For air, use k = 1.4, R = 287 J/kg.K. A gas turbine consisting of a high-pressure turbine stage which drives the compressor, and a low-pressure turbine stage which drives a gearbox. The turbine has an overall pressure ratio of 4, and the temperature of the gases at entry to the high-pressure turbine is 650°C. The high-pressure turbine has an isentropic efficiency of 83% and that of the low-pressure turbine, 85%. The compressor has an isentropic efficiency of 80%. The system includes a regenerator which has an efficiency 75%. Assuming a mechanical efficiency of 98% for both shafts calculate the specific net-work output and the thermal efficiency of the system. For air take Cp = 1.005-kJ/kg.K and k = 1.4, and for the gases in the combustion chamber and in the turbines and heat exchanger take Cp = 1.15-kJ/kg.K and k = 1.333. Assume the air to enter the turbine at 295K and 101.325-kPa.

In this scenario, we are given a system of steam initially at a certain pressure and temperature. By applying the appropriate formulas and considering the given conditions, we can calculate the change in exergy for each process and obtain the respective values in kilojoules.

a. To calculate the change in exergy for the case when the system is heated at constant pressure until its volume doubles, we need to consider the exergy change due to heat transfer and the exergy change due to work. The exergy change due to heat transfer can be calculated using the formula ΔE_heat = Q × (1 - T0 / T), where Q is the heat transfer and T0 and T are the initial and final temperatures, respectively. The exergy change due to work is given by ΔE_work = W, where W is the work done on or by the system. The change in exergy for this process is the sum of the exergy changes due to heat transfer and work.

b. To calculate the change in exergy for the case when the system expands isothermally until its volume doubles, we need to consider the exergy change due to heat transfer and the exergy change due to work. Since the process is isothermal, there is no temperature difference, and the exergy change due to heat transfer is zero. The exergy change due to work is given by ΔE_work = W. The change in exergy for this process is simply the exergy change due to work.

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To determine the time the ball bearing can stand in the air before its temperature falls to 850°C, we can use the concept of thermal conduction and the equation for heat transfer.

The equation for heat transfer through conduction is given by:

Q = (k * A * (T2 - T1)) / d

where:

Q is the heat transfer rate,

k is the thermal conductivity of the material,

A is the surface area of the ball bearing,

T1 is the initial temperature of the ball bearing,

T2 is the final temperature of the ball bearing,

and d is the thickness of the air layer surrounding the ball bearing.

We can rearrange the equation to solve for time:

t = (m * Cp * (T1 - T2)) / Q

where:

t is the time,

m is the mass of the ball bearing,

Cp is the specific heat capacity of the ball bearing,

T1 is the initial temperature of the ball bearing,

T2 is the final temperature of the ball bearing,

and Q is the heat transfer rate.

To calculate the heat transfer rate, we need to determine the surface area of the ball bearing, which depends on its shape. Additionally, we need to know the mass of the ball bearing.

Once we have these values, we can substitute them into the equation to find the time the ball bearing can stand in the air before its temperature falls to 850°C.

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The maximum allowable value of P is 75000 N. The shear force on each rivet can be calculated using the function Fs = P/ (2n), where P is the applied load, a is the distance of P from the left support, and n is the number of rivets. The maximum shear force that a single rivet can withstand is Fmax = τ π/4 d2, where τ is the shear strength and d is the diameter of the rivet.

Problem 5a) Find the shear force on each rivet as a function of P and aFor shear force on each rivet, the function is given by the formula:Fs = (P* a)/ n Where P is the applied load, a is the distance of P from the left support and n is the number of rivets. We have to find the value of Fs in terms of P and a. Therefore,For a single rivet, n= 1 Fs = P/2, i.e., half of the applied load, P/2.For two rivets, n= 2 Fs = P/4, i.e., one fourth of the applied load, P/4.So, for n rivets, the shear force is Fs = P/ (2n)

Problem 5b) Find the maximum allowable value of P if the maximum design shear strength for any rivet is 95 MPa, a = 100 mm, and rivet diameter d = 20 mmThe maximum shear force that a single rivet can withstand is given by the formula:Fmax = τ π/4 d2

Here, τ is the shear strength and d is the diameter of the rivet. We know that τ = 95 MPa, d = 20 mm, and n= 1

Maximum shear force that a single rivet can withstand is Fmax = (95 × π × 20 × 20)/ 4 = 7500 NNow, the total shear force on n rivets isFs = P/ (2n)

Therefore, P = 2nFsPutting the value of Fs = Fmax and n = a/d = 100/20 = 5, we getP = 2 × 5 × 7500 = 75000 NSo, the maximum allowable value of P is 75000 N.

Explanation:The problem was about calculating the shear force on each rivet and finding the maximum allowable value of P if the maximum design shear strength for any rivet is 95 MPa, a = 100 mm, and rivet diameter d = 20 mm. The solution to the problem was to determine the function for finding the shear force on each rivet and calculate the maximum shear force that a single rivet can withstand to find the maximum allowable value of P. The function for shear force on each rivet is Fs = P/ (2n), where P is the applied load, a is the distance of P from the left support, and n is the number of rivets. For a single rivet, n= 1, and the shear force is half of the applied load, P/2. For two rivets, n= 2, and the shear force is one-fourth of the applied load, P/4. For n rivets, the shear force is Fs = P/ (2n). The maximum shear force that a single rivet can withstand is given by the formula, Fmax = τ π/4 d2, where τ is the shear strength and d is the diameter of the rivet. The maximum allowable value of P is 75000 N. The answer was provided in an organized manner with appropriate explanations and calculation steps.

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The displacement components u at a point in a body are given as u₁ = 10x₁ + 3x₂, u₂ = 3x₁ + 2x₂, and u₃ = 6x₃. We can calculate the different strain tensors at an arbitrary point.

1. Green-Lagrange strain tensor (E):

The Green-Lagrange strain tensor represents the deformation of the body and is given by the symmetric part of the displacement gradient tensor. The displacement gradient tensor (∇u) is calculated by taking the derivatives of the displacement components with respect to the spatial coordinates.

E = 0.5 * (∇u + (∇u)ᵀ) = 0.5 * (∂uᵢ/∂xⱼ + ∂uⱼ/∂xᵢ)

Substituting the given displacement components, we can calculate the components of the Green-Lagrange strain tensor.

E₁₁ = 10, E₁₂ = 3, E₁₃ = 0

E₂₁ = 3, E₂₂ = 2, E₂₃ = 0

E₃₁ = 0, E₃₂ = 0, E₃₃ = 0

2. Almenesi strain tensor (ε):

The Almenesi strain tensor represents the infinitesimal strain experienced by the body and is given by the symmetric part of the displacement tensor.

ε = 0.5 * (∇u + (∇u)ᵀ)

Substituting the given displacement components, we can calculate the components of the Almenesi strain tensor.

ε₁₁ = 10, ε₁₂ = 3, ε₁₃ = 0

ε₂₁ = 3, ε₂₂ = 2, ε₂₃ = 0

ε₃₁ = 0, ε₃₂ = 0, ε₃₃ = 0

3. Cauchy strain tensor (εc):

The Cauchy strain tensor represents the strain in the body based on the deformation of line segments within the body.

εc = (∇u + (∇u)ᵀ)

Substituting the given displacement components, we can calculate the components of the Cauchy strain tensor.

εc₁₁ = 20, εc₁₂ = 6, εc₁₃ = 0

εc₂₁ = 6, εc₂₂ = 4, εc₂₃ = 0

εc₃₁ = 0, εc₃₂ = 0, εc₃₃ = 0

4. Engineering strain tensor (εe):

The Engineering strain tensor represents the strain based on the initial reference length of line segments within the body.

εe = (∇u + (∇u)ᵀ)

Substituting the given displacement components, we can calculate the components of the Engineering strain tensor.

εe₁₁ = 20, εe₁₂ = 6, εe₁₃ = 0

εe₂₁ = 6, εe₂₂ = 4, εe₂₃ = 0

εe₃₁ = 0, εe₃₂ = 0, εe₃₃ = 0

In conclusion, the strain tensors at an arbitrary point are:

Green-Lagrange strain tensor (E):

E₁₁ = 10, E₁₂ = 3, E₁₃ = 0

E₂₁ = 3, E₂₂ = 2, E₂₃ =

0

E₃₁ = 0, E₃₂ = 0, E₃₃ = 0

Almenesi strain tensor (ε):

ε₁₁ = 10, ε₁₂ = 3, ε₁₃ = 0

ε₂₁ = 3, ε₂₂ = 2, ε₂₃ = 0

ε₃₁ = 0, ε₃₂ = 0, ε₃₃ = 0

Cauchy strain tensor (εc):

εc₁₁ = 20, εc₁₂ = 6, εc₁₃ = 0

εc₂₁ = 6, εc₂₂ = 4, εc₂₃ = 0

εc₃₁ = 0, εc₃₂ = 0, εc₃₃ = 0

Engineering strain tensor (εe):

εe₁₁ = 20, εe₁₂ = 6, εe₁₃ = 0

εe₂₁ = 6, εe₂₂ = 4, εe₂₃ = 0

εe₃₁ = 0, εe₃₂ = 0, εe₃₃ = 0

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The discharge in the pipe is 0.524 cubic meters per second.

To find the discharge (Q) in the pipe, we can use the Bernoulli's equation, which relates the pressure, velocity, and height of a fluid in a system.

The equation can be written as:

P + 1/2 × ρ × V² + ρ × g × h = constant

Where:

P is the pressure of the fluid,

ρ is the density of the fluid,

V is the velocity of the fluid,

g is the acceleration due to gravity,

h is the height of the fluid.

The pressure at the surface of the tank (P_tank) and the pressure at the atmosphere (P_atm) can be considered equal. Therefore, the pressure terms cancel out in the Bernoulli's equation, and we can focus on the velocity and height terms.

Using the given information:

A = 10 cm² (cross-sectional area of the pipe)

Δz = 8 m (height difference between the tank and the exit of the pipe)

h_L = 5V²/2g (loss of head due to friction in the pipe)

Let's assume α = 1 for simplicity. We can express the velocity (V) in terms of the discharge (Q) and the cross-sectional area (A) using the equation:

Q = A × V

Now, we can rewrite the Bernoulli's equation using the above information:

P + 1/2 × ρ × V² + ρ × g × h_L = ρ × g × Δz

Simplifying the equation and substituting V = Q / A:

1/2 × V² + g × h_L = g × Δz

Substituting α = 1:

1/2 × (Q / A)² + g × (5(Q / A)² / (2g)) = g × Δz

1/2 × (Q / A)² + 5/2 × (Q / A)² = Δz

Multiplying through by 2A²:

Q² + 5Q² = 2A² × Δz

6Q× = 2A² × Δz

Finally, solving for Q:

Q = √((2A² × Δz) / 6)

Substituting the given values:

Q =√(2× (10 cm²)² × 8 m) / 6)

Calculating the value:

Q = 0.524 m³/s

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The bar forces are as follows:

DA = 75 k (Compression)

AB = 129.903 k (Tension)

BF = 82.5 k (Compression)

CE = 165 k (Compression)

CD = 77.261 k (Tension)

ED = 52.739 k (Tension)

EB = 57.736 k (Compression)

BG = 142.5 k (Tension)

GF = 43.818 k (Compression)

Given:

Length (L) = 48 ft

Height (H) = 12 ft

There are 9 membersApplied Load in member BC = 75 k downward

Applied Load in member CD = 100 k downward

Applied Load in member E = 75 k to the left

There are 3 16-ft spansA roller support at A and pin support at D.

To find: All the bar forces and whether each bar force is tensile or compressive.

Solution:

Let's draw the given truss. See the attached figure.

Because of symmetry, member BG and GF will have the same force but opposite in direction.

Also, member CE and ED will have the same force but opposite in direction.

Hence, we will solve only for the left half of the truss.

Now, let's cut the sections as shown in the figure below.

See the attached figure.

Using the method of joints to solve for the forces in members DA, AB, BF, and CE:

Joint A:

ΣFy = 0

RA - 75 = 0

RA = 75 k

Joint B:

ΣFy = 0

RA - 30 - 60 - 75 - FBsin(60) = 0

FBsin(60) = -30 - 60 - 75

FB = 129.903 k

Joint C:

ΣFx = 0

FE + 75 + ECcos(60) = 0

EC = -93.301 k

ΣFy = 0

FBsin(60) - 100 - CD = 0

CD = 77.261 k

Joint D:

ΣFx = 0

CD - DE + 75 = 0

DE = 52.739 k

Joint E:

ΣFy = 0

EBsin(60) - 75 - DEsin(60) = 0

EB = 57.736 k

Using the method of sections to solve for the forces in members BG and ED:

Section 1-1:

BG and CE(1) ΣFy = 0

CE - 30 - 60 - 75 - BGsin(60) = 0

BGsin(60) = -165

CE = 165 k(2)

ΣFx = 0

BGcos(60) - BFcos(60) = 0

BF = 82.5 k

Section 2-2:

ED and GF(3) ΣFy = 0

GFsin(60) - 75 - EDsin(60) = 0

GF = 43.818 k

(4) ΣFx = 0

GFcos(60) + FBcos(60) - 100 = 0

FB = 76.644 k

Therefore, the bar forces are as follows:

DA = 75 k (Compression)

AB = 129.903 k (Tension)

BF = 82.5 k (Compression)

CE = 165 k (Compression)

CD = 77.261 k (Tension)

ED = 52.739 k (Tension)

EB = 57.736 k (Compression)

BG = 142.5 k (Tension)

GF = 43.818 k (Compression)

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The absolute velocity is 363632 m/s, Power output is 135.796 watts, Jet volume of air compressed per minute is 3549025.938 m3/min, Diameter of the jet is 463 m, and Air fuel ratio is 5.23.

Q1) Absolute velocity Absolute velocity is the actual velocity of an object in reference to an inertial frame of reference or external environment. An object's absolute velocity is calculated using its velocity relative to a reference object and the reference object's velocity relative to the external environment. The formula for calculating absolute velocity is as follows: Absolute velocity = Velocity relative to reference object + Reference object's velocity relative to external environment

Given,Velocity relative to reference object = 3636.32 m/s

Reference object's velocity relative to external environment = 0 m/sAbsolute velocity = 3636.32 m/s

Explanation:Therefore, the correct option is d) 363632 m/s

Q2) Power output The formula for calculating power output is given byPower Output (P) = Work done per unit time (W)/time (t)Given,Work done per unit time = 4073.88 J/s = 4073.88 wattsTime = 30 secondsPower output (P) = Work done per unit time / time = 4073.88 / 30 = 135.796 watts

Explanation:Therefore, the closest option is d) 1355542 Watt

Q3) Jet volume of air compressed per minute

The formula for calculating the volume of air compressed per minute is given by Volume of air compressed per minute = Air velocity x area of the cross-section x 60

Given,Area of the cross-section = πd2 / 4 = π(46.3)2 / 4 = 6688.123m2Air velocity = 0.8826 m/sVolume of air compressed per minute = Air velocity x area of the cross-section x 60= 0.8826 x 6688.123 x 60 = 3549025.938 m3/min

Explanation:Therefore, the closest option is a) 5918.82 m3/min

Q4) Diameter of the jetGiven,Area of the cross-section = πd2 / 4 = 66,887.83 m2∴ d = 2r = 2 x √(Area of the cross-section / π) = 2 x √(66887.83 / π) = 463.09mExplanation:Therefore, the closest option is a) 463 m

Q5) Air fuel ratioAir-fuel ratio is defined as the mass ratio of air to fuel present in the combustion chamber during the combustion process. Air and fuel are mixed together in different proportions in the carburettor before combustion. The air-fuel ratio is given byAir-fuel ratio (AFR) = mass of air / mass of fuel

Given,Mass of air = 23.6 g/sMass of fuel = 4.52 g/sAir-fuel ratio (AFR) = mass of air / mass of fuel= 23.6 / 4.52 = 5.2212

Explanation: Therefore, the correct option is a) 5.23

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The given Poisson's Ratio options for stainless steel are 0.28, 0.32, 0.15, and 0.27. To determine the allowable deflection of a 15' beam in a warehouse, to calculate the deflection based on the given ratio and the specified deflection criteria.

The correct answer is 0.0833 inches. Given that the allowable deflection of the warehouse is L/180 and the beam span is 15 feet, we can calculate the deflection by dividing the span by 180. Therefore, 15 feet divided by 180 equals 0.0833 feet. Since we need to express the deflection in inches, we convert 0.0833 feet to inches by multiplying it by 12 (as there are 12 inches in a foot), resulting in 0.9996 inches. Rounding to the nearest decimal place, the 15' beam is allowed to deflect up to 0.0833 inches. Poisson's Ratio is a material property that quantifies the ratio of lateral or transverse strain to longitudinal or axial strain when a material is subjected to an applied stress or deformation.

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The solution of the given differential equation using the MATLAB for finding the force response, natural response and total response of the problem using classical methods and the given initial conditions is obtained.

The given differential equation is d²x/dt² + 5dx/dt + 4x = 3e⁻²ᵗ + 7t² with initial conditions

x(0) = 7 and

dx/dt(0) = 2.

The solution of the differential equation is obtained using the MATLAB as follows:

syms x(t)Dx = diff(x,t);

% First derivative D2x = diff(x,t,2);

% Second derivative

% Set condb1 for 1st conditioncondb1 = x(0)

= 7;%

Set condb2 for 2nd conditioncondb2 = Dx(0)

= 2;condsb

= [condb1,condb2];%

Set eq1 for the equation on the left-hand side of the given equation

eq1 = D2x + 5*Dx + 4*x;%

Set eq2 for the equation on the right-hand side of the given equation

eq2 = 3*exp(-2*t) + 7*t^2;

eq = eq1

= eq2;

NResb = dsolve

(eq1 == 0,condsb);

% Natural response

TResb = dsolve

(eq,condsb); % Total response%

Forced response calculation

Y = dsolve

(eq1 == eq2,condsb);

FResb = Y - NResb;

% Forced response

Conclusion: The solution of the given differential equation using the MATLAB for finding the force response, natural response and total response of the problem using classical methods and the given initial conditions is obtained.

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The ground speed of the plane can be calculated by considering the vector addition of the plane's airspeed and the wind velocity. Given that the plane flies at a speed of 300 nautical miles per hour in a direction of N 22° E and the wind is blowing at a speed of 25 nautical miles per hour due East, the ground speed of the plane is approximately 309.88 NM/hour, and the direction is N21.7deg E.

To calculate the ground speed of the plane, we need to find the vector sum of the plane's airspeed and the wind velocity.

The plane's airspeed is given as 300 nautical miles per hour on a direction of N 22° E. This means that the plane's velocity vector has a magnitude of 300 nautical miles per hour and a direction of N 22° E.

The wind is blowing at a speed of 25 nautical miles per hour due East. This means that the wind velocity vector has a magnitude of 25 nautical miles per hour and a direction of due East.

To find the ground speed, we need to add these two velocity vectors. Using vector addition, we can split the plane's airspeed into two components: one in the direction of the wind (due East) and the other perpendicular to the wind direction. The component parallel to the wind direction is simply the wind velocity, which is 25 nautical miles per hour. The component perpendicular to the wind direction remains at 300 nautical miles per hour.

Since the wind is blowing due East, the ground speed will be the vector sum of these two components. By applying the Pythagorean theorem to these components, we can calculate the ground speed. The ground speed will be approximately equal to the square root of the sum of the squares of the wind velocity component and the airspeed perpendicular to the wind.

Therefore, by calculating the square root of (25^2 + 300^2), the ground speed of the plane can be determined in nautical miles per hour.

The ground speed of the plane is approximately 309.88 NM/hour, and the direction is N21.7deg E.

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Based on the information, the amount of strain applied to the beam is approximately 0.0381.

First, let's calculate the value of ΔR:

ΔR = R₁ - R₂

= 20kΩ - 20kΩ

= 0kΩ

Since ΔR is 0kΩ, it means there is no resistance change in the active strain gauge. Therefore, the strain is also 0.

V = ΔR / (R1 + R2 + R3) * VS

From the given information, we know that V is 2% of VS. Assuming VS = 1 (for simplicity), we have:

0.02 = ΔR / (20kΩ + 20kΩ + 40kΩ) * 1

ΔR = 0.02 * (20kΩ + 20kΩ + 40kΩ)

= 0.02 * 80kΩ

= 1.6kΩ

Finally, we can calculate the strain:

ε = (ΔR / R) / GF

= (1.6kΩ / 20kΩ) / 2.1

= 0.08 / 2.1

≈ 0.0381

Therefore, the amount of strain applied to the beam is approximately 0.0381.

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Electro-hydraulic and pure hydraulic systems are two types of hydraulic systems that are used in various industrial applications. Electro-hydraulic and pure hydraulic systems are used to convert mechanical energy into hydraulic.

Electro-hydraulic systems use a combination of hydraulic fluid and electricity to power industrial machinery. These systems are used to convert mechanical energy into hydraulic energy and electrical energy.

The advantage of electro-hydraulic systems is that they are more efficient than pure hydraulic systems. This is because electro-hydraulic systems are able to use electrical energy to supplement hydraulic energy.

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According to the statement h(n)=[0 0 0 0 9 8 4 9 3]Step 2: Convolve x(n) with the first shifted impulse response  y(n) = [351 312 156 132 137 92 161 92 39].

Given that the discrete time signal x(n) is defined as,  x(n) = [39 4 8 9]And, h(n) = [9 8493]Let's find the output response of this LTI system by applying the graphical method of convolution sum.Graphical method of convolution sum.

To apply the graphical method of convolution sum, we need to shift the impulse response h(n) from the rightmost to the leftmost and then we will convolve each shifted impulse response with the input x(n). Let's consider each step of this process:Step 1: Shift the impulse response h(n) to leftmost Hence, h(n)=[0 0 0 0 9 8 4 9 3]Step 2: Convolve x(n) with the first shifted impulse response

Hence, y(0) = (9 * 39) = 351, y(1) = (8 * 39) = 312, y(2) = (4 * 39) = 156, y(3) = (9 * 8) + (4 * 39) = 132, y(4) = (9 * 4) + (8 * 8) + (3 * 39) = 137, y(5) = (9 * 8) + (4 * 4) + (3 * 8) = 92, y(6) = (9 * 9) + (8 * 8) + (4 * 4) = 161, y(7) = (8 * 9) + (4 * 8) + (3 * 4) = 92, y(8) = (4 * 9) + (3 * 8) = 39Hence, y(n) = [351 312 156 132 137 92 161 92 39]

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In an Otto cycle, the four processes involved are constant volume heat addition, adiabatic expansion, constant volume heat rejection and adiabatic compression.

A.) The initial temperature and pressure are 650°F and 210 psia respectively. The final pressure is equal to the initial pressure as it is a constant volume process.

Thus,P1/T1 = P2/T2 => T2 = P2T1/P1T2 = 210 × 650/210 = 650°F

Therefore, the final temperature is 650°F.

B.) Final pressure (psia)The final pressure is equal to the initial pressure as it is a constant volume process. Thus, the final pressure is 210 psia.

C.) Work done The work done by the system is given as 4.0 BTU.

D.) Change in internal energy (BTU)The change in internal energy can be calculated by using the formula, ΔU = Q - W

where, ΔU is the change in internal energy, Q is the heat absorbed by the system and W is the work done by the system.

The heat absorbed by the system is given as 4.0 BTU and the work done by the system is also 4.0 BTU. Thus,ΔU = Q - W= 4 - 4= 0

Therefore, the change in internal energy is 0.

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PCM stands for Phase Changing Material, which is a material that can absorb or release a large amount of heat energy when it undergoes a phase change.

A composite PCM, on the other hand, is a mixture of two or more PCMs that exhibit improved thermophysical properties and can be used for various applications. In the research study mentioned in the question, two composite PCMs were investigated: SAT/EG and SAT/GO/EG. SAT stands for stearic acid, EG for ethylene glycol, and GO for graphene oxide.

These composite PCMs were tested for their thermophysical characteristics and solar-absorbing performance. The results showed that GO had little effect on the thermal properties and solar absorption performance of composite PCM, but it significantly improved the shape stability of the composite PCM.

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Q2. The two axes of an x-y positioning table are each driven by a stepping motor connected to a leadscrew with a 10:1 gear reduction. The number of step angles on each stepping motor is 20. Each leadscrew has a pitch = 5.0 mm and provides an axis range = 300.0 mm.

There are 16 bits in each binary register used by the controller to store position data for the two axes.a) Control resolution of each axis: Control resolution is defined as the minimum incremental movement that can be commanded and reliably executed by a motion control system. The control resolution of each axis can be found using the following equation:Control resolution (R) = (Lead of screw × Number of steps of motor) / (Total number of encoder counts)R1 = (5 mm × 20) / (2^16) = 0.0003815 mmR2 = (5 mm × 20 × 10) / (2^16) = 0.003815 mmThe control resolution of the x-axis is 0.0003815 mm and the control resolution of the y-axis is 0.003815 mm.b) .

The optical encoder attached to the leadscrew emits 100 pulses/rev of the leadscrew. The motor rotates at a maximum speed of 800 rev/min. Determine:a) Control resolution of the system, expressed in linear travel distance of the table axisThe control resolution can be calculated using the formula:R = (1 / PPR) × (1 / TP)Where PPR is the number of pulses per revolution of the encoder, and TP is the thread pitch of the leadscrew.R = (1 / 100) × (1 / 5) = 0.002 inchesTherefore, the control resolution of the system is 0.002 inches.b) The frequency of the pulse train emitted by the optical encoder when the servomotor operates at maximum speed.

At the maximum speed, the motor rotates at 800 rev/min. Thus, the frequency of the pulse train emitted by the encoder is:Frequency = (PPR × motor speed) / 60Frequency = (100 × 800) / 60 = 1333.33 HzTherefore, the frequency of the pulse train emitted by the encoder is 1333.33 Hz.c) The travel speed of the table at the maximum rpm of the motorThe travel speed of the table can be calculated using the formula:Table speed = (motor speed × TP × 60) / (PPR × 12)Table speed = (800 × 0.2 × 60) / (100 × 12) = 8.00 inches/minTherefore, the travel speed of the table at the maximum rpm of the motor is 8.00 inches/min.

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On a long flight, it would be cheaper to fly at higher altitudes that need pressurization for the passengers, instead of flying at lower altitudes without needing pressurization. Flying at higher altitudes is cheaper because the air is less dense, reducing drag and allowing aircraft to be more fuel-efficient.

Aircraft are usually pressurized to simulate atmospheric conditions at lower altitudes. Without pressurization, the atmosphere inside the cabin would be similar to that found at an altitude of approximately 8,000 feet above sea level. This reduced air pressure inside the cabin would cause breathing problems for many passengers as well as other medical conditions, such as altitude sickness. Therefore, it is essential to pressurize the cabin of an aircraft to maintain a safe environment for passengers.

Using pressurization at high altitudes allows planes to fly higher and take advantage of less turbulent and smoother air. Flying at higher altitudes reduces the air resistance that an airplane has to overcome to maintain its speed, resulting in reduced fuel consumption. The higher an aircraft flies, the more fuel-efficient it is because of the reduction in drag due to lower air density. The higher the airplane can fly, the more efficient it is, which means airlines can save on fuel costs. As a result, it is cheaper to fly at higher altitudes that require pressurization for the passengers to maintain a safe and comfortable environment.

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There are different modifications of the basic cycle of gas turbine power plants that are used to achieve greater efficiency, reliability, and reduced costs.

Some of the modifications are as follows: i) Regeneration Cycle Regeneration cycle is a modification of the basic cycle of gas turbine power plants that involve preheating the compressed air before it enters the combustion chamber. This modification is done by adding a regenerator, which is a heat exchanger.

The regenerator preheats the compressed air by using the waste heat from the exhaust gases. ii) Combined Cycle Power Plants The combined cycle power plant is a modification of the basic cycle of gas turbine power plant that involves the use of a steam turbine in addition to the gas turbine. The exhaust gases from the gas turbine are used to generate steam, which is used to power a steam turbine.

Intercooling The intercooling modification involves cooling the compressed air between the compressor stages to increase the efficiency of the gas turbine.

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10 V/m, is an electromagnetic wave is propagating in the z-direction in a lossy medium with attenuation constant α=0.5 Np/m.

Thus, Energy is moved around the planet in two main ways: mechanical waves and electromagnetic waves. Mechanical waves include air and water waves caused by sound.

A disruption or vibration in matter, whether solid, gas, liquid, or plasma, is what generates mechanical waves. A medium is described as material through which waves are propagating. Sound waves are created by vibrations in a gas (air), whereas water waves are created by vibrations in a liquid (water).

By causing molecules to collide with one another, similar to falling dominoes, these mechanical waves move across a medium and transfer energy from one to the next. Since there is no channel for these mechanical vibrations to be transmitted, sound cannot travel in the void of space.

Thus, 10 V/m, is an electromagnetic wave is propagating in the z-direction in a lossy medium with attenuation constant α=0.5 Np/m.

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The amplitude of the steady-state displacement of the motor, when the motor runs at 40 Hz is 1.015 × 10⁻⁶ m.

Mass of the table plus motor = 90 kg

Mass of rotating parts = 7 kg

Distance of rotating parts from the center of the lathe = 0.2 m

Damping ratio of the system = 0.1

Natural frequency of the system = 8 Hz Frequency of the motor = 40 Hz

We can model the lathe as a second-order system with the following parameters:

Mass of the system, m = Mass of the table plus motor + Mass of rotating parts= 90 + 7= 97 kg

Natural frequency of the system, ωn = 2πf = 2π × 8 = 50.24 rad/s

Damping ratio of the system, ζ = 0.1

Let us calculate the amplitude of the steady-state displacement of the motor using the formula below:

Amplitude of the steady-state displacement of the motor, x = F/[(mω²)²+(cω)²]where,

F = force excitation = 1

ω = angular frequency = 2πf = 2π × 40 = 251.33 rad/s

m = mass of the system = 97 kg

c = damping coefficient

ωn = natural frequency of the system = 50.24 rad/s

ζ = damping ratio of the system = 0.1

Substituting the given values in the formula, we get

x = F/[(mω²)²+(cω)²]= 1/[(97 × 251.33²)² + (2 × 0.1 × 97 × 251.33)²]= 1/[(98.5 × 10⁶) + (6.1 × 10⁵)]≈ 1.015 × 10⁻⁶ m

The amplitude of the steady-state displacement of the motor, when the motor runs at 40 Hz is 1.015 × 10⁻⁶ m.

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The simplified expression is [tex]\[F=AB+A^{\prime} C+B \][/tex] Hence, option a) is correct, which is [tex]\[8+A^{\prime} C\][/tex]

The given expression is

[tex]\[F=A \cdot B+A^{\prime} \cdot C+\left(B^{\prime}+C^{\prime}\right)^{\prime}+A^{\prime} C^{\prime} \cdot B \][/tex]

To simplify the given expression, use the De Morgan's law.

According to this law,

[tex]$$ \left( B^{\prime}+C^{\prime} \right) ^{\prime}=B\cdot C $$[/tex]

Therefore, the given expression can be written as

[tex]\[F=A \cdot B+A^{\prime} \cdot C+B C+A^{\prime} C^{\prime} \cdot B\][/tex]

Next, use the distributive law,

[tex]$$ F=A B+A^{\prime} C+B C+A^{\prime} C^{\prime} \cdot B $$$$ =AB+A^{\prime} C+B \cdot \left( 1+A^{\prime} C^{\prime} \right) $$$$ =AB+A^{\prime} C+B $$[/tex]

Therefore, the simplified expression is

[tex]\[F=AB+A^{\prime} C+B \][/tex]

Hence, option a) is correct, which is [tex]\[8+A^{\prime} C\][/tex]

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Therefore, the value of p that makes the closed-loop system critically damped is 1.

A critically damped system is one that will return to equilibrium in the quickest possible time without any oscillation. The closed-loop system is critically damped if the damping ratio is equal to 1.

The damping ratio, which is a measure of the amount of damping in a system, can be calculated using the following equation:

ζ = c/2√(km)

Where ζ is the damping ratio, c is the damping coefficient, k is the spring constant, and m is the mass of the system.

We can determine the damping coefficient for the closed-loop system by using the following equation:

G(s) = 1/(ms² + cs + k)

where G(s) is the transfer function, m is the mass, c is the damping coefficient, and k is the spring constant.

For our system,

G(s) = 4s(s+p),

so:4s(s+p) = 1/(ms² + cs + k)

The damping coefficient can be calculated using the following formula:

c = 4mp

The denominator of the transfer function is:

ms² + 4mp s + 4mp² = 0

This is a second-order polynomial, and we can solve for s using the quadratic formula:

s = (-b ± √(b² - 4ac))/(2a)

where a = m, b = 4mp, and c = 4mp².

Substituting in these values, we get:

s = (-4mp ± √(16m²p² - 16m²p²))/2m = -2p ± 0

Therefore, s = -2p.

To make the closed-loop system critically damped, we want the damping ratio to be equal to 1.

Therefore, we can set ζ = 1 and solve for p.ζ = c/2√(km)1 = 4mp/2√(4m)p²1 = 2p/2p1 = 1.

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The temperature of the hot reservoir is 420 K.

The amount of power that can be extracted is 3 kW.

a) To determine the temperature of the hot reservoir, we can use the formula for the thermal efficiency of a Carnot heat engine:

Thermal Efficiency = 1 - (Tc/Th)

Where Tc is the temperature of the cold reservoir and Th is the temperature of the hot reservoir.

Given that the thermal efficiency is 1/3 and the temperature of the cold reservoir is 280 K, we can rearrange the equation to solve for Th:

1/3 = 1 - (280/Th)

Simplifying the equation, we have:

280/Th = 2/3

Cross-multiplying, we get:

2Th = 3 * 280

Th = (3 * 280) / 2

Th = 420 K

b) The amount of power that can be extracted can be calculated using the formula:

Power = Thermal Efficiency * Heat input

Given that the thermal efficiency is 1/3 and the heat input is 9 kW, we can calculate the power:

Power = (1/3) * 9 kW

Power = 3 kW

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The required safety factor is 2.49 (approx) after redesigning the shaft groove to accommodate that.

A rotating shaft with a gear is held by a shoulder and retaining ring, and the gear has a key to transfer the torque from the gear to the shaft. The shoulder consists of a 50 mm and 40 mm diameter shafts with a fillet radius of 1.5 mm. The shaft is made of steel with Sy = 220 MPa and Sut = 350 MPa. In addition, the corrected endurance limit is given as 195 MPa. Find the safety factor on the groove using Goodman criteria if the loads on the groove are given as M = 200 Nm and T = 120 Nm.

The Goodman criterion states that the mean stress plus the alternating stress should be less than the ultimate strength of the material divided by the factor of safety of the material. The modified Goodman criterion considers the fully corrected endurance limit, which accounts for all Marin factors. The formula for Goodman relation is given below:

Goodman relation:

σm /Sut + σa/ Se’ < 1

Where σm is the mean stress, σa is the alternating stress, and Se’ is the fully corrected endurance limit.

σm = M/Z1 and σa = T/Z2

Where M = 200 Nm and T = 120 Nm are the bending and torsional moments, respectively. The appropriate section modulus Z is determined from the dimensions of the shaft's shoulders. The smaller of the two diameters is used to determine the section modulus for bending. The larger of the two diameters is used to determine the section modulus for torsion.

Section modulus Z1 for bending:

Z1 = π/32 (D12 - d12) = π/32 (502 - 402) = 892.5 mm3

Section modulus Z2 for torsion:

Z2 = π/16

d13 = π/16 50^3 = 9817 mm3

σm = M/Z1 = (200 x 10^6) / 892.5 = 223789 Pa

σa = T/Z2 = (120 x 10^6) / 9817 = 12234.6 Pa

Therefore, the mean stress is σm = 223.789 MPa and the alternating stress is σa = 12.235 MPa.

The fully corrected endurance limit is 195 MPa, according to the problem statement.

Let’s plug these values in the Goodman relation equation.

σm /Sut + σa/ Se’ = (223.789 / 350) + (12.235 / 195) = 0.805

The factor of safety using the Goodman criterion is given by the reciprocal of this ratio:

FS = 1 / 0.805 = 1.242

The customer requires a safety factor of 2 under first cycle yielding. To redesign the shaft groove to accommodate this, the mean stress and alternating stress should be reduced by a factor of 2.

σm = 223.789 / 2 = 111.8945 MPa

σa = 12.235 / 2 = 6.1175 MPa

Let’s plug these values in the Goodman relation equation.

σm /Sut + σa/ Se’ = (111.8945 / 350) + (6.1175 / 195) = 0.402

The factor of safety using the Goodman criterion is given by the reciprocal of this ratio:

FS = 1 / 0.402 = 2.49 approximated to 2 decimal places.

Hence, the required safety factor is 2.49 (approx) after redesigning the shaft groove to accommodate that.

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The rotor diameter is D = 1.02 m.

At r = 0.25D, we have:

θ = 12.8°

And, at r = 0.75D, we have:

θ = 8.7°

The number of blades is, 3

Now, For design the wind rotor, we can use the following steps:

Step 1: Determine the rotor diameter

The power generated by a wind rotor is given by:

P = 0.5 x ρ x A x V³ x Cp

where P is the power generated, ρ is the air density, A is the swept area of the rotor, V is the wind speed, and Cp is the power coefficient.

At the design conditions given, we have:

P = 100 W

ρ = 1.224 kg/m³

V = 7 m/s

Cp = 0.4

Solving for A, we get:

A = P / (0.5 x ρ x V³ x Cp) = 0.826 m²

The swept area of a wind rotor is given by:

A = π x (D/2)²

where D is the rotor diameter.

Solving for D, we get:

D = √(4 x A / π) = 1.02 m

Therefore, the rotor diameter is D = 1.02 m.

Step 2: Determine the blade chord and twist angle

To determine the blade chord and twist angle, we can use the NACA 4412 airfoil.

The chord can be calculated using the following formula:

c = 16 x R / (3 x π x AR x (1 + λ))

where R is the rotor radius, AR is the aspect ratio, and λ is the taper ratio.

Assuming an aspect ratio of 6 and a taper ratio of 0.2, we get:

c = 16 x 0.51 / (3 x π x 6 x (1 + 0.2)) = 0.064 m

The twist angle can be determined using the following formula:

θ = 14 - 0.7 x r / R

where r is the radial position along the blade and R is the rotor radius.

Assuming a maximum twist angle of 14°, we get:

θ = 14 - 0.7 x r / 0.51

Therefore, at r = 0.25D, we have:

θ = 14 - 0.7 x 0.25 x 1.02 = 12.8°

And at r = 0.75D, we have:

θ = 14 - 0.7 x 0.75 x 1.02 = 8.7°

Step 3: Determine the number of blades

For electricity generation, a design tip speed ratio of 5 is recommended. The tip speed ratio is given by:

λ = ω x R / V

where ω is the angular velocity.

Assuming a rotational speed of 120 RPM (2π radians/s), we get:

λ = 2π x 0.51 / 7 = 0.91

The number of blades can be determined using the following formula:

N = 1 / (2 x sin(π/N))

Assuming a number of blades of 3, we get:

N = 1 / (2 x sin(π/3)) = 3

Step 4: Check the power coefficient and adjust design parameters if necessary

Finally, we should check the power coefficient of the wind rotor to ensure that it meets the design requirements.

The power coefficient is given by:

Cp = 0.22 x (6 x λ - 1) x sin(θ)³ / (cos(θ) x (1 + 4.5 x (λ / sin(θ))²))

At the design conditions given, we have:

λ = 0.91

θ = 12.8°

N = 3

Solving for Cp, we get:

Cp = 0.22 x (6 x 0.91 - 1) x sin(12.8°)³ / (cos(12.8°) x (1 + 4.5 x (0.91 / sin(12.8°))²)) = 0.414

Since the design power coefficient is 0.4, the wind rotor meets the design requirements.

Therefore, a wind rotor with a diameter of 1.02 m, three blades, a chord of 0.064 m, and a twist angle of 12.8° at the blade root and 8.7° at the blade tip, using the NACA 4412 airfoil, should generate 100 W of electricity at a wind speed of 7 m/s, with a design tip speed ratio of 5 and a design power coefficient of 0.4.

The rotor diameter can be calculated using the following formula:

D = 2 x R

where R is the radius of the swept area of the rotor.

The radius can be calculated using the following formula:

R = √(A / π)

where A is the swept area of the rotor.

The swept area of the rotor can be calculated using the power coefficient and the air density, which are given:

Cp = 2 x Co/C x sin(θ) x cos(θ)

ρ = 1.225 kg/m³

We can rearrange the equation for Cp to solve for sin(θ) and cos(θ):

sin(θ) = Cp / (2 x Co/C x cos(θ))

cos(θ) = √(1 - sin²(θ))

Substituting the given values, we get:

Co/C = 0.01

CLD = 0.8

sin(θ) = 0.4

cos(θ) = 0.9165

Solving for Cp, we get:

Cp = 2 x Co/C x sin(θ) x cos(θ) = 0.0733

Now, we can use the power equation to solve for the swept area of the rotor:

P = 0.5 x ρ x A x V³ x Cp

Assuming a wind speed of 7 m/s and a power output of 100 W, we get:

A = P / (0.5 x ρ x V³ x Cp) = 0.833 m²

Finally, we can calculate the rotor diameter:

R = √(A / π) = 0.514 m

D = 2 x R = 1.028 m

Therefore, the rotor diameter is approximately 1.028 m.

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In the second-order system of the given equation, the impulse response is the response of a system to a delta function input. Hence, to find the impulse response of the given second-order system y[n] = 0.8(y[n 1] − y[n − 2]) + x[n 1], the system is given an impulse input of δ[n].

After giving an impulse input, the system response would be equivalent to the system's impulse response H[n]. Here's how to solve the problem: Step 1: Given the equation of the second-order systemy[n] = 0.8(y[n 1] − y[n − 2]) + x[n 1]Step 2: Take an impulse input of δ[n] and substitute it into the system's equation; y[n] = 0.8(y[n 1] − y[n − 2]) + δ[n − 1]Step 3: Solving for the impulse response (H[n]) from the given equation, we have;H[n] = 0.8H[n − 1] − 0.8H[n − 2] + δ[n − 1]Since it's a second-order system, the equation has a second-order difference equation of the form;H[n] − 0.8H[n − 1] + 0.8H[n − 2] = δ[n − 1]Here, the impulse response is equal to the inverse of the z-transform of the given transfer function. Let's first find the transfer function of the given second-order system. Step 4: To find the transfer function, let's take the z-transform of the second-order system equation.

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The transformation from spherical coordinates (r,θ,φ) to Cartesian coordinates (x,y,z) is a standard mathematical technique used in computer graphics, physics, engineering, and many other fields.

To transform a point in spherical coordinates to Cartesian coordinates, we need to use the following transformation equations:x = r sin(φ) cos(θ) y = r sin(φ) sin(θ) z = r cos(φ)The Jacobian matrix for this transformation is given by:J = $\begin{bmatrix} [tex]sin(φ)cos(θ) & rcos(φ)cos(θ) & -rsin(φ)sin(θ)\\sin(φ)sin(θ) & rcos(φ)sin(θ) & rsin(φ)cos(θ)\\cos(φ) & -rsin(φ) & 0 \end{bmatrix}$.[/tex]

We can use this matrix to calculate the changes in the coordinate system. Let's say we have a point P in spherical coordinates given by P = (r,θ,φ). To calculate the change in the coordinate system, we need to multiply the Jacobian matrix by the vector ([tex]r,θ,φ).[/tex]

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For a round pipe with a diameter of 0.9 m and partially filled to a height of 0.315 m, the wetted perimeter can be calculated in meters, and the hydraulic depth can be determined in meters as well.

To find the wetted perimeter of the partially filled round pipe, we need to calculate the circumference of the cross-section that is in contact with the fluid. In this case, since the pipe is partially filled, the wetted perimeter will not be equal to the full circumference of the pipe. The wetted perimeter can be determined by finding the circumference of a circle with a diameter equal to the filled portion of the pipe. In this case, the diameter would be 0.9 m, and the filled height would be 0.315 m.

The hydraulic depth represents the average depth of the fluid flow within the pipe. For a partially filled pipe, it is calculated as the ratio of the cross-sectional area to the wetted perimeter. The hydraulic depth is important for fluid flow calculations and analysis. To calculate the hydraulic depth, we divide the filled cross-sectional area by the wetted perimeter. The filled cross-sectional area can be calculated using the formula for the area of a circle with a given diameter.

It's important to note that the wetted perimeter and hydraulic depth calculations assume a circular cross-section of the pipe and do not account for irregularities or variations in the pipe's shape.

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Simple Harmonic Motion (SHM) is an oscillatory motion where an object moves back and forth around an equilibrium position under a restoring force, characterized by terms such as equilibrium position, displacement, restoring force, amplitude, period, frequency, and sinusoidal pattern.

Simple Harmonic Motion (SHM) refers to a type of oscillatory motion that occurs when an object moves back and forth around a stable equilibrium position under the influence of a restoring force that is proportional to its displacement from that position.

The motion is characterized by a repetitive pattern and has several key terms associated with it.

The equilibrium position is the point where the object is at rest, and the displacement refers to the distance and direction from this position.

The restoring force acts to bring the object back towards the equilibrium position when it is displaced.

The amplitude represents the maximum displacement from the equilibrium position, while the period is the time taken to complete one full cycle of motion.

The frequency refers to the number of cycles per unit of time, and it is inversely proportional to the period.

The motion is called "simple harmonic" because the displacement follows a sinusoidal pattern, known as a sine or cosine function, which is mathematically described as a harmonic oscillation.

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The given function is f(t) = 2e¹⁰ᵗ , then L{f(t)} = F(s) .

The given function is [tex]f(t) = 2e¹⁰ᵗ[/tex] and we have to find the Laplace transform of the function L{f(t)}.

Apply the First Shift Theorem.

So, L{f(t-a)} = e^(-as) F(s)

Here, a = 0, f(t-a)

= f(t).

Therefore, L{f(t)} = F(s)

= 2/(s-10)

2. The given function is f(s) = 3s, and we have to find [tex]L⁻¹ {F(s)} / (s² + 49).[/tex]

We have to find the inverse Laplace transform of F(s) / (s² + 49).

F(s) = 3sL⁻¹ {F(s) / (s² + 49)}

= sin(7t).

Thus, L⁻¹ {F(s)} / (s² + 49) = sin(7t) / (s² + 49).

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