Reuben and Claire are trying to run a marathon in the spring Ruben runs 60 miles over 4 day. Claire runs 12 me over a 3-day. Are they running at the same rate of speed respond one or yes or two for know
To determine if Reuben and Claire are running at the same rate of speed, we need to compare the distance they ran over the number of days.
Reuben: 60 miles ÷ 4 days = 15 miles per day
Claire: 12 miles ÷ 3 days = 4 miles per day
Therefore, Reuben and Claire are not running at the same rate of speed. Let's respond with ''No'' or ''Two''.
To determine if Reuben and Claire are running at the same rate of speed, we can compare their miles per day.
Reuben runs 60 miles over 4 days, so his average rate of speed is 60 miles / 4 days = 15 miles per day.
Claire runs 12 miles over 3 days, so her average rate of speed is 12 miles / 3 days = 4 miles per day.
Since Reuben runs at a rate of 15 miles per day and Claire runs at a rate of 4 miles per day, they are not running at the same rate of speed. Therefore, the answer is two (no).
To determine if Reuben and Claire are running at the same rate of speed, we need to equate their distances and compare the amount of time they took.
First, let's convert the distances to the same unit (either miles or kilometers). Let's assume both Reuben and Claire are running in miles for now.
Reuben runs 60 miles in 4 days, so we can calculate his average speed as 60 miles / 4 days = 15 miles per day.
Claire runs 12 miles in 3 days, so her average speed is 12 miles / 3 days = 4 miles per day.
Since Reuben runs at a speed of 15 miles per day and Claire runs at a speed of 4 miles per day, we can conclude that they are not running at the same rate of speed.
Therefore, the answer is "No" or "Two" - they are not running at the same rate of speed.