Question 16
Line segment joining the mid-points M and N of parallel sides AB and DC, respectively of a trapezium ABCD is perpendicular to both the sides AB and DC. Prove that AD = BC.
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Solution
Since M is the mid-point of AB,
AM = MB
Now, in ΔAMNandΔBMN,AM=MB [proved above] ∠3=∠4 [each 90∘]
MN = MN [common side] ∴ΔAMN≅BMN [by SAS congruence rule] ∴∠1=∠2 [by CPCT]
On multiplying both sides of above equation by - 1 and than adding 90∘ both sides, we get 90∘−∠1=90∘−∠2 ⇒∠AND=∠BNC...(i)
Now, in ΔADNandΔBCN, ∠AND=∠BNC [from Eq.(i)]
AN = BN [∵ΔAMN≅ΔBMN]
and DN = NC [∴ N is the mid-point of CD (given)] ∴ΔADN≅ΔBCN [by SAS congruence rule]
Hence, AD = BC [by CPCT]