What is the Inverse cos(cos(-pi/3)?

1 Answer
George C.
Aug 27, 2015

arccos(cos(-pi/3)) = pi/3

Explanation:

In order that arccos be a well-defined function, its range is defined to be [0, pi].

So if theta = arccos(cos(-pi/3)), then cos(theta) = cos(-pi/3) and theta in [0, pi]

For any theta we have cos(theta) = cos(-theta), so we can see that in our case theta = pi/3 satisfies the required conditions to be arccos(cos(-pi/3))

Here's the graph of arccos(theta)

graph{arccos(x) [-5.168, 4.83, -0.86, 4.14]}

Related questions
See all questions in Basic Inverse Trigonometric Functions
Impact of this question
4306 views around the world
You can reuse this answer
Creative Commons License