Respuesta :

luisejr77

Answer: option c.

Step-by-step explanation:

You need to remember the identity:

[tex]tan\alpha=\frac{opposite}{adjacent}[/tex]

The inverse of the tangent function is arctangent. You need to use this to calculate the angle "R":

 [tex]\alpha =arctan(\frac{opposite}{adjacent})[/tex]

You know that you need to find the measure of "R" and [tex]r=10[/tex] (which is the opposite side) and [tex]s=31[/tex] (which is the adjacent side), you can sustitute values into [tex]\alpha =arctan(\frac{opposite}{adjacent})[/tex]

Then, you get:

[tex]R=arctan(\frac{10}{31})\\\\R=17.9\°[/tex]

alinakincsem

Answer:

The correct answer option is C. 17.9°.

Step-by-step explanation:

We are given a right angled triangle, SRT, with two known sides, r and s.

We are to find the measure of the angle R.

For that, we will use tan.

[tex] tan R = \frac { r } { s } [/tex]

[tex] tan R = \frac { 1 0 } { 3 1 } [/tex]

[tex] R = tan' 0.322 [/tex]

R = 17.9°

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