You would divide the distance by the rate (speed). For example, if you're going 60 miles an hour, and traveling a distance of 80 miles, you would divide 80 by 60, which equals 1.33 hours, which is an hour and one third of an hour. So it would be an hour and 20 minutes since 1/3 of an hour is 20 minutes.
the distance is d=rt distance = rate times time.
The formula that relates distance, time, and rate (or speed) is: [ \text{Distance} = \text{Rate} \times \text{Time} ] Where: **Distance** is how far something travels, **Rate** (or speed) is how fast it is traveling, **Time** is how long it has been traveling. You can rearrange this formula depending on what you need to solve for: To find **Rate**: [ \text{Rate} = \frac{\text{Distance}}{\text{Time}} ] To find **Time**: [ \text{Time} = \frac{\text{Distance}}{\text{Rate}} ] Click Here : ln.run/1Qu1h
The formula is Distance=Rate x Time (or distance equals rate multiplied by time). When you take this into account, you can manipulate it to solve for rate or time instead of distance. In other words, you could rewrite it as Rate= Distance/Time (rate equals distance divided by time) and Time= Distance/Rate (time equals distance divided by rate) in case they ask for what the Rate or Time is instead of Distance.
yes; distance divided by time
To find the average speed or rate of something.(:
Distance = (rate)(time). Where distance is equal to the rate times the time.
d=rt Distance=Rate (Speed) x Time This equation can be used to find Distance, Rate, and Time.
the distance is d=rt distance = rate times time.
Generally: RATE = DISTANCE / TIME -or- DISTANCE = RATE * TIME -or- TIME = DISTANCE / RATE qed
The formula that relates distance, time, and rate (or speed) is: [ \text{Distance} = \text{Rate} \times \text{Time} ] Where: **Distance** is how far something travels, **Rate** (or speed) is how fast it is traveling, **Time** is how long it has been traveling. You can rearrange this formula depending on what you need to solve for: To find **Rate**: [ \text{Rate} = \frac{\text{Distance}}{\text{Time}} ] To find **Time**: [ \text{Time} = \frac{\text{Distance}}{\text{Rate}} ] Click Here : ln.run/1Qu1h
Distance divided by time
The formula is Distance=Rate x Time (or distance equals rate multiplied by time). When you take this into account, you can manipulate it to solve for rate or time instead of distance. In other words, you could rewrite it as Rate= Distance/Time (rate equals distance divided by time) and Time= Distance/Rate (time equals distance divided by rate) in case they ask for what the Rate or Time is instead of Distance.
yes; distance divided by time
You can calculate the time it takes to travel by dividing the distance by the rate. The formula is time = distance / rate. This will give you the time in hours it takes to travel the given distance at the given rate.
distance = rate x time the distance is increased or decreased in direct proportion to the rate or time. If the rate doubles the distance doubles in given time; If the time doubles the distance doubles at a given rate.
Distance = Rate x Time Rate = Distance/Time, not Time/Distance
To find the average speed or rate of something.(: