McGraw-Hill Education GRE 2019

(singke) #1
r × t = w
16 t =^12

Solve for t: t =

1
2
1
6

=^12 × 6 = 3.



  1. B Let r be the rate of each machine. If 4 work together, their combined rate
    is 4r. You are told that these 4 machines will fill the production lot in 3 hours.
    Plug these values into the r × t = w formula:
    r × t = w

    4 r × 3 = 1
    12 r = 1
    r = 121
    The rate of each machine, in production lots/hour, is 121. Now plug this value
    into the r × t = w formula to determine how many machines, y, would be
    necessary to fill the lot in 30 minutes. Since your rate is in lots/hour, express 30
    minutes as 0.5 hours.
    r × t = w

    y( 121 ) × 0.5 = 1
    Solve for y:
    12 y×^12 = 1
    24 y = 1
    y = 24

  2. B Rate = worktime, so the rate of the first cook, in batches per minute, is 201 , and
    the rate of the second cook, in batches per minute, is 101. To get their combined
    rate, add up these rates: 101 + 201 = 203. To determine how long it will take the
    cooks to produce 3 batches, use the r × t = w formula:
    r × t = w

    203 t = 3
    Solve for t: t = 20 minutes. The question asks for how many hours it will take,
    so convert minutes to hours. 20 minutes is^13 of an hour.

  3. C The rate at which the tank fills will be the difference between the rate of the
    hose filling the tank and the rate at which the tank empties: 15 liters/second –
    10 liters/second = 5 liters/second. Since the question asks for the time at which
    the tank will be half full, the work is 100 liters. Now use the r × t = w formula
    to solve the problem:


CHAPTER 12 ■ FROM WORDS TO ALGEBRA 351

04-GRE-Test-2018_313-462.indd 351 12/05/17 12:04 pm

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