IXL - Checkpoint: Triangle theorems (Geometry practice)

Prove that the measures of the interior angles of a triangle sum to

180

°

.

The diagram shows

△

P

Q

R

.

It also shows

P

R

extended through point

S

and

R

T

parallel to

P

Q

.

Complete the proof that

m

∠

P

+

m

∠

Q

+

m

∠

Q

R

P

=

180

°

.

First, =

180

°

, since those angles form a straight angle. Also, since

P

Q

∥

R

T

,

∠

P

≅

by the Corresponding Angles Theorem and

∠

Q

≅

∠

Q

R

T

by the . Now, because the measures of ,

m

∠

P

= and

m

∠

Q

=

m

∠

Q

R

T

. So, using substitution,

m

∠

P

+

m

∠

Q

+

m

∠

Q

R

P

=

180

°

.

ref_doc_title.

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