1
Question
In the given figure, ABCD is a quadrilateral in which AB = AD and BC = DC. Prove that (i) AC bisects ∠A and ∠C, (ii) BE = DE, (iii) ∠ABC=∠ADC.
In the given figure, ABCD is a quadrilateral in which AB = AD and BC = DC. Prove that (i) AC bisects ∠A and ∠C, (ii) BE = DE, (iii) ∠ABC=∠ADC.
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Solution
ANSWER:
Given: ABCD is a quadrilateral in which AB = AD and BC = DC
(i)
In ∆ABC and ∆ADC, we have:
AB = AD
(Given)
BC = DC
(Given)
AC is common.
i.e., ∆ABC ≅ ∆ADC
(SSS congruence rule)
∴ ∠BAC = ∠DAC and ∠BCA = ∠D CA
(By CPCT)
Thus, AC bisects ∠A and ∠ C.
(ii)
Now, in ∆ABE and ∆ADE , we have:
AB = AD
(Given)
∠BAE = ∠DAE
(Proven above)
AE is common.
∴ ∆ABE ≅ ∆ADE
(SAS congruence rule)
⇒ BE = DE
(By CPCT)
(iii) ∆ABC ≅ ∆ADC
∴ ∠ABC = ∠AD C
(Proven above)
(By CPCT)
Given: ABCD is a quadrilateral in which AB = AD and BC = DC
(i)
In ∆ABC and ∆ADC, we have:
AB = AD
(Given)
BC = DC
(Given)
AC is common.
i.e., ∆ABC ≅ ∆ADC
(SSS congruence rule)
∴ ∠BAC = ∠DAC and ∠BCA = ∠D CA
(By CPCT)
Thus, AC bisects ∠A and ∠ C.
(ii)
Now, in ∆ABE and ∆ADE , we have:
AB = AD
(Given)
∠BAE = ∠DAE
(Proven above)
AE is common.
∴ ∆ABE ≅ ∆ADE
(SAS congruence rule)
⇒ BE = DE
(By CPCT)
(iii) ∆ABC ≅ ∆ADC
∴ ∠ABC = ∠AD C
(Proven above)
(By CPCT)
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