Kassidy wants to prove that the interior angles of any triangle sum to 180°. She draws a line through one vertex parallel to the opposite side, and then she labels all the angles formed.

Drag a reason to match each statement in Kassidy's two-column proof in the table below.

You can see that the red line is parallel to the line with angles 2 and 3. Alternate interior angles are two interior angles which lie on different parallel lines and on opposite sides of a transversal. Which justifies step 2

lublana lublana · Answer 2 · 2019-10-23T07:20:42+02:00

Answer:

1.A straight line measures 180 degrees

2.Alternate interior angles theorem

Step-by-step explanation:

We have to prove that

Sum of interior angles of any triangle =180 degrees

Proof:

1.[tex]m\angle 1+m\angle 4+m\angle 5=180^{\circ}[/tex]

Reason: A straight line measures 180 degrees

2.[tex]\angle 4\cong\angle 2[/tex]

[tex]\angle 5\cong \angle 3[/tex]

Reason:Alternate interior angles theorem

3.[tex]m\angle 4=m\angle 2,m\angle 3=m\angle 5[/tex]

Reason: by definition of congruent angles.

4.[tex]m\angle 1+m\angle 1+m\angle 3=180^{\circ}[/tex]

Reason: By substitution

Hence, proved.

Kassidy wants to prove that the interior angles of any triangle sum to 180°. She draws a line through one vertex parallel to the opposite side, and then she labels all the angles formed. Drag a reason to match each statement in Kassidy's two-column proof in the table below.

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Kassidy wants to prove that the interior angles of any triangle sum to 180°. She draws a line through one vertex parallel to the opposite side, and then she labels all the angles formed.

Drag a reason to match each statement in Kassidy's two-column proof in the table below.