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If a and b are real and a ≠ b then show that the roots of the equation (a – b)x^2 + 5(a + b)x – 2(a – b) = 0 are real and unequal.

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Question

If a and b are real and a ≠ b then show that the roots of the equation (a – b)x2 + 5(a + b)x – 2(a – b) = 0 are real and unequal.

Sum
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Solution

The given equation is (a – b)x2 + 5(a + b)x – 2(a – b) = 0

∴ D = [5(a + b)]2 – 4 × (a – b) × [–2(a – b)]

= 25(a + b)2 + 8(a – b)2 

Since a and b are real and a ≠ b, so (a – b)2 > 0 and (a + b)2 > 0 

∴ 8(a – b)2 > 0   ...(1) (Product of two positive numbers is always positive) 

Also, 25(a + b)2 > 0   ... 2 (Product of two positive numbers is always positive) 

Adding (1) and (2), we get 

25(a + b)2 + 8(a – b)2 > 0   ...(Sum of two positive numbers is always positive) 

⇒ D > 0 

Hence, the roots of the given equation are real and unequal.

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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 20. | Page 203
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