How to solve using quadratic formula: $(\frac{b}{x - a}) + (\frac{a}{x - b} = 2$ $(b/(x-a))+(a/(x-b)=2$ ?

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How to solve using quadratic formula: $(\frac{b}{x - a}) + (\frac{a}{x - b} = 2$ $(b/(x-a))+(a/(x-b)=2$ ?

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Answer 1 · 2017-11-20T11:19:46

Multiply by x-a and x-b

Explanation:

Take note of the following before even using the quadratic formula:
x=a+b is one answer, as each fraction becomes b/b+a/a, which is two.

Step by step:

$(\frac{b}{x - a}) + (\frac{a}{x - b}) = 2$ $(b/(x-a))+(a/(x-b))=2$
Multiply by x-a
$b + (\frac{a (x - a)}{x - b}) = 2 (x - a)$ $b+((a(x-a))/(x-b))=2(x-a)$
Multiply by x-b
$b (x - b) + a (x - a) = 2 (x - a) (x - b)$ $b(x-b)+a(x-a)=2(x-a)(x-b)$
Expand
$b x - b^{2} + a x - a^{2} = 2 x^{2} - 2 a x - 2 b x + 2 a b$ $bx-b^2+ax-a^2=2x^2-2ax-2bx+2ab$
Collect like terms
$0 = 2 x^{2} - 3 (a + b) x + (2 a b + a^{2} + b^{2})$ $0=2x^2-3(a+b)x+(2ab+a^2+b^2)$
$0 = 2 x^{2} - 3 (a + b) x + {(a + b)}^{2}$ $0=2x^2-3(a+b)x+(a+b)^2$
There's a regular quadratic for you to solve using the quadratic formula.
for ${d x}^{2} + e x + f$ $dx^2+ex+f$ , the solutions are $x = \frac{- e \pm \sqrt{e^{2} - 4 d f}}{2 d}$ $x=(-e+-sqrt(e^2-4df))/(2d)$
The solutions gotten:
$x = \frac{3 (a + b) \pm \sqrt{3^{2} {(a + b)}^{2} - 4 \cdot 2 \cdot {(a + b)}^{2}}}{2 \cdot 2}$ $x=(3(a+b)+-sqrt(3^2(a+b)^2-4*2*(a+b)^2))/(2*2)$
$x = \frac{3 (a + b) \pm \sqrt{9 {(a + b)}^{2} - 8 {(a + b)}^{2}}}{4}$ $x=(3(a+b)+-sqrt(9(a+b)^2-8(a+b)^2))/(4)$
$x = \frac{3 (a + b) \pm (a + b)}{4}$ $x=(3(a+b)+-(a+b))/(4)$
The two solutions are therefore:
$x = \frac{a + b}{2}, a + b$ $x=(a+b)/2,a+b$

Answer 2 · 2017-11-20T13:49:35

$x_{1} = \frac{a + b}{2}$ $x_1=(a+b)/2$ and $x_{2} = a + b$ $x_2=a+b$

Explanation:

$\frac{b}{x - a} + \frac{a}{x - b} = 2$ $b/(x-a)+a/(x-b)=2$

$\frac{b \cdot (x - b) + a \cdot (x - a)}{(x - a) \cdot (x - b)} = 2$ $[b*(x-b)+a*(x-a)]/[(x-a)*(x-b)]=2$

$\frac{x b - b^{2} + a x - a^{2}}{x^{2} - (a + b) \cdot x + a b} = 2$ $(xb-b^2+ax-a^2)/[x^2-(a+b)*x+ab]=2$

$(a + b) \cdot x - (a^{2} + b^{2}) = 2 x^{2} - (2 a + 2 b) \cdot x + 2 a b = 0$ $(a+b)*x-(a^2+b^2)=2x^2-(2a+2b)*x+2ab=0$

$2 x^{2} - (3 a + 3 b) \cdot x + a^{2} + 2 a b + b^{2} = 0$ $2x^2-(3a+3b)*x+a^2+2ab+b^2=0$

$2 x^{2} - (3 a + 3 b) \cdot x + {(a + b)}^{2} = 0$ $2x^2-(3a+3b)*x+(a+b)^2=0$

$[x - (a + b)] \cdot [2 x - (a + b)] = 0$ $[x-(a+b)]*[2x-(a+b)]=0$

Hence $x_{1} = \frac{a + b}{2}$ $x_1=(a+b)/2$ and $x_{2} = a + b$ $x_2=a+b$

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How to solve using quadratic formula: $(\frac{b}{x - a}) + (\frac{a}{x - b} = 2$ $(b/(x-a))+(a/(x-b)=2$ ?

2 Answers

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