The trigonometric ratios give us the trigonometric function of an angle in terms of two of the side lengths. We can use these ratios to find angles in right-angled triangles if we can isolate the angles in these equations.
To find missing angles in right-angled triangles using trigonometry, we require at least two known sides to use in a trigonometric ratios.
For any unknown angle and a pair of side lengths, we can use one of these ratios to write the relationship between those three values.
Once we have chosen a trigonometric ratio relating our unknown angle to two known side lengths, we need to isolate the angle. In order to do this, we need to reverse the effect of the trigonometric function.
To reverse the effect of a function on some value, we need to apply the inverse of that function.
Trigonometric functions have dedicated inverse functions of the form \sin ^{-1}, \cos ^{-1} and \tan ^{-1} which reverse their respective trigonometric functions. For example: \sin ^{-1}\left(\sin \theta \right) =\theta
Applying the inverse trigonometric functions to our trigonometric ratios gives us three new ratios that can be used to find angles in a right-angled triangle:
\theta =\sin^{-1}\left(\dfrac{\text{Opposite }}{\text{Hypotenuse }}\right) \quad \quad \theta =\cos^{-1}\left(\dfrac{\text{Adjacent }}{\text{Hypotenuse }}\right) \quad \quad \theta =\tan^{-1}\left(\dfrac{\text{Opposite }}{\text{Adjacent }}\right)
Any of these relationships can be used to find \theta depending on which side lengths of the triangle are known.
While we may represent the inverse trigonometric functions using an index of -1, they are not reciprocals of the original functions.
For example: \sin ^{-1}\theta \neq \dfrac{1}{\sin \theta }
We evaluate inverse trigonometric functions in the same way that we evaluate normal trigonometric functions.
To evaluate inverse trigonometric functions, we can input the inverse function on our calculators and enter the ratio corresponding to the angle to get expressions of the form \sin ^{-1}\left(\dfrac{4}{5}\right)and \tan ^{-1}\left(\dfrac{4}{3}\right).
As was with the normal trigonometric functions, we want to treat the inverse trigonometric function and its included ratio as a single term. This means that when we want to multiply or divide by it, we should perform that operation on the whole expression.
When evaluating inverse trigonometric function expressions, make sure that your calculator is in degrees mode. This will tell our calculator to evaluate inverse trigonometric functions in terms of degrees.
If \cos \theta =0.256, find \theta , writing your answer to the nearest degree.
The inverse trigonometric functions are given by:
\theta =\sin^{-1}\left(\dfrac{\text{Opposite }}{\text{Hypotenuse }}\right) \quad \quad \theta =\cos^{-1}\left(\dfrac{\text{Adjacent }}{\text{Hypotenuse }}\right) \quad \quad \theta =\tan^{-1}\left(\dfrac{\text{Opposite }}{\text{Adjacent }}\right)
When evaluating inverse trigonometric function expressions, make sure that your calculator is in degrees mode.
Based on where the angle is in the triangle and which pair of sides we are given, we can choose one of the trigonometric ratios to describe the relationship between those values.
We can then rearrange that ratio (or choose the corresponding inverse ratio) to make our unknown angle the subject of an equation and then solve for it.
Use the tangent ratio to find the size of the angle marked y, correct to the nearest degree.
Find the value of \theta to the nearest degree.
To find an unknown angle of a right angled triangle, we use a trigonometric ratio to set up an equation relating the angle and two given sides. Then we can use the inverse ratio to find the value of the angle.