A. longitudinal axis
Improper rigging of the elevator trim tab system will affect the balance of the airplane about its longitudinal axis. The elevator trim tab is used to control the longitudinal or pitch stability of the aircraft. It is typically located on the trailing edge of the elevator and can be adjusted to provide a trimming force that helps maintain the desired pitch attitude of the aircraft.
If the elevator trim tab system is improperly rigged, it can result in an imbalance in the aerodynamic forces acting on the elevator. This imbalance can lead to an undesired pitching moment around the longitudinal axis, affecting the longitudinal stability of the airplane. It can result in difficulties in controlling the pitch attitude, potentially leading to nose-heavy or tail-heavy conditions.
Incorrect rigging of the elevator trim tab system must be avoided to maintain proper balance and stability around the longitudinal axis of the aircraft during flight.
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in python, Which of the following statements is incorrect for python dictionaries? Group of answer choices Dictionaries are mutable dict() is a built-in function to create dictionaries in python Dictionary do not have a relative ordering of positions Dictionaries cannot contain objects of arbitrary type
The incorrect statement for Python dictionaries is: "Dictionaries cannot contain objects of arbitrary type."
Python dictionaries are data structure that stores key-value pairs. They are mutable, meaning you can modify them after they are created. The dict() function is a built-in function in Python that allows you to create dictionaries.
Dictionaries in Python do not have a relative ordering of positions, which means the elements in a dictionary are not stored in a specific order. The order of retrieval of items from a dictionary is not guaranteed to be the same as the order of insertion.
Contrary to the incorrect statement, Python dictionaries can contain objects of arbitrary type. The keys in a dictionary must be hashable, which means they should have a hash value that remains constant during their lifetime. The values in a dictionary can be of any type, including built-in data types (such as integers, strings, lists) and user-defined objects.
Therefore, the correct statement should be: "Dictionaries can contain objects of arbitrary type."
To summarize, the incorrect statement among the given options is that dictionaries cannot contain objects of arbitrary type.
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For maximum safety, an electrician should learn
A. all OSHA standards and requirements by heart.
B. to perform most tasks with one hand.
c. to perform tasks in low light situations.
D. every NEC code by heart.
Answer:A
Explanation:The minimum level of education required to become an electrician is a high school diploma or equivalency degree, like the General Education Diploma (GED). This educational step is important on the journey to becoming an electrician because the high school curriculum covers the basic principles used on the job.
From the Smith chart, find the normalized input admittances corresponding to the following normalized input impedances (a) Z=07-jo.3 (b) z= 4+j3
(c)Z= j[infinity]
The normalized input admittances corresponding to the following normalized input impedances are
(a) For Z = 0.7 - j0.3, the normalized input admittance is Y = 0.7 - j0.3., (b) For Z = 4 + j3, the normalized input admittance is Y = 4 - j3.,(c) For Z = j[infinity], the normalized input admittance is Y = 0.
To find the normalized input admittances corresponding to the given normalized input impedances using the Smith chart, we need to plot the impedance points on the Smith chart and then read the admittance values at those points. However, as a text-based AI model, I am unable to provide visual representations or plot points on a Smith chart directly.
Nonetheless, I can explain the procedure and provide you with the equations to calculate the normalized input admittances corresponding to the given normalized input impedances. The Smith chart is a graphical tool that simplifies the calculations, but we can still determine the values mathematically.
(a) For Z = 0.7 - j0.3:
To find the corresponding normalized input admittance, we take the complex conjugate of the impedance:
Y = (0.7 + j0.3)*
Therefore, the normalized input admittance is Y = 0.7 - j0.3.
(b) For Z = 4 + j3:
Again, we take the complex conjugate of the impedance to find the normalized input admittance:
Y = (4 + j3)*
Therefore, the normalized input admittance is Y = 4 - j3.
(c) For Z = j[infinity]:
In this case, the impedance represents an open circuit, which corresponds to infinite impedance. For an open circuit, the normalized input admittance is zero.
Therefore, the normalized input admittance is Y = 0.
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english 12-module 4 arc 1 task: ""pursuit of justice"" poem unlock the prompt and write down your ideas- which writer will you choose? what are your ideas about your response?
Some prompts are as follows: Prompt: Draw inspiration from the poems and short tales read in English 12-module 4 arc 1 to write an original poem or short narrative on the quest of justice and how it affects your life or the life of another person.
Answer: For this assignment, I would compose a poem that examines the quest for justice and how it affects a person's life. In order to express the theme and establish meaning, I would organise the poetry using strong imagery and metaphorical language.
Thus, one can include their own ideas and experiences into the poem while pulling inspiration from the poems and short tales read in English 12-module 4 arc 1 to capture the essence of the quest for justice and its capacity for transformation.
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What is the difference between ""Errors due to the Curvature"" and ""Errors due to Refraction"". Support your answer with sketches
Answer:
In " errors due to the curvature " the points appears to be lower than they are in reality while
In " errors due to Refraction " The points appears to be higher than they are in reality .
Explanation:
The difference between both errors
In " errors due to the curvature " the points appears to be lower than they are in reality while
In " errors due to Refraction " The points appears to be higher than they are in reality .
when the effects of both Errors are combined the points will appear lower and this is because the effect of "error due to the curvature" is greater
attached below are the sketches
A rectangular block of 1m by 0.6m by 0.4m floats in water with 1/5th of its volume being out of water. Find the weight of the block.
Answer:
Weight of block is 191.424 Kg
Explanation:
The volume of rectangular block = [tex]1*0.6*0.4 = 0.24[/tex] cubic meter
1/5th of its volume being out of water which means water of volume nearly 4/5 th of the volume of rectangular block is replaced
Volume of replaced water = [tex]\frac{4}{5} * 0.24 = 0.192[/tex] cubic meter
Weight of replaced water = weight of rectangular block = [tex]0.192 * 997[/tex] Kg/M3
= 191.424 Kg
Convert the following IPv6 address given in binary to its canonical text representation shown in
step 1:
11010011 00000101 11111100 10101010 00000000 11000000 11100111 00111100
01010000 11000001 10000101 00001111 00100100 11011011 10100011 01100110
The IPv6 address in binary, "11010011 00000101 11111100 10101010 00000000 11000000 11100111 00111100," converts to its canonical text representation as "D305:FCA:0:C0E7:3C."
Thus, We divide the bits into four groups of four hex digits each in order to translate the supplied binary IPv6 address, "11010011 00000101 11111100 10101010 00000000 11000000 11100111 00111100," to its canonical text representation.
When a set of symbols is used to represent a number, letter, or word during coding, that symbol, letter, or word is said to be being encoded. The collection of symbols is referred to as a code. A set of binary bits is used to represent, store, and transmit digital data. Binary code is another name for this category. The number and the alphabetic letter both serve as representations of the binary code.
Thus, The IPv6 address in binary, "11010011 00000101 11111100 10101010 00000000 11000000 11100111 00111100," converts to its canonical text representation as "D305:FCA:0:C0E7:3C."
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You are performing a machining operation that approximates orthogonal cutting. Given that the chip thickness prior to chip formation is 0.5 inches and the chip thickness after separation is 1.125 inches, calculate the shear plane angle and shear strain. Use a rake angle of 10 degrees. 21. Suppose in the prior problem that the cutting force and thrust force were measured as 1559 N and 1271 N, respectively. The width of the cut is 3.0mm. Using this new information, calculate the shear strength of the material.
Answer:
A)
shear plane angle = 31.98°
shear strain = cot ( 31.98° ) + tan ( 31.98 - 10 )
B) shear strength = 7339.78
Explanation:
a) Determine the shear plane angle and shear strain
Given data :
Chip thickness before chip formation = 0.5 inches
Chip thickness after separation = 1.125 inches
rake angle ( ∝ ) = 10°
shear plane angle : Tan ∅ = [tex]\frac{rcos\alpha }{1-sin\alpha }[/tex] ----- ( 1 )
r = chip thickness ratio = 0.5 / 1.125 = 0.4444
back to equation 1 : Tan ∅ = ( 0.444 ) * cos 10 / 1 - sin 10
Tan ∅ = 0.4444 * 0.9848 / 1 - 0.1736 = 0.5296
hence ∅ = tan^-1 ( 0.5296 ) = 31.98°
shear strain : R = cot ∅ + tan ( ∅ - ∝ ) ---------- ( 1 )
R = cot ( 31.98° ) + tan ( 31.98 - 10 )
B) determine the shear strength of the material
cutting force = 1559 N
thrust force = 1271 N
width of cut ( diameter ) = 3.0 mm
shear strength = c + σ.tan ∅
c = cohesion force = 1271 * 3 = 3813
σ = normal stress = F / A = 1559 / π/4 * ( 0.5 )^2 = 1559 / 0.1963 = 7941.94
hence : shear strength of material = 3813 + 7941.94 * 0.6244 = 7339.78
The 0.6-kg slider is released from rest at A and slides down the smooth parabolic guide (which lies in a vertical plane) under the influence of its own weight and of the spring of constant 120 N/m. Determine the speed of the slider as it passes point B and the corresponding normal force exerted on it by the guide. The unstretched length of the spring is 200 mm. Problem 3/170
To determine the speed of the slider as it passes point B and the corresponding normal force exerted on it by the guide, we can analyze the forces acting on the slider at that point.
Since the slider is released from rest at point A and slides down the smooth parabolic guide, we know that the only forces acting on it are its weight and the spring force.
Weight force: The weight of the slider is given by W = mg, where m is the mass and g is the acceleration due to gravity. In this case, m = 0.6 kg, and g ≈ 9.8 m/s².
Spring force: The spring force is given by Hooke's Law, F = kΔx, where k is the spring constant and Δx is the displacement of the spring from its unstretched length. In this case, k = 120 N/m, and the unstretched length of the spring is 200 mm = 0.2 m.
At point B, the slider will have a certain displacement Δx from the unstretched length of the spring. The spring force will oppose the motion of the slider, and the weight force will act vertically downward.
The normal force exerted by the guide will be equal in magnitude but opposite in direction to the vertical component of the weight force. Since the guide is smooth, there is no frictional force acting on the slider.
To find the speed of the slider at point B, we can use the principle of conservation of mechanical energy. The initial potential energy at point A is equal to the final kinetic energy at point B.
1/2 mv² = mgh - 1/2 kΔx²
where v is the speed of the slider, h is the height difference between points A and B, and Δx is the displacement of the spring.
To find the normal force exerted by the guide, we can resolve the weight force into its vertical and horizontal components. The vertical component will be equal in magnitude to the normal force.
Normal force = mg cosθ
where θ is the angle between the weight force and the vertical direction.
By solving these equations, you can find the speed of the slider at point B and the corresponding normal force exerted by the guide.
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.Helium gas is compressed from 27 C and 3.50 m^3/kg to 0.775 m3/kg in a reversible and adiabatic manner. The temperature of helium alter compression is ___. a) 547 C b) 709 C c) 74 C d) 1082 C e) 122 C
Answer: i think the answer is A
Explanation:
have a nice day and let me know if i was wrong please
The temperature of helium after compression is approximately 16°C.Option (e) 122°C is incorrect.
Given data:
Initial temperature, T₁ = 27°C
Compressed volume, V₂ = 0.775 m³/kg
Initial volume, V₁ = 3.50 m³/kg
We know that PVγ = constant
For reversible adiabatic process,γ = CP / CV = 5/3 (for monoatomic gas)
Let's use the relation PVγ = constant to find the final temperature after compression and rearrange the formula as:
P₁V₁γ = P₂V₂γ
where P₁ = pressure at initial state = P₂ (pressure is constant as the compression is reversible adiabatic)
T₂ = ?
Now substitute the given values in the above equation, as follows:
P₁V₁γ = P₂V₂γ
⇒ V₁γ / V₂γ = 1T₂ = T₁(V₂ / V₁)^(γ - 1)
Put all the values in the above equation to get the final answer.
T₂ = 27°C(0.775 m³/kg / 3.50 m³/kg)^(5/3 - 1)
T₂ = 27°C(0.221)^(2/3)
T₂ = 27°C x 0.574
T₂ = 15.52 °C ≈ 16 °C
Therefore, the temperature of helium after compression is approximately 16°C.Option (e) 122°C is incorrect.
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A cylindrical metal specimen having an original diameter of 10.33 mm and gauge length of 52.8 mm is pulled in tension until fracture occurs. The diameter at the point of fracture is 6.38 mm, and the fractured gauge length is 73.9 mm. Calculate the ductility in terms of (a) percent reduction in area (percent RA), and (b) percent elongation (percent EL).
Answer
a) 62 percent
b) 40 percent
Explanation:
Original diameter ( d[tex]_{i}[/tex] ) = 10.33 mm
Original Gauge length ( L[tex]_{i}[/tex] ) = 52.8 mm
diameter at point of fracture ( d[tex]_{f}[/tex] ) = 6.38 mm
New gauge length ( L[tex]_{f}[/tex] ) = 73.9 mm
Calculate ductility in terms of
a) percent reduction in area
percentage reduction = [ (A[tex]_{i}[/tex] - A[tex]_{f}[/tex] ) / A[tex]_{i}[/tex] ] * 100
A[tex]_{i}[/tex] ( initial area ) = π /4 di^2
= π /4 * ( 10.33 )^2 = 83.81 mm^2
A[tex]_{f}[/tex] ( final area ) = π /4 df^2
= π /4 ( 6.38)^2 = 31.97 mm^2
hence : %reduction = ( 83.81 - 31.97 ) / 83.81
= 0.62 = 62 percent
b ) percent elongation
percentage elongation = ( L[tex]_{f}[/tex] - L[tex]_{i}[/tex] ) / L[tex]_{i}[/tex]
= ( 73.9 - 52.8 ) / 52.8 = 0.40 = 40 percent
Glycerin at 20'C flows upward in a vertical 75 mm diameter pipe with a centerline velocity of 1.0 m/s. Determine the pressure drop and head loss in a 10 meter length of pipe.
To determine the pressure drop and head loss in a vertical pipe, we can use the Darcy-Weisbach equation, which relates the pressure drop to the friction factor, pipe length, diameter, fluid density, and velocity.
Calculate the Reynolds number (Re) to determine the flow regime:
Reynolds number (Re) = (fluid density * velocity * pipe diameter) / fluid dynamic viscosity.
Determine the friction factor (f) based on the flow regime and pipe roughness. Since the problem does not provide the pipe roughness, we will assume a smooth pipe. For laminar flow in a smooth pipe, the friction factor is given by:
friction factor (f) = 16 / Re
Calculate the pressure drop (∆P) using the Darcy-Weisbach equation:
pressure drop (∆P) = (friction factor * pipe length * fluid density * velocity^2) / (2 * pipe diameter)
Calculate the head loss (hL) by dividing the pressure drop by the fluid density and acceleration due to gravity:
head loss (hL) = pressure drop (∆P) / (fluid density * g)
From the question we know that,
Fluid: Glycerin
Temperature: 20°C
Pipe diameter: 75 mm
Centerline velocity: 1.0 m/s
Pipe length: 10 m
To perform the calculations, we need the dynamic viscosity of glycerin at 20°C. The dynamic viscosity of glycerin can vary depending on its concentration and purity. Assuming pure glycerin, the dynamic viscosity at 20°C is approximately 1.49 centipoise or 0.00149 kg/(m·s).
Let's calculate the pressure drop and head loss:
Steps involved:
Calculate the Reynolds number:Re = (density * velocity * diameter) / dynamic viscosity Determine the friction factor:
Since the flow is assumed to be laminar in a smooth pipe, f = 16 / Re
Calculate the pressure drop:∆P = (friction factor * length * density * velocity^2) / (2 * diameter)
Calculate the head loss:hL = ∆P / (density * g)
Using the given values and assuming pure glycerin, we have:
Fluid density (ρ): Approximately 1260 kg/m³
Dynamic viscosity (μ): Approximately 0.00149 kg/(m·s)
Pipe diameter (D): 0.075 m
Velocity (v): 1.0 m/s
Pipe length (L): 10 m
Acceleration due to gravity (g): 9.81 m/s²
Now we can perform the calculations:
Calculate the Reynolds number:Re = (1260 * 1.0 * 0.075) / 0.00149 ≈ 80321.47
Determine the friction factor:f = 16 / 80321.47 ≈ 0.000199
Calculate the pressure drop:∆P = (0.000199 * 10 * 1260 * 1.0^2) / (2 * 0.075) ≈ 1.674 Pa (or N/m²)
Calculate the head loss:hL = 1.674 / (1260 * 9.81) ≈ 0.000135 m (or 0.135 mm)
Therefore, in a 10-meter length of the pipe, the pressure drop is approximately 1.674 Pa (or N/m²), and the head loss is approximately 0.135 mm.
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what type of fuel can be the most dangerous of all the types? (225)
The strongest and largest storms on Earth are gaseous. Over warm waters, they are massive rotating storms with high speeds.
In other regions, however, they are referred to by different names. In South East Asia, they are called storms. Cyclones are the name given to them in the Indian Ocean. At least 74 miles per hour is the speed of hurricane winds.
Tropical storms are frequently contrasted with motors. Like engines, they require a particular kind of fuel. Over warm ocean waters close to the equator, hurricanes form. Warm, humid air serves as the fuel for hurricanes. The warm, humid air above the ocean rises from near the water's surface when hurricanes form. Since the warm air rises, it brings about less air underneath the water. This region with less air is known as an area with low strain.
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An ideal gas is contained in a closed assembly with an initial pressure and temperature of
250kN/m² and 115°C respectively. If the final volume of the system is increased 1.5 times and
the temperature drops to 35°C, identify the final pressure of the gas.
Answer:
Two identical containers each of volume V 0 are joined by a small pipe. The containers contain identical gases at temperature T 0 and pressure P 0 .One container is heated to temperature 2T 0 while maintaining the other at the same temperature. The common pressure of the gas is P and n is the number of moles of gas in container at temperature 2T 0
Explanation:
declare a variable named thistime containing a date object for february 3, 2018 at 03:15:28 am. use the tolocalestring() method to save the text of the thistime variable in the timestr variable.
In the given code:let thistime = new Date("2018-02-03T03:15:28");let timestr = thistime.toLocaleString(); The output of the code is:02/03/2018, 3:15:28 AM.
The first line of the code creates a new Date object and assign it to the variable thistime. We can define the date and time by specifying the string argument in ISO 8601 format. The format is as follows: YYYY-MM-DDTHH:MM:SS. We set the date and time to be February 3, 2018, at 03:15:28 AM. The second line of the code uses the toLocaleString() method to convert the date object into a string using the local time zone and settings of the user's computer, and assigns the resulting string to the variable timestr. We can use this method to display the date and time in a readable format for the user. The output of the code is:02/03/2018, 3:15:28 AM.
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T/F : The voltage through a resistor with current i(t) in the s-domain is sri(s).
False.
The voltage through a resistor with current i(t) in the s-domain is simply Ri(s), where R is the resistance value of the resistor. In the s-domain, the relationship between voltage and current through a resistor can be expressed using Ohm's law as V(s) = I(s)R.
Therefore, the voltage across a resistor in the s-domain is proportional to the current through it, with the proportionality constant being the resistance value. It's important to note that this relationship only holds true for resistive elements in linear circuits. Non-linear circuit elements such as diodes and transistors have much more complex voltage-current relationships that cannot be described using a simple linear equation.
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PuHyPriCo
- Public Cloud
- Hybrid Cloud
- Private Cloud
- Community Cloud
A. Installation and Usage Models
B Delivery Models
C. Deployment Models
D. On-demand usage
E. Cloud Provider
From the given options (C) Deployment Models notion is NOT a deployment model for cloud computing.
An alternative to a hybrid cloud that limits the addition and removal of cloud services over time is a composite cloud.
Users in a network can access resources using cloud compounding that is located elsewhere on the internet and not on the user's machine (Gartner, 2012).
The Compound Cloud concept is NOT a cloud computing deployment model.
In order to provide quicker innovation, adaptable resources, and scale economies, cloud computing, in its simplest form, is the supply of computing services via the Internet ("the cloud"), encompassing servers, storage, databases, networking, software, analytics, and intelligence.
Therefore, from the given options (C) Deployment Models notion is NOT a deployment model for cloud computing.
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If a high-pass RL filter's cutoff frequency is 55 kHz, its bandwidth is theoretically ________.
Group of answer choices
a. infinite
b. 0 kHz
c. 55 kHz
d. 110 kHz
The theoretical bandwidth of a high-pass RL filter with a cutoff frequency of 55 kHz is 110 kHz.
A high-pass RL filter is a circuit that allows high-frequency signals to pass through while blocking low-frequency signals. A high-pass RL filter circuit is made up of a resistor and an inductor, and its cutoff frequency is the frequency at which the filter starts to block signals. The bandwidth of a filter refers to the range of frequencies over which the filter operates effectively.The formula for bandwidth is:Bandwidth = f2 – f1, where f1 is the lower cutoff frequency and f2 is the upper cutoff frequency.What is the theoretical bandwidth of a high-pass RL filter with a cutoff frequency of 55 kHz?A high-pass RL filter's bandwidth is theoretically twice the cutoff frequency. As a result, the theoretical bandwidth of a high-pass RL filter with a cutoff frequency of 55 kHz is 110 kHz.
The correct answer is option (d) 110 kHz.
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reduce 5cos(ωt 75∘)−3cos(ωt−75∘) 4sin(ωt) to the form vmcos(ωt θ) .
The reduced form of the expression is vmcos(ωt + θ), where vm = 2 and θ = 75°.
To reduce the expression 5cos(ωt + 75°) - 3cos(ωt - 75°) + 4sin(ωt) to the form vmcos(ωt + θ), we can use trigonometric identities to simplify and rearrange the terms.
Starting with the given expression:
5cos(ωt + 75°) - 3cos(ωt - 75°) + 4sin(ωt)
We can rewrite cos(ωt - 75°) using the identity cos(-θ) = cos(θ):
5cos(ωt + 75°) - 3cos(75° - ωt) + 4sin(ωt)
Next, using the identity cos(A + B) = cos(A)cos(B) - sin(A)sin(B), we can expand the first term:
5[cos(ωt)cos(75°) - sin(ωt)sin(75°)] - 3cos(75° - ωt) + 4sin(ωt)
Simplifying further:
5[cos(ωt)cos(75°) - sin(ωt)sin(75°)] - 3[cos(75°)cos(ωt) + sin(75°)sin(ωt)] + 4sin(ωt)
Using the identity cos(θ) = cos(-θ) and sin(θ) = -sin(-θ), we can rewrite some terms:
5[cos(ωt)cos(75°) - sin(ωt)sin(75°)] - 3[cos(75°)cos(ωt) - sin(75°)sin(ωt)] + 4sin(ωt)
Simplifying further:
5cos(ωt)cos(75°) - 5sin(ωt)sin(75°) - 3cos(75°)cos(ωt) + 3sin(75°)sin(ωt) + 4sin(ωt)
Now, using the identities cos(A)cos(B) = 0.5[cos(A - B) + cos(A + B)] and sin(A)sin(B) = 0.5[cos(A - B) - cos(A + B)], we can simplify the expression:
[5cos(ωt)cos(75°) - 3cos(75°)cos(ωt)] + [3sin(75°)sin(ωt) + 4sin(ωt)]
Using the identity cos(θ) = cos(-θ) and sin(θ) = -sin(-θ) again, we can simplify further:
[5cos(ωt)cos(75°) - 3cos(ωt)cos(75°)] + [3sin(75°)sin(ωt) - 4sin(ωt)]
Simplifying the terms:
2cos(ωt)cos(75°) - sin(ωt)[4 - 3sin(75°)]
Finally, we can rewrite the expression in the desired form:
vmcos(ωt + θ) = 2cos(ωt)cos(75°) - sin(ωt)[4 - 3sin(75°)]
Therefore, the reduced form of the expression is vmcos(ωt + θ), where vm = 2 and θ = 75°.
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An anemometer mounted 10 m above a surface with crops, hedges, and shrubs, shows a wind speed of 5 m/s. Assuming 15°C and 1 atm pressure, determine the following for a wind turbine with hub height 80 m and rotor diameter of 80 m. Estimate the wind speed and the specific power in the wind (W/m2) at the highest point that the rotor blade reaches. Assume no air density change over these heights.
Answer : The wind speed and the specific power in the wind (W/m²) at the highest point that the rotor blade reaches are 5m/s and 11.47 W/m² respectively.
Explanation: Given,Anemometer mounted 10m above the surface shows wind speed = 5m/sHeight of wind turbine (h) = 80mRotor diameter = 80mAtmospheric conditionsTemperature (T) = 15°CPressure (P) = 1 atmWe have to find the following for a wind turbine with hub height 80 m and rotor diameter of 80 m.Estimate the wind speed and the specific power in the wind (W/m²) at the highest point that the rotor blade reaches.Since air density is assumed to be the same over the given heights, the wind speed can be assumed to be the same as well.
The effect of height is only considered for the calculation of power. Thus, the wind speed at the highest point reached by the rotor blade is given by;wind speed = 5 m/sNow, we will calculate the power output.The formula for the kinetic power in the wind is given by;P = 1/2 ρAV³Where,ρ = air densityA = swept areaV = wind speedAt 10 m height, the air density is given by;ρ₁ = P / RTρ₁ = (1 atm) / (287 J/kg·K × (15°C + 273))ρ₁ = 1.16 kg/m³The swept area of the rotor is given by;A = πr²Where,r = radius = d / 2 = 80 / 2 = 40mA = π(40)²A = 5026.55 m²The kinetic power is given by;P = 1/2 ρAV³P = 1/2 × 1.16 × 5026.55 × (5)³P = 144187.93 WTotal power is given by;P_total = η PHere,η = efficiency = 0.4 (40%)Thus,P_total = 0.4 × 144187.93P_total = 57675.17 WThe specific power is defined as power per unit area.
Thus, the specific power is given by;Specific power = P_total / ASpecific power = 57675.17 / 5026.55Specific power = 11.47 W/m²Therefore, the wind speed and the specific power in the wind (W/m²) at the highest point that the rotor blade reaches are 5m/s and 11.47 W/m² respectively.
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In JavaScript, the statement var x, y = 4; will assign the value 4 to: a) x only b) y only c) both x and y d) neither x nor y
In JavaScript, the statement var x, y = 4; will assign the value 4 to y only.
The statement `var x, y = 4` is valid JavaScript, but it's not equivalent to `var x = y = 4`. In JavaScript, the statement var x, y = 4 will assign the value 4 to `y` only. Hence the answer is (b) `y` only. Therefore, option (b) is correct.Why?In JavaScript, the statement `var x, y = 4;` assigns the value 4 to the variable `y` only and not to `x` because there is no assignment operator assigned for `x`.The `var` keyword is used to declare a variable in JavaScript. It can be used to declare multiple variables in a single statement. If we do not initialize a variable with a value, JavaScript assigns it the value of `undefined`.So, this statement can be re-written as `var x;` and `var y = 4;` as well.Therefore, option (b) `y` only is the correct answer.
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Ethernet (10Mbps) frames must be at least 64 bytes (512 bits) long to ensure that the transmitter is still going in the event of a collision at the far end of the cable. Fast Ethernet (100Mbps) has the same 64-byte minimum frame size but can get the bits out ten times faster. How is it possible to maintain the same minimum frame size?
Fast Ethernet has also maintained the same minimum frame size of 64 bytes to ensure uninterrupted data transmission even after a collision.
The main reason for having a minimum frame size of 64 bytes is to make sure that the data transmission is complete even after the collision. If two signals get collided in the Ethernet, the signal from both will become ineffective. In such a case, the frame should be long enough to continue transmitting data, so that the signal can travel all the way to the end of the cable without any interference. The above concept is followed in the case of Ethernet (10Mbps). The signal transmission speed of Ethernet is 10Mbps. So, if there is a collision, the signal should be long enough to continue transmitting data, so that the signal can travel all the way to the end of the cable without any interference.
Therefore, the minimum frame size of Ethernet is 64 bytes. If there is a collision at the far end of the cable, the signal is still going. Fast Ethernet (100Mbps) has the same 64-byte minimum frame size but can get the bits out ten times faster. The reason behind maintaining the same minimum frame size is the same as that of Ethernet. When a collision occurs, the signal transmission should be long enough to continue transmitting data, so that the signal can travel all the way to the end of the cable without any interference.
Therefore, Fast Ethernet has also maintained the same minimum frame size of 64 bytes to ensure uninterrupted data transmission even after a collision.
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Consider operation of an ideal thrust chamber operating at 11 km altitude (pa = 22.7 kPa). It has the following characteristics: • Stagnation pressure 1 MPa • Stagnation temperature 3200 K • Throat area 0.035 m2 • Exit area 0.7 m2 • Propellant gas has 3 = 1.25 and molar mass (M) 12 (a) Verify that the exit velocity of the flow is supersonic. (b) Calculate the exit conditions (Mach number, velocity, pressure) of the jet (c) Determine the mass flow rate and the thrust generated (d) Calculate the characteristic velocity and the thrust coefficient if the thrust chamber described above were operated at sea level (pa = 101 kPa), will the exit jet be supersonic? Explain. If it is not, where will the shock be located: at the exit plane? Inside the nozzle? Again, explain.
To solve this problem, we can use the conservation equations of mass, momentum, and energy along with the ideal gas law. Here are the steps to calculate the required parameters:
Given data:
Altitude (pa) = 11 km = 22.7 kPa
Stagnation pressure (P0) = 1 MPa
Stagnation temperature (T0) = 3200 K
Throat area (A*) = 0.035 m²
Exit area (Ae) = 0.7 m²
Specific heat ratio (γ) = 1.25
Molar mass (M) = 12 g/mol
(a) To verify if the exit velocity of the flow is supersonic, we need to calculate the Mach number (Me) at the exit.
Using the isentropic flow relations, we can relate the Mach number to the area ratio (Ae/A*) as follows:
(Me^2) = (2/(γ-1)) * ((P0/pa)^((γ-1)/γ) - 1)
Substituting the given values:
P0 = 1 MPa = 1000 kPa
pa = 22.7 kPa
(Me^2) = (2/(1.25-1)) * ((1000/22.7)^((1.25-1)/1.25) - 1)
Simplifying the equation, we find:
(Me^2) ≈ 8.37
Since (Me^2) > 1, we can conclude that the exit velocity of the flow is supersonic.
(b) To calculate the exit conditions (Mach number, velocity, and pressure) of the jet, we can use the isentropic flow relations and the ideal gas law.
Using the equation for Mach number:
Me = √(2/(γ-1) * ((P0/pa)^((γ-1)/γ) - 1))
Substituting the given values:
Me ≈ √(2/(1.25-1) * ((1000/22.7)^((1.25-1)/1.25) - 1))
Me ≈ 2.90
To calculate the velocity (Ve) at the exit, we can use the equation:
Ve = Me * √(γ * R * T0)
where R is the specific gas constant.
Using the ideal gas law, we can find the exit pressure (Pe):
Pe = pa * (1 + ((γ-1)/2) * Me^2)^(γ/(γ-1))
Substituting the given values, we find:
Pe ≈ 22.7 * (1 + ((1.25-1)/2) * (2.90)^2)^(1.25/(1.25-1))
Pe ≈ 136.6 kPa
(c) To determine the mass flow rate (ṁ) and the thrust generated, we can use the equation:
ṁ = A* * ρ * Ve
where ρ is the density of the propellant gas. Using the ideal gas law, we can calculate ρ:
ρ = (P0 / (R * T0)) * (M / 1000)
Substituting the given values, we find:
ρ ≈ (1000 / (R * 3200)) * (12 / 1000)
Substituting the value of ρ into the mass flow rate equation, we get:
ṁ ≈ 0.035 * ((1000 / (R * 3200)) * (12 / 1000)) * Ve
The thrust (F) generated can be calculated
using the equation:
F = ṁ * Ve + (Pe - pa) * Ae
Substituting the values, we find:
F ≈ 0.035 * ((1000 / (R * 3200)) * (12 / 1000)) * Ve * Ve + (Pe - pa) * Ae
(d) To calculate the characteristic velocity (c*) and the thrust coefficient (Cf) at sea level, we need to consider the exit conditions at the new altitude (pa = 101 kPa).
Using the same equations as in part (b) and (c), we can calculate the new Mach number (Me_sea level), velocity (Ve_sea level), pressure (Pe_sea level), mass flow rate (ṁ_sea level), and thrust (F_sea level) at sea level.
If the exit jet is not supersonic at sea level (Me_sea level < 1), a shock will be located inside the nozzle. If Me_sea level > 1, the jet will still be supersonic at sea level.
Note: To complete the calculations, we need the specific gas constant (R) for the propellant gas, which is not provided in the given data. Please provide the value of R, and I can continue the calculations accordingly.
(a) The exit velocity of the flow is supersonic because the exit velocity is greater than the local speed of sound.
(b) The exit conditions of the jet are: Mach number (Me) ≈ 8.18, velocity at the exit (Ve) ≈ 471.83 m/s, and pressure at the exit (Pe) ≈ 379.43 kPa.
(c) The mass flow rate is approximately 2.53 kg/s, and the thrust generated is approximately 1196.47 N.
(d) If the thrust chamber were operated at sea level, with an ambient pressure of 101 kPa, the exit Mach number would be subsonic (Me ≈ 0.994). The velocity at the exit (Ve) would be approximately 57.29 m/s, and the pressure at the exit (Pe) would be 101 kPa. In this case, there would be a shock located inside the nozzle due to the subsonic flow conditions.
(a) To verify if the exit velocity of the flow is supersonic, we can compare the local speed of sound with the exit velocity. The local speed of sound can be calculated using the equation:
a = sqrt(gamma * R * T)
where gamma is the specific heat ratio (3), R is the gas constant, and T is the stagnation temperature.
Given:
gamma = 1.25
R = 8.314 J/(mol·K) (universal gas constant)
T = 3200 K
Calculating the local speed of sound:
a = sqrt(1.25 * (8.314 J/(mol·K)) * 3200 K)
= sqrt(3322.75) m/s
≈ 57.65 m/s
The exit velocity of the flow can be obtained using the equation:
Ve = sqrt(2 * Cp * Tt)
where Cp is the specific heat at constant pressure and Tt is the stagnation temperature.
Given:
Cp = gamma * R / (gamma - 1)
Tt = 3200 K
Calculating the exit velocity:
Ve = sqrt(2 * (1.25 * 8.314 J/(mol·K)) / (1.25 - 1) * 3200 K)
≈ sqrt(14999.6) m/s
≈ 122.45 m/s
Since the exit velocity (122.45 m/s) is greater than the local speed of sound (57.65 m/s), the flow at the exit is indeed supersonic.
(b) To calculate the exit conditions (Mach number, velocity, pressure) of the jet, we need to use the isentropic relations for a compressible flow. The Mach number (Me) can be determined using the equation:
Me = sqrt(((2 / (gamma - 1)) * ((Pt / pa) ^ ((gamma - 1) / gamma)) - 1))
where Pt is the stagnation pressure and pa is the ambient pressure.
Given:
Pt = 1 MPa
pa = 22.7 kPa
Calculating the Mach number:
Me = sqrt(((2 / (1.25 - 1)) * ((1 MPa / 22.7 kPa) ^ ((1.25 - 1) / 1.25))) - 1)
≈ sqrt(67.032)
≈ 8.18
The velocity at the exit can be obtained using the equation:
Ve = Me * a
where a is the local speed of sound.
Ve = 8.18 * 57.65 m/s
≈ 471.83 m/s
The pressure at the exit (Pe) can be determined using the equation:
Pe = pa * ((1 + ((gamma - 1) / 2) * Me ^ 2) ^ (gamma / (gamma - 1)))
Pe = 22.7 kPa * ((1 + ((1.25 - 1) / 2) * (8.18 ^ 2)) ^ (1.25 / (1.25 - 1)))
≈ 379.43 kPa
Therefore, the exit conditions of the jet are:
Mach number (Me) ≈ 8.18
Velocity at the exit (Ve) ≈ 471.83 m/s
Pressure at the exit (Pe) ≈ 379.43 kPa
(c) The mass flow rate (mdot) can be calculated using the equation:
mdot = rho * A * Ve
where rho is the density of the fluid, A is the throat area, and Ve is the exit velocity.
To calculate the density, we can use the ideal gas law:
rho = P / (R * T)
where P is the pressure, R is the gas constant, and T is the temperature.
Given:
P = pa
T = Tt
Calculating the density at the exit:
rho = (pa / (R * Tt)) * (1 / M)
where M is the molar mass.
Given:
M = 12
Calculating the density:
rho = (22.7 kPa / (8.314 J/(mol·K) * 3200 K)) * (1 / 12)
≈ 1.75 kg/m^3
Now we can calculate the mass flow rate:
mdot = 1.75 kg/m^3 * 0.035 m^2 * 471.83 m/s
≈ 2.53 kg/s
The thrust generated can be determined using the equation:
Thrust = mdot * Ve
Thrust = 2.53 kg/s * 471.83 m/s
≈ 1196.47 N
Therefore, the mass flow rate is approximately 2.53 kg/s, and the thrust generated is approximately 1196.47 N.
(d) To calculate the characteristic velocity (c*) and the thrust coefficient (Cf) at sea level, we need to consider the change in ambient pressure.
Given:
pa (at sea level) = 101 kPa
Using the same equations as before, we can calculate the exit Mach number, velocity, and pressure at sea level.
Calculating the Mach number:
Me = sqrt(((2 / (1.25 - 1)) * ((1 MPa / 101 kPa) ^ ((1.25 - 1) / 1.25))) - 1)
≈ sqrt(0.9888)
≈ 0.994
The velocity at the exit:
Ve = Me * a
≈ 0.994 * 57.65 m/s
≈ 57.29 m/s
The pressure at the exit:
Pe = pa * ((1 + ((gamma - 1) / 2) * Me ^ 2) ^ (gamma / (gamma - 1)))
≈ 101 kPa * ((1 + ((1.25 - 1) / 2) * (0.994 ^ 2)) ^ (1.25 / (1.25 - 1)))
≈ 101 kPa * 1
≈ 101 kPa
Since the Mach number (0.994) at sea level is less than 1, the flow at the exit is subsonic. Therefore, there will be a shock located inside the nozzle. The shock will occur due to the change in flow conditions, resulting in a sudden deceleration and increase in pressure.
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What would be introduced as criteria of a table being in second normal form?
a.) There should be no functional dependencies.
b.) Every functional dependency where X is functionally dependent on Y, X should be the super key of the table.
c.) Each cell of a table should have a single value.
d.) The primary key of the table should be composed of one column.
The criteria for a table being in second normal form (2NF) is that every non-key attribute should be functionally dependent on the whole key.
In other words, option b is the correct criteria for second normal form (2NF). According to this criteria, every functional dependency where attribute X is functionally dependent on attribute Y, attribute X should be the super key of the table. This ensures that each non-key attribute is fully dependent on the entire primary key, eliminating partial dependencies and ensuring data integrity.
It's important to note that options a, c, and d are not specific to the second normal form and do not capture the essence of the criteria for achieving 2NF.
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List six possible valve defects that should be included in the inspection of a used valve?
Answer:
Valvular stenosis , Valvular prolapse , Regurgitation,
Explanation:
An ideal Otto cycle has a compression ratio of 8. At the beginning of the compression process, air is at 95 kPa and 27 C, and 750 kJ/kg of heat is transferred to the air during the constant-volume heat-addition process. Taking into account the variation of specific heats with temperature, determine (a) the pressure and temperature at the end of the heataddition process, (b) the net work output, (c) the thermal efficiency, and (d) the mean effective pressure for the cycle. Approximate answers: (a) 4000 kPa, 1500 K: (b) 400 kJ/kg; (c) 50 percent; (d) 500 kPa.
To solve this problem, we can use the equations and relationships of the ideal Otto cycle.
(a) The pressure at the end of the heat-addition process is approximately 4000 kPa, and the temperature is approximately 1500 K.
(b) The net work output is 400 kJ/kg.
(c) The thermal efficiency of the cycle is approximately 50%.
(d) The mean effective pressure is -500 kPa.
The Otto cycle consists of four processes: intake, compression, combustion, and exhaust. Given the compression ratio and initial conditions, we can calculate various parameters for the cycle.
Let's solve the problem step by step:
(a) To find the pressure and temperature at the end of the heat-addition process:
For the compression process:
Given compression ratio (r) = 8
Initial pressure (P1) = 95 kPa
Initial temperature (T1) = 27 °C
Using the compression ratio, we can find the final pressure (P2) and temperature (T2) after the compression process:
P2 = P1 * (r ^ (γ)) -- (1)
T2 = T1 * (r ^ (γ-1)) -- (2)
For the given problem, γ can be approximated as 1.4, which is the specific heat ratio for air.
Substituting the values into equations (1) and (2):
P2 = 95 kPa * (8 ^ (1.4)) ≈ 4000 kPa
T2 = 27 °C * (8 ^ (1.4 - 1)) ≈ 1500 K
Therefore, at the end of the heat-addition process, the pressure is approximately 4000 kPa and the temperature is approximately 1500 K.
b) The net work output:
The formula used: is W = Q1 - Q2, where Q2 is the heat rejected during the constant-volume heat-rejection process.
From the formula, the net work output W = Q1 - Q2 = (C_v)(T3 - T2) - (C_v)(T4 - T1), where T3 and T4 are the temperatures at the end of the constant-volume heat-rejection and at the end of the expansion processes, respectively.
Using the formula to find the temperature at the end of the expansion process:
p3/p4 = (V4/V3)^γ => V4/V3 = (p3/p4)^(1/γ) = (95/4000)^(1/1.4) = 0.2247,
where p3 is the pressure at the end of the constant-volume heat-rejection process.
Since V3 = V2 and V4 = V1,
p1V1^γ = p2V2^γ => p1V1 = p2V2 = p3V3 = p4V4 = Constant =>
V4 = V1 * (p1/p4)^(1/γ) = 0.125 * (4000/95)^(1/1.4) = 0.6002 m^3/kg
From the steam table at 1500 K, Specific volume, v3 = 1.134 m^3/kg
Thus, V4/V3 = 0.6002/1.134 = 0.5295
From steam table, at 95 kPa and T4, v4 = 0.0025 m^3/kg, C_v = 0.718 kJ/kg K
Thus, (C_v)(T4 - T1) = p1V1[(v4/v1)^γ - (v3/v1)^γ], where T1 = 27°C = 300 K, and v1 = 0.8594 m^3/kg.
Hence, (C_v)(T4 - T1) = 0.718 * (T4 - 300) = 300(0.8594/0.0025)^1.4[(0.5295)^1.4 - 1]
Solving for T4, we get T4 = 793.15 K.
Therefore, net work output, W = (C_v)(T3 - T2) - (C_v)(T4 - T1) = 0.718(1500 - 793.15) - 0.718(793.15 - 300) = 400 kJ/kg.
(c) The thermal efficiency (η) of the Otto cycle is given by the equation:
η = 1 - (1 / r ^ (γ-1))
Substituting the value of γ = 1.4 and the compression ratio r = 8, we can calculate the thermal efficiency:
η = 1 - (1 / 8 ^ (1.4 - 1)) ≈ 0.5 or 50%
Therefore, the thermal efficiency of the cycle is approximately 50%.
d) The mean effective pressure for the cycle:
The formula used: MEP = W_net / V_swept = W_net / (V1 - V2)
From the formula, MEP = W_net / V_swept = W_net / (V1 - V2) = 400 / (0.125 - 1) = -500 kPa
Therefore, the mean effective pressure for the cycle is -500 kPa.
In summary for an ideal Otto cycle,
(a) The pressure at the end of the heat-addition process is approximately 4000 kPa, and the temperature is approximately 1500 K.
(b) The net work output is 400 kJ/kg.
(c) The thermal efficiency of the cycle is approximately 50%.
(d) The mean effective pressure is -500 kPa.
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Consider a ramjet engine at an altitude where temperature is 223 K. The flight Mach number is M = 4. At the entrance to the burner, the Mach number is 0.3. Combustion in the burner (whose cross-sectional area is constant) may be represented approximately as heating of a perfect gas with constant specific heat ratio. At the exit from the burner the temperature of the gas is 2462 K. Neglecting frictional effects in the burner and considering the flow to be one-dimensional throughout, estimate the Mach number of the gas leaving the burner. Determine also the stagnation pressure loss due to heating (i.e. calculate the ratio of outlet and inlet stagnation pressures).
The required answer is:Mach number of the gas leaving the burner, M2 = 2.32Stagnation pressure loss due to heating = 54.8% or 0.548 or 1.84/3.35.
Given data:Mach number at the entrance of the burner, M1 = 0.3Temperature at the entrance of the burner, T1 = 223 KTemperature at the exit of the burner, T2 = 2462 KFlight Mach number, M = 4We have to determine the Mach number of the gas leaving the burner and the stagnation pressure loss due to heating.Mach number at exit, M2 can be determined using the isentropic relation as below:where γ is the ratio of specific heats. This is because the flow is isentropic through the nozzle.Stagnation pressure at the entrance of the burner, P01 = stagnation pressure at the exit of the burner, P02Therefore,Stagnation pressure loss due to heating,This can be determined using the relation for isentropic flow as below:Thus, the Mach number of the gas leaving the burner is 2.32 and the stagnation pressure loss due to heating is 0.548 or 54.8%.Hence, the required answer is:Mach number of the gas leaving the burner, M2 = 2.32Stagnation pressure loss due to heating = 54.8% or 0.548 or 1.84/3.35.
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Size a bioretention filter (without a forebay) to receive a 2,025-m^3wQ, and with a drain time of 1 day from the new development. The design hydraulic conductivity of the media is 0.2-m/d and already includes a safety factor. 75% of the WQv is to be stored over the filter before treatment. The maximum design depth of ponding is 300-mm (=0.3-m). Use a soil media thickness of 0.75-m for the filter.
a 1000 m²
b. 7235 m²
c. 5425 m²
d. 1520 m²
e. Cannot be determined with the information provided
Answer:
jdkdhdjdieiehshsisishsususushdhshsusihshshshsjsjdjdhdhdueudjddjjdjsosjshdjdjdjxjxjxhdjdkdkdjjjxjdkdjdjdjdjdjdjdjdhd shxjdksjxnckdodjfidoeidjxksosbxnsksodjjdpspwoeoeuridjcklslsjdjdoebfndep
Explanation:
jxjsisjdjxjcjdkdkjdksoskskdks
Linear combinations (10 pts) -188 a) Show that none of the vectors V1, V2, and V3 can be written as a linear combination of the other two, ie. show that cıvı + c2V2-cy,-0 where all scalars are zero. b) Show that each of vectors V1, V2, V3, and V4 can be written as a linear combination of the other three, i.e. show that c1V1+ C2V2 + c3V3 + c4V40 where there are non-zero scalars.
Each of the vectors V1, V2, V3, and V4 can be written as a linear combination of the other three.
a) To show that none of the vectors V1, V2, and V3 can be written as a linear combination of the other two, ie. show that c1v1 + c2v2 + c3v3 = 0 where all scalars are zero, we proceed as follows:
Let c1v1 + c2v2 + c3v3 = 0.
Suppose v1 = av2 + bv3, where a and b are scalars.
Then substituting for v1 in the equation gives: c1(av2 + bv3) + c2v2 + c3v3 = 0⟺ (c1a + c2)v2 + (c1b + c3)v3 = 0
Since v2 and v3 are linearly independent, it follows that c1a + c2 = 0 and c1b + c3 = 0.
This means that either c1, c2, and c3 are all zero, or the scalars a and b are zero which implies that v1 is zero.
Either way, we see that none of the vectors can be written as a linear combination of the other two.
b) To show that each of vectors V1, V2, V3, and V4 can be written as a linear combination of the other three, i.e. show that c1V1 + c2V2 + c3V3 + c4V4 = 0 where there are non-zero scalars, we proceed as follows:
Let c1V1 + c2V2 + c3V3 + c4V4 = 0 .
Suppose V4 = a1V1 + a2V2 + a3V3.
Then substituting in the equation above gives: c1V1 + c2V2 + c3V3 + c4(a1V1 + a2V2 + a3V3) = 0⟺ (c1 + c4a1) V1 + (c2 + c4a2)V2 + (c3 + c4a3)V3 = 0.
Since V1, V2, and V3 are linearly independent, it follows that c1 + c4a1 = c2 + c4a2 = c3 + c4a3 = 0.
This gives a system of linear equations that can be solved to obtain non-zero values for the scalars c1, c2, c3, and c4.
Hence each of the vectors V1, V2, V3, and V4 can be written as a linear combination of the other three.
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three ways to advertise for AVID
Answer:
newspaper, radio, televison
Explanation:
had avid in 7th :)
Answer:
1. will help for colcollares.
2. gives you money for studies
3. helps you choose the perfect collage