What is the reason for Statement 3 of the two-column proof?

Angle Addition Postulate

Definition of angle

Definition of complementary angles

Linear Pair Postulate
Given: the measure of angle J M K equals 52 degrees. The measure of angle K M L equals 38 degrees. Prove: angle J M L is a right angle. Art: Three rays M L, M K, and M J share an endpoint M. Ray M K forms a bisector. The bisector divides angle J M L into two parts labeled as J M K and K M L.

Statements Reasons
1. m∠JMK=52°m∠JMK=52° Given
2. m∠KML=38°m∠KML=38° Given
3. m∠JMK+m∠KML=m∠JMLm∠JMK+m∠KML=m∠JML
4. 52°+38°=m∠JML52°+38°=m∠JML Substitution Property of Equality
5. 90°=m∠JML90°=m∠JML Simplification
6. ∠JML∠JML is a right angle. Definition of right angle

Also, Three rays ML, MK, and MJ share an endpoint M. Ray MK forms a bisector as shown in the attached image and the bisector divides angle JML into two parts.

To Prove: [tex]\angle JML[/tex] is a right angle.

Proof:

Statements Reasons

1. [tex]m \angle JMK=52^\circ[/tex] Given

2. [tex]m \angle KML=38^\circ[/tex] Given

3. [tex]m \angle JMK+m \angle KML=m \angle JML[/tex]

The reason for statement 3 is Angle addition postulate. As angle JML is composed of 2 angles that is angle JMK and angle KML. So by adding the measures of angles JMK and KML, we will get the measure of angle JML which is referred as Angle addition postulate.

4. [tex]52^\circ+38^\circ = m \angle JML[/tex] Substitution property of equality

5. [tex]90^\circ = m \angle JML[/tex] Simplification

6. [tex]\angle[/tex]JML is a right angle. Definition of right angle

itsbaron22 itsbaron22 · Answer 2 · 2021-09-15T15:27:28+02:00

itsbaron22 itsbaron22

15-09-2021

Answer:

guy is right above and im in k12 too lol

Step-by-step explanation:

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