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Question
ABCD is a rectangle. M is the mid-point of AC and CPMN is a rectangle. Prove that:
- P is the mid-point of CD
- PN = `1/2` AC
Theorem
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Solution
Given:
- ABCD is a rectangle.
- M is the mid-point of AC.
- CPMN is a rectangle.
To Prove:
- P is the mid-point of CD.
- PN = `1/2` AC.
Proof:
Step 1: Since ABCD is a rectangle
- AB = CD and AD = BC,
- All angles are 90°.
Step 2: M is the mid-point of diagonal AC, So, AM = MC = `1/2` AC.
Step 3: CPMN is a rectangle
- Opposite sides are equal and parallel,
- All angles are 90°,
- Therefore, CP = MN and CM = PN,
- CP || MN and CM || PN.
Step 4: Since CPMN is a rectangle and shares side CM with ABCD and M is midpoint of AC, triangle AMC is formed.
Step 5: Since CPMN is a rectangle and P, C, M, N are its vertices,
- P lies on CD,
- N lies on AB,
- Because CPMN is rectangle, sides CP and MN are parallel and sides CM and PN are parallel,
- Since M is midpoint of AC and C and P lie on CD,
- By midpoint theorem in triangle ADC, P is midpoint of CD.
Step 6: Since CPMN is rectangle
- PN = CM (opposite sides of rectangle)
- CM = MA (since M is midpoint of AC)
- PN = `1/2` AC
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