एक विलेय के (5,g) को (500,g) विलायक में घोलने पर \(\Delta T_b=0.052,K\) है। यदि \(K_b=0.52,K,kg,mol^{-1}\) और (i=0.5) हो, तो वास्तविक मोलर द्रव्यमान क्या होगा?
When (5,g) solute is dissolved in (500,g) solvent, \(\Delta T_b=0.052,K\). If \(K_b=0.52,K,kg,mol^{-1}\) and (i=0.5), what is the true molar mass?
Explanation opens after your attempt
Correct Answer
B. \(200,g,mol^{-1}\)
Concept
Effective molality \(=\frac{0.052}{0.52}=0.1\).
Why this answer is correct
Since (i=0.5), true molality \(=\frac{0.1}{0.5}=0.2\).
Exam Tip
(500,g=0.5,kg), moles \(=0.2\times0.5=0.1\), so molar mass \(=50,g,mol^{-1}\). चरण 1: प्रभावी मोललता \(=\frac{0.052}{0.52}=0.1\) है। चरण 2: (i=0.5), इसलिए वास्तविक मोललता \(\frac{0.1}{0.5}=0.2\) है। चरण 3: (500,g=0.5,kg), मोल \(0.2\times0.5=0.1\), इसलिए मोलर द्रव्यमान \(=\frac{5}{0.1}=50,g,mol^{-1}\)।
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