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Question: Given \(sin\theta\) = \[\dfrac{2}{3}\] and \[\dfrac{\pi }{2} < \theta < \pi \] how do you find the v...

Given sinθsin\theta = 23\dfrac{2}{3} and π2<θ<π\dfrac{\pi }{2} < \theta < \pi how do you find the value of the other 5 trigonometric functions?

Explanation

Solution

To solve these types of problems, we will use the relationship between the trigonometric ratios and some trigonometric identities. We should know the identity sin2θ+cos2θ=1{{\sin }^{2}}\theta +{{\cos }^{2}}\theta =1. Also, the relationship such as, tanθ=sinθcosθ,cscθ=1sinθ,secθ=1cosθ&cotθ=1tanθ\tan \theta =\dfrac{\sin \theta }{\cos \theta },\csc \theta =\dfrac{1}{\sin \theta },\sec \theta =\dfrac{1}{\cos \theta }\And \cot \theta =\dfrac{1}{\tan \theta }. We should also know that in the second quadrant only sine and cosecant ratios are positive and others are negative.

Complete step by step solution:
We are given that the sinθ=23\sin \theta =\dfrac{2}{3}. Here the angle is π2<θ<π\dfrac{\pi }{2} < \theta < \pi . As the angle lies in this range it means that the angle lies in the second quadrant. We know that in the second quadrant only sine and cosecant ratios are positive and others are negative.
We know the trigonometric identity sin2θ+cos2θ=1{{\sin }^{2}}\theta +{{\cos }^{2}}\theta =1, substituting sinθ=23\sin \theta =\dfrac{2}{3} in this identity, we get
(23)2+cos2θ=1\Rightarrow {{\left( \dfrac{2}{3} \right)}^{2}}+{{\cos }^{2}}\theta =1
49+cos2θ=1\Rightarrow \dfrac{4}{9}+{{\cos }^{2}}\theta =1
Subtracting 49\dfrac{4}{9} from both sides of the above equation, we get
cos2θ=149=59\Rightarrow {{\cos }^{2}}\theta =1-\dfrac{4}{9}=\dfrac{5}{9}
taking the square root of both sides of the above equation, we get

& \Rightarrow \cos \theta =\pm \sqrt{\dfrac{5}{9}} \\\ & \Rightarrow \cos \theta =\pm \dfrac{\sqrt{5}}{3} \\\ \end{aligned}$$ As we already said that the angle is in the third quadrant so cosine ratios will be negative. $$\Rightarrow \cos \theta =-\dfrac{\sqrt{5}}{3}$$ Now, we can find the other trigonometric ratios using their relationships as, $$\tan \theta =\dfrac{\sin \theta }{\cos \theta }$$, substituting the value of the ratios, we get $$\Rightarrow \tan \theta =\dfrac{\dfrac{2}{3}}{-\dfrac{\sqrt{5}}{3}}=-\dfrac{2}{\sqrt{5}}$$ $$\Rightarrow \csc \theta =\dfrac{1}{\sin \theta }=\dfrac{1}{\dfrac{2}{3}}=\dfrac{3}{2}$$ $$\Rightarrow \sec \theta =\dfrac{1}{\cos \theta }=\dfrac{1}{-\dfrac{\sqrt{5}}{3}}=-\dfrac{3}{\sqrt{5}}$$ $$\Rightarrow \cot \theta =\dfrac{1}{\tan \theta }=\dfrac{1}{-\dfrac{2}{\sqrt{5}}}=-\dfrac{\sqrt{5}}{2}$$ Thus, we have found all the trigonometric ratios. **Note:** To solve these types of problems, one should know the trigonometric identities and the relationship between the ratios. Here we used $$\tan \theta =\dfrac{\sin \theta }{\cos \theta },\csc \theta =\dfrac{1}{\sin \theta },\sec \theta =\dfrac{1}{\cos \theta }\And \cot \theta =\dfrac{1}{\tan \theta }$$ and $${{\sin }^{2}}\theta +{{\cos }^{2}}\theta =1$$. Also, we should know which trigonometric ratios are positive in which quadrants. In the first quadrant, all ratios are positive, in the third quadrant tangent and cotangent are positive, and in the fourth quadrant only cosine and secant are positive.