How do you find the exact value of #tan^-1(-1)#?

1 Answer
Douglas K.
Oct 28, 2016

Please see the explanation.

Explanation:

The inverse tangent function will return a negative angle for this where #cos(theta) = -sin(theta)#. The angle that it returned is:

#theta = -pi/4#

Doing this causes a loss of information, because the condition #cos(theta) = -sin(theta)# occurs in the second AND the fourth quadrant. If you have additional information, regarding which quadrant, you should to one of the two following computations:

For the second quadrant:

#theta = tan^-1(-1) + pi#

#theta = -pi/4 + pi#

#theta = (3pi)/4#

For the fourth quadrant:

#theta = tan^-1(-1) + 2pi#

#theta = -pi/4 + 2pi#

#theta = (7pi)/4#

Related questions
See all questions in Basic Inverse Trigonometric Functions
Impact of this question
6683 views around the world
You can reuse this answer
Creative Commons License