapers in 10 min . This is \( 28 \% \) of his a) How many more papers does Scott have to deliver? b) Scott continues to deliver papers at the same rate. How long will it take him to deliver all his papers?

Scott delivers 14 newspapers, which is \( 28\% \) of his total delivery. To find the total number of newspapers he has to deliver, we can set up the equation \( 14 = 0.28 \times T \), where \( T \) is the total number of newspapers. Solving for \( T \), we can divide 14 by 0.28 to find that Scott has a total of 50 newspapers to deliver. To find out how many more he needs to deliver, we can subtract what he has already delivered: \( 50 - 14 = 36 \). If Scott maintains the same rate of delivery, he delivers 14 newspapers every 10 minutes. Since he has 36 papers left to deliver, we can calculate how long it will take him by setting up the proportion: \( \frac{10 \text{ min}}{14 \text{ papers}} \times 36 \text{ papers} \). This gives us \( \frac{10 \times 36}{14} = 25.71 \text{ min} \), or approximately 25 minutes and 43 seconds to deliver the remaining papers.