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Find the roots of the following equation, if they exist, by applying the quadratic formula: 3a^2x^2 + 8abx + 4b^2 = 0, a ≠ 0

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Question

Find the roots of the following equation, if they exist, by applying the quadratic formula:

3a2x2 + 8abx + 4b2 = 0, a ≠ 0

Sum
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Solution

Given: 

3a2x2 + 8abx + 4b2 = 0 

On comparing it with Ax2 + Bx + C = 0, we get: 

A = 3a2, B = 8ab and C = 4b2 

Discriminant D is given by: 

D = (B2 – 4AC) 

= (8ab)2 – 4 × 3a2 × 4b2 

= 16a2b2 > 0 

Hence, the roots of the equation are real.

Roots α and β are given by:  

`α = (-b + sqrt(D))/(2a)`

= `(-8ab + sqrt(16a^2b^2))/(2 xx 3a^2)`

= `(-8ab + 4ab)/(6a^2)`

= `(-4ab)/(6a^2)`

= `(-2b)/(3a) ` 

`β = (-b - sqrt(D))/(2a)`

= `(-8ab - sqrt(16a^2b^2))/(2 xx 3a^2)`

= `(-8ab - 4ab)/(6a^2)`

= `(-12ab)/(6a^2)`

= `(-2b)/(a)` 

Thus, the roots of the equation are `(-2b)/(3a)` and `(-2b)/a`.

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Chapter 4: Quadratic Equations - EXERCISE 4B [Page 194]

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R.S. Aggarwal Mathematics [English] Class 10
Chapter 4 Quadratic Equations
EXERCISE 4B | Q 34. | Page 194
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