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If the roots of the equations ax^2 + 2bx + c = 0 and bx^2 – 2sqrt(ac)x + b = 0 are simultaneously real then prove that b^2 = ac.

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Question

If the roots of the equations ax2 + 2bx + c = 0 and `bx^2 - 2sqrt(ac)x + b = 0` are simultaneously real then prove that b2 = ac.

Theorem
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Solution

It is given that the roots of the equation ax2 + 2bx + c = 0 are real.

∴ D1 = (2b)2 – 4 × a × c ≥ 0

⇒ 4(b2 – ac) ≥ 0 

⇒ –4(b2 – ac) ≥ 0 

⇒ b2 – ac ≥ 0   ...(1) 

Also, the roots of the equation `bx^2 - 2sqrt(ac)x + b = 0` are real. 

∴ `D_2 = (-2sqrt(ac))^2 - 4 xx b xx b ≥ 0` 

⇒ 4(ac – b2) ≥ 0 

⇒ –4(b2 – ac) ≥ 0

⇒ b2 – ac ≥ 0   ...(2) 

The roots of the given equations are simultaneously real if (1) and (2) holds true together. This is possible if 

b2 – ac = 0 

⇒ b2 = ac 

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Chapter 4: Quadratic Equations - EXERCISE 4C [Page 203]

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R.S. Aggarwal Mathematics [English] Class 10
Chapter 4 Quadratic Equations
EXERCISE 4C | Q 23. | Page 203
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