Step 4: Solve for the unknown. At this point, you have two algebraic
relationships:
l + s = 70
l = s + 20
Since the question asked for the length of the shorter piece, the final step is to
use substitution to solve for s. Substitute (s + 20) for l in the first equation: (s
+ 20) + s = 70. Solve for s:
2 s + 20 = 70
2 s = 50
s = 25
Price and Quantity Relationships
Some word problems will require you to recognize the following relationship:
(price/unit) × (number of units) = total price
Though it might be intimidating, this is a translation that most people use every
day. To illustrate this, look at the following example:
If Bob purchased 15 $30 shirts, how much money did he pay for all the
shirts?
SOLUTION: Plug the values into the given formula. The price per shirt is $30,
and the number of shirts is 15. Thus the total price is 30 × 15 = $450.
Now look at a more GRE-like example:
Bob spends a total of $140 at a certain shop, where he purchases a total of 20
shirts and ties. If the price of each shirt is $10, and the price of each tie is $5,
how many shirts does he buy?
Step 1: Assign variables. Since you are not given a value for the number of
shirts or the number of ties, let s = the number of shirts and t = the number
of ties.
Step 2: Identify relationships. There are two relationships in the question:
Relationship 1: Bob purchases a total of 20 shirts and ties. Thus t + s = 20.
Relationship 2: The total amount Bob pays for the shirts and ties is
$14 0. This amount will be the sum of the amount he paid for the shirts
and the amount he paid for the ties. If each shirt costs $10, then he paid
10 s for all the shirts. If each tie costs $5, then he paid 5t for all the ties.
The algebraic relationship will be 10s + 5t = 14 0.
CHAPTER 12 ■ FROM WORDS TO ALGEBRA 315
04-GRE-Test-2018_313-462.indd 315 12/05/17 12:03 pm