What type of triangle, if any , can be formed with angle measures of 32°, 126° , and 32°
32, 32, and 116 degrees
90 degrees and 78 degrees since one of the angles must be 90 degrees. We have 90+32=122 which is the second angle. Now the sum of the angles is 180 so 180-122=78 which is the third angle.
29 degrees Let x represent the number of degrees of the smaller angle and y the number of degrees of the larger angle. Because the angles are complementary, x+y=90. From the problem, x=y-32. Now solve the equations by substituting x from the second into the first: y-32+y=90 2y-32=90 2y=90+32=122 y=122/2=61 x=y-32=61-32=29
83
77 degrees
What type of triangle, if any , can be formed with angle measures of 32°, 126° , and 32°
An angle that measures 32 degrees is an acute angle
180-105-32 = 43 The third angle measures 43 degrees
Each exterior angle measures 11.5 degrees. Each interior angle measures 168.75 degrees
32 and 71 equals 103 subtract that from 180 and you get your answer of 77 degrees
It is a scalene triangle that would have the given angles.
It is a right angle triangle
What is a 79 degree of a third angle of a triangle
32, 32, and 116 degrees
It has 32 sides and each interior angle measures 168.75 degrees and so 180-168.75 = 11.25 degrees which is the measure of each exterior angle
90 degrees and 78 degrees since one of the angles must be 90 degrees. We have 90+32=122 which is the second angle. Now the sum of the angles is 180 so 180-122=78 which is the third angle.