Difference between revisions of "2013 AIME I Problems/Problem 14"
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==Solution 5 (lots of room for sillies, I wouldn't recommend it)== | ==Solution 5 (lots of room for sillies, I wouldn't recommend it)== | ||
− | We notice <math>\sin\theta=\frac{ | + | We notice <math>\sin\theta=-\frac{i}{2}(e^{i\theta}-e^{-i\theta})</math> and <math>\cos\theta=\frac{1}{2}(e^{i\theta}+e^{-i\theta})</math> |
− | + | We observe that both <math>P</math> and <math>Q</math> can be split into <math>2</math> parts, namely the terms which contain the <math>\cos</math> and the terms which contain the <math>\sin .</math> | |
− | + | The <math>\cos</math> part of <math>P</math> can be expressed as: | |
+ | <cmath>\begin{align*}\frac12\cos\theta-\frac18\cos3\theta+\cdots&=\frac14\left(e^{i\theta}\left(1-\frac{e^{i2\theta}}{4}+\cdots\right)+e^{-i\theta}\left(1-\frac{e^{-i2\theta}}{4}+\cdots\right)\right) \\ | ||
+ | &= \frac{1}{4}\left(\frac{e^{i\theta}}{1+\frac{1}{4}e^{i2\theta}}+\frac{e^{-i\theta}}{1+\frac{1}{4}e^{-i2\theta}}\right)\ | ||
+ | &= \frac{5(e^{i\theta}+e^{-i\theta})}{17+4e^{i2\theta}+4e^{-i2\theta}}.\end{align*}</cmath> | ||
− | + | Repeating the above process, we find that the <math>\sin</math> part of <math>P</math> is <cmath>\frac{2i(e^{i2\theta}-e^{-i2\theta})}{17+4e^{i2\theta}+4e^{-i2\theta}},</cmath> the <math>\cos</math> part of <math>Q</math> is <cmath>\frac{16+2(e^{i2\theta}+e^{-i2\theta})}{17+4e^{i2\theta}+4e^{-i2\theta}},</cmath> and finally, the <math>\sin</math> part of <math>Q</math> is <cmath>\frac{3i(e^{i\theta}-e^{-i\theta})}{17+4e^{i2\theta}+4e^{-i2\theta}}.</cmath> | |
+ | |||
+ | Converting back to trigonometric form, we have <cmath>\begin{align*}\frac{2\sqrt{2}}{7}&=\frac{10\cos{\theta}-4\sin{2\theta}}{16+4\cos{2\theta}-6\sin{\theta}}\ | ||
+ | &=\frac{5\cos{\theta}-2\sin{2\theta}}{8+2\cos{2\theta}-3\sin{\theta}}.\end{align*}</cmath> Using the <math>\sin</math> double identity and simplifying, we have <cmath>\frac{2\sqrt2}{7}=\frac{\cos{\theta}(5-4\sin{\theta})}{10-4\sin^2{\theta}-3\sin{\theta}}.</cmath> Factoring the denominator, we have <cmath>10-4\sin^2{\theta}-3\sin{\theta}=(5-4\sin\theta)(2+\sin\theta).</cmath> Simplifying <cmath>\begin{align*}\frac{2\sqrt2}{7}&= \frac{\cos{\theta}(5-4\sin{\theta})}{(5-4\sin\theta)(2+\sin\theta)}\ | ||
+ | &=\frac{\cos\theta}{2+\sin\theta}.\end{align*}</cmath> We set <math>\sin\theta</math> as <math>x</math>, and by the Pythagorean Identity, we have <math>57x^2+32x-17=0</math>. This factors into <math>(19x+17)(3x-1)=0</math>, which yields the 2 solutions <math>x=-\frac{17}{19}, x=\frac{1}{3}</math>. As <math>\pi\leq\theta<2\pi</math>, the latter root is erroneous, and we are left with <math>\sin\theta=-\frac{17}{19}</math>. Thus, our final answer is <math>17+19=\boxed{036}</math>. | ||
~ASAB | ~ASAB |
Revision as of 10:30, 7 January 2022
Contents
[hide]Problem
For , let
and
so that . Then where and are relatively prime positive integers. Find .
Solution 1
Noticing the and in both and we think of the angle addition identities:
With this in mind, we multiply by and by to try and use some angle addition identities. Indeed, we get after adding term-by-term. Similar term-by-term adding yields This is a system of equations; rearrange and rewrite to get and Subtract the two and rearrange to get Then, square both sides and use Pythagorean Identity to get a quadratic in Factor that quadratic and solve for The answer format tells us it's the negative solution, and our desired answer is
Solution 2
Use sum to product formulas to rewrite and
Therefore,
Using
Plug in to the previous equation and cancel out the "P" terms to get:
Then use the pythagorean identity to solve for ,
Solution 3
Note that
Thus, the following identities follow immediately:
Consider, now, the sum . It follows fairly immediately that:
This follows straight from the geometric series formula and simple simplification. We can now multiply the denominator by it's complex conjugate to find:
Comparing real and imaginary parts, we find:
Squaring this equation and letting :
Clearing denominators and solving for gives sine as .
Solution 4
A bit similar to Solution 3. We use because the progression cycles in . So we could rewrite that as .
Similarly, .
Setting complex , we get
.
The important part is the ratio of the imaginary part to the real part. To cancel out the imaginary part from the denominator, we must add to the numerator to make the denominator a difference (or rather a sum) of squares. The denominator does not matter. Only the numerator, because we are trying to find a PROPORTION of values. So denominators would cancel out.
.
Setting , we obtain .
Since because , . Adding up, .
Solution 5 (lots of room for sillies, I wouldn't recommend it)
We notice and
We observe that both and can be split into parts, namely the terms which contain the and the terms which contain the
The part of can be expressed as:
Repeating the above process, we find that the part of is the part of is and finally, the part of is
Converting back to trigonometric form, we have Using the double identity and simplifying, we have Factoring the denominator, we have Simplifying We set as , and by the Pythagorean Identity, we have . This factors into , which yields the 2 solutions . As , the latter root is erroneous, and we are left with . Thus, our final answer is .
~ASAB
Solution 6
Follow solution 3, up to the point of using the geometric series formula
Moving everything to the other side, and considering only the imaginary part, we get
We can then write , and , (). Thus, we can substitute and divide out by k.
Since , we get , and thus,
-Alexlikemath
See also
2013 AIME I (Problems • Answer Key • Resources) | ||
Preceded by Problem 13 |
Followed by Problem 15 | |
1 • 2 • 3 • 4 • 5 • 6 • 7 • 8 • 9 • 10 • 11 • 12 • 13 • 14 • 15 | ||
All AIME Problems and Solutions |
The problems on this page are copyrighted by the Mathematical Association of America's American Mathematics Competitions.