Angle A=60°
Angle B ?
Angle C 90°
If A, B, and C are angles in the same triangle, then B = 30 degrees. That is because
A + B+ C = 180
Angle B? Oh, you mean the mysterious angle that's keeping us on the edge of our seats, huh? Well, if we know that Angle C is a right angle (90°), and Angle A is 60°, then Angle B must be the missing piece to this triangular puzzle. So, grab your detective hat and get ready for some calculations! By subtracting Angle A and Angle C from 180° (the sum of the angles in a triangle), I can proudly present to you...drumroll, please...Angle B is 30°! Ta-da! Now that's a well-rounded answer, wouldn't you say?
To find Angle B, you can use the fact that the sum of the angles in a triangle is always 180°.
Step 1: Start with the sum of the angles in the triangle: 60° + Angle B + 90° = 180°.
Step 2: Simplify the equation: 150° + Angle B = 180°.
Step 3: Subtract 150° from both sides of the equation: Angle B = 180° - 150°.
Step 4: Calculate the value: Angle B = 30°.
So, Angle B is 30°.
To find the measurements of angles B and C, we can use the fact that the sum of the angles in a triangle is always 180 degrees.
Given Angle A = 60 degrees and Angle C = 90 degrees, we can use the equation:
Angle A + Angle B + Angle C = 180 degrees
Substituting the known values, we have:
60 degrees + Angle B + 90 degrees = 180 degrees
Let's simplify this equation:
150 degrees + Angle B = 180 degrees
To solve for Angle B, we can subtract 150 degrees from both sides of the equation:
Angle B = 180 degrees - 150 degrees = 30 degrees
Therefore, Angle B = 30 degrees.