angelpeter1458
contestada

In circle V, angle WXZ measures 30°. Line segments WV, XV, ZV, and YV are radii of circle V.

Circle V is shown. Line segments W V, X V, Z V, and Y V are radii. Lines are drawn from point W to point X and from point Z to point Y to form secants. Point U is on the circle between points W and X.

What is the measure of Arc W U X in circle V?

60°
90°
120°
150°

Respuesta :

Answer:

c i got it right

Step-by-step explanation:

The measure of arcWUX in circle V of the given diagram with the circle geometry is; C: 120°

How to solve Circle geometry?

From the complete image as seen online, we can say that;

The measure of ∠WUX is similar to the measure of vertex ∠V.

To get the measure of angle V (∠V), we will use the sum of angles in a triangle theorem to get;

30 + ∠V + ∠X = 180

60 + ∠V = 180

∠V = 180 - 60

∠V = 120°

Since ∠V = arcWUX

Then, measure of arcWUX is 120°

Read more about circle geometry at; brainly.com/question/24375372

Otras preguntas