If , a b, (a) Find : (b) Using properties of proportion, find:

(a) Given, Multiplying on both sides of equation : Hence, (b) Since, Applying componendo and dividendo, we get : Hence,

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(a) Given,

$x = \dfrac{5ab}{a - b}$

Multiplying $\dfrac{1}{a}$ on both sides of equation :

$\Rightarrow \dfrac{x}{a} = \dfrac{1}{a} \Big(\dfrac{5ab}{a - b}\Big) \\[1em] \Rightarrow \dfrac{x}{a} = \dfrac{5b}{a - b}.$

Hence, $\dfrac{x}{a} = \dfrac{5b}{a - b}.$

(b) Since,

$\dfrac{x}{a} = \dfrac{5b}{a - b}$

Applying componendo and dividendo, we get :

$\Rightarrow \dfrac{x + a}{x - a} = \dfrac{5b + (a - b)}{5b - (a - b)} \\[1em] \Rightarrow \dfrac{x + a}{x - a} = \dfrac{a + 4b}{6b - a}.$

Hence, $\dfrac{x + a}{x - a} = \dfrac{a + 4b}{6b - a}.$

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