The difference of two complementary angles is 30°. Find the angles.
Answers
Step-by-step explanation:
x+y=90 degrees
+y=90 degreesx=y+30
+y=90 degreesx=y+30(y+30)+y=90
+y=90 degreesx=y+30(y+30)+y=902y=90-30
+y=90 degreesx=y+30(y+30)+y=902y=90-30y=60/2
+y=90 degreesx=y+30(y+30)+y=902y=90-30y=60/2y=30degree
+y=90 degreesx=y+30(y+30)+y=902y=90-30y=60/2y=30degreex=30+30=60 degree.
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Answer:
30° and 60°
Step-by-step explanation:
Angle 1 = x
Anglè 2= y
Sum of complementary angles= 90°
x + y = 90°
x = 90°-y ---> equation 1
As given in the ques ..
X-y =30° ---> equation 2
Putting the value of 'x' in equation 2 we get-
x - y = 30°
( 90°- y ) - y =30°
90° -2y= 30°
90°-30°=2y
60°/2=y
Y =30°
Now putting this value of y in equation 1
x = 90-y
x = 90°-30°
x=60°
Hope this helps..
The method I uses for finding the values of x and y is substitution method. You can also use other methods like elemination method.
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Andd thanks for this ques.