If x ≠ y and $\dfrac{x^2 - x + 1}{y^2 - y + 1} = \dfrac{x^2 + x + 1}{y^2 + y + 1}$, prove that xy = 1. Use properties of proportion.

Given,

$\dfrac{x^2 - x + 1}{y^2 - y + 1} = \dfrac{x^2 + x + 1}{y^2 + y + 1}$

Applying alternendo we get,

$\dfrac{x^2 - x + 1}{x^2 + x + 1} = \dfrac{y^2 - y + 1}{y^2 + y + 1}$

Applying componendo and dividendo we get,

$\Rightarrow \dfrac{(x^2 − x + 1) + (x^2 + x + 1)}{(x^2 − x + 1) − (x^2 + x + 1)} = \dfrac{(y^2 - y + 1)+ (y^2 + y + 1)}{(y^2 - y + 1) - (y^2 + y + 1)} \\[1em] \Rightarrow \dfrac{x^2 − x + 1 + x^2 + x + 1}{x^2 − x + 1 − x^2 - x - 1} = \dfrac{y^2 - y + 1 + y^2 + y + 1}{y^2 - y + 1 - y^2 - y - 1} \\[1em] \Rightarrow \dfrac{2x^2 + 2}{-2x} = \dfrac{2y^2 + 2}{-2y} \\[1em] \Rightarrow \dfrac{2(x^2 + 1)}{-2x} = \dfrac{2(y^2 + 1)}{-2y} \\[1em] \Rightarrow \dfrac{x^2 + 1}{x} = \dfrac{y^2 + 1}{y} \\[1em]$

⇒ xy² + x = x²y + y

⇒ xy(y - x) - (y - x) = 0

⇒ (y − x)(xy − 1) = 0

⇒ xy = 1

Hence, proved that xy = 1.