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.
In the Land of OZ only one or two-letter words are used.
This topic has expert replies
GMAT/MBA Expert
- Jay@ManhattanReview
- GMAT Instructor
- Posts: 3008
- Joined: Mon Aug 22, 2016 6:19 am
- Location: Grand Central / New York
- Thanked: 470 times
- Followed by:34 members
Before the prohibition: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.
The number of 1-letter words = 66;
The number of 2-letter words = 66*66 = 66^2
Total number of words = 66 + 66^2
After the prohibition:
The number of 1-letter words = 65;
The number of 2-letter words = 65*65 = 65^2
Total number of words = 65 + 65^2
The number of words lost = [66 + 66^2] - [65 + 65^2] = 1 + [66^2 - 65^2] = 1 + (66 - 65)(66 + 65) = 1 + 1*(131) = 1 + 131 = 132.
The correct answer: E
Hope this helps!
-Jay
_________________
Manhattan Review GMAT Prep
Locations: New York | Singapore | Doha | Lausanne | and many more...
Schedule your free consultation with an experienced GMAT Prep Advisor! Click here.
GMAT/MBA Expert
- Brent@GMATPrepNow
- GMAT Instructor
- Posts: 16207
- Joined: Mon Dec 08, 2008 6:26 pm
- Location: Vancouver, BC
- Thanked: 5254 times
- Followed by:1268 members
- GMAT Score:770
Jay@ManhattanReview wrote:Jay's approach (above) is exactly how I would have solved it.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 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
-
- Master | Next Rank: 500 Posts
- Posts: 415
- Joined: Thu Oct 15, 2009 11:52 am
- Thanked: 27 times
Or you can focus on the words no longer permitted.
One letter word = 1 word lost
Two letter word: call first letter the forbidden letter. Then there are 65 other letters except for the forbidden one that can't be paired so 65 choices. Multiply by 2 since the forbidden letter can be swapped to the second position = 130 lost words.
Finally, recognize you can have a two letter word with both letters being forbidden = 1 lost word
Total lost words 132, E
One letter word = 1 word lost
Two letter word: call first letter the forbidden letter. Then there are 65 other letters except for the forbidden one that can't be paired so 65 choices. Multiply by 2 since the forbidden letter can be swapped to the second position = 130 lost words.
Finally, recognize you can have a two letter word with both letters being forbidden = 1 lost word
Total lost words 132, E
GMAT/MBA Expert
- Scott@TargetTestPrep
- GMAT Instructor
- Posts: 7271
- Joined: Sat Apr 25, 2015 10:56 am
- Location: Los Angeles, CA
- Thanked: 43 times
- Followed by:29 members
We are given that in the Land of OZ only one- or two-letter words are used. If all 66 letters can be used, then we have: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
1-letter words = 66
2-letter words = 66^2
Thus, there are 66 + 66^2 words if all 66 letters can be used.
When the seventh letter is taken away, we have:
1-letter words = 65
2-letter words = 65^2
Thus, there are 65 + 65^2 words when the seventh letter is taken away.
The number of lost words is:
(66 + 66^2) - (65 + 65^2)
66 + 66^2 - 65 - 65^2
1 + 66^2 - 65^2
Noting that the expression 66^2 - 65^2 is a difference of squares, we have:
1 + (66 - 65)(66 + 65)
1 + (1)(131) = 132
Answer: E
Scott Woodbury-Stewart
Founder and CEO
[email protected]
See why Target Test Prep is rated 5 out of 5 stars on BEAT the GMAT. Read our reviews