1992 AIME Problems/Problem 1

Problem

Find the sum of all positive rational numbers that are less than 10 and that have denominator 30 when written in lowest terms.

Solution

Solution 1

There are 8 fractions which fit the conditions between 0 and 1: $\frac{1}{30},\frac{7}{30},\frac{11}{30},\frac{13}{30},\frac{17}{30},\frac{19}{30},\frac{23}{30},\frac{29}{30}$

Their sum is 4. Note that there are also 8 terms between 1 and 2 which we can obtain by adding 1 to each of our first 8 terms. For example, $1+\frac{19}{30}=\frac{49}{30}.$ Following this pattern, our answer is $4(10)+8(1+2+3+\cdots+9)=400.$

Solution 2

By Euler's Totient Function, there are $8$ numbers that are relatively prime to $30$ , less than $30$ . Note that they come in pairs $(m,30-m)$ which result in sums of $!$ ; thus the sum of the smallest $8$ rational numbers satisfying this is $\frac12\cdot8\cdot1=4$ . Now refer to solution 1.

Solution 3

By the Gauss Summation Formula, there is a total sum of \frac{299*300}{2} for the numbers less than 10. The prime factorization of 30 is 2*3*5, therefore subtract 2\frac{149*150}{2} for the factors of 2, 3\frac{99*100}{2} for the factors of 3, and 5\frac{59*69}{2} for the factors of 5. Now add 6\frac{49*50}{2} for the factors of 6 subtracted twice, 10\frac{29*30}{2} for the factors of 10, and 15\frac{19*20}{2} for the factors of 15. Finally, subtract 30\frac{9*10}{2} to account for the intersection between the factors of 10 and 15. Dividing the final sum 12000 by 30 obtains the solution of 400.

1992 AIME (Problems • Answer Key • Resources)
Preceded by First question	Followed by Problem 2
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