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22 December, 01:06

Tony drove to the mountains last weekend. There was heavy traffic on the way there, and the trip took hours. When Tony drove home, there was no traffic and the trip only took hours. If his average rate was miles per hour faster on the trip home, how far away does Tony live from the mountains? Do not do any rounding.

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  1. 22 December, 01:34
    0
    Question not completed, so I analysed the question first

    Tony drove to the mountains last weekend. there was heavy traffic on the way there, and the trip took 6 hours. when tony drove home, there was no traffic and the trip only took 4 hours. if his average rate was 22 miles per hour faster on the trip home, how far away does tony live from the mountains?

    Explanation:

    Let use variables to solve the problems

    Let the first trip to be mountain take x hours

    Let the trip back home take y hours

    Let the speed to while going to the mountain be a miles/hour

    Then, while going home it was b miles/hour faster than while going to the mountain.

    Then, speed going home is (a+b) miles / hour

    The formula for speed is given as

    Speed=distance/time

    The constant through out the journey is distance, the two journey has the same distance.

    Then,

    Distance = speed*time

    For first journey going to the mountain

    Distance = a*x=ax miles

    For the second journey going home

    Distance = y * (a+b)

    Distance Mountain = distance home

    ax=y (a+b)

    Make a subject of the formula

    ax=ya+yb

    ax-ya=yb

    a (x-y) = yb

    a=yb / (x-y)

    Therefore, distance from mountain is

    Distance=speed * time

    Distance = a*x=ax

    Now, applying the questions

    So from the questions

    x=6hours, y=4hours

    Also, b=22miles/hour

    Then,

    a=yb / (x-y)

    a=4*22 / (6-4)

    a=88/2

    a=44miles/hour

    Then, the house distance from the mountain is

    Distance=ax

    Distance = 44*6

    Distance = 264miles
  2. 22 December, 02:22
    0
    480 miles.

    Explanation:

    Let, S = rate on his way to the mountains.

    Assume, Sgoing x time going = Sreturning x time returning

    = S * 12 hours = (S + 20mph) * 8 hours

    = 12 * S = 8 * S + 160.

    4 * S = 160

    S = 40 miles/hour

    The trip took 12 hours at 40 miles per hour, so distance was:

    = 12 hours * 40 mph

    = 480 miles.
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