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09 Jun 2015, 08:23
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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:
45%
(medium)
Question Stats:
67% (01:58) correct
33%
(02:10)
wrong
based on 253
sessions
History
Date
Time
Result
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How many positive 5-digit integers have the odd sum of their digits ?
A. \(9*10^2\)
B. \(9*10^3\)
C. \(10^4\)
D. \(45*10^3\)
E. \(9*10^4\)
A. \(9*10^2\)
B. \(9*10^3\)
C. \(10^4\)
D. \(45*10^3\)
E. \(9*10^4\)
17 Jun 2015, 12:10
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Official Solution:
How many positive 5-digit integers have the odd sum of their digits ?
A. \(9*10^2\)
B. \(9*10^3\)
C. \(10^4\)
D. \(45*10^3\)
E. \(9*10^4\)
Exactly half of all 5-digit integers will have an odd sum of their digits and the other half will have an even sum.
Let's consider the first ten 5-digit integers: 10,000 through 10,009. Half of them have an even sum of digits and the other half have an odd sum.
We can then move to the next ten 5-digit integers: 10,010 through 10,019. Again, half of them have an even sum and half have an odd sum.
This pattern continues for all 5-digit integers.
Since there are \(9*10^4\) 5-digit integers, half of them, which is \(45*10^3\), will have an odd sum of their digits.
Answer: D
How many positive 5-digit integers have the odd sum of their digits ?
A. \(9*10^2\)
B. \(9*10^3\)
C. \(10^4\)
D. \(45*10^3\)
E. \(9*10^4\)
Exactly half of all 5-digit integers will have an odd sum of their digits and the other half will have an even sum.
Let's consider the first ten 5-digit integers: 10,000 through 10,009. Half of them have an even sum of digits and the other half have an odd sum.
We can then move to the next ten 5-digit integers: 10,010 through 10,019. Again, half of them have an even sum and half have an odd sum.
This pattern continues for all 5-digit integers.
Since there are \(9*10^4\) 5-digit integers, half of them, which is \(45*10^3\), will have an odd sum of their digits.
Answer: D
General Discussion
31 Aug 2015, 12:07
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Why should exactly half of the numbers have odd sum of their digits and half even?? Is it due to the principle of symmetry? Can you please give me an example?
