1984 AIME Problems/Problem 8
Contents
Problem
The equation has complex roots with argument between and in the complex plane. Determine the degree measure of .
Solution 1
We shall introduce another factor to make the equation easier to solve. Consider . If is a root of , then . The polynomial has all of its roots with absolute value and argument of the form for integer . Now we simply need to find the root within the desired range that satisfies our original equation .
This reduces to either or . But can't be because if , then . This leaves .
Also,
From above, you notice that . Therefore, the solutions are all of the ninth roots of unity that are not the third roots of unity. After checking, the only angle is .
Solution 2
Note that the substitution simplifies this to . Simply applying the quadratic formula gives roots , which have angles of 120 and 240, respectively. This means , and the only one between 90 and 180 is .
See also
1984 AIME (Problems • Answer Key • Resources) | ||
Preceded by Problem 7 |
Followed by Problem 9 | |
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