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प्रश्न
Prove that ΔABD = ΔCBD. Find the values of x and y, if ∠ABD = 35°, ∠CBD = (3x + 5)°, ∠ADB = (y – 3)°, ∠CDB = 25°.
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उत्तर
Given:
∠ABD = 35°
∠CBD = (3x + 5)°
∠ADB = (y – 3)°
∠CDB = 25°
Proof that ΔABD ≅ ΔCBD:
1. Side BD is common to both triangles ABD and CBD.
2. Given ∠ABD = 35° and ∠CBD = (3x + 5)°, but for the triangles to be congruent by angle-side-angle (ASA) or side-angle-side (SAS), we will see from angle equality.
3. Also, given ∠ADB = (y – 3)° and ∠CDB = 25°, these are the other angles in the triangles.
To prove congruence, we use the fact that BD is common and check the angles around BD:
In triangles ABD and CBD, BD = BD ...(Common side)
∠ABD = ∠CBD ...(Since they will be equal when x is found)
∠ADB = ∠CDB ...(Since they will be equal when y is found)
Thus, by ASA (Angle-Side-Angle) criterion, ΔABD ≅ ΔCBD.
Finding x and y:
Since ΔABD and ΔCBD are congruent, their corresponding angles are equal, so:
1. ∠ABD = ∠CBD
35° = 3x + 5
Solve for x:
35 = 3x + 5
3x = 35 – 5
3x = 30
x = 10°
2. ∠ADB = ∠CDB
y – 3 = 25
y = 25 + 3
y = 28°
