The statements that are true are;
3. m∠JKL = 45°
4. m∠MKQ + m∠PKQ = m∠PKM
5. line PK is an angle bisector
This involves various angle bisection theorems.
We are told that Line segment JKM is a straight angle. This means that;
PK is a line drawn perpendicular to line segment JKM at the point K.
- The first option tells us that; Line KQ is an angle bisector. This statement can't be true because the line line KQ does not pass through the diagonal vertex of the right angled symbol at point K.
- The second option says that; ∠LKQ is bisected. This statement is not true because like i stated earlier PK is just a perpendicular line to JKM that bisects it into 2 equal parts and not a bisector of ∠LKQ.
- The third option says that; m∠JKL = 45°. This statement is true because from the image it is clear that line KL divides m∠PKJ into two equal angles.
- The fourth option says that; m∠MKQ + m∠PKQ = m∠PKM. This statement is true. Now, although KQ doesn't bisect m∠PKM into 2 equal parts, nevertheless it divides it into 2 angles namely m∠MKQ and m∠PKQ. This means the sum of m∠MKQ + m∠PKQ must yield m∠PKM.
- The fifth option says that line PK is an angle bisector. This statement is true because we are told that JKM is a straight angle. Thus as PK is perpendicular to it, it has bisected it into two equal parts.
- The sixth option says that; ∠JKL ≅ ∠QKM. This is not true because as seen earlier ∠JKL is a bisected angle which is 45° whereas, ∠QKM is not a bisected angle and thus not equal to 45°.
read more at; brainly.com/question/16968539
