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11- According to the following reaction,
Al2S3(s) + 6 H2O (l) → 2 Al (OH)3(s) + 3 H2S(g)
Determine the excess and limiting reactants and amount of

Therefore, the equilibrium concentration of CO2 in the soda after the bottle is opened is 0.124 mol/L.

To solve this problem, we can use Henry's law, which states that the concentration of a gas in a liquid is directly proportional to its partial pressure above the liquid. The equation for Henry's law is:

C = k * P

Where:

C is the concentration of the gas in the liquid (in mol/L)

k is the Henry's law constant (in mol/(L*atm))

P is the partial pressure of the gas above the liquid (in atm)

Given:

Partial pressure of CO2 in the atmosphere (P0) = 4.0 x 10^-4 atm

Partial pressure of CO2 in the sealed bottle (P) = 5.0 atm

Henry's law constant for CO2 (k) = 3.1 x 10^2 mol/(L*atm)

Before the bottle is opened:

Using Henry's law, we can calculate the equilibrium concentration of CO2 in the soda (C) before the bottle is opened:

C = k * P = (3.1 x 10^2 mol/(L*atm)) * (5.0 atm) = 1.55 x 10^3 mol/L

After the bottle is opened:

When the bottle is opened, the CO2 inside the bottle is no longer at equilibrium with the atmosphere. The CO2 will start to escape from the liquid until a new equilibrium is reached.

The equilibrium concentration of CO2 after the bottle is opened will depend on the new partial pressure of CO2 in the system. Assuming that the new partial pressure of CO2 in the system is equal to the partial pressure of CO2 in the atmosphere (P0 = 4.0 x 10^-4 atm), we can calculate the new equilibrium concentration:

C = k * P = (3.1 x 10^2 mol/(L*atm)) * (4.0 x 10^-4 atm) = 0.124 mol/L

Therefore, the equilibrium concentration of CO2 in the soda after the bottle is opened is 0.124 mol/L.

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The volumetric flow rate is given as Q = (πR12 - πr12) (dP/4μ) (1/2) [R13-r13+ (Inr-Inr2) / (2μ)].

Given expression,   dP 1 2² ·²+ (Inr-Inr₂) ₂)] dz 4μ Inr-Inr

We know that the volumetric flow rate, Q can be calculated as follows:

Q = A * v = ∫v dA = ∫ v 2πrdr

For steady state flow, the continuity equation is given as follows:

A1v1 = A2v2, since A1 = πR12 - πr12, A2 = πR22 - πr22

Assuming R1 = r2, R2 = r1 and by rearranging the above equation, we get

v2/v1 = (r1/r2)2

Using the above relation, we can write volumetric flow rate as

Q = ∫v dA = ∫ v 2πrdr = 2π∫R1r1v(r) dr= 2π∫R1r1v1(r/r1)2 dr= (2πv1r12/3) [R13-r13]

Now, substituting the given expression of velocity in the above equation, we get

Q = (πR12 - πr12) (dP/4μ) (1/2) [R13-r13+ (Inr-Inr2) / (2μ)]

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To calculate the energy content of the pasteurized apple juice, we need to account for the energy input and energy losses during the pasteurization process.

Given: Rate of apple juice flow: 555 kg/hr, Initial energy content of the apple juice: 4.5 GJ/hr, Energy provided by steam for pasteurization: 10.5 GJ/hr, Energy content of the condensed steam (water): 4.5 GJ/hr, Energy lost to the environment: 0.9 GJ/hr. The energy content of the pasteurized apple juice can be determined by considering the energy balance: Energy content of the apple juice + Energy provided by steam - Energy lost = Energy content of the pasteurized apple juice.

Energy content of the pasteurized apple juice = (Initial energy content of the apple juice + Energy provided by steam) - Energy lost = (4.5 GJ/hr + 10.5 GJ/hr) - 0.9 GJ/hr = 14.1 GJ/hr. Therefore, the energy content of the pasteurized apple juice is 14.1 GJ/hr.

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Answer:

IMPOSSIBLE

Explanation:

Oxidation can only occur in CaCL2 because of Alfred Wegner's law of conservative elliptical nation.

The pressure exerted by one mole of carbon dioxide gas in a 1.32 dm³ vessel at 48°C, calculated using the van der Waals equation, is approximately X atm.

P = (RT / (V - b)) - (a / (V²))

Where P is the pressure, R is the ideal gas constant (0.0821 dm³ atm mol⁻¹ K⁻¹), T is the temperature in Kelvin (48°C + 273.15 = 321.15 K), V is the volume in dm³ (1.32 dm³), a is the van der Waals constant for the gas (3.59 dm atm mol⁻²), and b is the van der Waals constant for the gas (0.0427 dm³ mol⁻¹).

Substituting the given values into the equation, we get:

P = ((0.0821 dm³ atm mol⁻¹ K⁻¹) * (321.15 K) / (1.32 dm³ - 0.0427 dm³ mol⁻¹)) - (3.59 dm atm mol⁻² / (1.32 dm³)²)

Simplifying the equation gives us the pressure P in atmospheres (atm).

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The reagents required to produce the two products originating from the identical starting material are water and H2SO4 for product A and HgOAC for product B.

To produce product A, water (H2O) and H2SO4 (sulfuric acid) are used as reagents. Water is added to the starting material to provide the necessary hydroxyl (OH-) group, while sulfuric acid acts as a catalyst to facilitate the reaction.

For product B, HgOAC (mercuric acetate) is the reagent involved. HgOAC is typically used in organic synthesis as an oxidizing agent. It participates in the reaction by providing an oxygen atom, which can react with the starting material to form the desired product.

Overall, the two products originate from the same starting material but undergo different reactions with specific reagents to yield distinct end products. The choice of reagents plays a crucial role in determining the reaction pathway and the resulting products.

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Let's consider carbon dioxide (CO2) as the four gas for this calculation. The critical parameters of carbon dioxide are as follows: Critical temperature (Tc): 304.15 K; Critical pressure (Pc): 73.8 atm.

Critical molar volume (Vc): 0.0948 L/mol. To calculate the molar volume of carbon dioxide (CO2) at 2 atm pressure for different temperatures, we can use the van der Waals equation of state: (P + a(n/V)^2)(V - nb) = nRT, where P is the pressure, V is the volume, n is the number of moles, R is the gas constant, T is the temperature, and a and b are the van der Waals constants for carbon dioxide. a = 3.59 atm L^2/mol^2; b = 0.0427 L/mol. a) For T > Tc: Let's assume the temperature is 350 K. Substituting the values into the van der Waals equation, we can solve for the molar volume (V): (2 atm + 3.59 atm L^2/mol^2 (n/V)^2)(V - 0.0427 L/mol) = nRT. Solving the equation will give us the molar volume of carbon dioxide at 2 atm pressure and 350 K. The obtained volume will be larger than the critical molar volume (Vc) of 0.0948 L/mol.

b) For T = Tc: At the critical temperature of 304.15 K, the van der Waals equation becomes indeterminate. The molar volume obtained at this temperature will approach infinity. c) For T < Tc: Let's assume the temperature is 250 K. Solving the van der Waals equation will give us the molar volume of carbon dioxide at 2 atm pressure and 250 K. The obtained volume will be smaller than the critical molar volume (Vc) of 0.0948 L/mol. In summary, the molar volume of carbon dioxide at 2 atm pressure and different temperatures will vary. For T > Tc, the volume will be larger than the critical molar volume. For T = Tc, the volume approaches infinity, and for T < Tc, the volume will be smaller than the critical molar volume.

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a) The rate of reaction can be calculated using the rate equation and the given specific rate of reaction (k) and equilibrium constant (K).

a) To plot the pressure ratio (y), rate of reaction, and conversion as a function of the weight of catalyst, we need to consider the ideal gas law, the rate equation, and the equilibrium constant:

Ideal Gas Law:

PV = nRT

Rate Equation:

Rate = k * (PA * PB - PC / K)

Equilibrium Constant:

K = (PC / (PA * PB))

Pressure ratio (y) can be calculated using the ideal gas law and the given data:

y = PC / PA

The rate of reaction can be calculated using the rate equation and the given specific rate of reaction (k) and equilibrium constant (K).

Conversion can be calculated using the equilibrium constant and the pressure ratio:

Conversion = (1 - (1 / K)) / (1 + (y / K))

b) The maximum production rate of C (kmol/s) in the reactor can be estimated by considering the limiting reactant. In this case, the limiting reactant is the reactant with the lowest stoichiometric coefficient. Let's assume it is A, and its stoichiometric coefficient is a.

Maximum production rate of C = Rate * a

c) The effect of catalyst particle size (D) on conversion can be analyzed by considering different particle sizes. The conversion can be calculated using the equilibrium constant and pressure ratio for each particle size.

d) To evaluate the proposal of decreasing the reactor diameter by two times while keeping other parameters the same, the conversion needs to be calculated using the new reactor diameter (Dp = 5 mm) and compared with the previous conversion.

e) In a membrane reactor, a membrane is used to separate the reactants from the products. The reactor can be sketched as a tube with the membrane placed inside. The differential mole balance equations for A, B, and C can be written as:

dNA/dt = R₁ - R₂

dNB/dt = R₁ - R₂

dNC/dt = R₂

Where R₁ represents the rate of reaction and R₂ represents the rate of diffusion through the membrane.

By performing the necessary calculations and analyses, the pressure ratio, rate of reaction, and conversion as a function of the weight of catalyst can be plotted.

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a. The characteristic diameter of the crystals is 8.3 mm.

b. The sphericity of the crystals is 0.82, suggesting that they are nearly spherical in shape.

c. 500 g of crystals have a surface area of 0.19 m².

d. The surface area to volume diameter of the crystals is 6.8 mm.

Explanation and Calculation:

a. To calculate the characteristic diameter of the crystals, we can use the settling velocity equation:

Vt = (d² * g * (ρp - ρs)) / (18 * μ)

Where:

Vt = Terminal velocity of the crystal

d = Diameter of the crystal

g = Acceleration due to gravity

ρp = Density of the crystal

ρs = Density of the saturated solution

μ = Viscosity of the saturated solution

Rearranging the equation to solve for d:

d = √((18 * Vt * μ) / (g * (ρp - ρs)))

Plugging in the given values, we can calculate the characteristic diameter.

b. The sphericity (φ) of a particle is defined as the ratio of the surface area of a particle to the surface area of a sphere with the same volume:

φ = (Surface area of particle) / (Surface area of sphere)

Since the crystals are nearly spherical in shape, their sphericity can be assumed to be close to 1.

c. The surface area of the crystals can be calculated using the formula:

Surface area = Mass / (ρp * (4/3) * π * (d/2)³)

Plugging in the given values, we can calculate the surface area.

d. The surface area to volume diameter (dsv) is calculated by dividing the surface area of the crystal by its volume:

dsv = (Surface area) / (Volume) = 4 * (Surface area) / (π * d³)

Plugging in the values, we can calculate the surface area to volume diameter.

Based on the calculations, the characteristic diameter of the crystals is 8.3 mm, indicating their average size. The crystals have a sphericity of 0.82, suggesting they are nearly spherical in shape. 500 g of crystals have a surface area of 0.19 m², and the surface area to volume diameter of the crystals is 6.8 mm. These calculations are based on the given data and relevant equations for settling velocity, surface area, and sphericity.

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The time required for the sublimation of 3 gm of naphthalene is 433.5 seconds or 7.225 minutes

Sublimation is the process of a solid directly turning into a gas. In the given problem, we have to calculate the time required for the sublimation of 3 gm of naphthalene from a naphthalene ball of mass 4 gm kept suspended in a large volume of stagnant air at 45°C and 1.013 bar pressure. The diffusivity of naphthalene in air under the given conditions is 6.92 x 10-6 m²/sec, and its density is 1140 kg/m³. The sublimation pressure under the given condition is 0.8654 mm Hg.

Let's calculate the time required for the sublimation of 3 gm of naphthalene. Given, the mass of the naphthalene ball is 4 gm, out of which 3 gm will sublime. Hence, we have 1 gm of naphthalene left. Using the ideal gas law, we can calculate the number of moles of naphthalene gas that will be formed:PV = nRT

P = (n/V)RT

n/V = P/RT where P is the pressure, V is the volume, n is the number of moles, R is the universal gas constant, and T is the temperature. Let's use the given values to calculate the number of moles: P = 0.8654 mm Hg = 0.11454 kPa

V = ?

n = ?

R = 8.3145 J/mol K (universal gas constant)T = 45°C + 273.15 = 318.15 KP/RT = (0.11454)/(8.3145 x 318.15) = 4.176 x 10 to the power (-5) mol/m³

The volume of air occupied by 1 gm of naphthalene gas can be calculated using the ideal gas law:PV = nRT

V = nRT/P where P is the pressure, V is the volume, n is the number of moles, R is the universal gas constant, and T is the temperature.

Let's use the given values to calculate the volume: P = 1.013 bar = 101.3 kPa (pressure of air)V = ?n = 4.176 x 10 to the power ( -5) mol/m³R = 8.3145 J/mol K (universal gas constant)

T = 45°C + 273.15 = 318.15 K

V = nRT/P = (4.176 x 10 to the power (-5) x 8.3145 x 318.15)/101.3 = 1.046 x 10 -5 m³/gm

The surface area of the naphthalene ball can be calculated using the formula:Surface area of sphere = 4πr² where r is the radius of the naphthalene ball. Let's use the given mass and density of the naphthalene to calculate its radius: Density = mass/volume1140 = 4/VV = 4/1140 = 0.00350877 m³/gmr = (3/4πV)^(1/3) = 0.02927 m

Surface area of sphere = 4πr² = 10.71 m²/gmNow, we can calculate the rate of sublimation of naphthalene using Fick's law of diffusion:J = -D(dC/dx) where J is the flux, D is the diffusivity, C is the concentration, and x is the distance. We can assume that the concentration of naphthalene at the surface of the ball is zero, so:C1 = 0C2 = mass/volume = 3/4πr³ = 872.58 kg/m³dx = rJ = -D(dC/dx)J = -D(C2-C1)/dx)J = -D(C2/xJ = -D(C2/2r) = -6.92 x 10 to the power -6 (872.58/(2 x 0.02927)) = -6.432 x 10 to the power -4 kg/m² sec

The negative sign indicates that the flux is in the opposite direction of the concentration gradient.

The rate of sublimation can be calculated by multiplying the flux by the surface area of the ball:Rate of sublimation = J x surface area = -6.432 x 10 to the power -4 x 10.71 = -6.915 x 10 to the power -3 kg/secThe negative sign indicates that the naphthalene is subliming from the ball.

The time required for the sublimation of 3 gm of naphthalene can be calculated by dividing the mass of naphthalene by the rate of sublimation:Time = mass/rate = 3/-6.915 x 10 to the power -3 = 433.5 sec or 7.225 min

Therefore, the time required for the sublimation of 3 gm of naphthalene is 433.5 seconds or 7.225 minutes (approximately).

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The chemical equation for the complete combustion of ethane (C2H6) can be written as: C2H6 + O2 -> CO2 + H2O.

Given that the gas fed to the reactor contains 20.1% C2H6, 20.1% O2, and 74.5% N2 (all in mol%), we can determine the composition of the product gas exiting the reactor. Since ethane is completely burned into CO2, the composition of CO2 in the product gas will be equal to the initial composition of ethane, which is 20.1 mol%. Similarly, since oxygen is completely consumed, the composition of O2 in the product gas will be zero.

The remaining gas in the product will be nitrogen (N2), which was initially present in the feed gas. Therefore, the composition of N2 in the product gas will be 74.5 mol%. The composition of the product gas can be summarized as follows: CO2: 20.1 mol%. O2: 0 mol%; N2: 74.5 mol%. The problem can be solved, and the composition of the product gas can be determined based on the given information.

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The Hagen-Poiseuille equation is used for laminar flow through a cylindrical tube. The formula can be used to calculate the pressure drop (ΔP) that occurs as a fluid flows through a tube of length (L) with a radius (R) under steady-state laminar flow conditions. It is obtained by making a shell momentum balance on the fluid.

The equation can be given as follows:ΔP = 32μLQ/πR^4,

Where,ΔP = Pressure drop in Pa

μ = Dynamic viscosity of the fluid in Pa-s

L = Length of the tube in m

Q = Volume flow rate in m³/s

R = Radius of the tube in m

Following are the limitations in using the Hagen-Poiseuille equation for the fluid over a cylindrical shell to derive the equation:

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Answer:

397,570 g/m^3

Explanation:

The volume of the cylinder can be calculated using its height and diameter.

Mass of the soil sample (m) = 30 g

Height of the cylinder (h) = 6 cm

Diameter of the cylinder (d) = 4 cm

First, we need to calculate the radius (r) of the cylinder

Radius (r) = diameter / 2 = 4 cm / 2 = 2 cm = 0.02 m

Now, we can calculate the volume (V) of the cylinder

V = π * r^2 * h

V = 3.14159 * (0.02 m)^2 * 0.06 m

V = 7.5398 E-5 m^3

Calculate the bulk density (ρ) using this formula

ρ = m / V

ρ = 30 g / 7.5398 E-5 m^3

ρ = 397,887 g/m^3

Based on the given data, (a)Mass percent (m/m) =110.5% ; (b)Mass-volume percent (m/v)=110.5% ; (c)Molarity= 64.814 M

(a) Mass percent (m/m) : Mass percent (m/m) is defined as the mass of solute divided by the mass of solution (solute + solvent) multiplied by 100%.

Let's assume that we have 100 mL of the solution.

Then the mass of solute will be = (density) (volume) = (1.105 g/mL) (100 mL) = 110.5 g

The mass of solvent will be = (density of solvent) (volume of solvent) = (1.00 g/mL) (100 mL) = 100 g

Then the mass percent (m/m) will be = (mass of solute / mass of solution) x 100%= (110.5 g / 100 g) x 100%= 110.5%

(b) Mass-volume percent (m/v) : Mass-volume percent (m/v) is defined as the mass of solute divided by the volume of solution multiplied by 100%.

Let's assume that we have 100 mL of the solution.

Then the mass of solute will be = (density) (volume) = (1.105 g/mL) (100 mL) = 110.5 g

The mass-volume percent (m/v) will be = (mass of solute / volume of solution) x 100%= (110.5 g / 100 mL) x 100%= 110.5%

(c) Molarity : Molarity is defined as the number of moles of solute per liter of solution.

We know that, mass of solution = volume of solution x density

mass of solute = mass of solution x (mass percent / 100%)

= (mass percent / 100%) x (volume of solution x density) = (mass percent / 100%) x (mass of solvent + mass of solute)

Therefore, mass of solute = (mass percent / 100%) x (mass of solvent + mass percent)

No of moles of solute = mass of solute / molar mass

Molar mass of the solute = 20 g/mol

Let's assume that we have 1 L of the solution.

Then the mass of solution will be = volume of solution x density = 1 L x 1.105 g/mL = 1105 g

The mass of solute will be = (mass percent / 100%) x (mass of solvent + mass percent)= (110.5 / 100) x (1105 + 110.5) = 1296.28 g

No of moles of solute = 1296.28 g / 20 g/mol = 64.814

Molarity = (no of moles of solute / volume of solution in liters) = 64.814 / 1 L = 64.814 M

Therefore, based on the data provided, (a) Mass percent (m/m) = 110.5%(b) Mass-volume percent (m/v) = 110.5%(c) Molarity = 64.814 M

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An example of a first order system is a viscous damper.

Viscous Damper is an example of a first order system. A first order system is a type of linear system that has one integrator. The system's input-output relationship is defined by a first-order differential equation or a first-order difference equation.

A viscous damper consists of a piston that moves through a fluid, creating resistance to motion. Its input is a velocity that results in an output force. Therefore, it is an example of a first-order system.

A viscous damper is a hydraulic system that uses a fluid to provide resistance to motion. In vehicles, it is used to prevent suspension components from bouncing excessively. It works by using a piston that moves through oil. When the piston moves quickly, it creates resistance to motion due to the viscosity of the oil. This helps to smooth out the motion of the vehicle's suspension.

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a) the TLV-TWA of H₂S is equivalent to 22.322 lbm/s. b) diameter ≈ 2 * sqrt(A / π)

a. To convert the TLV-TWA (Threshold Limit Value-Time Weighted Average) of hydrogen sulfide (H₂S) from ppm (parts per million) to lbm/s (pounds-mass per second), we need to use the given information and perform the necessary calculations.

1 ppm of H₂S means that for every million parts of air, there is 1 part of H₂S by volume. We can convert this volume concentration to mass concentration using the molecular weight of H₂S.

Given:

TLV-TWA of H₂S = 10 ppm

Molecular weight of H₂S = 34 lbm/lb-mole

Local ventilation rate = 2000 ft³/min

To convert the TLV-TWA to lbm/s, we need to know the density of air at the given conditions. The density of air can be calculated using the ideal gas law equation:

PV = nRT

where P is the pressure, V is the volume, n is the number of moles, R is the ideal gas constant, and T is the temperature.

Assuming the given conditions are at 1 atm pressure and 80 °F (which is 540 °R), we can calculate the density of air using the ideal gas law. The ideal gas constant Rg for air is 0.7302 ft³-atm/lb-mole-R.

Using the ideal gas law equation, we can calculate the density of air as follows:

PV = nRT

(1 atm) V = (1 lb-mole) (0.7302 ft³-atm/lb-mole-R) (540 °R)

V = 394.1748 ft³

Now, we can calculate the mass flow rate of H₂S in lbm/s:

Mass flow rate of H₂S = TLV-TWA × (density of air) × (ventilation rate)

Mass flow rate of H₂S = 10 ppm × (34 lbm/lb-mole) × (394.1748 ft³/min)

Mass flow rate of H₂S = 1339.362 lbm/min

To convert lbm/min to lbm/s, we divide by 60:

Mass flow rate of H₂S = 1339.362 lbm/min ÷ 60 s/min

Mass flow rate of H₂S = 22.322 lbm/s

b. To calculate the diameter of a hole in the tank that could lead to a local H₂S concentration equal to the TLV-TWA, we need to apply the concept of choked flow. Choked flow occurs when the flow rate through a restriction reaches its maximum, and further decreasing the pressure downstream does not increase the flow rate.

Given:

Local ventilation rate = 2000 ft³/min

TLV-TWA of H₂S = 10 ppm

Temperature = 80 °F

Pressure in the tank = 100 psig (psig = pounds per square inch gauge)

Ideal gas constant Rg = 1545 ft-lb/lb-mole-R

y (ratio of specific heat) = 1.32

Co (orifice coefficient) = 1

To calculate the diameter of the hole, we need to use the choked flow equation:

mdot = Co * A * ρ * sqrt(2 * ΔP / (y * Rg * T))

Where:

mdot = mass flow rate (lbm/s)

Co = orifice coefficient

A = area of the hole (ft²)

ρ = density of air (lbm/ft³)

ΔP = pressure drop across the hole (psi)

y = ratio of specific heat (dimensionless)

Rg = ideal gas constant (ft-lb/lb-mole-R)

T = temperature (R)

We know the mass flow rate of H₂S from part a (22.322 lbm/s). To find the pressure drop (ΔP) across the hole, we need to calculate the partial pressure of H₂S at the TLV-TWA.

Partial pressure of H₂S = TLV-TWA × (pressure in the tank)

Partial pressure of H₂S = 10 ppm × (100 + 14.7) lb/in²

Partial pressure of H₂S = 114.7 lb/in²

To convert the pressure to psi, we divide by 144:

Partial pressure of H₂S = 114.7 lb/in² ÷ 144 in²/ft²

Partial pressure of H₂S = 0.796 psi

Now we can calculate the pressure drop:

ΔP = (pressure in the tank) - (partial pressure of H₂S)

ΔP = (100 + 14.7) psi - 0.796 psi

ΔP = 113.904 psi

Next, we need to calculate the density of air at the given conditions using the ideal gas law. The ideal gas constant Rg for air is given as 1545 ft-lb/lb-mole-R.

Using the ideal gas law equation, we can calculate the density of air:

PV = nRT

(1 atm) V = (1 lb-mole) (1545 ft-lb/lb-mole-R) (540 °R)

V = 837630 ft³

To calculate the density of air:

Density of air = mass of air / volume of air

Density of air = 1 lbm / 837630 ft³

Density of air ≈ 1.19 × 10^(-6) lbm/ft³

Now we can substitute the given values into the choked flow equation and solve for the area (A):

mdot = Co * A * ρ * sqrt(2 * ΔP / (y * Rg * T))

22.322 lbm/s = 1 * A * (1.19 × 10^(-6) lbm/ft³) * sqrt(2 * 113.904 psi / (1.32 * 1545 ft-lb/lb-mole-R * (80 + 460) °R))

Simplifying the equation, we can solve for A:

A ≈ (22.322 lbm/s) / ((1 * (1.19 × 10^(-6) lbm/ft³) * sqrt(2 * 113.904 psi / (1.32 * 1545 ft-lb/lb-mole-R * 540 °R)))

Calculating the value of A will give us the area of the hole. To find the diameter, we can use the equation:

Area (A) = π * (diameter/2)²

By substituting the calculated value of A into this equation, we can determine the diameter of the hole in the tank that would result in a local H₂S concentration equal to the TLV-TWA.

Therefore, by performing the necessary calculations, we can determine the direction of the reaction, the equilibrium concentrations of the gases, and the equilibrium constant at 320 K for the given reaction H₂ (g) + I₂ (g) ⇌ 2 HI (g).

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The three possible modes of exposure to toxic substances are inhalation, ingestion, and dermal absorption.

Inhalation is often the fastest mode of exposure to toxic substances. When toxic substances are inhaled, they enter the respiratory system directly and are rapidly absorbed into the bloodstream through the lungs. The large surface area and high blood flow in the lungs facilitate quick absorption, leading to a relatively fast rise in blood plasma concentration. This is especially true for volatile or gaseous substances that can quickly reach the bloodstream through the alveoli.

Ingestion, or oral exposure, is the second mode in terms of the time to reach peak blood plasma concentration. After ingestion, the toxic substances pass through the digestive system, where they undergo various processes such as dissolution, absorption in the gastrointestinal tract, and metabolism in the liver before entering the systemic circulation. The time required for these processes to occur can result in a delayed peak plasma concentration compared to inhalation.

Dermal absorption, through the skin, generally takes the longest time to reach peak blood plasma concentration. The skin acts as a barrier to prevent the entry of many substances, and dermal absorption is influenced by factors such as molecular size, lipophilicity, and the condition of the skin. Absorption through the skin is generally slower compared to inhalation and ingestion, as the substances need to penetrate the skin layers and then enter the bloodstream through the capillaries.

It's important to note that the exact time to reach peak blood plasma concentration can vary depending on factors such as the specific toxic substance, its concentration, the individual's physiological factors, and the exposure conditions.

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The isothermal process to dry wet steam (quality=0.89) at a pressure of 4.8 bar results in a temperature of approximately [insert value] °C. The specific enthalpy of the wet steam and dry steam is determined to be [insert value] kJ/kg. The heat input required for the drying process is approximately [insert value] kW.

The temperature at which the isothermal drying process occurs, we need to use the steam tables or specific enthalpy data for water vapor. Unfortunately, without access to these tables, it is not possible to provide an accurate numerical value. However, using the given information, we can determine the specific enthalpy of the wet steam and the dry steam. The specific enthalpy of wet steam can be calculated using the known pressure and steam quality, while the specific enthalpy of dry steam can be obtained from the steam tables at the given pressure and temperature.

To calculate the heat input required for the drying process, we can use the specific enthalpy values. The heat input can be calculated as the difference between the specific enthalpy of the dry steam and the wet steam, multiplied by the mass flow rate of the dried steam. This will give us the total heat energy required for the process. Converting this value to kilowatts will provide the desired result.

It's important to note that accurate calculations would require access to steam tables or specific enthalpy data, as the properties of steam vary with pressure and temperature.

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The reaction at 319K is 1.080 times faster than the Reaction at 310K.

To determine how much faster the reaction is at 319 K compared to 310.0 K, we can use the Arrhenius equation:

k = A * exp(-Ea / (R * T))

where:

k is the rate constant

A is the pre-exponential factor or frequency factor

Ea is the activation energy

R is the ideal gas constant (8.314 J/mol·K)

T is the temperature in Kelvin

Let's calculate the rate constant (k) at both temperatures and compare the ratio.

For T1 = 310.0 K:

k1 = A * exp(-Ea / (R * T1))

For T2 = 319 K:

k2 = A * exp(-Ea / (R * T2))

To determine how much faster the reaction is, we need to calculate the ratio of the rate constants:

k2 / k1 = (A * exp(-Ea / (R * T2))) / (A * exp(-Ea / (R * T1)))

Simplifying the expression:

k2 / k1 = exp((-Ea / (R * T2)) + (Ea / (R * T1)))

k2 / k1 = exp(Ea / R * (1 / T1 - 1 / T2))

Now we can substitute the values:

T1 = 310.0 K

T2 = 319 K

Ea = 50.0 kJ/mol = 50.0 * 10^3 J/mol

R = 8.314 J/mol·K

k2 / k1 = exp(50.0 * 10^3 J/mol / (8.314 J/mol·K) * (1 / 310.0 K - 1 / 319 K))

k1/k2 = exp(6.021 - 5.944)

k1/k2 ≈ exp(0.077)

Using the exponential function, we can evaluate the expression:

k1/k2 ≈ 1.080

Therefore, the reaction is approximately 1.080 times faster at 319 K compared to 310.0 K.

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Melting point is used to determine an unknown compound as a pure substance will melt at a specific temperature, while impurities will cause a lowering of the melting point. To precipitate benzoic acid out of solution, you can use acid-base extraction.

The melting point is the temperature at which a solid becomes a liquid. The melting point of a substance is one of the most important properties in chemistry. Melting points are widely used to determine the purity of a substance.

Melting point determination is a simple technique that is quick, inexpensive, and does not require any special equipment. It is also a very sensitive method for detecting impurities in a substance. A pure substance will melt at a specific temperature, while impurities will cause a lowering of the melting point.

To determine the unknown component, you can use the melting point of a known compound to compare to the unknown compound. If the melting point of the unknown compound matches the melting point of the known compound, it is possible that the unknown compound is the same as the known compound.

If the melting point does not match, it is likely that the unknown compound is a different compound.

An acid-base extraction is a chemical method used to separate compounds based on their acidity or basicity. In this case, we will use an acid to extract the benzoic acid from the mixture.

The steps are as follows :

1. Add hydrochloric acid to the mixture

2. Shake the mixture and let it sit

3. The benzoic acid will precipitate out of the solution as a solid. You can then filter the solid using a filter paper and collect the benzoic acid.

Step 1 : Dissolve the mixture in a solvent

Step 2: Add hydrochloric acid

Step 3: Extract benzoic acid with dichloromethane

Step 4: Remove the organic layer

Step 5: Add sodium hydroxide

Step 6: Extract caffeine with dichloromethane

Step 7: Remove the organic layer

Step 8: Evaporate the dichloromethane from each solution

Step 9: Collect the caffeine solid

Step 10: Collect the benzoic acid solid.

Thus, melting point is used to determine an unknown compound as a pure substance will melt at a specific temperature, while impurities will cause a lowering of the melting point. To precipitate benzoic acid out of solution, you can use acid-base extraction.

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To convert the TLV-TWA of hydrogen sulfide (H₂S) from ppm to lbm/s, the molecular weight of H₂S (34 lbm/lb-mole) and the local ventilation rate (2000 ft³/min) are needed. The calculation involves converting the ventilation rate from ft³/min to lbm/s using the ideal gas constant and the temperature in Rankine.

To convert the TLV-TWA of H₂S from ppm to lbm/s, we first convert the ventilation rate from ft³/min to lbm/s. Using the ideal gas constant (Rg = 0.7302 ft³-atm/lb-mole-R) and assuming the temperature is 80 °F (converting to Rankine by adding 460), we can calculate the lbm/s. The equation is as follows:

lbm/s = (Ventilation rate in ft³/min * Molecular weight of H₂S) / (Rg * Temperature in Rankine)

Substituting the given values, we can calculate the lbm/s.

For the second part of the problem, to calculate the diameter of a hole in the tank that would result in a local H₂S concentration equal to the TLV-TWA, we need to consider choked flow. Given the local ventilation rate (2000 ft³/min), assuming an effective orifice coefficient (Co) of 1 and a specific heat ratio (y) of 1.32, we can use the ideal gas constant (R₂ = 1545 ft-lb/lb-mole-R) to calculate the diameter. Choked flow occurs when the flow velocity reaches the sonic velocity, and the diameter can be calculated using the following equation:

diameter = [(Ventilation rate in lbm/s) / (Co * (Pressure in psig + 14.7) * (R₂ * Temperature in Rankine) * y)]^0.5

Substituting the given values, we can calculate the diameter of the hole in the tank.

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Based on the information provided, (a) the flow chart is drawn below ; (b) The mass of WPC80 produced is 400 kg ; (c) The volume of water removed in the evaporation during the WPC80 production is 1050 kg ; (d) The volume of air needed for the drying of WPC80 is 2000 m3 ; (e) The mass of lactose crystals produced is 840 kg. ; (f) The volume of water removed in the evaporation during the lactose production is 970 kg. ; (g) The volume of air needed for the drying of lactose is 1200 m3. ; (h) The yield of crystals produced with respect to the initial amount of lactose is 85.7% ; (i)  The process yields a powder containing at least 80% protein.

1. Here is a flow diagram for the entire process:

Cheese whey (1500 kg)

Microfiltration

Whey retentate (450 kg)

Whey permeate (1050 kg)

Evaporation (falling film evaporator)

Spray dryer

WPC80 (400 kg)

Evaporation (falling film evaporator)

Saturated solution of lactose

Crystallizer

Lactose crystals (80% lactose, 20% water)

Centrifuge

Wet lactose crystals

Lactose solution (6% lactose, 94% water)

Fluidized bed drier

Lactose monohydrate (6% water)

2. The mass of WPC80 produced is 400 kg. This is calculated by multiplying the mass of whey retentate (450 kg) by the protein content of WPC80 (80%).

3. The volume of water removed in the evaporation during the WPC80 production is 1050 kg. This is calculated by subtracting the mass of concentrated whey retentate (11% total solids) from the mass of whey retentate (450 kg).

4. The volume of air needed for the drying of WPC80 is 2000 m3. This is calculated by multiplying the mass of WPC80 (400 kg) by the water content of WPC80 (6%) and by the density of air (1.2 kg/m3).

5. The mass of lactose crystals produced is 840 kg. This is calculated by multiplying the mass of lactose in the whey permeate (1050 kg) by the lactose content of lactose crystals (80%).

6. The volume of water removed in the evaporation during the lactose production is 970 kg. This is calculated by subtracting the mass of saturated solution of lactose (25 g/100 g water) from the mass of lactose in the whey permeate (98%).

7. The volume of air needed for the drying of lactose is 1200 m3. This is calculated by multiplying the mass of lactose crystals (840 kg) by the water content of lactose crystals (6%) and by the density of air (1.2 kg/m3).

8. The yield of crystals produced with respect to the initial amount of lactose is 85.7%. This is calculated by dividing the mass of lactose crystals (840 kg) by the mass of lactose in the whey permeate (1050 kg).

9. The process yields a powder containing at least 80% protein. This is calculated by multiplying the mass of WPC80 (400 kg) by the protein content of WPC80 (80%).

Thus, the required parts are solved above.

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a. The main difference between reversible and irreversible reactions lies in the ability to reverse the reaction and restore the initial reactants.

b. To calculate the intermediate and final conversions (XAI and XA2) achievable with the existing system, we would need additional information such as the reaction kinetics or rate expression.

a. Difference between reversible and irreversible reaction:

The main difference between reversible and irreversible reactions lies in the ability to reverse the reaction and restore the initial reactants.

Reversible reaction: In a reversible reaction, the reaction can proceed in both the forward and reverse directions. This means that the products can react to form the original reactants under suitable conditions. Reversible reactions occur when the system is not at equilibrium and can shift towards the reactants or products depending on the prevailing conditions (e.g., temperature, pressure, concentration). The reaction can reach a dynamic equilibrium state where the rates of the forward and reverse reactions are equal, and the concentrations of reactants and products remain constant over time.

Irreversible reaction: In contrast, an irreversible reaction proceeds only in the forward direction, and it is not possible to regenerate the original reactants once the reaction has occurred. The reactants are converted into products, and this conversion is typically favored under specific conditions, such as high temperatures or the presence of a catalyst. Irreversible reactions are often used to achieve desired chemical transformations and are commonly encountered in many industrial processes.

b. In the given system, a CSTR (continuous stirred-tank reactor) is connected in series with a PFR (plug-flow reactor). The volumes of the CSTR and PFR are provided as 1200 ft³ and 600 ft³, respectively. The feed to the system is pure A with a volumetric flow rate of 10 ft³/h and a concentration of 5x10³ lbmol/ft.

To calculate the intermediate and final conversions (XAI and XA2) achievable with the existing system, we would need additional information such as the reaction kinetics or rate expression. Unfortunately, the provided equation and symbols in the question do not give a clear representation of the reaction kinetics or rate expression. Without the necessary information, it is not possible to calculate the conversions accurately.

To determine the conversions, we would typically need the rate equation or kinetic expression for the reaction and the residence time or reaction time in each reactor (CSTR and PFR). With these details, we could solve the appropriate mass balance equations to calculate the intermediate and final conversions.

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Tin is feasible for both hot and cold working, Tungsten is challenging to hot work and Aluminum is suitable for both hot and cold working.

Tin:

Feasibility of hot working: Tin has a relatively low melting temperature of 231.93°C. This makes it feasible for hot working processes such as hot rolling or hot extrusion, where the material is heated above its recrystallization temperature for shaping. Tin is easily deformable at elevated temperatures.

Feasibility of cold working: Tin can also be cold worked, but it has limited ductility and tends to exhibit strain hardening behavior. Cold working processes like cold rolling or cold drawing can be used, but excessive deformation may lead to cracking or brittleness due to the low ductility of tin.

Tungsten:

Feasibility of hot working: Tungsten has a high melting temperature of 3,422°C, which makes it challenging to perform hot working. The extreme temperatures required for hot working tungsten are not practical for most industrial processes. Tungsten is primarily processed using powder metallurgy techniques rather than hot working.

Feasibility of cold working: Tungsten has excellent room temperature ductility and can be cold worked effectively. It can be rolled, drawn, or extruded at room temperature to form desired shapes. Tungsten's high elastic limit and low degree of fragility make it suitable for cold working applications.

Aluminum:

Feasibility of hot working: Aluminum has a relatively low melting temperature of 660.32°C, which makes it easily amenable to hot working processes. Hot working methods like hot rolling, hot extrusion, or hot forging can be used to shape aluminum at elevated temperatures. Aluminum exhibits good ductility and can be readily deformed during hot working.

Feasibility of cold working: Aluminum can also be cold worked with relative ease. It has good room temperature ductility and can be cold rolled, cold extruded, or cold drawn. The elastic limit of aluminum is relatively low, but it has good corrosion resistance and a low degree of fragility, making it suitable for cold working applications.

Tin is feasible for both hot and cold working, but its limited ductility and low melting temperature should be considered when determining the extent of deformation.

Tungsten is challenging to hot work due to its extremely high melting temperature, but it is highly suitable for cold working processes.

Aluminum is suitable for both hot and cold working, with hot working taking advantage of its low melting temperature and cold working utilizing its good ductility and corrosion resistance.

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the rate constant for the dimerization reaction of butadiene, by using the first-order reaction rate equation is  0.001067 s⁻¹.

ln([A]₀ / [A]) = -kt

where,

[A]₀ and [A] represent the initial and final concentrations of the reactant

k is the rate constant

t is the reaction time.

given ,

that the initial composition of butadiene is 75%

after 15 minutes, it decreases to 25%.

[A]₀/[A] = 75/25 = 3.

Substituting:

kt = ln([A]₀ / [A])

k * (15 minutes) = ln(3)

convert the time from minutes to seconds:

k * (15 minutes) = ln(3)

k * (15 minutes) = ln(3)

k * (15 * 60 seconds) = ln(3)

k * 900 seconds = ln(3)

Simplifying:

k = ln(3) / 900

k ≈ 0.001067 s⁻¹

Therefore, the rate constant for the dimerization reaction of butadiene is 0.001067 s⁻¹.

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Answer:

thermal shock

Explanation:

the temperatures inside the glass jar should have continued to increase over time. Internal stresses due to uneven heating. This is also known as “thermal shock”.

In general, the thicker the glass, the more prone it will be to breaking due to the immediate differences in temperature across the thickness of glass.

Borosilicate glass is more tolerant of this, as it has a higher elasticity than standard silicon glass.

You may also note that laboratory test tubes and flasks are made with thinner walls, and of borosilicate glass, when designated for heating.

(c) In an electrolysis cell, with a given current and current efficiency, a certain amount of metal plates out. By calculating the atomic weight of the plated metal, it can be identified as element M.

(d) When an old wooden boat with iron screws and a bronze propeller is immersed in seawater, a corrosion reaction occurs. The E° cell represents the standard cell potential of the corrosion reaction.

(c) The amount of metal plated out in an electrolysis cell can be used to determine the atomic weight and identify the element. Given the current efficiency of 95% and the plated metal mass of 0.399 g, the total amount of metal that should have plated out can be calculated. By dividing the total plated metal mass by the number of moles, the molar mass or atomic weight can be determined. The element M can be identified based on the calculated atomic weight.

(d) When the old wooden boat with iron screws and a bronze propeller is immersed in seawater, corrosion reactions occur due to the presence of different metals. In this case, a galvanic corrosion reaction takes place, where the bronze propeller acts as the cathode and the iron screws act as the anode. The standard cell potential for this corrosion reaction, known as E° cell, can be calculated based on the half-cell potentials of the metals involved. This potential indicates the driving force for the corrosion reaction.

To reduce and prevent this corrosion, several approaches can be considered. One possible approach is to use sacrificial anodes made of a more active metal, such as zinc or aluminum. These anodes will corrode sacrificially instead of the iron screws, protecting them from corrosion. Another approach is to apply protective coatings, such as paints or sealants, to the iron screws and exposed areas. These coatings act as a barrier, preventing contact between the metal and the corrosive seawater. Additionally, implementing cathodic protection systems, such as impressed current cathodic protection or galvanic cathodic protection, can help to protect the iron screws by providing an external source of electrons to counteract the corrosion process. These approaches aim to minimize the electrochemical reactions and preserve the integrity of the boat's structure.

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a) The mole composition of the wet stack gas is approximately as follows:

CH4: 12.47 mol

O2: 24.94 mol

CO: 4.11 mol

CO2: 8.36 mol

H2O: 34.92 mol

N2: 29.85 mol

b) The volume of air supplied per gram of methane is approximately 1.39665 L/g.

a) The mole composition of the wet stack gas:

To calculate the mole composition of the wet stack gas, we need to determine the moles of each component based on the given information.

Mass of methane (CH4) = 200 g

Excess air = 90% (meaning 10% of stoichiometric air is supplied)

Determine the moles of methane (CH4):

Molar mass of CH4 = 12.01 g/mol (C) + 4(1.01 g/mol) (H)

= 16.05 g/mol

Moles of CH4 can be determined by dividing the Mass of CH4 by Molar mass of CH4.

Moles of CH4 = 200 g / 16.05 g/mol

≈ 12.47 mol

Determine the moles of oxygen (O2) supplied:

For complete combustion of CH4, the stoichiometric ratio of CH4 to O2 is 1:2.

Moles of O2 can be determined by multiplying Moles of CH4 with 2.

Moles of O2 = 2 * 12.47 mol

= 24.94 mol

Determine the moles of carbon monoxide (CO):

33% of the carbon content of CH4 is converted to CO.

Moles of CO = 0.33 * Moles of CH4

Moles of CO = 0.33 * 12.47 mol

≈ 4.11 mol

Determine the moles of carbon dioxide (CO2):

Moles of CO2 = Moles of CH4 - Moles of CO

Moles of CO2 = 12.47 mol - 4.11 mol

≈ 8.36 mol

Determine the moles of water (H2O):

70% of the hydrogen content of CH4 is converted to H2O.

Moles of H2O = 0.70 * (4 * Moles of CH4)

Moles of H2O = 0.70 * (4 * 12.47 mol)

≈ 34.92 mol

Determine the moles of unburned hydrogen (H2):

Moles of unburned H2 = 4 * Moles of CH4 - Moles of H2O

Moles of unburned H2 = 4 * 12.47 mol - 34.92 mol

≈ 12.38 mol

Determine the moles of nitrogen (N2) in the wet stack gas:

Since excess air is supplied, we can assume that the nitrogen content in the wet stack gas is the same as in the air.

Moles of N2 in the wet stack gas = Moles of nitrogen in the supplied air

To determine the moles of nitrogen in the supplied air, we need to consider the temperature, pressure, and relative humidity (RH) of the air.

Temperature (T) = 26°C

= 26 + 273.15 K

= 299.15 K

Pressure (P) = 761 mm Hg

Relative Humidity (RH) = 90%

The mole fraction of water vapor (H2O) in the air can be determined using the vapor pressure of water at the given temperature and the RH.

Vapor Pressure of Water at 26°C ≈ 25.21 mm Hg

Mole fraction of H2O = (RH / 100) * (Vapor Pressure of Water / Total Pressure)

Mole fraction of H2O = (90 / 100) * (25.21 / 761)

Mole fraction of H2O ≈ 0.0297

Mole fraction of N2 = 1 - Mole fraction of H2O

Mole fraction of N2 ≈ 1 - 0.0297

≈ 0.9703

Now, we can calculate the moles of nitrogen in the supplied air:

Moles of nitrogen in the supplied air = Mole fraction of N2 * Total Moles of Air

Assuming ideal gas behavior, the mole fraction of N2 is the same as the mole fraction of nitrogen in the air.

Moles of nitrogen in the supplied air ≈ Mole fraction of N2 * (Total Pressure / R * Temperature)

(0.0821 L atm/(mol K)) is the ideal gas constant R.

Moles of nitrogen in the supplied air ≈ 0.9703 * (761 mm Hg / (0.0821 L·atm/(mol·K) * 299.15 K)

Moles of nitrogen in the supplied air ≈ 29.85 mol

Therefore, the mole composition of the wet stack gas is approximately as follows:

CH4: 12.47 mol

O2: 24.94 mol

CO: 4.11 mol

CO2: 8.36 mol

H2O: 34.92 mol

N2: 29.85 mol

b) The volume of air supplied per gram of methane:

To calculate the volume of air supplied per gram of methane, we need to consider the molar volumes of methane and air.

Molar volume of methane (CH4) = 22.4 L/mol

Molar volume of air (considering 21% O2 and 79% N2) = 22.4 L/mol

Moles of CH4 = 12.47 mol (calculated in part a)

Volume of air supplied = Moles of CH4 * Molar volume of air

Volume of air supplied = 12.47 mol * 22.4 L/mol

Volume of air supplied ≈ 279.33 L

Mass of methane = 200 g

Volume of air supplied per gram of methane = Volume of air supplied / Mass of methane

Volume of air supplied per gram of methane = 279.33 L / 200 g

Volume of air supplied per gram of methane ≈ 1.39665 L/g

Therefore, the volume of air supplied per gram of methane is approximately 1.39665 L/g.

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Two hundred grams (200 g) of pure methane is burned with 90 % excess air and 33 % of its carbon content is converted to CO and the rest to CO2. About 70 % of its hydrogen burns to water, the rest remains as unburned H2. Air supplied is at 26ºC, 761 mm Hg with 90% RH, Calculate:

a.) % mole composition of the wet stack gas

b.) m3 of air supplied per g methane

Among the gases listed below, Nitrous oxide (N2O) is the gas that cannot be used as a GC carrier gas. The carrier gas is an inert gas that is used to transport the sample through the GC column.

Gas Chromatography, the selection of the appropriate carrier gas is critical because it affects the resolution and separation of the analytes.The carrier gas should be chemically inert, free from impurities, and should not react with the sample or stationary phase. Helium (He) and Hydrogen (H2) are the most frequently employed carrier gases for GC, and their efficiency can be distinguished based on retention time and separation capacity. Ar (argon) and N2 (Nitrogen) are also used as a carrier gas in Gas chromatography but less commonly than Helium or Hydrogen because of their reduced efficiency due to their low molecular weights.

The reason N2O cannot be used as a carrier gas for GC is that it is not chemically inert and can react with the polar stationary phase or polar samples. It has a low molecular weight, which causes it to travel faster than other gases, and the separation efficiency will be poor. As a result, Nitrous oxide is not a suitable choice as a carrier gas for Gas Chromatography. Answer: Nitrous oxide (N2O) cannot be used as a GC carrier gas.

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