QuestionFind the exact value of .
Studdy Solution
STEP 1
Assumptions1. The problem is asking for the exact value of the inverse tangent of -1, denoted as . . We are working in the standard mathematical convention where angles are measured in radians.
STEP 2
We need to find an angle whose tangent is -1. We know that the tangent of an angle in the unit circle is defined as the ratio of the y-coordinate to the x-coordinate.
STEP 3
We know that when is an odd multiple of in the second and fourth quadrants, where the tangent function is negative.
STEP 4
The smallest positive angle that satisfies this condition is in the second quadrant. However, the range of is , so we need to find an angle in this range.
STEP 5
The angle in the fourth quadrant also has a tangent of -1, and it lies in the range of .
STEP 6
Therefore, the exact value of the expression is .
The exact value of the expression is .
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