Not sure how to set it up?
Nancy can do a full job in 3 hours, so her rate of work is "1 job per 3 hours". Or since she can to 1/3 of the job in one hour, we could say her rate is 1/3 job per hour. Likewise, Ned's rate is 1/5 job per hour. Let t be the number of hours working at the job. Then after t time, Nacy can do (1/3)t of the job and Ned can do (1/5)t. We want to add these together to add up to 1 (for "1 job", which means the whole project. So our equation is:
(1/3)t + (1/5)t = 1
You can multiply both sides of this by 15 to cancel out the fractions, then solve for t.
Reply:To set this one up, think about how much of the design each person can make in one hour. Since Nancy takes 3 hours, in one hour she will have finished 1/3 of the float. Likewise, Ned will have finished 1/5 of the float in one hour. So both of them working together can finish 1/3+1/5 of the float in one hour. You should be able to figure out the rest from here. =) If you need more help, just let me know.
Reply:There is a simple formula you can use: Together/Separate + Together/Separate = 1.
Let Nancy represent the first T/S and Ned represent the second T/S. We know the Separate times of each are 3 and 5 respectively. We are trying to find the time it Together takes them to do the one job.
Hence, set it up at x/3 + x/5 = 1. Find Least Common Denominator of 15.
Thus, 5x/15 + 3x/15 = 15/15. Since the x's are on top, you can basically ignore the denominator 15s for actually solving the problem.
5x + 3x = 15, means 8x = 15. So, x = 15/8 which is a little less than 2 hours. If you desire it to be in minutes, it is 7 and 1/2 minutes under 2 hours; ie, 1 hour and 52 and 1/2 minutes for them to do together.
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