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If angle a and B are supplementary angles and angle a is two times as large as angle B find the measures of angle and angle B?
If angles A and B are supplementary, their measures add up to 180 degrees. Let angle B be ( x ). Then angle A, being twice as large, is ( 2x ). Setting up the equation, we have ( x + 2x = 180 ), which simplifies to ( 3x = 180 ). Solving for ( x ), we find ( x = 60 ) degrees for angle B, and angle A measures ( 120 ) degrees. Thus, angle A is 120 degrees and angle B is 60 degrees.
What is the supplementary angle to a 97 angle?
The supplementary angle to a 97-degree angle is calculated by subtracting the angle from 180 degrees. Therefore, the supplementary angle is 180 - 97 = 83 degrees.
What is the supplementary angle of 134 degrees?
The supplementary angle of a given angle is found by subtracting that angle from 180 degrees. For an angle of 134 degrees, the supplementary angle is 180 - 134 = 46 degrees. Therefore, the supplementary angle of 134 degrees is 46 degrees.
What is the measure of an supplementary angle to a 15 degrees angle?
The measure of a supplementary angle is found by subtracting the given angle from 180 degrees. For a 15-degree angle, the supplementary angle is 180 - 15, which equals 165 degrees. Therefore, the measure of the supplementary angle to a 15-degree angle is 165 degrees.
What is the supplementary angle of 142.8?
The supplementary angle of a given angle is found by subtracting that angle from 180 degrees. For 142.8 degrees, the supplementary angle is calculated as 180 - 142.8, which equals 37.2 degrees. Therefore, the supplementary angle of 142.8 degrees is 37.2 degrees.
If slope angle A angle B 180 then angle A and angle B are angles?
supplementary angles
What is the measure of angle A if angles A and B are supplementary and angle B is 104?
76
If in angle A plus measure angle B equals 180 then angle A and angle B are?
The angles are supplementary if they have a sum of 180 degrees.
What is a supplimentary angle?
Given an angle A whose measure is in the range [0, 180] degrees, the supplementary angle to A is the angle B such that the measure of A + B = 180 degrees.
What is the supplementary angle of 91.4?
When finding a supplementary angle, you can simply use a + b = c. C will always equal 180. In this case A is 91.4. So your equation is:91.4 + B = 180180 - 91.4 = BB = 88.6.The supplementary angle is 88.6.
If angle a and B are supplementary angles and angle a is two times as large as angle B find the measures of angle and angle B?
If angles A and B are supplementary, their measures add up to 180 degrees. Let angle B be ( x ). Then angle A, being twice as large, is ( 2x ). Setting up the equation, we have ( x + 2x = 180 ), which simplifies to ( 3x = 180 ). Solving for ( x ), we find ( x = 60 ) degrees for angle B, and angle A measures ( 120 ) degrees. Thus, angle A is 120 degrees and angle B is 60 degrees.
What is the supplementary angle to a 97 angle?
The supplementary angle to a 97-degree angle is calculated by subtracting the angle from 180 degrees. Therefore, the supplementary angle is 180 - 97 = 83 degrees.
What is the supplementary angle of 134 degrees?
The supplementary angle of a given angle is found by subtracting that angle from 180 degrees. For an angle of 134 degrees, the supplementary angle is 180 - 134 = 46 degrees. Therefore, the supplementary angle of 134 degrees is 46 degrees.
What is the measure of an supplementary angle to a 15 degrees angle?
The measure of a supplementary angle is found by subtracting the given angle from 180 degrees. For a 15-degree angle, the supplementary angle is 180 - 15, which equals 165 degrees. Therefore, the measure of the supplementary angle to a 15-degree angle is 165 degrees.
What is the supplementary angle of 142.8?
The supplementary angle of a given angle is found by subtracting that angle from 180 degrees. For 142.8 degrees, the supplementary angle is calculated as 180 - 142.8, which equals 37.2 degrees. Therefore, the supplementary angle of 142.8 degrees is 37.2 degrees.
What is the sum of the measure of a supplementary angle?
A supplementary angle can have any value - depending on the first angle.
Prove that the bisectors of two adjacent supplementary angles include a right angle?
Let two adjacent angles be ( \angle A ) and ( \angle B ) such that ( \angle A + \angle B = 180^\circ ). The angle bisector of ( \angle A ) divides it into two equal angles, ( \frac{1}{2} \angle A ), and the angle bisector of ( \angle B ) divides it into ( \frac{1}{2} \angle B ). Therefore, the angle formed by the two bisectors is ( \frac{1}{2} \angle A + \frac{1}{2} \angle B = \frac{1}{2} ( \angle A + \angle B ) = \frac{1}{2} \times 180^\circ = 90^\circ ). This proves that the bisectors of two adjacent supplementary angles indeed form a right angle.
