What is m∠RUT?
120°
R
T
S
U

I don't have the diagram or enough context to determine ∠RUT. Could you either upload the figure or describe how R, U, T (and S) are arranged and what the 120° refers to (e.g. is 120° an angle at one of those points, an arc measure, a central angle, etc.)?

To help you faster, here are common situations and how you'd get m∠RUT from a given 120°:

- If the 120° is ∠RUT itself, then m∠RUT = 120°.
- If the 120° is an adjacent angle that forms a linear pair with ∠RUT, then m∠RUT = 180° − 120° = 60°.
- If the 120° is a vertical angle to ∠RUT (opposite angle made by intersecting lines), then m∠RUT = 120°.
- If the points lie on a circle and 120° is the measure of the intercepted arc, and ∠RUT is an inscribed angle intercepting that arc, then m∠RUT = 1/2 · 120° = 60°.
- If 120° is a central angle subtending an arc and ∠RUT is an inscribed angle subtending the same arc, then m∠RUT = 1/2 · 120° = 60°.
- If parallel lines/transversal relations are involved, corresponding or alternate interior angles might equal 120° (so m∠RUT = 120°) or be supplementary (so m∠RUT = 60°), depending on configuration.

Send the picture or a short description of the diagram and I’ll give the exact value.

its a circle