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Can you guys help with verifying my work for this problem. My answers don't match the given answers.

Given $\tan 2\theta = -\dfrac{-24}{7}$, where $\theta$ is an acute angle, find $\sin \theta$ and $\cos \theta$

I used the identity, $\tan 2\theta = \dfrac{2\tan \theta}{1 - tan^2 \theta}$ to try and get an equation in $\tan \theta$.

$ \begin{align} -\dfrac{24}{7} &= \dfrac{2\tan \theta}{1 - \tan^2 \theta} \\ -24 + 24\tan^2 \theta &= 14 \tan \theta \\ 24tan^2 \theta - 14\tan \theta - 24 &= 0 \\ 12tan^2 \theta - 7\tan \theta - 12 &= 0 \\ \end{align} $

Solving this quadratic I got, $ \tan \theta = \dfrac{3}{2} \text{ or } \tan \theta = -\dfrac{3}{4}$

$\therefore \sin \theta = \pm \dfrac{3}{\sqrt{13}} \text{ and } \cos \theta = \pm \dfrac{2}{\sqrt{13}}$

Or,

$\therefore \sin \theta = \pm \dfrac{3}{5} \text{ and } \cos \theta = \mp \dfrac{4}{5}$

The given answer is,

$\sin \theta = \dfrac{4}{5} \text{ and } \cos \theta = \dfrac{3}{5}$

I thought I needed to discard the negative solution assuming $\theta$ is acute. But they haven't indicated a quadrant. Do I assume the quadrant is I only? What am i missing? Thanks again for your help.

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    @Gerry, Can you post your comment as an answer and make it community wiki.2011-07-05

2 Answers 2

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At Chandru's request:

  1. The quadratic $12z^2-7z-12$ factors as $(3z-4)(4z+3)$ so we should get $\tan\,\theta=4/3$ and $\tan\,\theta=-3/4$.

  2. "Acute angle" means "angle between 0 and $\pi/2$" means 1st quadrant.

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Given $ \tan(2\theta)= -\frac{24}{7}$ From the relation between $\sin(\theta)$, $\cos(\theta)$ and $\tan(\theta)$, we get $ \frac{\sin(2\theta)}{\cos(2\theta)}= -\frac{24}{7} \implies \sin(2\theta)= -\frac{24}{7} \cos(2\theta)$and $ \sin(2\theta)^2 + \cos(2\theta)^2=1$ $\cos(2\theta) = \pm \frac{7}{25} \implies 2 \cos^2(\theta)-1 = \pm \frac{7}{25}$ Case 1: Rational number on the right is positive, $\cos^2(\theta)=\frac{16}{25} \implies \cos(\theta) = \pm \frac{4}{5} $ Solution to case 1:
$\cos(\theta)=\frac{4}{5}$$ \sin(\theta)=\frac{3}{5}.$ Both sine and cosine functions are positive, for $\theta$ being acute.
Case 2:Rational number on the right is negative $\cos^2(\theta)=\frac{9}{25} \implies \cos(\theta) = \pm \frac{3}{5} $Solution to case 2:
$\cos(\theta)=\frac{3}{5} $$ \sin(\theta)=\frac{4}{5}.$ Both sine and cosine functions are positive, for $\theta$ being acute.