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Question
In ΔABC, ∠B = 90°. M and N are mid-points of AB and BC respectively.
Prove that
- CM2 + AN2 = 5MN2
- AN2 + CM2 = AC2 + MN2
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Solution
Given:
In ΔABC, ∠B = 90°.
M and N are mid-points of AB and BC respectively.
To Prove:
- CM2 + AN2 = 5MN2
- AN2 + CM2 = AC2 + MN2
Proof:
Let the right-angled triangle △ABC be such that:
AB = 2y, BC = 2x
Then AC2 = (2x)2 + (2y)2 = 4(x2 + y2)
Since M and N are midpoints:
AM = MB = y and BN = NC = x
Step 1: Find coordinates of points:
Let B(0, 0), C(2x,0) and A(0, 2y).
Then M(0, y), N(x, 0)
Step 2: Find the required distances:
CM2 = (2x − 0)2 + (0 − y)2 = 4x2 + y2
AN2 = (0 − x)2 + (2y − 0)2 = x2 + 4y2
MN2 = (x − 0)2 + (0 − y)2 = x2 + y2
Step 3: Prove (i):
CM2 + AN2 = (4x2 + y2) + (x2 + 4y2)
CM2 + AN2 = 5(x2 + y2)
But MN2 = x2 + y2,
CM2 + AN2 = 5MN2
Hence, (i) is proved.
Step 4: Prove (ii):
AN2 + CM2 = 5(x2 + y2)
and
AC2 = 4(x2 + y2), MN2 = x2 + y2
AC2 + MN2 = 4(x2 + y2) + (x2 + y2) = 5(x2 + y2)
Thus,
AN2 + CM2 = AC2 + MN2
Hence, (ii) is proved.
