In a cyclic quadrilateral ABCD , E is a point on AC such that angle ADE = angle BDC. PT AD.BC= AE. DB and AB.DE=CE. DA
vaidehiwatwe:
hey can u send a pic of it
Answers
Answered by
2
In a cyclic quadrilateral, the vertices are on the circumference of a circle. Also, the angle between a side and a diagonal is equal to the angle between the opposite side and the other diagonal.
Given ∠ADE = ∠CDB = x (let).
ABCD is a Cyclic Quadrilateral
=> ∠CAD = ∠CBD = y and ∠CDB = ∠CAB = x
=> ∠ABD = ACD = w
Also, ∠CDE = x + z = ∠ADB
Compare ΔAED and ΔBCD. The angles are same and hence are similar triangles. Ratios of corresponding sides are:
=> AD/ BD = AE / BC
=> AD * BC = AE * BD proved.
Now, compare ΔABD and ΔCDE. Two angles x+z and w are equal in both. They are similar triangles. Hence,
=> AB / DA = CE / DE
=> AB * DE = CE * DA proved.
Given ∠ADE = ∠CDB = x (let).
ABCD is a Cyclic Quadrilateral
=> ∠CAD = ∠CBD = y and ∠CDB = ∠CAB = x
=> ∠ABD = ACD = w
Also, ∠CDE = x + z = ∠ADB
Compare ΔAED and ΔBCD. The angles are same and hence are similar triangles. Ratios of corresponding sides are:
=> AD/ BD = AE / BC
=> AD * BC = AE * BD proved.
Now, compare ΔABD and ΔCDE. Two angles x+z and w are equal in both. They are similar triangles. Hence,
=> AB / DA = CE / DE
=> AB * DE = CE * DA proved.
Attachments:
Pls mark as brainliest if it helps !
Similar questions