In Fig. 7.21. AC = AE, AB = AD and Z BAD= Z EAC. Show that BC = DE.
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Answered by
1
Answer:
It is given that ∠BAD=∠EAC
∠BAD+∠DAC=∠EAC+∠DAC [add ∠DAC on both sides]
∴∠BAC=∠DAE
In △BAC and △DAE
AB=AD (Given)
∠BAC=∠DAE (Proved above)
AC=AE (Given)
∴△BAC≅△DAE (By SAS congruence rule)
∴BC=DE (By CPCT)
Step-by-step explanation:
HOPE YOU WILL UNDERSTAND
Answered by
3
Answer:
It is given that ∠BAD=∠EAC
∠BAD+∠DAC=∠EAC+∠DAC [add ∠DAC on both sides]
∴∠BAC=∠DAE
In △BAC and △DAE
AB=AD (Given)
∠BAC=∠DAE (Proved above)
AC=AE (Given)
∴△BAC≅△DAE (By SAS congruence rule)
∴BC=DE (By CPCT)
Step-by-step explanation:
hope it will help full for you
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