<p>*Jan can mow her lawn in 60 minutes by herself, if she hires Wally to do it, he takes 30 minutes, while Peter can do it in 40 minutes. If Jan starts mowing her lawn for 15 minutes then decides to hire Wally and Peter to help her finish, how long will it take (in hours) from when Jan started to when the three finished together?? </p>
<p>A 1/6 hours</p>
<p>B 5/12 hours</p>
<p>C 7/12 hours</p>
<p>D 3/4 hours</p>
<p>E 5/6 hours </p>
<p>I just don't know how to do it ! help
thanks in advance</p>
<p>Together, they can mow 3/40(1/60+1/30+1/30) of the lawn in one minute.
Then you can say that 3/40x=3/4. x=10. 3/4 is the remaining part of the lawn to be mowed(1-(15/60)). 15/60 + 10/60 = 5/12</p>
<p>Dunkin_Donuts is right, but to avoid confusion, I'm just pointing out that he or she meant "3/40(1/60 + 1/40 + 1/30) in that first line. Otherwise he's exactly right.</p>
<p>I did it differently (I think), although I used Dunkin_Donuts' explanation as a start. I'll try to explain:</p>
<p>Jan mowes the lawn in 60 minutes. That means that she finishes 1/60 of the lawn in one minute. Wally and Peter can mow 1/30 and 1/40 per minute, respectively. Therefore, the three can mow 1/60 + 1/30 + 1/40 = 9/120 of the lawn in one minute.
They have to mow 90/120 ( = 3/4 ) of the lawn, because Jan has already mowed 1/4. If it takes them 1 minute to mow 9/120, it takes 10 minutes to mow 90/120, because time is proportional to the amount of mowed lawn:</p>