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How to Calculate and Solve for Net Heat Flux for Radiation | Radiation Heat Transfer

The image above represents net heat flux for radiation.

To compute for net heat flux for radiation, four essential parameters are needed and these parameters are Emissivity (ε), Area (A), Emitting Power of Black Body (e_b) and Radiosity (J).

The formula for calculating net heat flux for radiation:

q_net = ^εAe_b / _{1 – ε} – J

Where:

q_net = Net Heat Flux for Radiation
ε = Emissivity
A = Area
e_b = Emitting Power of Black Body
J = Radiosity

Let’s solve an example;
Find the net heat flux for radiation when the emissivity is 22, the area is 2, the emitting power of black body is 10 and the radiosity is 14.

This implies that;

ε = Emissivity = 22
A = Area = 2
e_b = Emitting Power of Black Body = 10
J = Radiosity = 14

q_net = ^εAe_b / _{1 – ε} – J
q_net = ^(22)(2)(10) / _{1 – 22} – 14
q_net = ⁴⁴⁰ / _-21 – 14
q_net = -20.9523 – 14
q_net = -34.95

Therefore, the net heat flux for radiation is -34.95 W.

Continue reading How to Calculate and Solve for Net Heat Flux for Radiation | Radiation Heat Transfer

How to Calculate and Solve for Emissive Power | Radiation Heat Transfer

The image above represents emissive power.

To compute for emissive power, two essential parameters are needed and these parameters are Area of Emitting Body (A) and Geometric Body Constant (F).

The formula for calculating emissive power:

Q = AF

Where:

Q = Emissive Power
A = Area of Emitting Body
F = Geometric Body Constant

Let’s solve an example;
Find the emissive power when the area of emitting body is 12 and the geometric body constant is 6.

This implies that;

A = Area of Emitting Body = 12
F = Geometric Body Constant = 6

Q = AF
Q = 12(6)
Q = 72

Therefore, the emissive power is 72 W.

Calculating the Area of Emitting Body when the Emissive Power and the Geometric Body Constant is Given.

A = ^Q / _F

Where:

A = Area of Emitting Body
Q = Emissive Power
F = Geometric Body Constant

Let’s solve an example;
Find the area of emitting body when the emissive power is 32 and the geometric body constant is 8.

This implies that;

Q = Emissive Power = 32
F = Geometric Body Constant = 8

A = ^Q / _F
A = ³² / ₈
A = 4

Therefore, the area of emitting body is 4.

Continue reading How to Calculate and Solve for Emissive Power | Radiation Heat Transfer

How to Calculate and Solve for Total Irradiation | Radiation Heat Transfer

The image above represents total irradiation.

To compute for total irradiation, three essential parameters are needed and these parameters are Reflectivity (ρ), Emissive Power of First Body (e) and Emissive Power of Second Body (e₂).

The formula for calculating total irradiation:

G = ^{e₂ + ρe} / _{1 – ρ}

Where:

G = Total Irradiation
ρ = Reflectivity
e = Emissive Power of First Body
e₂ = Emissive Power of Second Body

Let’s solve an example;
Given that the reflectivity is 21, the emissive power of first body is 3 and the emissive power of second body is 9. Find the total irradiation?

This implies that;

ρ = Reflectivity = 21
e = Emissive Power of First Body = 3
e₂ = Emissive Power of Second Body = 9

G = ^{e₂ + ρe} / _{1 – ρ}
G = ^{9 + 21(3)} / _{1 – 21}
G = ^{9 + 63} / _-20
G = ⁷² / _-20G = -3.6

Therefore, the total irradiation is -3.6.

Continue reading How to Calculate and Solve for Total Irradiation | Radiation Heat Transfer

How to Calculate and Solve for Stefan Boltzmann’s Constant | Radiation Heat Transfer

The image above represents stefan boltzmann’s constant.

To compute for stefan boltzmann’s constant, three essential parameters are needed and these parameters are Boltzmann’s Constant (K_B), Planck’s Constant (h) and Speed of Light (c).

The formula for calculating stefan boltzmann’s constant:

σ = ^2π5K_B4 / _15c²h⁵

Where:

σ = Stefan Boltzmann’s Constant
K_B = Boltzmann’s Constant
h = Planck’s Constant
c = Speed of Light

Let’s solve an example;
Find the stefan boltzmann’s constant when the boltzmann’s constant is 42, the planck’s constant is 34 and the speed of light is 26.

This implies that;

K_B = Boltzmann’s Constant = 42
h = Planck’s Constant = 34
c = Speed of Light = 26

σ = ^2π5K_B4 / _15c²h⁵
σ = ^2π5(42)4 / _{15(26)²(34)⁵}
σ = ^{2(306.019)(3111696)} / _{15(676)(45435424)}
σ = ^{1904480458.135} / _460715199360
σ = 0.00413

Therefore, the stefan boltzmann’s constant is 0.00413.

Continue reading How to Calculate and Solve for Stefan Boltzmann’s Constant | Radiation Heat Transfer

How to Calculate and Solve for Monochromatic Emissive Power | Radiation Heat Transfer

The image above represents monochromatic emissive power.

To compute for monochromatic emissive power, five essential parameters are needed and these parameters are Planck’s Constant (h), Velocity of Light (c), Wavelength (λ), Boltzmann’s Constant (K_B) and Temperature (T).

The formula for calculating monochromatic emissive power:

e_bx = ^2πhc²λ-5 / _{exp(^ch/KBλT) – 1}

Where:

e_bx = Monochromatic Emissive Power | Planck’s Equation
h = Planck’s Constant
c = Velocity of Light
λ = Wavelength
K_B = Boltzmann’s Constant
T = Temperature

Let’s solve an example;
Find the monochromatic emissive power when the planck’s constant is 6.626E-24, the velocity of light is 3E8, the wavelength is 22, the boltzmann’s constant is 1.380E-23 and the temperature is 10.

This implies that;

h = Planck’s Constant = 6.626E-24
c = Velocity of Light = 3E8
λ = Wavelength = 22
K_B = Boltzmann’s Constant = 1.380E-23
T = Temperature = 10

e_bx = ^2πhc²λ-5 / _{exp(^ch/KBλT) – 1}
e_bx = ^{2π(6.62607004e-34)(300000000)²(22)-5} / _{exp(^{(300000000)(6.62607004e-34)}/(1.38064852e-23)(22)(10)) – 1}
e_bx = ^{2π(6.62607004e-34)(90000000000000000)(1.94037e-7)} / _{exp(^{1.987821012e-25}/3.037426744e-21) – 1}
e_bx = ^{7.270512005456302e-23} / _{exp(0.00006544424539379114) – 1}
e_bx = ^{7.270512005456302e-23} / _{1.0000654463869152 – 1}
e_bx = ^{7.270512005456302e-23} / _{0.00006544638691519111}
e_bx = 1.11e-18

Therefore, the monochromatic emissive power is 1.11e-18.

Continue reading How to Calculate and Solve for Monochromatic Emissive Power | Radiation Heat Transfer

How to Calculate and Solve for Energy Transfer by Radiation | Radiation Heat Transfer

The image above represents energy transfer by radiation.

To compute for energy transfer by radiation, three essential parameters are needed and these parameters are Emissivity (ε₁), Absorbivity (α₁) and Emissive Power of Black Body (e_b).

The formula for calculating energy transfer by radiation:

q_net = e_b(ε₁ – α₁)

Where:

q_net = Energy Transfer by Radiation
ε₁ = Emissivity
α₁ = Absorbivity
e_b = Emissive Power of Black Body

Let’s solve an example;
Find the energy transfer by radiation when the emissivity is 30, the absorbivity is 10 and the emissive power of black body is 4.

This implies that;

ε₁ = Emissivity = 30
α₁ = Absorbivity = 10
e_b = Emissive Power of Black Body = 4

q_net = e_b(ε₁ – α₁)
q_net = 4(30 – 10)
q_net = 4(20)
q_net = 80

Therefore, the energy transfer by radiation is 80 J.

Calculating the Emissivity when the Energy Transfer by Radiation, the Aborbivity and the Emissive Power of Black Body is Given.

ε₁ = (^q_net / _{e_b}) + α₁

Where:

ε₁ = Emissivity
q_net = Energy Transfer by Radiation
α₁ = Absorbivity
e_b = Emissive Power of Black Body

Let’s solve an example;
Find the emissivity when the energy transfer by radiation is 28, the absorbivity is 3 and the emissive power of black body is 7.

This implies that;

q_net = Energy Transfer by Radiation = 28
α₁ = Absorbivity = 3
e_b = Emissive Power of Black Body = 7

ε₁ = (^q_net / _{e_b}) + α₁
ε₁ = (²⁸ / ₇) + 3
ε₁ = 4 + 3
ε₁ = 7

Therefore, the emissivity is 7

Calculating the Aborbivity when the Energy Transfer by Radiation, the Emissivity and Emissive Power of Black Body is Given.

α₁ = ε₁ – (^q_net / _{e_b})

Where:

α₁ = Absorbivity
q_net = Energy Transfer by Radiation
ε₁ = Emissivity
e_b = Emissive Power of Black Body

Let’s solve an example;
Find the absorbivity when the energy transfer by radiation is 8, the emissivity is 18 and the emissive power of black body is 4.

This implies that;

q_net = Energy Transfer by Radiation = 8
ε₁ = Emissivity = 18
e_b = Emissive Power of Black Body = 4

α₁ = ε₁ – (^q_net / _{e_b})
α₁ = 18 – (⁸ / ₄)
α₁ = 18 – 2
α₁ = 16

Therefore, the absorbivity is 16.

Calculating the Emissive Power of Black Body when the Energy Transfer by Radiation, the Emissivity and Absorbivity is Given.

e_b = ^q_net / _{ε₁ – α₁}

Where:

e_b = Emissive Power of Black Body
q_net = Energy Transfer by Radiation
ε₁ = Emissivity
α₁ = Absorbivity

Let’s solve an example;
Find the emissive power of black body when the energy transfer by radiation is 50, the emissivity is 15 and the absorbivity is 10.

This implies that;

q_net = Energy Transfer by Radiation = 50
ε₁ = Emissivity = 15
α₁ = Absorbivity = 10

e_b = ^q_net / _{ε₁ – α₁}
e_b = ⁵⁰ / _{15 – 10}
e_b = ⁵⁰ / ₅
e_b = 10

Therefore, the emissive power of black body is 10.

Nickzom Calculator – The Calculator Encyclopedia is capable of calculating the energy transfer by radiation.

To get the answer and workings of the energy transfer by radiation using the Nickzom Calculator – The Calculator Encyclopedia. First, you need to obtain the app.

You can get this app via any of these means:

Web – https://www.nickzom.org/calculator-plus

To get access to the professional version via web, you need to register and subscribe for NGN 2,000 per annum to have utter access to all functionalities.
You can also try the demo version via https://www.nickzom.org/calculator

Android (Paid) – https://play.google.com/store/apps/details?id=org.nickzom.nickzomcalculator
Android (Free) – https://play.google.com/store/apps/details?id=com.nickzom.nickzomcalculator

Apple (Paid) – https://itunes.apple.com/us/app/nickzom-calculator/id1331162702?mt=8
Once, you have obtained the calculator encyclopedia app, proceed to the Calculator Map, then click on Materials and Metallurgical under Engineering.

Now, Click on Radiation Heat Transfer under Materials and Metallurgical

Now, Click on Energy Transfer by Radiation under Radiation Heat Transfer

The screenshot below displays the page or activity to enter your values, to get the answer for the energy transfer by radiation according to the respective parameter which is the Emissivity (ε₁), Absorbivity (α₁) and Emissive Power of Black Body (e_b).

Now, enter the values appropriately and accordingly for the parameters as required by the Emissivity (ε₁) is 30, Absorbivity (α₁) is 10 and Emissive Power of Black Body (e_b) is 4.

Finally, Click on Calculate

As you can see from the screenshot above, Nickzom Calculator– The Calculator Encyclopedia solves for the energy transfer by radiation and presents the formula, workings and steps too.

How to Calculate and Solve for Radiosity | Radiation Heat Transfer

The image above represents radiosity.

To compute for radiosity, three essential parameters are needed and these parameters are Total Emissive Power (e), Reflectivity (ρ) and Total Irradiation (G).

The formula for calculating radiosity:

J = e + ρG

Where:

J = Radiation Heat Transfer
e = Total Emissive Power
ρ = Reflectivity
G = Total Irradiation

Let’s solve an example;
Find the radiation heat transfer when the total emissive power is 12, the reflectivity is 10 and the total irradiation is 20.

This implies that;

e = Total Emissive Power = 12
ρ = Reflectivity = 10
G = Total Irradiation = 20

J = e + ρG
J = 12 + (10)(20)
J = 12 + 200
J = 212

Therefore, the radiosity is 212 W/m².

Calculating the Total Emissive Power when the Radiosity, the Reflectivity and the Total Irradiation is Given.

e = J – ρG

Where:

e = Total Emissive Power
J = Radiation Heat Transfer
ρ = Reflectivity
G = Total Irradiation

Let’s solve an example;
Find the total emissive power when the radiation heat transfer is 32, the reflectivity is 10 and the total irradiation is 2.

This implies that;

J = Radiation Heat Transfer = 32
ρ = Reflectivity = 10
G = Total Irradiation = 2

e = J – ρG
e = 32 – (10)(2)
e = 32 – 20
e = 12

Therefore, the total emissive power is 12.

Continue reading How to Calculate and Solve for Radiosity | Radiation Heat Transfer

How to Calculate and Solve for Permeation | Mass Transfer

The image above represents permeation.

To compute for permeation, six essential parameters are needed and these parameters are Length of Vessel (L), Diameter (D), Initial Concentration (c₁), Final Concentration (c₂), Inlet Radius of Pipe (r₁) and Exit Radius of Pipe (r₂).

The formula for calculating permeation:

j = -2πLD (^{c₁ – c₂} / _In(^r1/r2))

Where:

j = Permeation
L = Length of Vessel
D = Diameter
c₁ = Initial Concentration
c₂ = Final Concentration
r₁ = Inlet Radius of Pipe
r₂ = Exit Radius of Pipe

Let’s solve an example;
Find the permeation when the length of vessel is 8, the diameter is 2, the initial concentration is 4, the final concentration is 9, the inlet radius of pipe is 13 and the exit radius of pipe is 11.

This implies that;

L = Length of Vessel = 8
D = Diameter = 2
c₁ = Initial Concentration = 4
c₂ = Final Concentration = 9
r₁ = Inlet Radius of Pipe = 13
r₂ = Exit Radius of Pipe = 11

j = -2πLD (^{c₁ – c₂} / _In(^r1/r2))
j = -2π(8)(2) (^{4 – 9}/_In(¹³/11))
j = (-100.53) (^-5/_In(1.18))
j = (-100.53) (^-5/_0.167)
j = (-100.53) (-29.93)
j = 3008.9

Therefore, the permeation is 3008.9 m².

Continue reading How to Calculate and Solve for Permeation | Mass Transfer

How to Calculate and Solve for Permeability | Mass Transfer

The image above represents permeability.

To compute for permeability, five essential parameters are needed and these parameters are Constant (A), Partial Pressure (P_o), Activation due to Permeation (Q_p), Gas Constant (R) and Temperature (T).

The formula for calculating permeability:

P = AP_o^0.5 . e^-Q_p/_RT

Where:

P = Permeability
A = Constant
P_o = Partial Pressure
Q_p = Activation due to Permeation
R = Gas Constant
T = Temperature

Let’s solve an example;
Find the permeability when the constant is 12, the partial pressure is 22, the activation due to permeation is 10, the gas constant is 14 and the temperature is 2.

This implies that;

A = Constant = 12
P_o = Partial Pressure = 22
Q_p = Activation due to Permeation = 10
R = Gas Constant = 14
T = Temperature = 2

P = AP_o^0.5 . e^-Q_p/_RT
P = 12(22)^0.5 . e^{-(10)/_(14)(2)}
P = 12(4.69) . e^-10/₂₈
P = 56.28 . e^-0.357
P = 56.28 (0.699)
P = 39.38

Therefore, the permeability is 39.38.

Continue reading How to Calculate and Solve for Permeability | Mass Transfer

How to Calculate and Solve for Knudsen Diffusion of Moulding Sand | Mass Transfer

The image above represents knudsen diffusion of moulding sand.

To compute for knudsen diffusion of moulding sand, three essential parameters are needed and these parameters are Pore Radius (r), Temperature (T) and Molecular Weight (M).

The formula for calculating knudsen diffusion of moulding sand:

D_k = 9700r√(^T/_M)

Where:

D_k = Knudsen Diffusion of Moulding Sand
r = Pore Radius
T = Temperature
M = Molecular Weight

Let’s solve an example;
Find the knudsen diffusion of moulding sand when the pore radius is 24, the temperature is 18 and the molecular weight is 12.

This implies that;

r = Pore Radius = 24
T = Temperature = 18
M = Molecular Weight = 12

D_k = 9700r√(^T/_M)
D_k = 9700(24)√(¹⁸/₁₂)
D_k = 9700(24)√(1.5)
D_k = 9700(24)(1.22)
D_k = 285120.6

Therefore, the knudsen diffusion of moulding sand is 285120.6 cm²/s.

Calculating the Pore Radius when the Knudsen Diffusion of Moulding Sand, the Temperature and the Molecular Weight is Given.

r = ^D_k / _{9700 √(^T /}_M)

Where:

r = Pore Radius
D_k = Knudsen Diffusion of Moulding Sand
T = Temperature
M = Molecular Weight

Let’s solve an example;
Find the pore radius when the knudsen diffusion of moulding sand is 20, the temperature is 14 and the molecular weight is 10.

This implies that;

D_k = Knudsen Diffusion of Moulding Sand = 20
T = Temperature = 14
M = Molecular Weight = 10

r = ^D_k / _{9700 √(^T /}_M)
r = ²⁰ / _{9700 √(¹⁴ /}₁₀)
r = ²⁰ / _{9700 √(1.4)}
r = ²⁰ / ₁₁₄₄₆
r = 0.00174

Therefore, the pore radius is 0.00174.

Continue reading How to Calculate and Solve for Knudsen Diffusion of Moulding Sand | Mass Transfer