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प्रश्न
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 equal and unequal.
उत्तर
The given equation is `(a-b)x^2+5(a+b)x-2(a-b)=0`
∴ D=`[5(a+b)]^2-4xx(a-b)xx[-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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