AIME I Algebra Arithmetic Math Olympiad USA Math Olympiad

Problem on Rational Numbers | AIME I, 1992 | Question 1

Try this beautiful problem from the American Invitational Mathematics Examination I, AIME I, 1992 based on Rational Numbers.

Problem on Rational Numbers – AIME I, 1992

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

  • is 107
  • is 400
  • is 840
  • cannot be determined from the given information

Key Concepts


Rational Numbers

Euler’s Totient Function

Check the Answer

Answer: is 400.

AIME I, 1992, Question 1

Elementary Number Theory by David Burton

Try with Hints

For Euler’s Totient function, there exists 8 numbers that are relatively prime to 30, less than 30.

Here they are in (m,30-m) which in the form of sums of 1

\(\Rightarrow\) sum of smallest eight rational numbers=4

there are eight terms between 0 and 1 and there are eight terms between 1 and 2 where these we get as adding 1 to each of first eight terms

\(\Rightarrow\) 4(10)+8(1+2+3+…+9)=400.

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