1990 AIME Problems/Problem 10

Problem

The sets $A = \{z : z^{18} = 1\}$ and $B = \{w : w^{48} = 1\}$ are both sets of complex roots of unity. The set $C = \{zw : z \in A ~ \mbox{and} ~ w \in B\}$ is also a set of complex roots of unity. How many distinct elements are in $C_{}^{}$ ?

Solution

Solution 1

The least common multiple of $18$ and $48$ is $144$ , so define $n = e^{2\pi i/144}$ . We can write the numbers of set $A$ as $\{n^8, n^{16}, \ldots n^{144}\}$ and of set $B$ as $\{n^3, n^6, \ldots n^{144}\}$ . $n^x$ can yield at most $144$ different values. All solutions for $zw$ will be in the form of $n^{8k_1 + 3k_2}$ .

$8$ and $3$ are relatively prime, and it is well known that for two relatively prime integers $a,b$ , the largest number that cannot be expressed as the sum of multiples of $a,b$ is $a \cdot b - a - b$ . For $3,8$ , this is $13$ ; however, we can easily see that the numbers $145$ to $157$ can be written in terms of $3,8$ . Since the exponents are of roots of unities, they reduce $\text{mod} 144$ , so all numbers in the range are covered. Thus the answer is $\boxed{144}$ .

Solution 2

The 18th and 48th roots of $1$ can be found using De Moivre's Theorem. They are $cis \left(\frac{2\pi k_1}{18}\right)$ and $cis \left(\frac{2\pi k_2}{48}\right)$ respectively, where $cis \theta = \cos \theta + i \sin \theta$ and $k_1$ and $k_2$ are integers from 0 to 17 and 0 to 47, respectively.

$zw = cis \left(\frac{\pi k_1}{9} + \frac{\pi k_2}{24}\right) = cis \left(\frac{8\pi k_1 + 3 \pi k_2}{72}\right)$ . Since the trigonometric functions are periodic every $2\pi$ , there are at most $72 \cdot 2 = 144$ distinct elements in $C$ . As above, all of these will work.

1990 AIME (Problems • Answer Key • Resources)
Preceded by Problem 9	Followed by Problem 11
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1990 AIME Problems/Problem 10

Problem

Contents

Solution

Solution 1

Solution 2

See also