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Question
Find the roots of the following equation, if they exist, by applying the quadratic formula:
x2 – (2b – 1)x + (b2 – b – 20) = 0
Sum
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Solution
The given equation is x2 – (2b – 1)x + (b2 – b – 20) = 0
Comparing it with Ax2 + Bx + C = 0, we get
A = 1, B = –(2b – 1) and C = b2 – b – 20
∴ Discriminant, D = B2 – 4AC
= [–(2b – 1)]2 – 4 × 1 × (b2 – b – 20)
= 4b2 – 4b + 1 – 4b2 + 4b + 80
= 81 > 0
So, the given equation has real roots.
Now, `sqrt(D) = sqrt(18) = 9`
∴ `α = (-B + sqrt(D))/(2A)`
= `(-[-(2b-1)] + 9)/(2 xx 1)`
= `(2b + 8)/2`
= b + 4
`β = (-B - sqrt(D))/(2A)`
= `(-[-(2b - 1)] - 9)/(2 xx 1)`
= `(2b - 10)/2`
= b – 5
Hence, (b + 4) and (b – 5) are the roots of the given equation.
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