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Find the sum of all $r$ such that $\frac{8r^2 - 14 r + 3}{r+5} = 4r -1$.
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Find the sum of all $r$ such that $\frac{8r^2 - 14 r + 3}{r+5} = 4r -1$.

User Viswanatha Swamy
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6.4k points

1 Answer

3 votes

Answer:

8.25

Explanation:


(8r^2 - 14 r + 3)/(r+5) = 4r -1


8r^2 - 14r + 3= (4r -1)(r + 5)


8r^2 - 14r + 3= 4 {r}^(2) + 19r - 5


4 {r}^(2) - 33r + 8=0


4 {r}^(2) - 32r - r + 8 = 0


4r(r - 8) - 1(r - 8) = 0


(4r - 1)(r - 8)


r = 8 \: or \: (1)/(4)

Therefore the sum of all values of r


8 + (1)/(4) = 8 (1)/(4)

User Rachel
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