I am having trouble solving the trigonometric equation below: $$\frac{\cos^2\left(3t\right)}{\tan\left(t\right)}+\frac{\cos^2\left(t\right)}{\tan\left(3t\right)}=0$$
I would appreciate any help you can give me! Thank you!
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3$\begingroup$ We would appreciate showing what you did ! $\endgroup$– NarasimhamCommented Dec 13, 2020 at 22:17
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1$\begingroup$ Please clarify what kind of trouble you are having. What methods do you know? What have you tried? $\endgroup$– Yuriy SCommented Dec 13, 2020 at 22:26
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$\begingroup$ Generally with these things, decide which side of the equation looks messiest, then convert $\sec,\tan,\cot,\csc$ functions to $\cos,\sin$ functions. Apply any double angle identities, until everything is in terms of $\sin x$ and $\cos x$ and simplify. $\endgroup$– Doug MCommented Dec 13, 2020 at 22:34
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$\begingroup$ Since answerers have as yet only tackled the first problem, and since you have now asked about your own solution to the third problem in another question, you should take the opportunity to edit this question down. Specifically: remove the second and third problems, and ask the second one separately. (A question should include only one problem.) $\endgroup$– BlueCommented Dec 14, 2020 at 1:16
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1$\begingroup$ that is a good idea! $\endgroup$– Ed TwoCommented Dec 14, 2020 at 1:33
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2 Answers
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I will do the first one, hopefully, it will give you some ideas how to tackle the rest.
$\frac {\cos^2 3t}{\tan t} + \frac {\cos^2 t}{\tan 3t} = 0$
Find the common denominator and make this into one fraction.
$\frac {\cos^2 3t\tan 3t + \cos^2t\tan t}{\tan 3t\tan t} = 0$
Lets focus on the numerator. If this expression equals $0$ then the numerator equals $0$ and the denominator does not equal $0.$
$\cos^2 3t\tan 3t + \cos^2t\tan t = 0$
use: $\tan t = \frac {\sin t}{\cos t}$ and cancel.
$\cos 3t\sin 3t + \cos t\tan t = 0$
I want to use $2\cos t\sin t = \sin 2t$
$2\cos 3t\sin 3t + 2\cos t\tan t = 0\\ \sin 6t + \cos t\tan t = 0$
The next step is a little bit obscure... $\sin 3t = (4\sin t - 3\sin^3 t)$
$3\sin 2t - 4\sin^3 2t + \sin 2t = 0$
Everything is in terms of $\sin 2t$!
$u=\sin 2t$ will make what we have look more like a polynomial.
$4u - 4u^3 = 0\\ u(1-u)(1+u)= 0\\ u = 0, \pm 1$
Reverse the substitution.
$\sin 2t = 0 \text { or } \pm 1$
$t = 0, \pm\frac {\pi}{2}, \pm \frac {\pi}{4}, \pm \frac{3\pi}{4}+ n\pi$
But if $t=0$ the denominator in the original expression equals 0, and we are going to throw that answer away. And $\tan t$ is not defined at $t = \pm\frac {\pi}{2}$ so we should disregard that solution, too.
$t = \frac {(2n+1)\pi}{4}$
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Here it is a slightly different approach from @Doug M. One has that \begin{align*} \frac{\cos^{2}(3t)}{\tan(t)} + \frac{\cos^{2}(t)}{\tan(3t)} = 0 & \Rightarrow \cos^{2}(3t)\tan(3t) + \cos^{2}(t)\tan(t) = 0\\\\ & \Rightarrow \cos(3t)\sin(3t) + \cos(t)\sin(t) = 0\\\\ & \Rightarrow \sin(6t) + \sin(2t) = 0\\\\ & \Rightarrow \sin(6t) = \sin(-2t) \end{align*}
After solving such equation, verify whether the solutions satisfy $\tan(t)\tan(3t)\neq 0$.
Can you take it from here?
