Molar conductivity of a weak acid HQ of conce | vedclass

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(A) For a weak acid,$K_a = C\alpha^2$ and $\alpha = \frac{\Lambda_m}{\Lambda_m^0}$.$K_a = C \left(\frac{\Lambda_m}{\Lambda_m^0}\right)^2$$pK_a = -\log

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$2$

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(A) For a weak acid,$K_a = C\alpha^2$ and $\alpha = \frac{\Lambda_m}{\Lambda_m^0}$.$K_a = C \left(\frac{\Lambda_m}{\Lambda_m^0}\right)^2$$pK_a = -\log K_a = -\log C - 2\log \Lambda_m + 2\log \Lambda_m^0$$pK_a(HQ) - pK_a(HZ) = \log \left(\frac{C_{HZ}}{C_{HQ}}\right) + 2\log \left(\frac{\Lambda_{m(HZ)}}{\Lambda_{m(HQ)}}\right)$Given $\frac{\Lambda_{m(HQ)}}{\Lambda_{m(HZ)}} = \frac{1}{30}$,so $\frac{\Lambda_{m(HZ)}}{\Lambda_{m(HQ)}} = 30$.Since $\lambda_{Q^{-}}^0 = \lambda_{Z^{-}}^0$ and $\lambda_{H^+}^0$ is the same for both,$\Lambda_{m(HQ)}^0 = \Lambda_{m(HZ)}^0$.$\Delta pK_a = \log \left(\frac{0.02}{0.18}\right) + 2\log(30)$$\Delta pK_a = \log \left(\frac{1}{9}\right) + 2\log(30) = -2\log 3 + 2(\log 3 + \log 10) = -2\log 3 + 2\log 3 + 2 = 2$.

List-$I$	List-$II$
$P$. $\underset{X}{(C_2H_5)_3N} + \underset{Y}{CH_3COOH}$	$1$. Conductivity decreases and then increases
$Q$. $\underset{X}{KI (0.1 \ M)} + \underset{Y}{AgNO_3 (0.01 \ M)}$	$2$. Conductivity decreases and then does not change much
$R$. $\underset{X}{CH_3COOH} + \underset{Y}{KOH}$	$3$. Conductivity increases and then does not change much
$S$. $\underset{X}{NaOH} + \underset{Y}{HI}$	$4$. Conductivity does not change much and then increases

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