Problem Solving

swerve wrote:In the Land of OZ, only one or two-letter words are used. The local language has 66 different letters. The parliament decided to forbid the use of the seventh letter. How many words have the people of OZ lost because of the prohibition?

A. 65
B. 66
C. 67
D. 131
E. 132

The OA is E.

Please, can anyone explain this PS question for me? I need help. I tried to solve it but I can't get the correct answer. Thanks.

Jay@ManhattanReview wrote:

swerve wrote:In the Land of OZ, only one or two-letter words are used. The local language has 66 different letters. The parliament decided to forbid the use of the seventh letter. How many words have the people of OZ lost because of the prohibition?

A. 65
B. 66
C. 67
D. 131
E. 132

Jay's approach (above) is exactly how I would have solved it.
The only way my approach differs is when we get to:

The number of words lost = [66 + 66²] - [65 + 65²]
At this point, we might notice that each of the 5 answer choices has a DIFFERENT UNITS DIGIT.
So, we can save some time by focusing solely on the UNITS DIGITS
For example, notice that 66² = ---6 [we need not concern ourselves with the other digits. We need only recognize that (66)(66) = some number with 6 as its units digit ]
Likewise 65² = (65)(65) = ----5

So, we get:
The number of words lost = [66 + 66²] - [65 + 65²]
= [66 + ---6] - [65 + ----5]
= (------2) - (----0)
= ------2

Since only answer choice E has a units digit of 2, the correct answer must be E

Cheers,
Brent

swerve wrote:In the Land of OZ, only one or two-letter words are used. The local language has 66 different letters. The parliament decided to forbid the use of the seventh letter. How many words have the people of OZ lost because of the prohibition?

A. 65
B. 66
C. 67
D. 131
E. 132