McGraw-Hill Education GRE 2019

(singke) #1
s + t = 10
40 s + 20t = 340
To solve for s, use substitution. First, manipulate the first equation to express
t in terms of s: t = 10 – s. Next, substitute that expression for t in the second
equation: 40s + 20(10 – s) = 340. Solve for s:
40 s + 20(10 – s) = 340
40 s + 200 – 20s = 340
20 s = 14 0
s = 7


  1. A Let c = the price of each computer and m = the price of each monitor.
    The manufacturer thus paid a total of $3c for the computers and $5m for the
    monitors. The sum of these values equals $4,000: 3c + 5m = 4,000. The other
    algebraic relationship you can create from the information is c = 5m. There are
    now two equations:
    3 c + 5m = 4,000
    c = 5m
    To solve for m, substitute 5m in for c in the first equation: 3(5m) + 5m = 4,000.
    Distribute and combine like terms: 20m = 4,000. Solve for m: m = 200.

  2. D The question asks you to determine the amount paid per friend. This can
    be expressed as the following ratio: total bill/number of people paying. The
    numerator of this ratio will be 800. The denominator will be the total number
    of friends splitting the bill after x do not pay. If there were 10 friends originally,
    and x do not pay, the number of people paying is 10 – x. Thus the ratio will
    be 10 –^800 x.

  3. D Let b = Bob’s current age and j = Jack’s current age. You are asked to solve
    for b + 5. Use the assigned variables to construct algebraic relationships. The
    first sentence provides a relationship between Bob’s current age and Jack’s
    current age: b = j + 10. The second sentence provides a relationship between
    their ages in 2 years: b + 2 = 2(j + 2). Use substitution to solve for b:
    Step 1: Manipulate the first equation to write j in terms of b: b – 10 = j
    Step 2: Substitute b – 10 for j in the second equation:


b + 2 = 2(b – 10 + 2)
b + 2 = 2(b – 8)
b + 2 = 2b – 16
18 = b
In 5 years, Bob will be 23.


  1. D Since you are asked to solve for the length of the call, you should assign a
    variable: l = length of the call. The total charge of $5.75 consists of two parts:
    the charge for the first minute and the charge for all subsequent minutes. The


CHAPTER 12 ■ FROM WORDS TO ALGEBRA 323

04-GRE-Test-2018_313-462.indd 323 12/05/17 12:03 pm

Free download pdf