combined work

  1. math_celebrity

    Michelle can paint one car in 2 hours. It takes Tyler 3 hours to paint the same car while Colton tak

    Michelle can paint one car in 2 hours. It takes Tyler 3 hours to paint the same car while Colton takes 6 hours to paint the car. If they all work together, how long will it take them to paint the car? Setup unit rates: Michelle can paint 1/2 of the car in one hour Tyler can paint 1/3 of the...
  2. math_celebrity

    Hose A can fill a pool in 4 hours. Hose B can fill the pool in 2 hours. If both hoses are turned on

    Hose A can fill a pool in 4 hours. Hose B can fill the pool in 2 hours. If both hoses are turned on at the same time how long will it take to fill the pool? Hose A can fill the pool in 1/4 of the pool an hour Hose B can fill the pool in 1/2 of the pool an hour In one hour using combined...
  3. math_celebrity

    When Mike uses a riding mower, it takes him 3 hours to mow his lawn. When he uses a push mower, it t

    When Mike uses a riding mower, it takes him 3 hours to mow his lawn. When he uses a push mower, it takes him 6 hours to mow the lawn. (His sister also can mow the lawn with the push mower in 6 hours.). Mike wanted to get the lawn mowed as quickly as possible, so he paid his sister $10 to mow...
  4. math_celebrity

    Adam, Bethany, and Carla own a painting company. To paint a particular home, Adam estimates it woul

    Adam, Bethany, and Carla own a painting company. To paint a particular home, Adam estimates it would take him 4 days. Bethany estimates 5.5 days. Carla estimates 6 days. How long would it take them to work together to paint the house. Our combined work function for time (t) using a = Adam's...
  5. math_celebrity

    An experienced accountant can balance the books twice as fast as a new accountant. Working together

    An experienced accountant can balance the books twice as fast as a new accountant. Working together it takes the accountants 10 hours. How long would it take the experienced accountant working alone? Person A: x/2 job per hour Person B: 1/x job per hour Set up our equation: 1/x + 1/(2x) =...
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