If P - P c - x reduced pressure - V - V c - y reduced volume and T - T C - z reduced temperature- then-A- x-3-y2y-1-zB- x-3-y23 y-1-8 zC- x-3-y23 y-1-8 zD- x-3-y23 y-1-8 z

The correct option is D ( x + 3y^2 )(3y 1) = 8zAs we know, Critical pressure, P_c=a27b^2 Critical volume, V_c=3b Critical temperature, T_c=8a27Rb For one ...

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Standard XII

Chemistry

Liquefaction of Gases and Critical Constants

If P / P c = ...

Question

If $\frac{P}{P_{c}} = x$ (reduced pressure), $\frac{V}{V_{c}} = y$ (reduced volume) and $\frac{T}{T_{c}} = z$ (reduced temperature), then,

(x - \frac{3}{y^{2}}) (3 y - 1) = 8 z

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(x + \frac{3}{y^{2}}) (y - 1) = z

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(x - \frac{3}{y^{2}}) (3 y + 1) = 8 z

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(x + \frac{3}{y^{2}}) (3 y - 1) = 8 z

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Solution

The correct option is D $(x + \frac{3}{y^{2}}) (3 y - 1) = 8 z$
As we know,
$Critical pressure, P_{c} = \frac{a}{27 b^{2}}$
$Critical volume, V_{c} = 3 b$
$Critical temperature, T_{c} = \frac{8 a}{27 R b}$
For one mole of a real gas
$(P + \frac{a}{V^{2}}) (V - b) = R T . . . (i)$
$\frac{P}{P_{c}} = x (given)$
$∴ P = x P_{c} = \frac{a x}{27 b^{2}}$
$\frac{V}{V_{c}} = y (given)$
$∴ V = y V_{c} = 3 b y$
$\frac{T}{T_{c}} = z (given)$
$T = z T_{c} = \frac{8 a z}{27 R b}$
Putting values of $P, V$ and $T$ into Equation $(i)$ , we get
$(\frac{a x}{27 b^{2}} + \frac{a}{{(3 b y)}^{2}}) (3 b y - b) = R \times \frac{8 a z}{27 R b}$
$(\frac{a x}{27 b^{2}} + \frac{a}{9 b^{2} y^{2}}) (3 b y - b) = R \times \frac{8 a z}{27 R b}$
$\frac{a}{27 b^{2}} (x + \frac{3}{y^{2}}) \times b (3 y - 1) = R \times \frac{8 a z}{27 R b}$
$(x + \frac{3}{y^{2}}) (3 y - 1) = 8 z$

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Similar questions

Q. If

\frac{P}{P_{c}} = x

(reduced pressure),

\frac{V}{V_{c}} = y

(reduced volume) and

\frac{T}{T_{c}} = z

(reduced temperature), then,

Q. The vander waal's equation of corresponding states for 1 mole of gas is [where

P_{c} =

critical pressure,

T_{c} =

critical temperature,

V_{c} =

critical volume]

[π = \frac{P}{P_{c}}, ϕ = \frac{V}{V_{c}} a n d θ = \frac{T}{T_{c}}]

Q. If

\frac{P}{P_{c}} = P_{r}, \frac{T}{T_{c}} = T_{r}, a n d \frac{V_{m}}{V_{m, c}} = V_{r}

where

P_{r}

is reduced pressure,

P_{c}

is critical pressure

T_{r}

is reduced temperature,

T_{c}

is critical temperature

V_{r}

is reduced volume,

V_{c}

is critical volume
then the equation of state (or van der Waals equation), only in terms of

P_{r}, T_{r}

and

V_{r}

Q. Given that the reduced temperature,

θ = \frac{T}{T_{C}}

,the reduced pressure

π = \frac{F}{F_{C}}

, the reduced volume

ϕ = \frac{V}{V_{C}}

Thus, it can be said that the reduced equation of state may be given as:

Q. Given that the reduced temperature,

θ = \frac{T}{T_{C}}

the reduced pressure,

π = \frac{F}{F_{C}}

the reduced volume,

ϕ = \frac{V}{V_{C}}

. Thus, it can be said that the reduced equation of state may be given as :

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Liquefaction of Gases and Critical Constants

Standard XII Chemistry

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If PPc=x (reduced pressure), VVc=y (reduced volume) and TTc=z (reduced temperature), then,

If $\frac{P}{P_{c}} = x$ (reduced pressure), $\frac{V}{V_{c}} = y$ (reduced volume) and $\frac{T}{T_{c}} = z$ (reduced temperature), then,