The tangent in the <em>unit</em> circle is equal to 0.334.
<h3>How to calculate the value of the function tangent with the help of a unit circle</h3>
In trigonometry, <em>unit</em> circles are representations of a circle with radius 1 and centered at the origin of a <em>Cartesian</em> plane commonly use to estimate and understand angles and <em>trigonometric</em> functions related to them.
Angles are generated by line segments whose coordinates are of the form (x, y), where x is the position of the <em>terminal</em> point along the x-axis and y is the position of the <em>terminal</em> point along the y-axis.
In addition, the tangent of the angle generated in a unit angle is defined by the following equation:
tan θ = y / x (1)
If we know that x = - 0.9483 and y = - 0.3173, then the tangent of the angle generated in the unit circle is:
tan θ = (- 0.3173)/(- 0.9483)
tan θ = 0.334
The tangent in the <em>unit</em> circle is equal to 0.334.
To learn more on trigonometric functions: brainly.com/question/23599274
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