As we saw in Math 2 lesson  10.04 Solving right triangles , we can use the inverse functions to solve one step trigonometric equations like \text{sin }\theta = \dfrac{1}{2}, by taking the applying the inverse function to both sides of the equation to give \theta = \text{sin}^{-1}\left(\dfrac{1}{2}\right).
We will now take it one step further and require some algebraic manipulation before taking the trigonometric inverse.
To solve an equation involving reciprocal trigonometric functions, recall their relationship to the trigonometric functions:
\displaystyle \text{csc }\theta | \displaystyle = | \displaystyle \dfrac{1}{\text{sin }\theta} |
\displaystyle \text{sec }\theta | \displaystyle = | \displaystyle \dfrac{1}{\text{cos }\theta} |
\displaystyle \text{cot }\theta | \displaystyle = | \displaystyle \dfrac{\text{cos }\theta}{\text{sin }\theta} = \dfrac{1}{\text{tan }\theta} |
Find the measure in degrees of the acute angle satisfying \text{tan }\theta = 5\sqrt{3}-4 \text{ tan }\theta.
Find the measure in degrees of the angle satisfying 8 \text{ cos }\theta - 4 = 0 for 0\degree \lt \theta \lt 90\degree.
Remember the relationship between the reciprocal trigonometric functions and the trigonometric functions:
\displaystyle \text{cosec }\theta | \displaystyle = | \displaystyle \dfrac{1}{\text{sin }\theta} |
\displaystyle \text{sec }\theta | \displaystyle = | \displaystyle \dfrac{1}{\text{cos }\theta} |
\displaystyle \text{cot }\theta | \displaystyle = | \displaystyle \dfrac{\text{cos }\theta}{\text{sin }\theta} = \dfrac{1}{\text{tan }\theta} |
Trigonometric equations express the value of a trigonometric function, when we do not know what angle leads to that value. For example, we may know that for some angle \theta we have \sin \theta = \dfrac{\sqrt{3}}{2} or \cos \beta = - \dfrac{1}{2}. The problem is to determine what values of \theta and \beta will make these true statements.
Using the blue unit circle below, there are two instances where the \sin function is equal to \\\dfrac{\sqrt{3}}{2} (60\degree and 120\degree) and two where \cos is equal to -\dfrac{1}{2} (120\degree and 240\degree).
Solve \sin \theta = 0 for \theta over the domain 0\degree \leq \theta \leq 360\degree.
If we have a unit circle diagram, we can use the fact that for any point on the unit circle:
\displaystyle x | \displaystyle = | \displaystyle \cos \theta |
\displaystyle y | \displaystyle = | \displaystyle \sin \theta |
\displaystyle \dfrac{y}{x} | \displaystyle = | \displaystyle \tan \theta |
Given a particular value of a trigonometric function, we may wish to find the values of the domain variable that are mapped to that function value. Or, given two distinct functions defined on the same domain, we may ask what values of the domain variable make the two functions equal.
These situations are what is meant by the idea of solving trigonometric (and other) equations. We are finding the values of the variable that make the equations true.
Given the function defined by 2\sin x = 1 for x \in [0,\,360\degree], find the values of x.
Solve 4\cos x + 1 = 3 for x \in [0,\,360\degree].
Find all the solutions of the equation \sin t = 2\sin t - \dfrac{1}{2}in the interval [0,\,2\pi].
Consider the equation \cos \theta = -0.798\,6.
Find the measure in degrees of the acute angle satisfying \cos \theta = 0.798\,6.
Round to the nearest degree.
Find the measure in degrees of the angles satisfying \cos \theta = - 0.798\,6 for 0\degree \leq \theta \leq 360\degree.
Round to the nearest degree.
We can determine the sign of the six basic trigonometric functions by relating the point \left( x, y \right) on the unit circle to the trigonometric functions \left ( \cos \theta , \sin \theta \right).