[email protected] wrote: ↑Sun May 12, 2013 11:02 am
A certain stock exchange designates each stock with the one, two or three letter code, where each letter is selected from the 26 letters of the alphabet. If the letters may be repeated and if the same letters used in a different order, constitute a different code, how many different stocks is it possible to uniquely designate with these codes?
a)2951
b)8125
c)15600
d)16302
e)18278
OA is
E
1-letter codes
26 letters, so there are 26 possible codes
2-letter codes
There are 26 options for the 1st letter, and 26 options for the 2nd letter.
So, the number of 2-letter codes = (26)(26) = 26²
3-letter codes
There are 26 options for the 1st letter, 26 options for the 2nd letter, and 26 options for the 3rd letter.
So, the number of 3-letter codes = (26)(26)(26) = 26³
So, the TOTAL number of codes = 26 + 26² + 26³
IMPORTANT: Before we perform ANY calculations, we should first look at the answer choices, because we know that the GMAT test-makers are very reasonable, and they don't care whether we're able make long, tedious calculations. Instead, the test-makers will create the question (or answer choices) so that there's an alternative approach.
The alternative approach here is to recognize that:
26 has
6 as its units digit
26² has
6 as its units digit
26³ has
6 as its units digit
So, (26)+(26²)+(26³) = (2
6)+(___
6)+(____
6) = _____
8
Since only E has
8 as its units digit, the answer must be E
Cheers,
Brent
