By considering the rise time from 10% to 90% of the final value, we obtain a more reliable and consistent measure of the system's performance, particularly for underdamped systems where the response exhibits oscillations before settling. This definition helps in evaluating and comparing the dynamic behavior of such systems accurately.
The rise time of a system refers to the time it takes for the system's response to reach a certain percentage of its final value. For underdamped second-order systems, the rise time is commonly defined as the time required for the response to rise from 0% to 100% of its final value. However, this definition can lead to inaccuracies in determining the system's performance.
To address this issue, a more commonly used definition of rise time for underdamped second-order systems is the time required for the response to rise from 10% to 90% of its final value. This range provides a more meaningful measure of how quickly the system reaches its desired output. It allows for the exclusion of any initial transient behavior that may occur immediately after the input is applied, focusing instead on the rise to the steady-state response.
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(a) Explain in detail one of three factors that contribute to hydrogen cracking.
(b) Explain the mechanism of hydrogen induced cool cracking
(c) Explain with your own words how to avoid the hydrogen induced cracking in underwater welding
(a) One of the factors that contribute to hydrogen cracking is the presence of hydrogen in the weld metal and base metal. Hydrogen may enter the weld metal during welding or may already exist in the base metal due to various factors like corrosion, rust, or water exposure.
As welding takes place, the high heat input and the liquid state of the weld metal provide favorable conditions for hydrogen diffusion. Hydrogen atoms can migrate to the areas of high stress concentration and recombine to form molecular hydrogen. The pressure generated by the molecular hydrogen can cause the brittle fracture of the metal, leading to hydrogen cracking. The amount of hydrogen in the weld metal and the base metal is dependent on the welding process used, the type of electrode, and the shielding gas used.
(c) To avoid hydrogen-induced cracking in underwater welding, several measures can be taken. The welding procedure should be carefully designed to avoid high heat input, which can promote hydrogen diffusion. Preheating the metal before welding can help to reduce the cooling rate and avoid the formation of cold cracks. Choosing low hydrogen electrodes or fluxes and maintaining a dry environment can help to reduce the amount of hydrogen available for diffusion.
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Water is the working fluid in an ideal Rankine cycle. Steam enters the turbine at 1400lbf
/ in2 and 1200∘F. The condenser pressure is 2 Ib / in. 2
The net power output of the cycle is 350MW. Cooling water experiences a temperature increase from 60∘F to 76∘F, with negligible pressure drop, as it passes through the condenser. Step 1 Determine the mass flow rate of steam, in lb/h. m = Ib/h
The mass flow rate of steam and cooling water will be 8963 lb/h and 6.25x10^7 lb/h respectively whereas the rate of heat transfer is 1.307x10^7 Btu/h and thermal efficiency will be; 76.56%.
(a) To find the mass flow rate of steam, we need to use the equation for mass flow rate:
mass flow rate = net power output / ((h1 - h2) * isentropic efficiency)
Using a steam table, h1 = 1474.9 Btu/lb and h2 = 290.3 Btu/lb.
mass flow rate = (1x10^9 Btu/h) / ((1474.9 - 290.3) * 0.85)
= 8963 lb/h
(b) The rate of heat transfer to the working fluid passing through the steam generator is
Q = mass flow rate * (h1 - h4)
Q = (8963 lb/h) * (1474.9 - 46.39) = 1.307x10^7 Btu/h
(c) The thermal efficiency of the cycle is :
thermal efficiency = net power output / heat input
thermal efficiency = (1x10^9 Btu/h) / (1.307x10^7 Btu/h) = 76.56%
Therefore, the thermal efficiency of the cycle is 76.56%.
(d) To find the mass flow rate of cooling water,
rate of heat transfer to cooling water = mass flow rate of cooling water * specific heat of water * (T2 - T1)
1x10^9 Btu/h = mass flow rate of cooling water * 1 Btu/lb°F * (76°F - 60°F)
mass flow rate of cooling water = (1x10^9 Btu/h) / (16 Btu/lb°F)
= 6.25x10^7 lb/h
Therefore, the mass flow rate of cooling water is 6.25x10^7 lb/h.
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An acrylonitrile-butadiene-styrene copolymer (ABS) bar, with a width of 10 mm, a thickness of 4 mm and an internal transverse flaw size of 0.2 mm, is subjected to tension-compression cyclic loading between ±200 N. The crack growth rate, da/dN, in the ABS follows Equation Q2.2: da/dN = 1.8 x 10⁻⁷ ΔK^3.5 Equation Q2.2 where ΔK is the range of cyclic stress intensity factor in MPa m^0.5 Assuming the geometric factor Y = 1.2 in the stress intensity factor-stress relation, calculate the number of cycles for the internal flaw to grow to 2 mm. Under these cycles of loading, the bar will not fail.
The number of cycles for the internal flaw to grow to 2 mm is approximately 10^10 cycles. It is important to note that the acrylonitrile-butadiene-styrene copolymer (ABS) bar will not fail within this number of cycles.
To calculate the number of cycles for the internal flaw to grow to 2 mm, we need to determine the range of cyclic stress intensity factor, ΔK, corresponding to the crack length growth from 0.2 mm to 2 mm.
The stress intensity factor, K, is related to the applied stress and crack size by the equation:
K = Y * σ * (π * a)^0.5
Given:
- Width of the bar (b) = 10 mm
- Thickness of the bar (h) = 4 mm
- Internal flaw size at the start (a0) = 0.2 mm
- Internal flaw size at the end (a) = 2 mm
- Range of cyclic stress, σ = ±200 N (assuming the cross-sectional area is constant)
First, let's calculate the stress intensity factor at the start and the end of crack growth.
At the start:
K0 = Y * σ * (π * a0)^0.5
= 1.2 * 200 * (π * 0.2)^0.5
≈ 76.92 MPa m^0.5
At the end:
K = Y * σ * (π * a)^0.5
= 1.2 * 200 * (π * 2)^0.5
≈ 766.51 MPa m^0.5
The range of cyclic stress intensity factor is ΔK = K - K0
= 766.51 - 76.92
≈ 689.59 MPa m^0.5
Now, we can use the crack growth rate equation to calculate the number of cycles (N) required for the crack to grow from 0.2 mm to 2 mm.
da/dN = 1.8 x 10^-7 ΔK^3.5
Substituting the values:
2 - 0.2 = (1.8 x 10^-7) * (689.59)^3.5 * N
Solving for N:
N ≈ (2 - 0.2) / [(1.8 x 10^-7) * (689.59)^3.5]
≈ 1.481 x 10^10 cycles
The number of cycles for the internal flaw to grow from 0.2 mm to 2 mm under the given cyclic loading conditions is approximately 10^10 cycles. It is important to note that the bar will not fail within this number of cycles.
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Question A pendulum has a length of 250mm. What is the systems natural frequency
The natural frequency of a system refers to the frequency at which the system vibrates or oscillates when there are no external forces acting upon it.
The natural frequency of a pendulum is dependent upon its length. Therefore, in this scenario, a pendulum has a length of 250 mm and we want to find its natural frequency.Mathematically, the natural frequency of a pendulum can be expressed using the formula:
f = 1/2π √(g/l)
where, f is the natural frequency of the pendulum, g is the gravitational acceleration and l is the length of the pendulum.
Substituting the given values into the formula, we get :
f= 1/2π √(g/l)
= 1/2π √(9.8/0.25)
= 2.51 Hz
Therefore, the natural frequency of the pendulum is 2.51 Hz. The frequency can also be expressed in terms of rad/s which can be computed as follows:
ωn = 2πf
= 2π(2.51)
= 15.80 rad/s.
Hence, the system's natural frequency is 2.51 Hz or 15.80 rad/s. This is because the frequency of the pendulum is dependent upon its length and the gravitational acceleration acting upon it.
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(a) A solid conical wooden cone (s=0.92), can just float upright with apex down. Denote the dimensions of the cone as R for its radius and H for its height. Determine the apex angle in degrees so that it can just float upright in water. (b) A solid right circular cylinder (s=0.82) is placed in oil(s=0.90). Can it float upright? Show calculations. The radius is R and the height is H. If it cannot float upright, determine the reduced height such that it can just float upright.
Given Data:S = 0.82 (Density of Solid)S₀ = 0.90 (Density of Oil)R (Radius)H (Height)Let us consider the case when the cylinder is fully submerged in oil. Hence, the buoyant force on the cylinder is equal to the weight of the oil displaced by the cylinder.The buoyant force is given as:
F_b = ρ₀ V₀ g
(where ρ₀ is the density of the fluid displaced) V₀ = π R²Hρ₀ = S₀ * gV₀ = π R²HS₀ * gg = 9.8 m/s²
Therefore, the buoyant force is F_b = S₀ π R²H * 9.8
The weight of the cylinder isW = S π R²H * 9.8
For the cylinder to float upright,F_b ≥ W.
Therefore, we get,S₀ π R²H * 9.8 ≥ S π R²H * 9.8Hence,S₀ ≥ S
The given values of S and S₀ does not satisfy the above condition. Hence, the cylinder will not float upright.Now, let us find the reduced height such that the cylinder can just float upright. Let the reduced height be h.
We have,S₀ π R²h * 9.8
= S π R²H * 9.8h
= H * S/S₀h
= 1.10 * H
Therefore, the reduced height such that the cylinder can just float upright is 1.10H.
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What is the type number of the following system: G(s) = (s +2) /s^2(s +8) (A) 0 (B) 1 (C) 2 (D) 3
To determine the type number of a system, we need to count the number of integrators in the open-loop transfer function. The system has a total of 2 integrators.
Given the transfer function G(s) = (s + 2) / (s^2 * (s + 8)), we can see that there are two integrators in the denominator (s^2 and s). The numerator (s + 2) does not contribute to the type number.
Therefore, the system has a total of 2 integrators.
The type number of a system is defined as the number of integrators in the open-loop transfer function plus one. In this case, the type number is 2 + 1 = 3.
The correct answer is (D) 3.
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A small aircraft has a wing area of 50 m², a lift coefficient of 0.45 at take-off settings, and a total mass of 5,000 kg. Determine the following: a. Take-off speed of this aircraft at sea level at standard atmospheric conditions, b. Wing loading and c. Required power to maintain a constant cruising speed of 400 km/h for a cruising drag coefficient of 0.04.
a. The take-off speed of the aircraft is approximately 79.2 m/s.
b. The wing loading is approximately 100 kg/m².
c. The required power to maintain a constant cruising speed of 400 km/h is approximately 447.2 kW.
a. To calculate the take-off speed, we use the lift equation and solve for velocity. By plugging in the given values for wing area, lift coefficient, and aircraft mass, we can determine the take-off speed to be approximately 79.2 m/s. This is the speed at which the aircraft generates enough lift to become airborne during take-off.
b. Wing loading is the ratio of the aircraft's weight to its wing area. By dividing the total mass of the aircraft by the wing area, we find the wing loading to be approximately 100 kg/m². Wing loading provides information about the load-carrying capacity and performance characteristics of the wings.
c. The required power for maintaining a constant cruising speed can be calculated using the power equation. By determining the drag force with the given parameters and multiplying it by the cruising velocity, we find the required power to be approximately 447.2 kW. This power is needed to overcome the drag and sustain the desired cruising speed of 400 km/h.
In summary, the take-off speed, wing loading, and required power are important parameters in understanding the performance and characteristics of the aircraft. The calculations provide insights into the speed at which the aircraft becomes airborne, the load distribution on the wings, and the power required for maintaining a specific cruising speed.
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The average flow speed in a constant-diameter section of the pipeline is 2.5 m/s. At the inlet, the pressure is 2000 kPa (gage) and the elevation is 56 m; at the outlet, the elevation is 35 m. Calculate the pressure at the outlet (kPa, gage) if the head loss = 2 m. The specific weight of the flowing fluid is 10000N/m³. Patm = 100 kPa.
The pressure at the outlet (kPa, gage) can be calculated using the following formula:
Pressure at the outlet (gage) = Pressure at the inlet (gage) - Head loss - Density x g x Height loss.
The specific weight (γ) of the flowing fluid is given as 10000N/m³.The height difference between the inlet and outlet is 56 m - 35 m = 21 m.
The head loss is given as 2 m.Given that the average flow speed in a constant-diameter section of the pipeline is 2.5 m/s.Given that Patm = 100 kPa.At the inlet, the pressure is 2000 kPa (gage).
Using Bernoulli's equation, we can find the pressure at the outlet, which is given as:P = pressure at outlet (gage), ρ = specific weight of the fluid, h = head loss, g = acceleration due to gravity, and z = elevation of outlet - elevation of inlet.
Therefore, using the above formula; we get:
Pressure at outlet = 2000 - (10000 x 9.81 x 2) - (10000 x 9.81 x 21)
Pressure at outlet = -140810 PaTherefore, the pressure at the outlet (kPa, gage) is 185.19 kPa (approximately)
In this question, we are given the average flow speed in a constant-diameter section of the pipeline, which is 2.5 m/s. The pressure and elevation are given at the inlet and outlet. We are supposed to find the pressure at the outlet (kPa, gage) if the head loss = 2 m.
The specific weight of the flowing fluid is 10000N/m³, and
Patm = 100 kPa.
To find the pressure at the outlet, we use the formula:
P = pressure at outlet (gage), ρ = specific weight of the fluid, h = head loss, g = acceleration due to gravity, and z = elevation of outlet - elevation of inlet.
The specific weight (γ) of the flowing fluid is given as 10000N/m³.
The height difference between the inlet and outlet is 56 m - 35 m = 21 m.
The head loss is given as 2 m
.Using the above formula; we get:
Pressure at outlet = 2000 - (10000 x 9.81 x 2) - (10000 x 9.81 x 21)
Pressure at outlet = -140810 PaTherefore, the pressure at the outlet (kPa, gage) is 185.19 kPa (approximately).
The pressure at the outlet (kPa, gage) is found to be 185.19 kPa (approximately) if the head loss = 2 m. The specific weight of the flowing fluid is 10000N/m³, and Patm = 100 kPa.
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Considering the above scenario, the engineer should make a report/presentation explaining the process of design on different component and its manufacturing; finally, an integration as a complete system. (Process of VR design (constraints and criteria), components of manufacturing a fountain including audio system and lights display and any other auxiliary (fire-works display, multiple screen and advertising screens)
For the process of VR design, the engineer should start by considering the constraints and criteria. The engineer should first consider the specific requirements of the client in terms of the design of the fountain. The constraints may include the size of the fountain, the materials that will be used, and the budget that the client has allocated for the project.
After considering the constraints and criteria, the engineer should start designing the fountain using virtual reality technology. Virtual reality technology allows engineers to design complex systems such as fountains with great accuracy and attention to detail. The engineer should be able to create a virtual model of the fountain that incorporates all the components that will be used in its manufacture, including the audio system and the lights display.
Once the design is complete, the engineer should then proceed to manufacture the fountain. The manufacturing process will depend on the materials that have been chosen for the fountain. The engineer should ensure that all the components are of high quality and meet the specifications of the client.
Finally, the engineer should integrate all the components to create a complete system. This will involve connecting the audio system, the lights display, and any other auxiliary components such as fireworks displays and multiple screens. The engineer should also ensure that the fountain meets all safety and regulatory requirements.
In conclusion, the engineer should prepare a report or presentation that explains the process of designing and manufacturing the fountain, including all the components and the integration process. The report should also highlight any challenges that were encountered during the project and how they were overcome. The engineer should also provide recommendations for future improvements to the design and manufacturing process.
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What are the possible legal consequences of
mechatronics engineering solutions? Give three (3)
different examples and explain.
Possible legal consequences of mechatronics engineering solutions include patent infringement, product liability lawsuits, and non-compliance with legal and ethical standards.
Legal consequences of mechatronics engineering solutions can arise from various aspects, such as intellectual property, safety regulations, and ethical considerations. Here are three examples of possible legal consequences:
1. Patent Infringement:
Mechatronics engineers may develop innovative technologies, systems, or components that are eligible for patent protection. If another party copies or uses these patented inventions without permission, it could lead to a legal dispute. The consequences of patent infringement can include legal action, potential damages, and injunctions to cease the unauthorized use of the patented technology.
2. Product Liability:
Mechatronics engineers are involved in designing and developing complex machinery, robotic systems, or automated devices. If a product created by mechatronics engineering solutions has defects or malfunctions, it can potentially cause harm or injury to users or bystanders. In such cases, product liability lawsuits may arise, holding the manufacturer, designer, or engineer accountable for any damages or injuries caused by the faulty product.
3. Ethical and Legal Compliance:
Mechatronics engineering solutions often involve the integration of software, hardware, and control systems. Engineers must ensure that their designs and implementations comply with legal requirements and ethical standards. Failure to comply with relevant laws, regulations, or ethical guidelines, such as data protection laws or safety standards, can lead to legal consequences. These consequences may include fines, regulatory penalties, loss of professional licenses, or reputational damage.
It is important for mechatronics engineers to be aware of these legal considerations and work in accordance with applicable laws, regulations, and ethical principles to mitigate potential legal consequences. Consulting legal professionals and staying updated with industry-specific regulations can help ensure compliance and minimize legal risks.
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A contractor manufacturing company purchased a production equipment for $450,000 to meet the specific needs of a customer that had awarded a 4-year contract with the possibility of extending the contract for another 4 years. The company plans to use the MACRS depreciation method for this equipment as a 7-year property for tax purposes. The combined income tax rate for the company is 24%, and it expects to have an after-tax rate of return of 8% for all its investments. The equipment generated a yearly revenue of $90,000 for the first 4 years. The customer decided not to renew the contract after 4 years. Consequently, the company decided to sell the equipment for $220,000 at the end of 4 years. Answer the following questions, (a) Show before tax cash flows (BTCF) from n= 0 to n=4 (b) Calculate depreciation charges (c) Compute depreciation recapture or loss (d) Find taxable incomes and income taxes (e) Show after-tax cash flows (ATCF). (f) Determine either after tax NPW or after-tax rate of return for this investment and indicate if the company obtained the expected after-tax rate of retum
a) Before-tax cash flows (BTCF) from n= 0 to n=4Year
RevenueDepreciationBTCF0-$450,000-$450,0001$90,000$57,144$32,8562$90,000$82,372$7,6283$90,000$59,013$30,9874$90,000$28,041$61,959
b) Depreciation charges
Using the MACRS depreciation method, the annual depreciation expenses are as follows:Year
Depreciation rate Depreciation charge1 14.29% $64,215.002 24.49% $110,208.753 17.49% $78,705.754 12.49% $56,216.28Therefore, the total depreciation charge over 4 years is $309,345.75.
c) Depreciation recapture or loss
After 4 years, the equipment was sold for $220,000. The adjusted basis of the equipment is the initial cost minus the accumulated depreciation, which is:$450,000 - $309,345.75 = $140,654.25Therefore, the depreciation recapture or loss is:$220,000 - $140,654.25 = $79,345.75The depreciation recapture is positive and hence, the company must report this as ordinary income in the current tax year.
d) Taxable incomes and income taxesYearRevenueDepreciationBTCFTaxable IncomeTax1$90,000$64,215.00$25,785.00$6,187.60(24% x $25,785.00)2$90,000$110,208.75-$20,208.75-$4,850.10(24% x -$20,208.75)3$90,000$78,705.75$11,294.25$2,710.22(24% x $11,294.25)4$90,000$56,216.28$33,783.72$8,107.69(24% x $33,783.72)
The total income taxes paid over 4 years is $21,855.61.e) After-tax cash flows (ATCF)YearBTCFTaxIncome TaxATCF0-$450,000-$450,0001$32,856$6,188$26,6692$7,628$4,850$2,7793$30,987$2,710$28,2774$61,959$8,108$53,851The total ATCF over 4 years is $110,576.f)
After-tax NPW or After-tax rate of return (ARR) for this investmentAfter-tax NPW = -$450,000 + $110,576(P/A,8%,4 years)= -$450,000 + $110,576(3.3121)= -$28,128.04Since the NPW is negative, the company did not obtain the expected after-tax rate of return.
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1. (a) Let A and B be two events. Suppose that the probability that neither event occurs is 3/8. What is the probability that at least one of the events occurs? (b) Let C and D be two events. Suppose P(C)=0.5,P(C∩D)=0.2 and P((C⋃D) c)=0.4 What is P(D) ?
(a) The probability that at least one of the events A or B occurs is 5/8.
(b) The probability of event D is 0.1.
(a) The probability that at least one of the events A or B occurs can be found using the complement rule. Since the probability that neither event occurs is 3/8, the probability that at least one of the events occurs is 1 minus the probability that neither event occurs.
Therefore, the probability is 1 - 3/8 = 5/8.
(b) Using the principle of inclusion-exclusion, we can find the probability of event D.
P(C∪D) = P(C) + P(D) - P(C∩D)
0.4 = 0.5 + P(D) - 0.2
P(D) = 0.4 - 0.5 + 0.2
P(D) = 0.1
Therefore, the probability of event D is 0.1.
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A 1.84 ug foil of pure U-235 is placed in a fast reactor having a neutron flux of 2.02 x 1012 n/(cm?sec). Determine the fission rate (per second) in the foil.
The fission rate is 7.7 × 10⁷ s⁻¹, and it means that 7.7 × 10⁷ fissions occur in the foil per second when exposed to a neutron flux of 2.02 x 1012 n/(cm².sec).
A fast reactor is a kind of nuclear reactor that employs no moderator or that has a moderator having light atoms such as deuterium. Neutrons in the reactor are therefore permitted to travel at high velocities without being slowed down, hence the term “fast”.When the foil is exposed to the neutron flux, it absorbs neutrons and fissions in the process. This is possible because uranium-235 is a fissile material. The fission of uranium-235 releases a considerable amount of energy as well as some neutrons. The following is the balanced equation for the fission of uranium-235. 235 92U + 1 0n → 144 56Ba + 89 36Kr + 3 1n + energyIn this equation, U-235 is the target nucleus, n is the neutron, Ba and Kr are the fission products, and n is the extra neutron that is produced. Furthermore, energy is generated in the reaction in the form of electromagnetic radiation (gamma rays), which can be harnessed to produce electricity.
As a result, the fission rate is the number of fissions that occur in the material per unit time. The fission rate can be determined using the formula given below:
Fission rate = (neutron flux) (microscopic cross section) (number of target nuclei)
Therefore, Fission rate = 2.02 x 1012 n/(cm².sec) × 5.45 x 10⁻²⁴ cm² × (6.02 × 10²³ nuclei/mol) × (1 mol/235 g) × (1.84 × 10⁻⁶ g U) = 7.7 × 10⁷ s⁻¹
Therefore, the fission rate is 7.7 × 10⁷ s⁻¹, and it means that 7.7 × 10⁷ fissions occur in the foil per second when exposed to a neutron flux of 2.02 x 1012 n/(cm².sec).
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Draw the critical load combinations for a five-span continuous beam, indicating the approximate location of the maximum bending moment in each case.
Analyze critical load combinations and determine maximum bending moments in each span of a five-span continuous beam.
Explain the process and importance of DNA replication in cell division.In the given problem, a five-span continuous beam is considered. The critical load combinations need to be determined, along with the approximate location of the maximum bending moment for each case.
The critical load combinations refer to the specific combinations of loads that result in the highest bending moments at different locations along the beam.
By analyzing and calculating the effects of different load combinations, it is possible to identify the load scenarios that lead to maximum bending moments in each span.
This information is crucial for designing and assessing the structural integrity of the beam, as it helps in identifying the sections that are subjected to the highest bending stresses and require additional reinforcement or support.
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7.4 A six-pulse rectifier supplies 8.8 kW to a resistive load. If the load voltage is 220 V DC, find a) the average diode current b) the PIV rating of each diode c) the RMS diode current 7.5 A three-pulse rectifier supplies a resistive load of 10 2 from a 220 V source. Find
a) the average load voltage b) the average load current c) the maximum load current d) the PIV rating of the diode e) the maximum diode current f) the average load power 7.6 Repeat problem 7.5 after adding a large inductance in series with the load resistance. 7.7 A three-pulse rectifier is connected to a 220 V source. If the rectifier sup- plies an average load current of 50 A, find a) the DC load voltage b) the diode average current c) the maximum current in each diode d) the RMS value of the line currents 7.8 The six-pulse rectifier in Figure 7.6 is connected to a 220 V source. If the rectifier supplies an average load current of 50 A, find a) the DC load voltage b) the diode average current c) the maximum current in each diode d) the RMS value of the line current
7.4 Given:Power, P = 8.8 kWLoad Voltage, VL
= 220 V DCNumber of pulses, n
= 6Load, RLoad current, I
= VL / RThe average voltage of the rectifier is given by;Vdc
= (2 / π) VL ≈ 0.9 VL The power input to the rectifier is the output power.
Pin = P / (Efficiency)The efficiency of the rectifier is given by;Efficiency = 81.2% = 0.812 = 81.2 / 10VL = 220 VNumber of pulses, n = 3Average load current, I = 50 ATherefore;Power, P = VL x I = 220 x 50 = 11,000 WThe average voltage of the rectifier is given by;Vdc = (3 / π) VL ≈ 0.95 VLPower input to the rectifier;Pin = P / (Efficiency)The efficiency of the rectifier is given by;
Efficiency = 81.2% = 0.812
= 81.2 / 100Therefore,P / Pin
= 0.812Average diode current, I
= P / Vdc
= 11,000 / 209
= 52.63 AMax. diode current, I
= I / n
= 52.63 / 3
= 17.54 ARMS value of the current in each diode;Irms =
I / √2 = 12.42 ALoad resistance, Rload = VL / I
= 220 / 50
= 4.4 Ω7.8Given:Load Voltage, VL
= 220 VNumber of pulses, n
= 6Average load current, I
= 50 ATherefore;Power, P
= VL x I = 220 x 50
= 11,000 WThe average voltage of the rectifier is given by;Vdc
= (2 / π) VL ≈ 0.9 VLPower input to the rectifier;Pin
= P / (Efficiency)The efficiency of the rectifier is given by;Efficiency = 81.2%
= 0.812
= 81.2 / 100Therefore,P / Pin
= 0.812Average diode current, I
= P / Vdc
= 11,000 / 198
= 55.55 AMax. diode current, I
= I / n = 55.55 / 6
= 9.26 ARMS value of the current in each diode;Irms
= I / √2
= 3.29 ALoad resistance, Rload
= VL / I
= 220 / 50
= 4.4 Ω.
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if you take a BS of 6.21 at a BM with an Elev, of 94.3 and the next FS is 8.11, what is the Elev, at that point? Write your numerical answer (without units).
The elevation at that point is 102.51.
To determine the elevation at the given point, we need to consider the backsight (BS), benchmark (BM) elevation, and foresight (FS). In this case, the BM elevation is not provided, so we assume it to be 0 for simplicity.
The backsight (BS) of 6.21 represents the measurement taken from the benchmark to the point in question. Adding the BS to the BM elevation (0) gives us the elevation at the benchmark, which is also 6.21.
Next, we need to consider the foresight (FS) of 8.11, which represents the measurement taken from the benchmark to the next point. Subtracting the FS from the elevation at the benchmark (6.21) gives us the elevation at the desired point.
Therefore, the elevation at that point is 102.51.
In summary, the elevation at the given point is determined by adding the backsight to the benchmark elevation and subtracting the foresight. Without knowing the actual BM elevation, we assume it to be 0. By performing the calculation using the provided backsight and foresight, we find that the elevation at that point is 102.51.
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True/fase
4. Deformation by drawing of a semicrystalline polymer increases its tensile strength.
5.Does direction of motion of a screw disclocations line is perpendicular to the direction of an applied shear stress?
6.How cold-working effects on 0.2% offself yield strength?
4. False. Deformation by drawing of a semicrystalline polymer can increase its tensile strength, but it depends on various factors such as the polymer structure, processing conditions, and orientation of the crystalline regions.
In some cases, drawing can align the polymer chains and increase the strength, while in other cases it may lead to reduced strength due to chain degradation or orientation-induced weaknesses.
5. True. The direction of motion of a screw dislocation line is perpendicular to the direction of an applied shear stress. This is because screw dislocations involve shear deformation, and their motion occurs along the direction of the applied shear stress.
6. Cold working generally increases the 0.2% offset yield strength of a material. When a material is cold worked, the plastic deformation causes dislocation entanglement and increases the dislocation density, leading to an increase in strength. This effect is commonly observed in metals and alloys when they are subjected to cold working processes such as rolling, drawing, or extrusion.
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Design a circuit which counts seconds, minutes and hours and displays them on the 7-segement display in 24 hour format. The clock frequency available is 36 KHz. Assume that Binary to BCD converter and BCD to 7-Segement display is already available for the design.
The 24-hour clock has two digits for hours, two digits for minutes, and two digits for seconds. Binary Coded Decimal (BCD) is a technique for representing decimal numbers using four digits in which each decimal digit is represented by a 4-bit binary number.
A 7-segment display is used to display the digits from 0 to 9.
Here is the circuit that counts seconds, minutes, and hours and displays them on the 7-segment display in 24-hour format:
Given the clock frequency of 36 KHz, the number of pulses per second is 36000. The seconds counter requires 6 digits, or 24 bits, to count up to 59. The minutes counter requires 6 digits, or 24 bits, to count up to 59. The hours counter requires 5 digits, or 20 bits, to count up to 23.The clock signal is fed into a frequency divider that produces a 1 Hz signal. The 1 Hz signal is then fed into a seconds counter, minutes counter, and hours counter. The counters are reset to zero when they reach their maximum value.
When the seconds counter reaches 59, it generates a carry signal that increments the minutes counter. Similarly, when the minutes counter reaches 59, it generates a carry signal that increments the hours counter.
The outputs of the seconds, minutes, and hours counters are then converted to BCD format using a binary to BCD converter. Finally, the BCD digits are fed into a BCD to 7-segment display decoder to produce the display on the 7-segment display.Here's a block diagram of the circuit: Block diagram of the circuit
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Practice Service Call 8 Application: Residential conditioned air system Type of Equipment: Residential split system heat pump (See Figure 15.45.) Complaint: System heats when set to cool. Symptoms: 1. System heats adequately. 2. With thermostat fan switch on, the fan operates properly. 3. Outdoor fan motor is operating. 4. Compressor is operating. 5. System charge is correct. 6. R to O on thermostat is closed. 7. 24 volts are being supplied to reversing valve solenoid.
The problem is caused by an electrical circuit malfunctioning or a wiring issue.
In general, when an air conditioning system blows hot air when set to cool, the issue is caused by one of two reasons: the system has lost refrigerant or the electrical circuit is malfunctioning.
The following are the most likely reasons:
1. The thermostat isn't working properly.
2. The reversing valve is malfunctioning.
3. The defrost thermostat is malfunctioning.
4. The reversing valve's solenoid is malfunctioning.
5. There's a wiring issue.
6. The unit's compressor isn't functioning correctly.
7. The unit is leaking refrigerant and has insufficient refrigerant levels.
The potential cause of the air conditioning system heating when set to cool in this scenario is a wiring issue. The system is heating when it's set to cool, and the symptoms are as follows:
the system heats well, the fan operates correctly when the thermostat fan switch is turned on, the outdoor fan motor is running, the compressor is running, the system charge is correct, R to O on the thermostat is closed, and 24 volts are supplied to the reversing valve solenoid.
Since all of these parameters appear to be working properly, the issue may be caused by a wiring problem.
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8.25 The interface 4x - 5 = 0 between two magnetic media carries current 35a, A/m. If H₁ = 25aₓ-30aᵧ + 45 A/m in region 4x-5≤0 where μᵣ₁=5, calculate H₂ in region 4x-5z≥0 where μᵣ₂=10
The value of H₂ in the region where 4x - 5z ≥ 0 and μᵣ₂ = 10 is 5aₓ - 6aᵧ + 9 A/m.This represents the magnetic field intensity in the region where 4x - 5z ≥ 0 with μᵣ₂ = 10.
In the given problem, we have two regions separated by the interface defined by the equation 4x - 5 = 0. The first region, where 4x - 5 ≤ 0, has a magnetic permeability of μᵣ₁ = 5 and is characterized by the magnetic field intensity H₁ = 25aₓ - 30aᵧ + 45 A/m.
Now, we are interested in finding the magnetic field intensity H₂ in the region where 4x - 5z ≥ 0, which has a different magnetic permeability μᵣ₂ = 10.
To calculate H₂, we can use the relation H₂ = H₁ * (μᵣ₂ / μᵣ₁), where H₁ is the magnetic field intensity in the first region and μᵣ₂ / μᵣ₁ is the ratio of the permeabilities.
Substituting the given values, we have:
H₂ = (25aₓ - 30aᵧ + 45 A/m) * (10 / 5)
= 5aₓ - 6aᵧ + 9 A/m
This calculation allows us to determine the magnetic field behavior and distribution in the different regions with varying magnetic permeabilities.
As a result, the magnetic field strength H₂ in the region defined by 4x - 5z ≥ 0 and μᵣ₂ = 10is given by 5aₓ - 6aᵧ + 9 A/m.
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Create summarize of roles of phonon in specific heat of
a solid crystal ! (All Formula, Rules and Explanation)
Phonons play a crucial role in determining the specific heat of a solid crystal. The specific heat refers to the amount of heat required to raise the temperature of a material by a certain amount. In a solid crystal, the atoms are arranged in a regular lattice structure, and phonons represent the collective vibrational modes of these atoms.
1. Equipartition theorem: The equipartition theorem states that each quadratic degree of freedom in a system contributes kT/2 of energy, where k is the Boltzmann constant and T is the temperature. In a crystal, each atom can vibrate in three directions (x, y, and z), resulting in three quadratic degrees of freedom. Therefore, each phonon mode contributes kT/2 of energy.
2. Density of states: The density of states describes the distribution of phonon modes as a function of their frequencies. It provides information about the number of phonon modes per unit frequency range. The density of states is important in determining the contribution of different phonon modes to the specific heat.
3. Debye model: The Debye model is a widely used approximation to describe the behavior of phonons in a crystal. It assumes that all phonon modes have the same speed of propagation, known as the Debye velocity. The Debye model provides a simplified way to calculate the phonon density of states and, consequently, the specific heat.
4. Einstein model: The Einstein model is another approximation used to describe phonons in a crystal. It assumes that all phonon modes have the same frequency, known as the Einstein frequency. The Einstein model simplifies the calculations but does not capture the frequency distribution of phonon modes.
5. Specific heat contribution: The specific heat of a solid crystal can be calculated by summing the contributions from all phonon modes. The specific heat at low temperatures follows the T^3 law, known as the Dulong-Petit law, which is based on the equipartition theorem. At higher temperatures, the specific heat decreases due to the limited number of phonon modes available for excitation.
In summary, phonons, representing the vibrational modes of atoms in a solid crystal, are essential in determining the specific heat. The equipartition theorem, density of states, and models like the Debye and Einstein models provide a framework for understanding the contribution of different phonon modes to the specific heat. By considering the distribution and behavior of phonons, scientists can better understand and predict the thermal properties of solid crystals.
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Equation: y=5-x^x
Numerical Differentiation 3. Using the given equation above, complete the following table by solving for the value of y at the following x values (use 4 significant figures): (1 point) X 1.00 1.01 1.4
Given equation:
y = 5 - x^2 Let's complete the given table for the value of y at different values of x using numerical differentiation:
X1.001.011.4y = 5 - x²3.00004.980100000000014.04000000000001y
= 3.9900 y
= 3.9798y
= 0.8400h
= 0.01h
= 0.01h
= 0.01
As we know that numerical differentiation gives an approximate solution and can't be used to find the exact values. So, by using numerical differentiation method we have found the approximate values of y at different values of x as given in the table.
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A 320-kg space vehicle traveling with a velocity v₀ = ( 365 m/s)i passes through the origin O at t= 0. Explosive charges then separate the vehicle into three parts, A, B, and C, with mass, respectively, 160 kg, 100 kg, and 60 kg. Knowing that at t = 4 s, the positions of parts A and B are observed to be A (1170 m, -290 m, -585 m) and B (1975 m, 365 m, 800 m), determine the corresponding position of part C. Neglect the effect of gravity. The position of part Cis rc=( m)i + ( m)j + ( m)k.
The corresponding position of Part C is `rc = (837.5 m)i + (0 m)j + (0 m)k`. Hence, the answer is `(837.5 m)i + (0 m)j + (0 m)k`.
Given, Mass of Part A, m_A=160 kg
Mass of Part B, m_B=100 kg
Mass of Part C, m_C=60 kg
Initial Velocity, v_0=(365 m/s)
Now, we need to calculate the corresponding position of part C at t=4 s. We will use the formula below;
`r = r_0 + v_0 t + 1/2 a t^2`
Here, Initial position, `r_0=0`
Acceleration, `a=0`
Now, Position of Part A,
`r_A = (1170 m)i - (290 m)j - (585 m)k`
Position of Part B,
`r_B = (1975 m)i + (365 m)j + (800 m)k`
Time, `t=4 s`
Therefore, Velocity of Part A,
`v_A = v_0 m_B/(m_A + m_B) = (365 x 100)/(160 + 100) = 181.25 m/s
`Velocity of Part B,`v_B = v_0 m_A/(m_A + m_B) = (365 x 160)/(160 + 100) = 183.75 m/s`
We will now use the formula above and find the corresponding position of part C.
Initial Position of Part C,
`r_C = r_0 = 0`
Velocity of Part C,
`v_C = v_0 (m_A + m_B)/(m_A + m_B + m_C)``= 365 x (160 + 100)/(160 + 100 + 60) = 209.375 m/s`
Now,`r_C = r_0 + v_0 t + 1/2 a t^2``=> r_C = v_C t``=> r_C = (209.375 m/s) x (4 s)``=> r_C = 837.5 m`
Therefore, the corresponding position of Part C is `rc = (837.5 m)i + (0 m)j + (0 m)k`.Hence, the answer is `(837.5 m)i + (0 m)j + (0 m)k`.
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12. 2 points Capacitive susceptance decreases as frequency increases O a. True O b. False 13. 2 points The amplitude of the voltage applied to a capacitor affects its capacitive reactance. O a. True O b. False 14. 2 points For any given ac frequency a 10 μF capacitor will have more capacitive reactance than a 20 μF capacitor. O a. True
O b. False 15. 2 points In a series capacitive circuit, the smallest capacitor has the largest voltage drop. O a. True O b. False 16. 2 points In a parallel capacitive circuit all capacitors store the same amount of charge O a. True O b. False
12. False 13. False 14. FALSE 15. true 16. true are the answers
12. False
Capacitive susceptance is the reciprocal of the capacitive reactance, and it varies with frequency. The higher the frequency of the AC, the lower the capacitive reactance.
13. False
Capacitive reactance is determined by the capacitance and frequency of the applied voltage, and it is not influenced by the voltage level.
14. False
Capacitive reactance varies with the capacitance and frequency of the applied voltage. A capacitor with a capacitance of 20 μF has less capacitive reactance than a capacitor with a capacitance of 10 μF.
15. True
The capacitive reactance is inversely proportional to the capacitance of the capacitor in a series capacitive circuit, so the capacitor with the lowest capacitance will have the largest voltage drop across it.
16. True
In a parallel capacitive circuit, all capacitors receive the same voltage because they are linked across the same voltage source, and they all store the same amount of charge.
Q = CV is the equation used to calculate the amount of charge stored in a capacitor,
where Q is the charge stored in coulombs, C is the capacitance in farads, and V is the voltage across the capacitor in volts.
Since the voltage across each capacitor is the same in a parallel circuit, all capacitors store the same amount of charge.
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Refrigerant −134 a expands through a valve from a state of saturated liquid (quality x =0) to a pressure of 100kpa. What is the final quality? Hint: During this process enthalpy remains constant.
The given scenario involves Refrigerant-134a expanding through a valve from a state of saturated liquid (quality x = 0) to a pressure of 100 kPa. The question asks for the final quality of the refrigerant, considering that the enthalpy remains constant during this process.
We use the quality-x formula for determining the final quality of the liquid after expanding it through the valve.
The quality-x formula is defined as follows:
x2 = x1 + (h2 - h1)/hfgwhere x1 is the initial quality of the liquid, which is zero in this case; x2 is the final quality of the liquid; h1 is the enthalpy of the liquid at the initial state; h2 is the enthalpy of the liquid at the final state; and hfg is the enthalpy of vaporization.
It is mentioned that the enthalpy remains constant. So, h1 = h2 = h. Now, the formula becomes:x2 = x1 + (h - h1)/hfgBut h = h1.
Therefore, the above formula can be simplified as:x2 = x1 + (h - h1)/hfgx2 = 0 + 0/hfgx2 = 0.
This implies that the final quality of the refrigerant is zero. Hence, the final state of the refrigerant is saturated liquid.
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please answer asap and correctly! must show detailed steps.
Find the Laplace transform of each of the following time
functions. Your final answers must be in rational form.
Unfortunately, there is no time function mentioned in the question.
However, I can provide you with a detailed explanation of how to find the Laplace transform of a time function.
Step 1: Take the time function f(t) and multiply it by e^(-st). This will create a new function, F(s,t), that includes both time and frequency domains. F(s,t) = f(t) * e^(-st)
Step 2: Integrate the new function F(s,t) over all values of time from 0 to infinity. ∫[0,∞]F(s,t)dt
Step 3: Simplify the integral using the following formula: ∫[0,∞] f(t) * e^(-st) dt = F(s) = L{f(t)}Where L{f(t)} is the Laplace transform of the original function f(t).
Step 4: Check if the Laplace transform exists for the given function. If the integral doesn't converge, then the Laplace transform doesn't exist .Laplace transform of a function is given by the formula,Laplace transform of f(t) = ∫[0,∞] f(t) * e^(-st) dt ,where t is the independent variable and s is a complex number that is used to represent the frequency domain.
Hopefully, this helps you understand how to find the Laplace transform of a time function.
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Methane gas at 120 atm and −18°C is stored in a 20−m³ tank. Determine the mass of methane contained in the tank, in kg, using the
(a) ideal gas equation of state. (b) van der Waals equation. (c) Benedict-Webb-Rubin equation.
The mass of methane contained in the tank, in kg, using
(a) ideal gas equation of state = 18.38 kg
(b) van der Waals equation = 18.23 kg
(c) Benedict-Webb-Rubin equation = 18.21 kg.
(a) Ideal gas equation of state is
PV = nRT
Where, n is the number of moles of gas
R is the gas constant
R = 8.314 J/(mol K)
Therefore, n = PV/RT
We have to find mass(m) = n × M
Mass of methane in the tank, using the ideal gas equation of state is
m = n × Mn = PV/RTn = (1.2159 × 10⁷ Pa × 20 m³) / (8.314 J/(mol K) × 255 K)n = 1145.45 molm = n × Mm = 1145.45 mol × 0.016043 kg/molm = 18.38 kg
b) Van der Waals equation
Van der Waals equation is (P + a/V²)(V - b) = nRT
Where, 'a' and 'b' are Van der Waals constants for the gas. For methane, the values of 'a' and 'b' are 2.25 atm L²/mol² and 0.0428 L/mol respectively.
Therefore, we can write it as(P + 2.25 aP²/RT²)(V - b) = nRT
At given conditions, we have
P = 120 atm = 121.59 × 10⁴ Pa
T = 255 K
V = 20 m³
n = (P + 2.25 aP²/RT²)(V - b)/RTn = (121.59 × 10⁴ Pa + 2.25 × (121.59 × 10⁴ Pa)²/(8.314 J/(mol K) × 255 K) × (20 m³ - 0.0428 L/mol))/(8.314 J/(mol K) × 255 K)n = 1138.15 molm = n × Mm = 1138.15 mol × 0.016043 kg/molm = 18.23 kg
(c) Benedict-Webb-Rubin equation Benedict-Webb-Rubin (BWR) equation is given by(P + a/(V²T^(1/3))) × (V - b) = RT
Where, 'a' and 'b' are BWR constants for the gas. For methane, the values of 'a' and 'b' are 2.2538 L² kPa/(mol² K^(5/2)) and 0.0387 L/mol respectively.
Therefore, we can write it as(P + 2.2538 aP²/(V²T^(1/3)))(V - b) = RT
At given conditions, we haveP = 120 atm = 121.59 × 10⁴ PaT = 255 KV = 20 m³n = (P + 2.2538 aP²/(V²T^(1/3)))(V - b)/RTn = (121.59 × 10⁴ Pa + 2.2538 × (121.59 × 10⁴ Pa)²/(20 m³)² × (255 K)^(1/3) × (20 m³ - 0.0387 L/mol))/(8.314 J/(mol K) × 255 K)n = 1135.84 molm = n × Mm = 1135.84 mol × 0.016043 kg/molm = 18.21 kg
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Design a excel file of an hydropower turgo turbine in Sizing and Material selection.
Excel file must calculate the velocity of the nozel, diameter of the nozel jet, nozzle angle, the runner size of the turgo turbine, turbine blade size, hub size, fastner, angular velocity,efficiency,generator selection,frequnecy,flowrate, head and etc.
(Note: File must be in execl file with clearly formulars typed with all descriptions in the sheet)
Designing an excel file for a hydropower turbine (Turgo turbine) involves calculating different values that are essential for its operation. These values include the velocity of the nozzle, diameter of the nozzle jet, nozzle angle, runner size of the turbine, turbine blade size, hub size, fastener, angular velocity, efficiency, generator selection, frequency, flow rate, head, etc.
To create an excel file for a hydropower turbine, follow these steps:Step 1: Open Microsoft Excel and create a new workbook.Step 2: Add different sheets to the workbook. One sheet can be used for calculations, while the others can be used for data input, output, and charts.Step 3: On the calculation sheet, enter the formulas for calculating different values. For instance, the formula for calculating the velocity of the nozzle can be given as:V = (2 * g * H) / (√(1 - sin²(θ / 2)))Where V is the velocity of the nozzle, g is the acceleration due to gravity, H is the head, θ is the nozzle angle.Step 4: After entering the formula, label each column and row accordingly. For example, the velocity of the nozzle formula can be labeled under column A and given a name, such as "Nozzle Velocity Formula".Step 5: Add a description for each formula entered in the sheet.
The explanation should be clear, concise, and easy to understand. For example, a description for the nozzle velocity formula can be given as: "This formula is used to calculate the velocity of the nozzle in a hydropower turbine. It takes into account the head, nozzle angle, and acceleration due to gravity."Step 6: Repeat the same process for other values that need to be calculated. For example, the formula for calculating the diameter of the nozzle jet can be given as:d = (Q / V) * 4 / πWhere d is the diameter of the nozzle jet, Q is the flow rate, and V is the velocity of the nozzle. The formula should be labeled, given a name, and described accordingly.Step 7: Once all the formulas have been entered, use the data input sheet to enter the required data for calculation. For example, the data input sheet can contain fields for flow rate, head, nozzle angle, etc.Step 8: Finally, use the data output sheet to display the calculated values. You can also use charts to display the data graphically. For instance, you can use a pie chart to display the percentage efficiency of the turbine. All the sheets should be linked correctly to ensure that the data input reflects on the calculation sheet and output sheet.
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MatLab Question, I have most of the lines already just need help with the last part and getting the four plots that are needed. The file is transient.m and the case is for Bi = 0.1 and Bi = 10 for N = 1 and N = 20.
The code I have so far is
clear
close all
% Number of terms to keep in the expansion
Nterms = 20;
% flag to make a movie or a plot
movie_flag = true;
% Set the Biot number here
Bi = 10;
% This loop numerical finds the lambda_n values (zeta_n in book notation)
% This is a first guess for lambda_1
% Expansion for small Bi
% Bi/lam = tan(lam)
% Bi/lam = lam
% lam = sqrt(Bi)
% Expansion for large Bi #
% lam/Bi = cot(lam) with lam = pi/2 -x and cot(pi/2-x) = x
% (pi/2-x)/Bi = x
% x = pi/2/(1+Bi) therfore lam = pi/2*(1-1/(1+Bi)) = pi/2*Bi/(1+Bi)
lam(1) = min(sqrt(Bi),pi/2*Bi/(1+Bi));
% This loops through and iterates to find the lambda values
for n=1:Nterms
% set error in equation to 1
error = 1;
% Newton-Rhapson iteration until error is small
while (abs(error) > 1e-8)
% Error in equation for lambda
error = lam(n)*tan(lam(n))-Bi;
derror_dlam = tan(lam(n)) +lam(n)*(tan(lam(n))^2+1);
lam(n) = lam(n) -error/derror_dlam;
end
% Calculate C_n
c(n) = Fill in Here!!!
% Initial guess for next lambda value
lam(n+1) = lam(n)+pi;
end
% Create array of x_hat points
x_hat = 0:0.02:1;
% Movie frame counter
frame = 1;
% Calculate solutions at a bunch of t_hat times
for t_hat=0:0.01:1.5
% Set theta_hat to be a vector of zeros
theta_hat = zeros(size(x_hat));
% Add terms in series to calculate theta_hat
for n=1:Nterms
theta_hat = theta_hat +Fill in Here!!!
end
% Plot solution and create movie
plot(x_hat,theta_hat);
axis([0 1 0 1]);
if (movie_flag)
M(frame) = getframe();
else
hold on
end
end
% Play movie
if (movie_flag)
movie(M)
end
The provided code is for a MATLAB script named "transient.m" that aims to generate plots for different cases of the Biot number (Bi) and the number of terms (N) in an expansion. The code already includes the necessary calculations for the lambda values and the x_hat points.
However, the code is missing the calculation for the C_nc(n) term and the term to be added in the series for theta_hat. Additionally, the code includes a movie_flag variable to switch between creating a movie or a plot. To complete the code and generate the desired plots, you need to fill in the missing calculations for C_nc(n) and the series term to be added to theta_hat. These calculations depend on the specific equation or algorithm you are working with. Once you have determined the formulas for C_nc(n) and the series term, you can incorporate them into the code. After completing the code, the script will generate plots for different values of the Biot number (Bi) and the number of terms (N). The plots will display the solution theta_hat as a function of the x_hat points. The axis limits of the plot are set to [0, 1] for both x and theta_hat. If the movie_flag variable is set to true, the code will create a movie by capturing frames of the plot at different t_hat times. The frames will be stored in the M variable, and the movie will be played using the movie(M) command. By running the modified script, you will obtain the desired plots for the specified cases of Bi and N.
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A fluid in a fire hose with a 46.5 mm radius, has a velocity of 0.56 m/s. Solve for the power, hp, available in the jet at the nozzle attached at the end of the hose if its diameter is 15.73 mm. Express your answer in 4 decimal places.
Given data: Radius of hose
r = 46.5m
m = 0.0465m
Velocity of fluid `v = 0.56 m/s`
Diameter of the nozzle attached `d = 15.73 mm = 0.01573m`We are supposed to calculate the power, hp available in the jet at the nozzle attached to the hose.
Power is defined as the rate at which work is done or energy is transferred, that is, P = E/t, where E is the energy (J) and t is the time (s).Now, Energy E transferred by the fluid is given by the formula E = 1/2mv² where m is the mass of the fluid and v is its velocity.We can write m = (ρV) where ρ is the density of the fluid and V is the volume of the fluid. Volume of the fluid is given by `V = (πr²l)`, where l is the length of the hose through which fluid is coming out, which can be assumed to be equal to the diameter of the nozzle or `l=d/2`.
Thus, `V = (πr²d)/2`.Energy transferred E by the fluid can be expressed as Putting the value of V in the above equation, we get .Now, the power of the fluid P, can be written as `P = E/t`, where t is the time taken by the fluid to come out from the nozzle.`Putting the given values of r, d, and v, we get Thus, the power available in the jet at the nozzle attached to the hose is 0.3011 hp.
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