The best way to solve this problem is to translate into algebra, and then to combine the equations.
Let
b be the cost, in dollars of a bagel. Let
c be the cost, in dollars, of a coffee.
| A bagel and a coffee cost |
$1.65 |
can be translated as |
b |
+ |
c |
= |
| 1.65 |
Two bagels and a coffee cost |
$2.60 |
can be translated as |
| If you subtract the first equation from the second equation, you |
So now we know the price of a bagel. But that is NOT what the question is asking for. It's asking for the price of a coffee (Notice that choice (E) - $0.95, is the price of a bagel - a choice included to trap the test taker who is not paying attention.) In order to find the price of a coffee, we can now use the first equation, which is
So a coffee costs $0.70, which is choice (C).
So now we know the price of a bagel. But that is NOT what the question is asking for. It's asking for the price of a coffee (Notice that choice (E) - $0.95, is the price of a bagel - a choice included to trap the test taker who is not paying attention.) In order to find the price of a coffee, we can now use the first equation, which is
| b |
+ |
c |
= |
1.65. |
b |
+ |
0.95 |
= |
1.65, |
b |
= |
1.65 |
- |
0.95 |
= |
0.70. |
So a coffee costs $0.70, which is choice (C).
