A solution of two components containing n_{1} | vedclass

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Question

(D) Molarity $(C_{2})$ is defined as the number of moles of solute per liter of solution.$C_{2} = \frac{n_{2}}{V_{sol} (in \ L)} = \frac{n_{2} 	imes

Vedclass · Accepted Answer

$C_{2} = \frac{1000 d x_{2}}{M_{1} + x_{2}(M_{2} - M_{1})}$

Vedclass · Answer

(D) Molarity $(C_{2})$ is defined as the number of moles of solute per liter of solution.$C_{2} = \frac{n_{2}}{V_{sol} (in \ L)} = \frac{n_{2} 	imes 1000}{V_{sol} (in \ mL)}$Since $V_{sol} = \frac{	ext{Total Mass}}{d} = \frac{n_{1}M_{1} + n_{2}M_{2}}{d}$, we have:$C_{2} = \frac{n_{2} 	imes 1000 	imes d}{n_{1}M_{1} + n_{2}M_{2}}$Divide numerator and denominator by $(n_{1} + n_{2})$:$C_{2} = \frac{1000 d (n_{2} / (n_{1} + n_{2}))}{(n_{1}M_{1} + n_{2}M_{2}) / (n_{1} + n_{2})}$Using mole fraction $x_{2} = \frac{n_{2}}{n_{1} + n_{2}}$ and $x_{1} = \frac{n_{1}}{n_{1} + n_{2}} = 1 - x_{2}$:$C_{2} = \frac{1000 d x_{2}}{x_{1}M_{1} + x_{2}M_{2}} = \frac{1000 d x_{2}}{(1 - x_{2})M_{1} + x_{2}M_{2}}$$C_{2} = \frac{1000 d x_{2}}{M_{1} - x_{2}M_{1} + x_{2}M_{2}} = \frac{1000 d x_{2}}{M_{1} + x_{2}(M_{2} - M_{1})}$

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