The first step in his proof should be the givens if they are provided to you. If they aren't when solving a proof, I like to look for stuff that i know is congruent in the pictures and then using theorems and postulates complete the proof.
Answer:
First step to prove that opposite angle of a quadrilateral in a circle are supplementary is to find the intercepted arc of opposite angles of cyclic quadrilateral.
Step-by-step explanation:
Cyclic quadrilateral:
Cyclic quadrilateral is a quadrilateral which lie on a circle.
As shown in figure, ABCD is a cyclic quadrilateral. First step to show that the opposite angle of a quadrilateral ABCD in a circle are supplementary is to find the intercepted arc of opposite ∠A and ∠C of cyclic quadrilateral.
as shown in figure intercepted are of ∠A is Arc(BCD) and intercepted arc of ∠C is Arc(DAB).
Therefore,
[tex]Arc(BCD)=2\angle A[/tex]...................(1)
and
[tex]Arc(DAB)=2\angle C[/tex]...................(2)
We Know that
[tex]Arc(BCD)+Arc(DAB)=360[/tex]..............(3)
Put values of Arc(BCD) and Arc(DAB) in equation (3)
[tex]2\angle A+2\angle C=360[/tex].............(4)
[tex]2(\angle A+\angle C)=360[/tex]
[tex]\angle A+ \angle C=\frac{360}{2}[/tex]
[tex]\angle A+ \angle C=180[/tex]
Hence,
opposite angles [tex]\angle A[/tex] and [tex]\angle C[/tex] of cyclic quadrilateral are supplementary.
