In a given rocket engine, a mass flow of propellants equal to 87.6 lbm/s is pumped into the combustion chamber, where the stagnation temperature after combustion is 6000°R. The combustion products have mixture values R = 2400 ft·lb/(slug·°R) and γ = 1.21. If the throat area is 0.5 ft2 , calculate the stagnation pressure in the combustion chamber in lb/ft2 . Hint: use your knowledge about choked flow.

The acceleration of point A on the hoop can be calculated by considering both the tangential acceleration due to the hoop's angular acceleration and the radial (centripetal) acceleration. These values are vectorially added along with the deceleration of the hoop's center.

To determine the acceleration of point A, we must consider both the tangential and radial (centripetal) accelerations since the hoop is experiencing angular acceleration and the center of the hoop has a deceleration. The tangential acceleration (at) is due to the angular acceleration and is calculated by multiplying the angular acceleration (
a) by the radius (r) of the hoop. The radial (centripetal) acceleration (ar) depends on the angular velocity (
w) and the radius of the hoop. The equation for centripetal acceleration is ar = w2
r. The total acceleration (aA) of point A can be found by vectorially adding the tangential and radial accelerations, considering the direction of deceleration of the center as well.

Answer:

(a). 42.1 ft/s, (b). 3366.66 ft^3/s, (c). 0.235, (d). 18.2 ft, (e). 3.8 ft.

Explanation:

The following parameters are given in the question above and they are;

Induced hydraulic jump, j = 80 ft wide channel, and the water depths on either side of the jump are 1 ft and 10 ft. Let k1 and k2 represent each side of the jump respectively.

(a). The velocity of the faster moving flow can be calculated using the formula below;

k1/k2 = 1/2 [ √ (1 + 8g1^2) - 1 ].

Substituting the values into the equation above a s solving it, we have;

g1 = 7.416.

Hence, g1 = V1/ √(L × k1).

Therefore, making V1 the subject of the formula, we have;

V1 = 7.416× √ ( 32.2 × 1).

V1 = 42.1 ft/s.

(b). R = V1 × j × k1.

R = 42.1 × 80 × 1.

R = 3366.66 ft^3/s.

(c). Recall that R = V2 × A.

Where A = 80 × 10.

Therefore, V2 = 3366.66/ 80 × 10.

V2 = 4.21 ft/s.

Hence,

g2 = V1/ √(L × k2).

g2 = 4.21/ √ (32.2 × 10).

g2 = 0.235.

(d). (k2 - k1)^3/ 4 × k1k2.

= (10 - 1)^3/ 4 × 1 × 10.

= 18.2 ft.

(e).The critical depth;

[ (3366.66/80)^2 / 32.2]^ 1/3.

The The critical depth = 3.80 ft.

Answer:

a) 42.08 ft/sec

b) 3366.33 ft³/sec

c) 0.235

d) 18.225 ft

e) 3.80 ft

Explanation:

Given:

b = 80ft

y1 = 1 ft

y2 = 10ft

a) Let's take the formula:

[tex] \frac{y2}{y1} = \frac{1}{5} * \sqrt{1 + 8f^2 - 1} [/tex]

[tex] 10*2 = \sqrt{1 + 8f^2 - 1[/tex]

1 + 8f² = (20+1)²

= 8f² = 440

f² = 55

f = 7.416

For velocity of the faster moving flow, we have :

[tex] \frac{V_1}{\sqrt{g*y_1}} = 7.416 [/tex]

[tex] V_1 = 7.416 *\sqrt{32.2*1}[/tex]

V1 = 42.08 ft/sec

b) the flow rate will be calculated as

Q = VA

VA = V1 * b *y1

= 42.08 * 80 * 1

= 3366.66 ft³/sec

c) The Froude number of the sub-critical flow.

V2.A2 = 3366.66

Where A2 = 80ft * 10ft

Solving for V2, we have:

[tex] V_2 = \frac{3666.66}{80*10} [/tex]

= 4.208 ft/sec

Froude number, F2 =

[tex] \frac{V_2}{g*y_2} = \frac{4.208}{32.2*10} [/tex]

F2 = 0.235

d) [tex]El = \frac{(y_2 - y_1)^3}{4*y_1*y_2}[/tex]

[tex] El = \frac{(10-1)^3}{4*1*10} [/tex]

[tex] = \frac{9^3}{40} [/tex]

= 18.225ft

e) for critical depth, we use :

[tex] y_c = [\frac{(\frac{3366.66}{80})^2}{32.2}]^1^/^3 [/tex]

= 3.80 ft

Answer:

John should continue with his catering business because accounting and economic profits from pizza catering are more than his annual salary from teaching.

Explanation:

John can earn from teaching $80,000 annually

For starting business of pizza catering John will incur following expense

Tuition for catering skills $2,000

Opportunity cost for withdrew of funds ($110,000 * 5%) $5,500

Interest for Borrowing from friend ($50,000 * 6%) $3,000

Opportunity cost of Rent from premises $12,000

Total opportunity cost $22,500

Revenue:

Revenues from Pizza $400,000

Revenue from Beverages $190,000

Total revenue $590,000

Expenses:

Cashier wages ($55,000 * 2) $110,000

Pizza ingredients $50,000

Manager salary $75,000

Pizza bakers wages ($60,000 * 3) $180,000

Equipment $10,000

Total Expense $425,000

Net Income - Accounting Profit ($590,000 - $425,000) = $165,000

Less opportunity cost $22,500

Economic Profit $142,500

Answer:

a) 9.995 psi

b) 1.3725 psi

Explanation:

Given:-

- The diameter of the pipe at inlet, d1 = 1 in

- The diameter of the pipe at exit, de = 0.5 in

- The exit velocity, Ve = 30 ft/s

- The exit discharge pressure Pe = 0 ( gauge )

- The density of water ρ = 1.940 slugs/ft3

Find:-

Calculate the minimum gage pressure required at the section (1)

Solution:-

- The mass flow rate m ( flow ) for the fluid remains constant via the continuity equation applies for all steady state fluid conditions.

                 m  ( flow ) = ρ*An*Vn = constant

Where,

           An: the area of nth section

           Vn: the velocity at nth section

- Consider the point ( 1 ) and exit point. Determine the velocity at point ( 1 ) via continuity equation.

- The cross sectional area of the pipe at nth point is given by:

                 An = π*dn^2 / 4

- The continuity equation becomes:

                 ρ*A1*V1 = ρ*Ae*Ve

Note: Water is assumed as incompressible fluid; hence, density remains constant.

                V1 = ( Ae / A1 ) * Ve

                V1 = ( (π*de^2 / 4 ) / (π*d1^2 / 4) ) *Ve

                V1 = ( de / d1 ) ^2 * Ve

                V1 = ( 0.5 / 1 )^2 * 30

                V1 =7.5 ft/s

- The required velocity at section ( 1 ) is V1 = 7.5 ft/s.

- Apply the bernoulli's principle for the point ( 1 ) and exit. Assuming the frictional losses are minimal.

        P1 + 0.5*ρ*V1^2 + ρ*g*h1 = Pe + 0.5*ρ*Ve^2 + ρ*g*he

- We will set " h1 " as datum; hence, h1 = 0. The elevation of exit nozzle from point (1) is at he = 10 ft.

- The bernoulli's equation expressed above is in " gauge pressure ". So the gauge pressure of exit Pe = 0 ( Patm ).

Therefore the simplified equation becomes:

        P1 + 0.5*ρ*V1^2  =  0.5*ρ*Ve^2 + ρ*g*he

        P1 = 0.5*ρ* ( Ve^2 - V1^2 ) + ρ*g*he

        P1  = 0.5*1.940*( 30^2 - 7.5^2 ) + 1.940*32*10

        P1 = 818.4375 + 620.8

        P1 = 1439.2375 lbf / ft^2 = 9.995 psi

- If the device is inverted then the velocity at the inlet " V1 " would remain same as there is no change in continuity equation - ( Diameters at each section remains same ).

- The only thing that changes is the application of bernoulli's equation as follows:

         P1 + 0.5*ρ*V1^2 + ρ*g*h1 = Pe + 0.5*ρ*Ve^2 + ρ*g*he

- We will set " he " as datum; hence, he = 0. The elevation of point ( 1 ) from exit nozzle is at h1 = 10 ft.

- The bernoulli's equation expressed above is in " gauge pressure ". So the gauge pressure of exit Pe = 0 ( Patm ).

Therefore the simplified equation becomes:

        P1 + 0.5*ρ*V1^2 + ρ*g*h1 =  0.5*ρ*Ve^2

        P1 = 0.5*ρ* ( Ve^2 - V1^2 ) - ρ*g*h1

        P1  = 0.5*1.940*( 30^2 - 7.5^2 ) - 1.940*32*10

        P1 = 818.4375 - 620.8

        P1 = 197.6375 lbf / ft^2 = 1.3725 psi

Answer:

surface temperature = 128.74⁰c

Explanation:

Given data

diameter of cable = 5 mm = 0.005 m

length of cable = 4 m

T∞ ( surrounding temperature ) = 20⁰c

voltage drop across cable ( dv )= 60 V

current across cable = 1.5 A

attached to this answer is the comprehensive analysis and solution to the problem.

The assumption made is not a good one since the calculated Ts ( surface temperature ) is very much different from the assumed Ts

Answer:

See explaination

Explanation:

Given that

the cross section at right is mode 2024-T3

Ftu=62 ksi

E=10.5 Msi

Ec=10.7 Msi

the angle b1=1.25"

b2=1.75"

t1=0.050"

t2=0.080"

Kindly check attachment for the step by step solution of the given problem.

Answer:

4. The velocity gradient at the wall is greater for a laminar boundary layer than a turbulent boundary layer.

Explanation:

This is false

Answer:

The answer 1 is correct.

Explanation:

When a junction called the p-n is forward biased, the capacitance of diffusion will form or structured across depletion layers.

When at a higher frequency or frequencies, the dopants, are vibrated across the metallurgical junction and the doping profiles smooths out.

Answer:

a) [tex]\dot W = 0.978\,kW[/tex], b) [tex]I = \left(50000\,\frac{kJ}{h} \right)\cdot \left(\frac{1}{3600}\,\frac{h}{s}\right)\cdot \left(\frac{1}{COP_{real}} \right) - 0.978\,kW[/tex]

Explanation:

a) The ideal Coefficient of Performance for the heat pump is:

[tex]COP_{HP} = \frac{T_{H}}{T_{H}-T_{L}}[/tex]

[tex]COP_{HP} = \frac{298.15\,K}{298.15\,K - 277.15\,K}[/tex]

[tex]COP_{HP} = 14.198[/tex]

The reversible work input is:

[tex]\dot W = \frac{\dot Q_{H}}{COP_{HP}}[/tex]

[tex]\dot W = \left(\frac{50000\,\frac{kJ}{h} }{14.198} \right)\cdot \left(\frac{1}{3600}\,\frac{h}{s} \right)[/tex]

[tex]\dot W = 0.978\,kW[/tex]

b) The irreversibility is given by the difference between real work and ideal work inputs:

[tex]I = \dot W_{real} - \dot W_{ideal}[/tex]

[tex]I = \left(50000\,\frac{kJ}{h} \right)\cdot \left(\frac{1}{3600}\,\frac{h}{s}\right)\cdot \left(\frac{1}{COP_{real}} \right) - 0.978\,kW[/tex]

Answer:

The correct answer is 0.004382 kW/K, the second law is a=satisfied and established because it is a positive value.

Explanation:

Solution

From the question given we recall that,

The transferred heat rate is = 2kW

A reservoir cold at = 300K

The next step is to find the rate  at which the entropy of the two reservoirs changes is kW/K

Given that:

Δs =  Q/T This is the entropy formula,

Thus

Δs₁ = 2/ 300 = 0.006667 kW/K

Δs₂ = 2 / 875 =0.002285

Therefore,

Δs = 0.006667 - 0.002285

= 0.004382 kW/K

Yes, the second law is satisfied, because it is seen as positive.

The dimensions of the specific resistance of the filter medium, Rf, are F/L (force per unit length), and the dimensions of the filtrate "viscosity", alpha, are T/L^2 (time per area). This ensures the dimensional consistency of the vacuum filtration equation.

To answer the question regarding vacuum filtration, we need to determine the dimensions of Rf and alpha. The equation provided is Q = Delta pA2 alpha(VRw + ARf), where each symbol has an associated dimension. To keep the equation dimensionally consistent, the dimensions of the terms added within the parenthesis must be the same, i.e., the dimensions of VRw must equal the dimensions of ARf.

Let's break down the dimensions:

Hence, the dimensions of Rf are F/L (force per unit length), and the dimensions of alpha are T/L2 (time per area).

Answer:

transfer function from R(s) to E(s) and determine the steady-state error (ess) for a unit-step reference input (c) Select the system parameters (k, kP, kI) such that the closed-loop system has damping coefficient ζ = 0.707 Figure Control system diagram.

Explanation:

hope this helps

you face is A certain vehicle loses 3.5% of its value each year. If the vehicle has an initial value of $11,168, construct a model that represents the value of the vehicle after a certain number of years. Use your model to compute the value of the vehicle at the end of 6 years.