SOLUTION: Given: Segment NK is a median of triangle JMN; IN>NM Prove: m<1>m<2

Algebra.Com
Question 1177180: Given: Segment NK is a median of triangle JMN; IN>NM Prove: m<1>m<2
Answer by CPhill(1959)   (Show Source): You can put this solution on YOUR website!
**1. Given Information**
* NK is a median of triangle JMN. This means that NK bisects side JM, so JK = KM.
* IN > NM
**2. Triangle Inequality Theorem**
In any triangle, the sum of the lengths of any two sides must be greater than the length of the third side.
**3. Applying the Triangle Inequality Theorem to Triangle INK**
* IN + NK > IK
**4. Applying the Triangle Inequality Theorem to Triangle NMK**
* NM + NK > MK
**5. Using the Given Information and Steps 3 and 4**
* Since IN > NM (given), and NK is common to both triangles INK and NMK, we can conclude that:
IN + NK > NM + NK
* This further implies that IK > MK
**6. Relating IK and MK to JK and KM**
* We know that JK = KM (because NK is a median).
* Therefore, IK > JK
**7. Hinge Theorem**
The Hinge Theorem states that if two triangles have two congruent sides, then the triangle with the larger included angle has the longer third side.
**8. Applying the Hinge Theorem**
* In triangles JNK and KNM:
* JN = NM (given)
* NK = NK (common side)
* IK > JK (from step 6)
* Therefore, by the Hinge Theorem, m∠1 > m∠2.
**Conclusion**
We have successfully proven that m∠1 > m∠2 using the given information, the Triangle Inequality Theorem, and the Hinge Theorem.
RELATED QUESTIONS

Given: AM = 1/2 of AB (There is a diagram which shows AB as a segment with Point M in... (answered by MathLover1)
Given: In △ ABC, segment AC = segment BC and segment AB ≠ segment AC. segment AD is a (answered by Edwin McCravy)
I have a confusing proof. GIVEN: 1)triangle ABC is isosceles. 2)line segment... (answered by Theo)
In a triangle congruence proof, it shows to two triangles abm and dem vertically up and... (answered by mollukutti)
This prove is really confusing me and below have provided what i think i understand but i (answered by drk)
You are given that:  Triangle ABC where segment AB is congruent to segment AC; draw a... (answered by fractalier)
Quadrilateral KLMN has vertices K(2, 3), L(7,3), M(4,7) and N(-1,7). Prove that the... (answered by ewatrrr)
Given: Triangle ABC Prove: m<4= m<1 + m<2 Picture: A triangle with line, CD,... (answered by drk)
Given: Parallelogram HOME Prove: line segment HO is congruent to line segment ME; line... (answered by Theo)