The coefficient of kinetic friction between block A and the tabletop is 0.336.
The weight of block A = 43.2 N
The weight of block B = 29.0 N
(a) The downward motion of block B is constant
(b) The acceleration of block B is -0.00069 m/s²
(a)
The net force acting on the block B will be,
F_net = T - f_fric = m_b × a
Where
T is the tension in the string,
f_fric is the frictional force acting on the block A,
m_b is the mass of block B and
a is the acceleration of block B.
Also,
T = m_b × g = 29.0 N
where g is the acceleration due to gravity.
And as the block is moving with constant velocity, the acceleration of block B is zero.
So, F_net = 0
T - f_fric = 0
f_fric = T
The frictional force f_fric can be expressed as
f_fric = μ_k × N
where N is the normal force.
The normal force on block A is the weight of block A + the weight of the cat,
so,
N = m_Ag + m_catg
The mass of the cat is also 43.2 N.
Thus, N = 43.2 N + 43.2 N = 86.4 N
Therefore,
μ_k × N = T
μ_k = T/N
μ_k = 29.0/86.4
μ_k = 0.336
The coefficient of kinetic friction between block A and the tabletop is 0.336.
(b)
The net force acting on the block B is F_net = T - f_fric
F_net = m_b × a
Where T is the tension in the string,
f_fric is the frictional force acting on the block A,
m_b is the mass of block B and
a is the acceleration of block B.
T = 29.0 N
f_fric = μ_k × N
f_fric = 0.336 × 86.4
f_fric = 29.02 N
F_net = T - f_fric
F_net = 29.0 - 29.02
F_net = -0.02 N
Thus, F_net = m_b × a
-0.02 N = 29.0 N × a
a = -0.02/29.0
a = -0.00069 m/s²
The acceleration of block B is negative and it is slowing down.
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Station 1: Sierra is running in a school track
meet. She will need extra energy to complete
the race and her body systems need to work
together to help her get it. Cellular respiration
is the way our bodies get energy out of the food
we eat. Her body needs to make sure her cells
get enough oxygen for cellular respiration to
occur but removes the carbon dioxide that is
built up in this same process. Which body systems will work together to
maintain the energy Sierra needs?
Answer:
The body systems that work together to maintain the energy Sierra needs are;
The digestive system, the respiratory system, and the circulatory system
Explanation:
Cellular respiration in the body cells require oxygen to produce energy which are used by the muscles and other body cells. Carbon dioxide is also produced and is the build up of carbon dioxide has to be removed from the body as the by product of cellular respiration which is toxic at the cell level
Therefore, the body systems that work together to maintain the energy Sierra needs are;
The digestive system; Takes in the energy containing food and brakes them into chemicals that are transported to the cells for cellular respiration
The respiratory system; Takes in oxygen and removes carbon dioxide from the blood from and to the atmosphere
The circulatory system; Supplies food and oxygen from the digestive and respiratory system to the cells and transports produced carbon dioxide from the cells to the lungs from where it is passed out of the body by th respiratory system.
Solutes dissolve quicker in _________ water.
warm
cold
cool
which, if either, of the forces pictured as acting upon the rod in the diagram will produce a torque about an axis perpendicular to the plane of the diagram at the left end of the rod?
The force F2 will produce a torque about an axis perpendicular to the plane of the diagram at the left end of the rod.
To determine which force produces a torque about an axis perpendicular to the plane of the diagram at the left end of the rod, we need to consider the concept of torque and the position of the forces relative to the axis.
Torque is the rotational equivalent of force and is given by the equation: Torque = Force × Distance × sin(θ), where Force is the magnitude of the force, Distance is the perpendicular distance from the axis of rotation to the line of action of the force, and θ is the angle between the force and the lever arm.
In the given diagram, we have two forces acting on the rod, F1 and F2. The lever arm for each force is the distance from the left end of the rod to the line of action of the force.
For force, F1, the line of action passes through the left end of the rod. Therefore, the lever arm is zero, and sin(θ) is also zero since the angle between the force and the lever arm is 0 degrees. Consequently, the torque produced by force F1 is zero.
For force, F2, the line of action is not passing through the left end of the rod. The lever arm for force F2 is the perpendicular distance from the left end of the rod to the line of action of F2. Since this distance is non-zero and the angle between the force and the lever arm is non-zero, both the distance and sin(θ) are non-zero.
Therefore, the torque produced by force F2 is non-zero and will produce a torque about an axis perpendicular to the plane of the diagram at the left end of the rod.
Out of the two forces pictured, the only force F2 will produce a torque about an axis perpendicular to the plane of the diagram at the left end of the rod. Force F1 will not produce any torque since its line of action passes through the left end of the rod, resulting in a lever arm of zero.
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the power dissipated in a series rcl circuit is 65.0 w, and the current is 0.530 a. the circuit is at resonance. determine the voltage of the generator.
The voltage of the generator in the series RCL circuit at resonance is approximately 122.64 volts.
To determine the voltage of the generator in a series RCL circuit, we need to use the power and current values. In a series RCL circuit at resonance, the power dissipated is equal to the power supplied by the generator.
In this case:
Power dissipated (P) = 65.0 W
Current (I) = 0.530 A
The formula for power in an electrical circuit is:
P = VI
Where:
P is the power in watts
V is the voltage in volts
I is the current in amperes
Rearranging the formula to solve for voltage (V), we get:
V = P / I
Substituting the given values:
V = 65.0 W / 0.530 A
V ≈ 122.64 volts
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what is the volume of water in a 250 cylinder at 0.9999 density
The volume of water in the 250 mL cylinder is approximately 249.975 mL.
To calculate the volume of water, we multiply the density of water by the volume of the cylinder.
Given:
Density of water = 0.9999 g/mL
Volume of the cylinder = 250 mL
The formula for calculating the volume of a substance is:
Volume = Mass / Density
Since we are given the density and we want to find the volume, we rearrange the formula as:
Volume = Mass / Density
The mass can be obtained by multiplying the density by the volume:
Mass = Density * Volume
Substituting the given values:
Mass = 0.9999 g/mL * 250 mL
Simplifying, we get:
Mass = 249.975 g
Therefore, the volume of water in the 250 mL cylinder is approximately 249.975 mL.
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Compare the density of a 1,000,000 kg iceberg to that of a 10 g ice cube taken from the
iceberg. Explain your answer.
ANYONE ASAPP ITS SO IMPORTANT PLSSS
Answer:
The density of the 1,000,000 kg iceberg = The density of the 10 g iceberg
Explanation:
The given quantities of iceberg that will be the basis of the comparison of the densities of the iceberg;
The mass of the iceberg = 1,000,000 kg
The mass of the ice cube taken from the iceberg = 10 g
The density of a substance, is the measure of the mass of the substance per volume of the substance, it is a constant for the substance
[tex]Density = \dfrac{Mass}{Volume}[/tex]
For the iceberg, the density of the iceberg is the property that indicates the volume occupied by a given mass of the iceberg
Because of density, we can estimate that the volume occupied by a 1,000 kg iceberg is 10 times the volume occupied by a 100 kg iceberg
We can write
The density of the 100 kg iceberg = 100 kg/(x m³)
The density of the 1,000 kg iceberg = 1,000 kg/(10 × x m³) = 100 kg/(x m³)
Therefore, the density of the 100 kg iceberg = The density of the 1,000 kg iceberg
Similarly,
The density of the 1,000,000 kg iceberg = The density of the 10 g iceberg because the 10 g iceberg was obtained from the 1,000,000 kg iceberg, and therefore, they have the same density.
A 1036 nm film with an index of refraction n=2.62 is placed on the surface of glass n=1.52. Light (λ=520.0 nm) falls hits the perpendicular to the surface from air. You want to increase the thickness so the reflected light cancels. What is the minimum thickness of the film that you must add?
Answer:
[tex]55.64\ \text{nm}[/tex]
Explanation:
[tex]\lambda[/tex] = Wavelength falling on film = 520 nm
n = Refractive index of film = 2.62
T = Thickness of film
m = Order
We have the relation
[tex]2T=\dfrac{m\lambda}{n}\\\Rightarrow T=\dfrac{m\lambda}{2n}\\\Rightarrow T=\dfrac{m\times 520}{2\times 2.62}\\\Rightarrow T=99.24m[/tex]
The thickness should be greater than 1036 nm. This means [tex]m=11[/tex]
[tex]T=99.24\times 11=1091.64\ \text{nm}[/tex]
Thickness of the film to be added would be
[tex]\Delta T=1091.64-1036=55.64\ \text{nm}[/tex]
Thickness of the film to be added is [tex]55.64\ \text{nm}[/tex].
Answer:
Explanation:
The ray of light is passing from high refractive index medium to low refractive index medium so condition for cancellation of reflected light is as follows .
2μt = (2n+1) λ/2
where μ is refractive index of the medium , t is thickness , λ is wavelength of light and n is a integer .
Putting n = 10
2x 2.62 x t = 21 x 520 / 2 nm
5.24 t = 5460 nm
t = 1042 nm
Thickness required to be added
= 1042 - 1036 = 6 nm .
Find the Potential Difference across the 2 Ω resistor. Answer in units of V.
Image attached of circuit diagram, question needing help on is the second one in the picture. Thank you!!
(Please only answer if you know how to find the V I know what the current is already.)
The potential difference across the 2 Ω resistor is 2 V.
How to calculate the potential differenceThe potential difference across the 2 Ω resistor is equal to the current flowing through it multiplied by the resistance of the resistor. The current flowing through the circuit is 1 A, and the resistance of the 2 Ω resistor is 2 Ω.
Therefore, the potential difference across the 2 Ω resistor is:
= 1 A * 2 Ω = 2 V.
V = I * R
V = 1 A * 2 Ω
V = 2 V
Therefore, the potential difference across the 2 Ω resistor is 2 V.
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A uniform, solid disk with mass m and radius R is pivoted about a horizontal axis through its center. A small object of the same mass m is glued to the rim of the disk.
If the disk is released from rest with the small object at the end of a horizontal radius, find the angular speed when the small object is directly below the axis.
(Express your answer in terms of the variables m, R, and appropriate constants.)
The angular speed ω[tex]_{final}[/tex]when the small object is directly below the axis is 0. This means that the system comes to rest in that position.
To solve this problem, we can use the principle of conservation of angular momentum. When the small object is directly below the axis, the total angular momentum of the system remains constant.
The angular momentum L of an object is given by the formula:
L = Iω
where L is the angular momentum, I is the moment of inertia, and ω is the angular speed.
The moment of inertia of a solid disk rotating about an axis through its center is given by:
I_disk = (1/2) × m × R²
where m is the mass of the disk and R is the radius.
Similarly, the moment of inertia of a point mass m located at the rim of the disk is given by:
I_object = m × R²
The total moment of inertia of the system, when the small object is glued to the rim, is the sum of the moments of inertia of the disk and the object:
[tex]I_{total}[/tex] = I_disk + I_object
[tex]I_{total}[/tex]= (1/2) × m × R² + m × R²
[tex]I_{total}[/tex]= (3/2) × m × R²
Now, at the initial position, the angular momentum of the system is given by:
I[tex]_{total}[/tex] × ω[tex]_{initial}[/tex]= L[tex]_{initial}[/tex]
Since the disk is released from rest, ω_initial is 0.
When the small object is directly below the axis, the moment of inertia becomes:
I[tex]_{final}[/tex]= I[tex]_{disk}[/tex]
The angular momentum at this position is:
L[tex]_{final}[/tex]= I[tex]_{final}[/tex] × ω[tex]_{final}[/tex]
Since angular momentum is conserved, we can equate the initial and final angular momentum:
L[tex]_{initial}[/tex] = L[tex]_{initial}[/tex]
I[tex]_{total}[/tex] × ω[tex]_{initial}[/tex]= I[tex]_{final}[/tex] × ω[tex]_{final}[/tex]
Substituting the expressions for the moments of inertia and simplifying:
[(3/2) × m × R²] * 0 = (1/2) × m × R² × ω_final
Simplifying further:
0 = (1/2) * ω[tex]_{final}[/tex]
Therefore, we find that the angular speed ω_final when the small object is directly below the axis is 0. This means that the system comes to rest in that position.
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For a mass hanging from a spring, the maximum displacement the spring is stretched or compressed from its equilibrium position is its
Answer: The maximum displacement the spring is stretched or compressed from its equilibrium position is its AMPLITUDE.
Explanation:
In simple harmonic motion, the restoring force which pulls the oscillating body back towards its rest position is proportional in magnitude to the displacement of the body from the rest position.
The simple harmonic motion in terms of MASS AND SPRING, simple pendulum and loaded test tube is the motion or movement of a particle in a to and fro movement along a straight line under the influence of force.
Mass and spring: This means when a string of suspended mass, M, with initial level of the spring is at rest, the spring will start moving upward and downward due to the imbalance of the suspended mass.
The maximum displacement as the spring is stretched or compressed from its equilibrium position is its AMPLITUDE. This is measured in units of meter.
what matches ????????????????
Answer:
1st: Radiation
2nd: Conduction
3rd: Convection
Explanation:
I actually learned this before in school. Yay
a block has an initial speed of 8.0 m/s up an inclined plane that makes an angle of 32 ∘ with the horizontal. Ignoring friction, what is the block's speed after it has traveled 2.0 m?
The block's speed after it has traveled 2.0 m up the inclined plane, ignoring friction, is approximately 6.19 m/s.
To determine the block's speed after it has traveled 2.0 m up the inclined plane, we can use the principles of kinematics. We'll consider the initial speed, distance traveled, and the angle of the inclined plane.
Using the kinematic equation:
v^2 = u^2 + 2as
where v is the final velocity, u is the initial velocity, a is the acceleration, and s is the distance traveled.
Given that the initial speed (u) is 8.0 m/s and the distance traveled (s) is 2.0 m, we need to find the acceleration (a).
The component of gravity acting down the inclined plane is given by:
mg sin(θ)
where m is the mass of the block and θ is the angle of the inclined plane.
Since there is no friction, the net force along the incline is equal to the component of gravity acting down the incline:
ma = mg sin(θ)
Canceling out the mass (m) on both sides:
a = g sin(θ)
Using the known values of the angle of the inclined plane (θ = 32°) and the acceleration due to gravity (g = 9.8 m/s^2):
a = (9.8 m/s^2) sin(32°)
a ≈ 5.27 m/s^2
Now we can substitute the values into the kinematic equation:
v^2 = u^2 + 2as
v^2 = (8.0 m/s)^2 + 2(5.27 m/s^2)(2.0 m)
v^2 ≈ 64.0 m^2/s^2 + 21.08 m^2/s^2
v^2 ≈ 85.08 m^2/s^2
Taking the square root of both sides:
v ≈ √(85.08 m^2/s^2)
v ≈ 9.23 m/s
Therefore, the block's speed after it has traveled 2.0 m up the inclined plane, ignoring friction, is approximately 9.23 m/s.
The block's speed after it has traveled 2.0 m up the inclined plane, ignoring friction, is approximately 9.23 m/s. This calculation is based on the initial speed, distance traveled, and the angle of the inclined plane, using principles of kinematics.
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A train is moving with the velocity 10 m/s. It attains an acceleration of 4 m/s² after 5 seconds. Find the distance covered by the train in that time.
The train covers a distance of 100 meters in the given time.
To find the distance covered by the train in the given time, we can use the equations of motion.
S = ut + (1/2)at²
The equation S = ut + (1/2)at² is derived from the basic equations of motion. The first term (ut) represents the distance covered in the initial velocity u multiplied by time t. The second term (1/2)at² represents the distance covered due to the acceleration a during time t.
The initial velocity (u) of the train is 10 m/s, and the acceleration (a) is 4 m/s². We are given that this acceleration is attained after 5 seconds, so the time (t) is also 5 seconds. We need to find the distance covered (S).
Substituting the given values:
S = (10 m/s)(5 s) + (1/2)(4 m/s²)(5 s)²
S = 50 m + (1/2)(4 m/s²)(25 s²)
S = 50 m + 50 m
S = 100 m
It's important to note that the given problem assumes a constant acceleration throughout the entire time interval.
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8. how do you explain the decrease in wave speed in layer b?
The decrease in wave speed in layer B can be explained by the change in the properties of the medium through which the wave is propagating. Generally, the speed of a wave depends on the properties of the medium it is traveling through, such as the density and elasticity.
There are several factors that can lead to a decrease in wave speed in layer B:
Change in Density: If the density of the medium increases in layer B compared to layer A, it will result in a decrease in wave speed. This is because a denser medium tends to slow down the propagation of waves.
Change in Elasticity: If the elasticity (or stiffness) of the medium decreases in layer B compared to layer A, it can cause a decrease in wave speed. A less elastic medium offers more resistance to wave propagation, resulting in slower wave speed.
Change in Temperature: In some cases, temperature variations can affect the properties of the medium. For example, in the case of sound waves, as temperature increases, the speed of sound generally increases due to an increase in the elasticity and average kinetic energy of the molecules. Conversely, a decrease in temperature can lower the wave speed.
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a soccor ball is dropped from a height of h1 = 3.05 m above the ground. after it bounces, it only reaches a height h2 = 2.12 m above the ground. the soccor ball has mass m = 0.115 kg.
Part (a) What is the magnitude of the impulse , in kilogram meters per second, the soccer ball experienced during the bounce?
Part (b) If the soccer ball was in contact with the ground for , what was the magnitude of the constant force acting on it, in Newtons?
Part (c) How much energy, in joules, did the soccer ball transfer to the environment during the bounce
(a) The magnitude of the impulse experienced by the soccer ball during the bounce is 0.6923 kg·m/s, (b) the magnitude of the constant force acting on the soccer ball during the bounce is 13.846 N and (c) the soccer ball transferred approximately 12.026 joules of energy to the environment during the bounce.
What is energy and how is it measured?
Energy is a fundamental concept in physics that refers to the ability of a system to do work or cause a change. It is a scalar quantity and is associated with various forms, such as kinetic energy, potential energy, thermal energy, and others.
The SI unit of energy is the joule (J).
Part (a):
The magnitude of the impulse (J) experienced by the soccer ball during the bounce can be calculated using the equation:
J = Δp,
where Δp is the change in momentum.
The change in momentum is given by:
Δp = m * Δv,
where m is the mass of the soccer ball and Δv is the change in velocity.
The initial velocity of the soccer ball is zero as it is dropped from rest. The final velocity can be calculated using the equation for final velocity in free fall:
v² = u² + 2gh,
where v is the final velocity, u is the initial velocity (zero in this case), g is the acceleration due to gravity, and h is the height.
Calculating the final velocity:
v² = 0² + 2 * 9.8 m/s² * 2.12 m,
v ≈ 6.02 m/s.
Substituting the values into the equation for change in momentum:
Δp = m * (v - u),
Δp = 0.115 kg * (6.02 m/s - 0 m/s).
Calculating:
Δp ≈ 0.6923 kg·m/s.
Therefore, the magnitude of the impulse experienced by the soccer ball during the bounce is approximately 0.6923 kg·m/s.
Part (b):
The magnitude of the constant force (F) acting on the soccer ball can be calculated using the equation:
F = Δp / Δt,
where Δp is the change in momentum and Δt is the time interval.
Given that the soccer ball was in contact with the ground for Δt = 0.05 s, we can substitute the values into the equation:
F = 0.6923 kg·m/s / 0.05 s.
Calculating:
F = 13.846 N.
Therefore, the magnitude of the constant force acting on the soccer ball during the bounce is 13.846 N.
Part (c):
The energy transferred to the environment during the bounce can be calculated as the work done by the force of the ball on the ground.
The work done is given by:
W = F * d,
where F is the magnitude of the force and d is the distance over which the force acts.
In this case, the force acts over the distance between the initial and final heights, which is h₁ - h₂.
Substituting the values:
W = 13.846 N * (3.05 m - 2.12 m).
Calculating:
W ≈ 12.026 J.
Therefore, the soccer ball transferred approximately 12.026 joules of energy to the environment during the bounce.
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The energy used to move against the magnetic force is stored as (pick one: potential or kinetic)
A charge of +5.0 x 10-6 C is situated 0.2 meters away from another isolated charge of -3.0 x 10-6 C. What is the magnitude of the electric force that these charges exert on each other? Is this a repulsive or attractive force?
Answer:
since the charges are of different nature it's a attractive force
Explanation:
magnitude of force=
9*10^9*5*10^-6*3*10^-6/0.04
= 3.375N answer
Which human activity causes the most erosion?
А
building a bridge over a river
B
cutting down trees for lumber
С
building a dam in a stream
D
planting crops in a field
Answer:
B
Explanation:
Two charges, one with a charge of +10.0 x 10-6 C, the other with a charge of -3 x 10-6 C exert a force on each other with a magnitude of 1.7 Newtons on each other. Is this a repulsive or attractive force. What is the separation distance of these charges?
Answer:
b.
Explanation:
Answer:
Attractive force and r = 0.399 m
Explanation:
One charge is positive and the other charge is negative. Opposite charges attract, so there has to be a force that attracts between them.
q1 = 10.0 x 10^-6 C
q2 = -3 x 10^-6 C
F = 1.7 N
Plug those values into Coulomb's Law:
[tex]F = k\frac{q1q2}{r^{2} } \\1.7 = \frac{(9x10^{9})(10.0 x 10^{-6})(-3 x 10^{-6})}{r^{2} }[/tex]
Solve for r
r = 0.399 m
An ammeter measures that the current in a simple circuit is 0.22 amps. The circuit is connected to a 55V battery. What is the resistance in the circuit?
Answer: The resistance in the circuit is 250 ohms
Explanation:
According to Ohm's law:
[tex]V=IR[/tex]
where V = voltage = 55 V
I = current in Amperes = 0.22 A
R = Resistance = ?
Putting in the values we get:
[tex]55V=0.22A\times R[/tex]
[tex]R=250ohm[/tex]
Thus the resistance in the circuit is 250 ohms
What is the resistance (in kΩ) of a 5.00 ✕ 10² Ω, a 2.00 kΩ, and 3.50 kΩ resistor connected in series?
in kohms
The resistance of the circuit is 6.00 kΩ when resistor connected in series.
Resistance: It is the opposition to the flow of electric current. It is a measure of how much the resistor opposes the flow of electricity through it. Series: In a series circuit, the current that flows through each of the components is the same and the voltage across the circuit is the sum of the individual voltage drops. When we connect multiple resistors in series, we connect them end to end to create a single path for current flow. The total resistance of the series circuit is equal to the sum of the individual resistances. In this problem, three resistors are connected in series: a 5.00 * 10² Ω, a 2.00 kΩ, and a 3.50 kΩ resistor. We need to find the total resistance of the circuit. First, we need to convert the 5.00 * 10² Ω into kΩ by dividing by 1000. \frac{5.00 * 10² Ω }{ 1000 }= 0.5 kΩ
Now we can add up the resistances in kΩ to find the total resistance in kΩ.R(total) = 0.5 kΩ + 2.00 kΩ + 3.50 kΩR
(total) = 6.00 kΩ .Therefore, the resistance of the circuit is 6.00 kΩ.
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calculate the magnetic field strength (t) needed on the loop to create a maximum torque of 320 n⋅m if the loop is carrying 21 a.
The magnetic field strength needed on the square loop to create a maximum torque of 320 N·m is approximately 43.24 N/A.
To calculate the magnetic field strength needed to create a maximum torque on a square loop, we can use the formula:
Torque (T) = N × B × A × sinθ
Where:
T = Torque
N = Number of turns in the loop
B = Magnetic field strength
A = Area of the loop
θ = Angle between the magnetic field and the plane of the loop
In this case, we are given:
N = 185 turns
A = (20.0 cm)² = 0.04 m² (since the loop is square)
T = 320 N·m
θ = 90 degrees (since the torque is maximum)
Rearranging the formula, we can solve for B:
B = T / (N × A × sinθ)
Substituting the given values:
B = 320 N·m / (185 × 0.04 m² × sin(90°))
B = 320 N·m / (7.4 m²)
B ≈ 43.24 N/A
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The question is -
Calculate the magnetic field strength needed on a 185-turn square loop 20.0 cm on a side to create a maximum torque of 320 N·m, if the loop is carrying 21 A.
T?
a) Highest temperature and pressure in the cycle
b) amount of heat transferred,
c) thermal efficiency, and
d) mean effective pressure. Use constant specific heat approach - k=1.4, cp= 1.005 kJ/kg.K cv= 0.718 kJ/kg.K, R = 0.287 kJ/kg.K 10 points
For an otto cycle:
a) Highest temperature and pressure are 1000K and 2.5 MPa.
b) amount of heat transferred, 150.2 kJ/kg
c) thermal efficiency, 56.5%
d) mean effective pressure is 1.31 MPa.
How to solve for an otto cycle?Given:
Initial conditions T1 = 27C = 300K, P1 = 100 kPa = 100 × 10³ Pa, V1 = 500 cm³ = 500 × 10⁻⁶ m³
Compression ratio (r) = V1/V2 = 10
End of isentropic expansion T3 = 1000 K
Specific heat ratio (k) = 1.4
Specific heat at constant pressure (cp) = 1.005 kJ/kg.K = 1005 J/kg.K
Specific heat at constant volume (cv) = 0.718 kJ/kg.K = 718 J/kg.K
Gas constant (R) = 0.287 kJ/kg.K = 287 J/kg.K
a) Highest temperature and pressure in the cycle:
At the end of the isentropic compression (point 2), we use the relation T2 = T1 × (V1/V2)^(k-1)
⇒ T2 = 300 K × 10^(1.4-1) = 300 K × 10^0.4 = 509 K
The pressure at the end of the compression stroke (point 2) is given by P2 = P1 × (V1/V2)^k
⇒ P2 = 100 × 10³ Pa × 10^1.4 = 2.5 MPa
The maximum temperature T3 is given in the problem as 1000K.
The maximum pressure in the cycle is the pressure at point 2, P2 = 2.5 MPa.
b) Amount of heat transferred:
The heat input is during the constant volume process 2-3, given by Q_in = m × cv × (T3 - T2)
But we do not have the mass (m) of the gas, we can calculate the change in internal energy per unit mass as ΔU = cv × (T3 - T2) = 718 J/kg.K × (1000K - 509K) = 352.6 kJ/kg
The heat rejected is during the constant volume process 4-1, given by Q_out = m × cv × (T4 - T1)
Using the adiabatic process, we know that T4 = T1 × (V2/V1)^(k-1) = 300 K × 10^0.4 = 509 K
ΔU = cv × (T4 - T1) = 718 J/kg.K × (509K - 300K) = 150.2 kJ/kg
c) Thermal efficiency:
The thermal efficiency of an Otto cycle is given by η = 1 - 1/(r^(k-1))
⇒ η = 1 - 1/(10^0.4) = 0.565 or 56.5%
d) Mean effective pressure (mep):
The thermal efficiency can also be expressed as η = 1 - V2/V1 = mep/(P2 - P1)
⇒ mep = η × (P2 - P1) = 0.565 × (2.5 MPa - 100 kPa) = 1.31 MPa
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Complete question:
An Otto cycle with compression ratio of 10.The air is at 100 kPa,27C,and 500 cm prior to the compression stroke. Temperature at the end of isentropic expansion is 1000 K. Determine the followings
a) Highest temperature and pressure in the cycle b) amount of heat transferred, c) thermal efficiency, and d) mean effective pressure. Use constant specific heat approach - k=1.4, cp= 1.005 kJ/kg.K cv= 0.718 kJ/kg.K, R = 0.287 kJ/kg.K 10 points
What is a metallic bond?
Explain in like a simple way please
A common way to measure the distance to lightning is to start counting, one count per second, as soon as you see the flash. Stop counting when you hear the thunder and divide by five to get the distance in miles. Use this information to estimate the speed of sound in m/s. Show your work below. This will require some conversions.
Answer:
d = 1.07 mile
Explanation:
The rationale for this method is that the speed of light is much greater than the speed of sound, the definition of speed in uniform motion is
v = d / t
d = v t
the speed of sound is worth
v = 343 m / s
Therefore, the speed of sound must be multiplied by time to do this, all the units must be in the same system, as the distance in miles is requested
v = 343 m/s (1mile/1609 m) (3600s/1 h) = 343 (2.24) = 767.4 mile/h
v = 343 m / s (1 mile / 1609 m) = 0.213, mile/ s
If the measured time is t = 5s we multiply it by the speed
we substitute
d = 0.213 5
d = 1.07 mile
If you want to calculate the speed, this method in general is not widely used, since you must know the distance where the lightning occurred, which is relatively complicated.
Learning Goal: To understand the forces between a bar magnet and 1. a stationary charge, 2. a moving charge, and 3. a ferromagnetic object. A bar magnet oriented along the y axis can rotate about an axis parallel to the z axis. Its north pole initially points along j^.
Solution :
As the charge is stationary, hence
[tex]$F_m= qvB \sin \theta$[/tex]
[tex]$F_m=0$[/tex]
Hence, no torque at all.
When the charge is moving in positive x direction and the field will be in the negative y direction outside the bar, then :
[tex]$F = q(V \hat i \times B(- \hat j))$[/tex]
[tex]$= -qV B (\hat i \times \hat j)$[/tex]
[tex]$=qVB(- \hat k)$[/tex]
Hence, the force have direction [tex]$(- \hat k)$[/tex].
When instead of charge, an iron nail is used, then there will be induced magnetic field in the soft iron. The nature of the pole induced will be opposite near tot he bar. That is the north pole will be induced near the south pole and vice versa. That is why whichever be the pole of magnet closest to iron will be attracted by iron.
Consider a diffraction grating through which monochromatic light (of unknown wavelength) has a first-order maximum at 17.5°. At what angle, in degrees, does the diffraction grating produce a second-order maximum for the same light? Numeric : A numeric value is expected and not an expression. θ2 =
The angle at which the second-order maximum is produced in the diffraction grating is 36.97°.
Angle at which the first-order maximum is produced, θ₁ = 17.5°
The equation for the diffraction grating is given by,
nλ = 2d sinθ
Given that the same light is used for both diffraction grating procedures. The equation for wavelength can be given as,
λ = 2d sinθ/n
So, we can say that,
λ₁ = λ₂
2d sinθ₁/n₁ = 2d sinθ₂/n₂
sinθ₁/n₁ = sinθ₂/n₂
So,
sinθ₂ = n₂sinθ₁/n₁
sinθ₂ = 2 x sin(17.5)/1
sinθ₂ = 2 x 0.30071
sinθ₂ = 0.60142
Therefore, the angle at which the second-order maximum is produced is given by,
θ₂ = sin⁻¹(0.60142)
θ₂ = 36.97°
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Use part one of the fundamental theorem of calculus to find the derivative of the function.
f(x) =
0 5 + sec(5t)dt
x
Hint:
0
x
5 + sec(5t)
dt = −
x
0
5 + sec(5t)
dt
f '(x) =
Using the theorem of calculus the derived derivative of the function found is f(x) = ∫₀ˣ 5 + sec(5t) dt is f'(x) = -x^5 + sec(5t).
Using the first part of the Fundamental Theorem of Calculus, we can find the derivative of the function f(x) = ∫[0, x] (5 + sec(5t)) dt.
Let F(x) be the antiderivative of the integrand 5 + sec(5t) with respect to t. By evaluating the integral at the upper limit x and subtracting the value at the lower limit 0, we obtain F(x) - F(0).
To find the derivative of f(x), we differentiate both sides of the equation with respect to x. Using the chain rule, we have:
f'(x) = (d/dx)(F(x) - F(0))
Since F(0) is a constant, its derivative is zero. Therefore, the equation simplifies to:
f'(x) = d/dx (F(x)) = F'(x)
The derivative of F(x) is the original integrand, 5 + sec(5t). Therefore, the derivative of the function f(x) is:
f'(x) = 5 + sec(5t)
Hence, the derivative of f(x) is 5 + sec(5t).
The derivative of the function f(x) = ∫₀ˣ 5 + sec(5t) dt is f'(x) = -x^5 + sec(5t).
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Please help, I'm taking a test mlnkhjbgvfgcfgvhb
What is the motion of the particles in this kind of wave?
A) The particles will move up and down over large areas.
B) The particles will move up and down over small areas.
C) The particles will move side to side over small areas.
D) The particles will move side to side over large areas.
Answer:
I think its A
Explanation:
Not 100 percent sure tho but they do go up and down in big movements.
Initial velocity vector vA has a magnitude of 3. 00 meters per second and points 20. 0o north of east, while final velocity vector vB has a magnitude of 6. 00 meters per second and points 40. 0o south of east. Find the magnitude and the direction of the change in velocity vector Δv (which is the vector subtraction of the two vectors: final velocity vector minus initial velocity vector).
We are givenInitial velocity vector vA has a magnitude of 3.00 meters per second and points 20.0o north of east, while final velocity vector vB has a magnitude of 6.00 meters per second and points 40.0o south of east. We need to find the magnitude and the direction of the change in velocity vector Δv (which is the vector subtraction of the two vectors:
final velocity vector minus initial velocity vector).Let's solve the given problem:From the above figure, the direction of Δv is at an angle θ to the east of south:
[tex]θ = θ2 - θ1= 40.0 - (-20.0)= 60.0o[/tex]
Magnitude of the Δv: Let's use the Pythagorean theorem to find the magnitude of Δv. We have:[tex]$$|\Delta \vec{v}| = \sqrt{|\vec{v}_B|^2+|\vec{v}_A|^2-2|\vec{v}_A||\vec{v}_B|\cos(\theta)}$$[/tex]
Putting the given values in the above equation, we get
[tex]$$|\Delta \vec{v}| = \sqrt{(6.00)^2+(3.00)^2-2(6.00)(3.00)\cos(60.0)}$$$$|\Delta \vec{v}| = 3.10\ \text{m/s}$$[/tex]
So, the magnitude of the Δv is 3.10 m/s.Therefore, the magnitude and the direction of the change in velocity vector Δv is 3.10 m/s at an angle of 60.0o to the east of south.
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