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Warm Up

Warm Up. Math 8H. Problem Solving Day 2 Rate  Time = Distance. Algebra 1 Glencoe McGraw-Hill JoAnn Evans. d + d = d Distance + distance = total vehicle 1 vehicle 2 distance The two vehicles will either be starting at opposite ends and

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Warm Up

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  1. Warm Up

  2. Math 8H Problem Solving Day 2 Rate  Time = Distance Algebra 1 Glencoe McGraw-Hill JoAnn Evans

  3. d + d = d Distance + distance = total vehicle 1 vehicle 2 distance The two vehicles will either be starting at opposite ends and traveling toward each other -or- they will start at the same place and travel in opposite directions until they reach a given distance apart. d = d distance of = distance of vehicle 1 vehicle 2 This is the “catch up” formula. The first vehicle will start, then the second vehicle will begin at a later time , traveling at a faster speed, until it catches up with the first vehicle. -or- It is the “round trip” formula. Two Types of rate • time = distanceProblems:

  4. Example 1: d + d = total distance Two trains left the same station at the same time and traveled in opposite directions. The E train averaged 130 km/h and the A train’s speed was 110 km/h. In how many hours were they 480 km apart? start E train A train 480 km apart The problem gives the distance and the rates. You need to find the time. Let t = time

  5. Verbal Sentence: E train’s distance +A train’s distance = total distance d+d= d Remember: d = rt rt+rt= d Equation: 130t + 110t=480 Solution: The trains were 480 km apart in 2 hrs.

  6. Example 2: d + d = total distance Two cars traveled in opposite directions from the same starting point. The rate of one car was 20 km/h less than the rate of the other car. After 5 hours, the cars were 700 km apart. Find the rate of each car. start Faster Car Slower car 700 km apart The problem gives the distance and the time. You need to find the rate. Let r =rate of faster car Let r – 20 = rate of slower car

  7. Verbal Sentence: faster car’s dist. +slower car’s dist. = total distance d +d= d Remember: d = rt rt +rt= d Equation: r•5+(r-20)5= 700 Solution: The faster car is 80 km/h and the slow is 60 km/h.

  8. Example 3: d = d Sam started out in his car traveling at 60 mph. Two hours later, Jenny left from the same point. She traveled along the same road at 75 mph. After how many hours will she catch up with Sam? Sam’s car Point where Jenny caught up start Jenny’s car The problem gives the rate. You need to find the time. Let t = Jenny’s time Let t + 2 = Sam’s time (he started 2 hrs earlier)

  9. Verbal Sentence: Jenny’s distance=Sam’s distance d= d Remember: d = rt rt = rt Equation: 75t = 60(t + 2) Solution: It took Jenny 8 hours to catch up with Sam.

  10. Example 4: d = d The Wagner family drove to the beach at 75 km/h. They returned later in heavy traffic, slowed to 50 km/h. It took 1 hour longer to return home than it did to get to the beach. How long did it take to get home? to the beach return home The problem gives the rate. You need to find the time. Let t = time to return home Let t - 1 = time it took to get to beach

  11. Verbal Sentence: distance home =distance to beach Remember: d = rt rt=rt Equation: 50t =75(t – 1) Solution: It took 3 hours to return home. d =d

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