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If the quadratic equation (1 + m^2)x^2 + 2mcx + (c^2 – a^2) = 0 has equal roots, prove that c^2 = a^2(1 + m^2).

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Question

If the quadratic equation (1 + m2)x2 + 2mcx + (c2 – a2) = 0 has equal roots, prove that c2 = a2(1 + m2).  

Theorem
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Solution

Given: 

(1 + m2)x2 + 2mcx + (c2 – a2) = 0

Here, 

a = (1 + m2), b = 2mc and c = (c2 – a2)

It is given that the roots of the equation are equal; therefore, we have: 

D = 0 

⇒ (b2 – 4ac) = 0 

⇒ (2mc)2 – 4 × (1 + m2) × (c2 – a2) = 0 

⇒ 4m2c2 – 4(c2 – a2 + m2c2 – m2a2) = 0 

⇒ 4m2c2 – 4c2 + 4a2 – 4m2c2 + 4m2a2 = 0 

⇒ –4c2 + 4a2 + 4m2a2 = 0 

⇒ a2 + m2a2 = c2 

⇒ a2(1 + m2) = c2 

⇒ c2 = a2(1 + m2

Hence proved.

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Chapter 4: Quadratic Equations - EXERCISE 4C [Page 202]

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R.S. Aggarwal Mathematics [English] Class 10
Chapter 4 Quadratic Equations
EXERCISE 4C | Q 14. | Page 202
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