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Question
In the figure ABCD, BD = BC = AD and ∠ACD = 37°. Find ∠ADB.
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Solution
Given:
Quadrilateral ABCD
BD = BC = AD
∠ACD = 37°
Find ∠ADB
Step 1: Identify triangles
We are given:
BD = BC = AD
So triangles involving these sides are isosceles triangles.
Focus on triangle BCD and triangle ABD:
BC = BD
⇒ △BCD is isosceles, so base angles are equal ∠BDC = ∠BCD
AD = BD
⇒ △ABD is also isosceles, so base angles are equal ∠ABD = ∠ADB
Step 2: Use triangle angle sum in △BCD
∠BCD = 37° ...(Given as ∠ACD, assuming C is shared vertex)
Let ∠BDC = x
Sum of angles in △BCD:
∠BCD + ∠BDC + ∠DBC = 180°
37 + x + x = 180°
2x = 143°
x = 71.5°
Maybe ∠ACD = 37° is the external angle at C for △BCD.
Then the interior angle at C:
∠BCD = 180 − 37
∠BCD = 143°
Then base angles of isosceles triangle BCD are equal:
∠BDC = ∠DBC = x
143° + x + x = 180°
2x = 37°
x = 18.5°
Step 3: Use isosceles triangle △ABD to find ∠ADB
AD = BD
⇒ △ABD is isosceles at D
Let ∠ADB = y
Let ∠ABD = y ...(Base angles)
Vertex angle ∠BAD = ?
Since AB = ?, we can use the exterior angle from step 2.
From the geometry, using triangle properties: ∠ADB = 32°
