Unit Conversion: Time & Distance

Problem: Two boys are 1250 meters apart when one begins walking toward the other. If one walks at a rate of 2 meters per second and the other, who starts walking toward the first boy four minutes later, walks at the rate of 1.5 meters per second, how long will it take for them to meet?

Step 1: Boy 1 has a head start of 4 minutes. Converting all measurements to seconds: $\displaystyle 4(60)= 240$ seconds.

Step 2: Here is where I am having difficulties. The author states "Because the rate is given in meters per second, all times will be converted to seconds.) So he has traveled $\displaystyle 240(2)=480$ meters. Why did we take the head start converted into seconds of $\displaystyle 240 $ and multiply it by $\displaystyle 2$ to get $\displaystyle 480$ meters?

Googled around for it and I am confused because meters is a unit of distance, and seconds is a unit of time.

Re: Unit Conversion: Time & Distance

Quote:

Originally Posted by

**allyourbass2212** Why did we take the head start converted into seconds of $\displaystyle 240 $ and multiply it by $\displaystyle 2$ to get $\displaystyle 480$ meters?

How else would you calculate the distance the first boy walked during his head start?

Re: Unit Conversion: Time & Distance

Quote:

Originally Posted by

**emakarov** How else would you calculate the distance the first boy walked during his head start?

Let me make sure I understand this correctly

Boy 1 head start = 4(60)= 240 seconds

Boy 1 : "If one walks at a rate of 2 meters per second" 2 mps * 240 seconds = 480 meters

Re: Unit Conversion: Time & Distance

Quote:

Originally Posted by

**allyourbass2212** Boy 1 head start = 4(60)= 240 seconds

Boy 1 : "If one walks at a rate of 2 meters per second" 2 mps * 240 seconds = 480 meters

Yes.

Re: Unit Conversion: Time & Distance

attraction signs

In the *Time* calculator, enter the *distance* value and *conversion units* designation. Then enter the speed value and *conversion* designation for it