find the measure of such angle whose supplementary angle is 35 degree more than twice of its complementary angle
Answers
Answer:
Let x be the measure of the angle, s be the measure of the supplement of the angle, and c be the measure of the complement of the angle. By the definition of supplement, we can write x+s=180, or s=180-x, and by the definition of complement, we can write x+c=90, or c=90-x. Since the measure of the supplement it 35 more than twice the measure of the complement, we can write s=2c+35. Substituting in our values for s and c, we have:
180-x = 2(90-x) + 35
180 - x = 180 - 2x + 35
180 - x = 215 - 2x
x + 180 = 215
x = 35
Now solve for s and c:
s = 180 - x
s = 180 - 35
s = 145
c = 90 - x
c = 90 - 35
c = 55
So the measure of the angle is 35, the measure of its supplement is 145, and the measure of its complement is 55.
I hope that helps :)
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