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प्रश्न
AD and BC are equal perpendiculars drawn on AB. Prove that DC bisects AB.
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उत्तर
Given:
AD ⊥ AB and BC ⊥ AB, where AD = BC.
We need to prove that DC bisects AB, i.e., AC = CB.
Proof:
1. Draw the figure:
Let A, B and C be three points.
Let D be a point on line AB, such that AD ⊥ AB and BC ⊥ AB, where AD = BC.
2. Using symmetry:
Since AD = BC and both are perpendicular to AB, triangles △ABD and △CBA are right-angled triangles by the property of perpendicular lines.
3. Congruence of triangles:
We now have two right-angled triangles: △ABD and △CBA.
In these triangles:
AD = BC ...(Given)
AB is a common side,
∠ABD = ∠CBA = 90° since both are right angles.
By Hypotenuse-Leg (HL) congruence, these two triangles are congruent △ABD ≅ △CBA
4. Conclusion from congruence:
From the congruence of triangles △ABD and △CBA, we can conclude that the corresponding sides are equal AC = BC.
This implies that DC bisects AB because it divides AB into two equal parts.
Thus, DC bisects AB.
