McGraw-Hill Education GRE 2019

(singke) #1
r × t = w

5 × t = 100
Solve for t: t = 20 seconds.


  1. B Let s = Sam’s rate. Bob’s rate is thus 2s, and their combined rate is s + 2s = 3s.
    Now use the r × t = w formula to find the value for s.
    r × t = w

    3 s × 12 = 1
    36 s = 1
    s = 361
    Bob’s rate is twice Sam’s rate, so Bob’s rate is 2( 361 ) = 181. Now plug this rate into
    the r × t = w formula.
    r × t = w

    181 × t = 1
    t = 18

  2. D Use the r × t = w table to determine the number of minutes it will take
    Machine A to produce 40 more widgets than machine B. Machine A’s rate is
    widgets/minute =^152 , and Machine B’s rate is widgets/minute =^203. Since the
    machines start at the same time, use t to represent each of their times. Plug
    these values into the table.
    r × t = w

    Machine A 152 t =^152 t
    Machine B 203 t =^203 t
    Represented algebraically, Machine A’s work is thus^152 t and Machine B’s
    work is^203 t. You know that Machine A produces 40 more widgets, so
    15 t
    2 = 40 +


20 t
3. Now solve for t:
Bring t to one side: 152 t –^203 t = 40

Get a common denominator: 456 t –^406 t = 40

352 PART 4 ■ MATH REVIEW

04-GRE-Test-2018_313-462.indd 352 12/05/17 12:04 pm

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