Write roots of the equation (a − b) x^2+ (b − c) x + (c − a) = 0.

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Write roots of the equation $(a − b) x^2+ (b − c) x + (c − a) = 0$.

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The given equation in $(a − b) x^2+ (b − c) x + (c − a) = 0$ ....(i) Let $\alpha$ and $\beta$ are the roots of (i) then, $\alpha+\beta=\frac{-\text{b}}{\text{a}}=\frac{-(\text{b}-\text{c})}{\text{a}-\text{b}}\ ...(\text{ii})$ and $\alpha\beta=\frac{\text{c}}{\text{a}}=\frac{\text{c}-\text{a}}{\text{a}-\text{b}}$ Now, $(\alpha-\beta)^2=(\alpha+\beta)^2-4\alpha\beta$ $\Rightarrow\Big(-\frac{\text{b}-\text{c}}{\text{a}-\text{b}}\Big)^2-4\Big(\frac{\text{c}-\text{a}}{\text{a}-\text{b}}\Big)$ $\Rightarrow\frac{(\text{b}-\text{c})^2-4(\text{c}-\text{a})(\text{a}-\text{b})}{(\text{a}-\text{b})^2}$ $\therefore\alpha-\beta=\frac{\sqrt{(\text{b}-\text{c})^2-4(\text{c}-\text{a})(\text{a}-\text{b}})}{(\text{a}-\text{b})}\ ...(\text{ii})$ Solving (i) and (ii) $2\alpha=\frac{-(\text{b}-\text{c})}{\text{a}-\text{b}}+\frac{\sqrt{(\text{b}-\text{c})^2-4(\text{c}-\text{a})(\text{a}-\text{b}})}{\text{a}-\text{b}}$ $=\frac{-(\text{b}-\text{c})}{\text{a}-\text{b}}+\frac{\sqrt{(2\text{a}-\text{b}-\text{c})^2}}{\text{a}-\text{b}}$ $=\frac{2(\text{a}-\text{b})}{\text{a}-\text{b}}=2$ $\therefore\alpha=1$ From (ii) $\beta=\frac{\text{c}-\text{a}}{\text{a}-\text{b}}$

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