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Question
Find the roots of the following equation, if they exist, by applying the quadratic formula:
16x2 = 24x + 1
Sum
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Solution
Given: 16x2 = 24x + 1
Step-wise calculation:
1. Bring to standard form:
16x2 – 24x – 1 = 0
So a = 16, b = –24, c = –1.
2. Use the quadratic formula `x = (-b ± sqrt(b^2 - 4ac))/(2a)`.
3. Compute the discriminant:
D = (–24)2 – 4(16)(–1)
= 576 + 64
= 640
4. `sqrt(D) = sqrt(640)`
= `sqrt(64 xx 10)`
= `8sqrt(10)`
5. `x = (24 ± 8sqrt(10))/(32)`
= Divide numerator and denominator by 8
= `(3 ± sqrt(10))/4`
The two real roots are `x = ((3 + sqrt(10)))/4` and `x = ((3 - sqrt(10)))/4`.
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