Algebra word problem...?

John can drive 240 miles in the same time as it takes George to drive 220 miles. If John drives 5 mph faster than George, then how fast does John drive?

Comments

  • Use J for John's speed and G for George's:

    J = G + 5 (John drives 5mph faster)

    240 = J * t (distance is rate times time)

    220 = G * t

    Divide both sides of the second equation by J and both sides of the third by G:

    t = 240 / J

    t = 220 / G

    Since the time is the same, set the two right sides equal to each other:

    240 / J = 220 / G

    Substitute G + 5 (from the first equation) for J:

    240 / (G + 5) = 220 / G

    Cross-multiply:

    240G = 220(G + 5)

    Multiply out the right side:

    240G = 220G + 1100

    Subtract 220G from both sides:

    20G = 1100

    Divide both sides by 20:

    G = 1100 / 20 = 55

    George drives at 55 mph. Going 5 mph faster, John drives at 60 mph.

  • Ok, John's speed is 240/t and George's is 220/t and we are given 240/t - 220/t = 5

    First multiply everything by t to get rid of the fractions.

    240 - 220 = 5t

    5t = 20

    t = 4

    George's speed is 55 and John's is 60. Time is 4 hours.

  • 240/J = 220/(J-5)

    24J-120 = 22J

    2J = 120

    J = 60 mph

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