what is the property of the exterior angle
Answers
The exterior angle theorem states that if a triangle's side gets an extension, then the resultant exterior angle would be equal to the sum of the two opposite interior angles of the triangle.
Step-by-step explanation:
Exterior angle property
Exterior and interior opposite angle
In a triangle is a side of a triangle is produced in
either direction the angles so formed with any of
the other side is called the exterior angle of the
triangle. The angle inside the triangle opposite of
the exterior angles so formed are called the
interior opposite angle.
Verification of exterior angle property by paper cutting and pasting.
•In note draw a triangle and produce one of its
sides to form an exterior angle trace this figure
on to your craft sheet.
•Mark interior angles on your craft seat.
•In the given figure∆ACD is the exterior angle;<A
and<B are interior opposite angle.
•Cut out<A and <B from the craft sheet accurately
along the arms.
•Best this as adjacent angle carefully matching
the arms on<AXD in your notebook.
Thus, we can see that <ACD=<A+<B
Thus, we can see that <ACD=<A+<BThis verify that the exterior angle of the triangle
Thus, we can see that <ACD=<A+<BThis verify that the exterior angle of the triangle is equal to the sum of the interior positive angle.
Proof of exterior angle property.
In ∆PQR,side PR is produced to S, forming an
exterior angle QRS.<1 and <3 are interior positive angle.
<1+<2+<3=180°(angle sum property)
<4+<2=189°(Linear pair)
So,
<1+<2+<3=<4+<2. [By using (1) and (2)]
therefore
<1+<3=<4+<2
or
<4=<1+<3
Thus,the exterior angle is equal to the sum of the interior opposite angle.