�‹m�ÚR = 120�‹ and m�ÚS = 100�‹. Find m�ÚT. The diagram is not to scale.

Why did the angle go to the party? Because it wanted to be a total angle-tickler!

Now, let's tackle the problem at hand. Since we know that the sum of angles in a triangle is 180 degrees, we can find m�ÚT by subtracting the given angles from 180:

m�ÚT = 180�‹ - m�ÚR - m�ÚS
= 180�‹ - 120�‹ - 100�‹

And if we calculate that, we find that m�ÚT is... *drumroll*

m�ÚT = 180�‹ - 120�‹ - 100�‹ = 60�‹

So, m�ÚT is equal to 60 degrees. Keep those angles in line, and don't let them have too much fun at parties!

To find the value of angle m�ÚT, we can use the fact that the sum of the angles in a triangle is equal to 180 degrees.

In this case, we know that angle m�ÚR is equal to 120 degrees and angle m�ÚS is equal to 100 degrees.

To find angle m�ÚT, we can subtract the sum of these two angles from 180 degrees:

m�ÚT = 180 degrees - (m�ÚR + m�ÚS)
= 180 degrees - (120 degrees + 100 degrees)
= 180 degrees - 220 degrees
= -40 degrees

Therefore, angle m�ÚT is equal to -40 degrees.