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Question
Question 11
If a line is drawn parallel to the base of an isosceles triangle to intersect its equal sides, prove that the quadrilateral, so formed is cyclic.
If a line is drawn parallel to the base of an isosceles triangle to intersect its equal sides, prove that the quadrilateral, so formed is cyclic.
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Solution
Given ΔABC is an isosceles triangle such that AB = AC and also DE || BC.
To prove that quadrilateral BCDE is a cyclic quadrilateral.
Construction : Draw a circle passes through the points B, C, D and E
Proof
In Δ ABC,
AB = AC [equal sides of a isosceles triangle]
∠ACB=∠ABC . . . . . .(i) [angles opposite to the equal sides are equal]
Since,DE || BC
∠ADE=∠ACB . . . . . .(ii)
On adding both sides by ∠EDC in Eq. (ii), we get
∠ADE+∠EDC=∠ACB+∠EDC
⇒ 180∘=∠ACB+∠EDC
⇒ ∠EDC+∠ABC=180∘ [from Eq.(i)]
Hence, BCDE is a cyclic quadrilateral, because sum of the opposite angles is 180∘.
Given ΔABC is an isosceles triangle such that AB = AC and also DE || BC.
To prove that quadrilateral BCDE is a cyclic quadrilateral.
Construction : Draw a circle passes through the points B, C, D and E
Proof
In Δ ABC,
AB = AC [equal sides of a isosceles triangle]
∠ACB=∠ABC . . . . . .(i) [angles opposite to the equal sides are equal]
Since,DE || BC
∠ADE=∠ACB . . . . . .(ii)
On adding both sides by ∠EDC in Eq. (ii), we get
∠ADE+∠EDC=∠ACB+∠EDC
⇒ 180∘=∠ACB+∠EDC
⇒ ∠EDC+∠ABC=180∘ [from Eq.(i)]
Hence, BCDE is a cyclic quadrilateral, because sum of the opposite angles is 180∘.
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