SOLUTION: Jack, Kay, and Lynn deliver advertising flyers in a small town. If each person works alone, it takes Jack 2 h to deliver all the flyers, and it takes Lynn 5 h longer than it takes

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Question 1132886: Jack, Kay, and Lynn deliver advertising flyers in a small town. If each person works alone, it takes Jack 2 h to deliver all the flyers, and it takes Lynn 5 h longer than it takes Kay. Working together, they can deliver all the flyers in 60% of the time it takes Kay working alone. How long does it take Kay to deliver all the flyers alone?
Found 2 solutions by josgarithmetic, greenestamps:
Answer by josgarithmetic(39617) (Show Source):
You can put this solution on YOUR website!

Answer by greenestamps(13200) (Show Source):
You can put this solution on YOUR website!

Let k be the number of hours Kay takes to do the job alone; then k+5 is the number of hours it takes Lynn alone. We are given that it takes Jack 2 hours to do the job.

So the fractions the three of them do alone in 1 hour are 1/2, 1/k, and 1/(k+5).

Working together, it takes the three of them 60% as long as it takes Kay alone. Since it takes them 3/5 as long as Kay working alone, in 1 hour the fraction of the job they get done together is 5/3 as much as Kay alone does in 1 hour. Then the equation to solve is

Multiply everything by the LCM of the denominators, 6k(k+5):

Obviously choose the positive solution, k=1.

ANSWER: It takes Kay 1 hour to deliver all the flyers alone.