If two lines intersed with each other then prove that vertically opposite angles angles are equal.
Answers
Answer:
Step-by-step explanation:
According to the problem, we need to prove that if two lines intersect each other, then the vertically opposite angles are equal.
Let us draw the two lines AB and CD intersecting at point O.
We know that the sum of angles lying on a straight line is 180∘.
Let us consider the angles on the line CD. So, we get ∠COB+∠BOD=180∘.
⇒∠COB=180∘−∠BOD ---(1).
Now, let us consider the angles on the line AB. So, we get ∠COB+∠AOC=180∘ ---(2).
Let us substitute equation (2) in equation (1).
So, we get 180∘−∠BOD+∠AOC=180∘.
⇒∠AOC=180∘−180∘+∠BOD.
⇒∠AOC=∠BOD.
From the figure, we can see that the angles ∠AOC and ∠BOD are vertically opposite angles.
So, we have proved that if two lines intersect each other, then the vertically opposite angles are equal.
Note: We can also prove that the other pair of vertically opposite angles ∠COB and ∠DOA equal in the similar way as shown below:
Let us consider the angles on the line CD. So, we get ∠COB+∠BOD=180∘.
⇒∠BOD=180∘−∠COB ---(3).
Now, let us consider the angles on the line AB. So, we get ∠BOD+∠DOA=180∘ ---(4).
Let us substitute equation (3) in equation (4).
So, we get 180∘−∠COB+∠DOA=180∘.
⇒∠DOA=180∘−180∘+∠COB.
⇒∠DOA=∠COB.
We use this result to get the required answers.
Answer:
angle COB=180°- angle BOD (1)
angle COB+angle AOC=180°(2)
Step-by-step explanation:
so we have proved that
I hope it helps you