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17 Sep 2010, 05:39
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D
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
75%
(hard)
Question Stats:
61% (02:50) correct
39%
(02:37)
wrong
based on 587
sessions
History
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How many integers k greater than 100 and less than 1000 are there such that if the hundreds and the unit digits of k are reversed, the resulting integer is k + 99?
A. 50
B. 60
C. 70
D. 80
E. 90
A. 50
B. 60
C. 70
D. 80
E. 90
17 Sep 2010, 06:13
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vanidhar
Some wording. Anyway:
\(k\) is 3-digit integer. Any 3 digit integer can be expressed as \(100a+10b+c\).
Now, we are told that \((100a+10b+c)+99=100c+10b+a\) --> \(99c-99a=99\) --> \(c-a=1\) --> there are 8 pairs of \(c\) and \(a\) possible such that their difference to be 1: (9,8), (8,7), ..., and (2,1) (note that \(a\) can not be 0 as \(k\) is 3-digit integer and its hundreds digit, \(a\), is more than or equal to 1).
Also, \(b\), tens digit of \(k\), could tale 10 values (0, 1, ..., 9) so there are total of 8*10=80 such numbers possible.
Example:
102 - 201;
112 - 211;
122 - 221;
...
899 - 998.
Answer: D.
General Discussion
17 Sep 2010, 06:16
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vanidhar
Not sure if this is the shortest.. But this is how I did this
There are 8 sets of integers with hundreds and units digits exchanged that satisfies k + 99.
1. 102 | 201 (satisfies k+99, where k = 102)
2. 203 | 302 (satisfies k+99, where k = 203)
3. ...
4. ...
5. ...
6. ...
7. 708 | 807
8. 809 | 908
Each set has 10 such numbers.
1. 102 | 201 (still k+99 holds good)
2. 112 | 211
3. 122 | 221
4. 132 | 231
5. ...
6. ...
7. ...
8. ...
9. 182 | 281
10. 192 | 291
Therefore, 8 sets with 10 such number in each set will give 8 x 10 = 80 integers.
