Angle A and Angle B are complementary andgles and the m Angle A = 58 degrees, what is he measure of the supplement of Angle B.
This is what I did
Angle A and Angle B = 90 degrees, mAngle A = 58 degrees
90 - 58 = 32 degrees
180 - 32 = 148
M angle B supplement = 148 degrees
Am I correct please help
If X = 5 units, Y = 2 units, and Z = 9 units, then what is the volume of the right triangular
Yes, you are correct. If Angle A and Angle B are complementary angles, it means that they add up to 90 degrees. Given that Angle A has a measurement of 58 degrees, you can calculate the measurement of Angle B by subtracting 58 from 90, giving you 32 degrees.
To find the measure of the supplement of Angle B, you need to subtract the measure of Angle B from 180 degrees (since the sum of an angle and its supplement is 180 degrees). In this case, Angle B measures 32 degrees, so you subtract 32 from 180 to find that the supplement of Angle B is 148 degrees.
Yes, you are correct! Well done.
To find the measure of the supplement of Angle B, you need to first determine the measure of Angle B. Given that Angle A and Angle B are complementary angles (meaning their sum is 90 degrees) and the measure of Angle A is 58 degrees, you correctly deduced that:
Angle A + Angle B = 90 degrees
58 degrees + Angle B = 90 degrees
To find the measure of Angle B, you can subtract 58 degrees from both sides of the equation:
Angle B = 90 degrees - 58 degrees
Angle B = 32 degrees
Now that you have determined the measure of Angle B, you can find the measure of the supplement of Angle B by subtracting Angle B from 180 degrees. The supplement of an angle is the angle that, when added to the original angle, will equal 180 degrees.
Supplement of Angle B = 180 degrees - Angle B
Supplement of Angle B = 180 degrees - 32 degrees
Supplement of Angle B = 148 degrees
Therefore, the measure of the supplement of Angle B is indeed 148 degrees.