Problem

Given the following unit circle corresponding to the angle $t$ below, determine the values of each trigonometric function.
Enter $\cos (t)$.
Enter $\sin (t)$
Enter $\tan (t)$

Answer

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Answer

\[\boxed{\tan(t) = \tan(t)}\]

Steps

Step 1 :Given the following unit circle corresponding to the angle $t$ below, determine the values of each trigonometric function.

Step 2 :The question does not provide a specific angle $t$ or a unit circle diagram. Therefore, it's impossible to determine the exact values of $\cos(t)$, $\sin(t)$, and $\tan(t)$ without this information.

Step 3 :However, the general formulas for these trigonometric functions can be provided.

Step 4 :The values of the trigonometric functions depend on the specific angle $t$. In general, they can be calculated as follows:

Step 5 :\[\cos(t) = \cos(t)\]

Step 6 :\[\sin(t) = \sin(t)\]

Step 7 :\[\tan(t) = \tan(t)\]

Step 8 :where $t$ is the angle in radians.

Step 9 :\[\boxed{\cos(t) = \cos(t)}\]

Step 10 :\[\boxed{\sin(t) = \sin(t)}\]

Step 11 :\[\boxed{\tan(t) = \tan(t)}\]

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