The answer to the problem is option C) 4.8 times farther. When comparing the distances travelled while braking from 56 mi/h to rest and from 28 mi/h to rest, assuming equal rates of acceleration, the ratio of the distances travelled is 4.8:1.
To solve this problem, we can use the equation of motion:
[tex]\[v_f^2 = v_i^2 + 2a \cdot d\][/tex]
where [tex]\(v_f\)[/tex] is the final velocity, [tex]\(v_i\)[/tex] is the initial velocity, a is the acceleration, and d is the distance travelled.
In the first case, the initial velocity is 56 mi/h, the final velocity is 0 mi/h (rest), and we need to find the distance travelled. Let's denote it as [tex]\(d_1\)[/tex].
Plugging in the values into the equation of motion, we have:
[tex]\[0^2 = (56)^2 + 2a \cdot d_1\][/tex]
In the second case, the initial velocity is 28 mi/h, the final velocity is also 0 mi/h, and we need to find the distance travelled. Let's denote it as [tex]\(d_2\)[/tex].
Using the equation of motion, we have:
[tex]\[0^2 = (28)^2 + 2a \cdot d_2\][/tex]
Dividing the two equations, we get:
[tex]\[\frac{d_1}{d_2} = \frac{(56)^2 + 2a \cdot d_1}{(28)^2 + 2a \cdot d_2}\][/tex]
Simplifying this expression yields the ratio of distances traveled, which is approximately 4.8:1. Therefore, the answer is option C) 4.8 times farther.
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a proton is accelerated from rest through a potential difference Vo and gains a speed of vo. If it were accelerated instead through a potential difference of 2Vo, it would gain a speed:
A)8vo
B)4vo
C)2vo
D)vo (square root 2)
The correct answer is A) 8vo. If the proton were accelerated through a potential difference of 2Vo, it would gain a speed that is 8 times the speed gained through a potential difference of Vo.
The speed of a particle accelerated through a potential difference can be calculated using the equation:
v = √(2eV/m)
Where:
v = speed of the particle
e = elementary charge (charge of a proton)
V = potential difference
m = mass of the particle
Let's consider the first scenario, where the proton is accelerated through a potential difference of Vo. In this case, the speed gained by the proton is v.
Now, let's consider the second scenario, where the proton is accelerated through a potential difference of 2Vo. We need to find the speed gained in this case.
Using the same equation as before, we have:
v' = √(2e(2Vo)/m)
= √(4eVo/m)
v' = 2√(2eVo/m)
Comparing v' to v, we can see that v' is 2 times greater than v. Therefore, the speed gained by the proton when accelerated through a potential difference of 2Vo is 2v.
Now, we need to determine the ratio of the speeds in the two scenarios:
v'/v = (2v)/v
v'/v = 2
So, the speed gained by the proton when accelerated through a potential difference of 2Vo is twice the speed gained when accelerated through a potential difference of Vo.
Since vo represents the speed gained in the first scenario, the speed gained in the second scenario would be 2 times vo:
v' = 2vo
Therefore, the correct answer is A) 8vo.
If the proton were accelerated through a potential difference of 2Vo, it would gain a speed that is 8 times the speed gained through a potential difference of Vo.
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a small block is attached to an ideal spring and is moving in shm on a horizontal frictionless surface. the amplitude of the motion is 0.155 m. the maximum speed of the block is 3.70 m/s.
The magnitude of the maximum acceleration of the block is 14.3 m/s².
In simple harmonic motion (SHM), the acceleration of an object is given by the equation,
a = -ω²x, acceleration is a, angular frequency is ω, and displacement from the equilibrium position is x. The maximum magnitude of the acceleration occurs at the extreme points of the motion when the displacement is maximum (amplitude). At these points, the velocity of the block is zero.
Given that the amplitude of the motion is 0.155 m and the maximum speed of the block is 3.70 m/s, we can find the angular frequency (ω) using the relationship between velocity and angular frequency in SHM,
v = ω√(A² - x²), velocity is V, amplitude is A, and displacement is x. Plugging in the given values, we have,
3.70 m/s = ω√(0.155² - 0²)
Solving for ω,
ω = 3.70 m/s / 0.155 m
ω ≈ 23.87 rad/s
Now, to find the maximum magnitude of the acceleration, we substitute the values of ω and x into the acceleration equation,
a = -ω²x
a = -(23.87 rad/s)² * 0.155 m
a ≈ -14.3 m/s² (taking the magnitude)
Therefore, the maximum magnitude of the acceleration of the block is approximately 14.3 m/s².
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Complete question - a small block is attached to an ideal spring and is moving in SHM on a horizontal frictionless surface. the amplitude of the motion is 0.155 m. the maximum speed of the block is 3.70 m/s. What is the maximum magnitude of the acceleration of the block? Express your answer with the appropriate units.
if a fixed amount of gas is heated, then the volume will because the heat will cause the molecules of gas to move____
If a fixed amount of gas is heated, then the volume will increase because the heat will cause the molecules of gas to move faster and collide more frequently, resulting in an expansion of the gas.
When a gas is heated, its temperature increases, which corresponds to an increase in the average kinetic energy of the gas molecules. The increase in kinetic energy causes the molecules to move faster and with greater energy.
As the gas molecules move faster, they collide with each other and with the walls of the container more frequently and with greater force. These collisions exert pressure on the walls of the container, and if the container is flexible or has movable parts, the gas will expand to occupy a larger volume.
According to Charles's Law, which states that at constant pressure, the volume of a gas is directly proportional to its temperature, an increase in temperature leads to an increase in volume. This relationship can be explained by the increased kinetic energy and collisions of the gas molecules, resulting in the expansion of the gas.
Therefore, when a fixed amount of gas is heated, the volume will increase due to the increased molecular motion caused by the heat.
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a small power plant produces a voltage of [v] kv and current of [i] a. the voltage is stepped up to [w] kv by a transformer before it is transmitted to a substation. the resistance of the transmission line between the power plant and the substation is [r] .capital omega what percentage of the power produced at the power plant is lost in transmission to the substation?
Percentage of Power Loss = (Power Loss / P1) * 100
= ((v * i) - (w * i)) / (v * i) * 100.
Simplifying this expression gives us the percentage of power lost in transmission from the power plant to the substation.
To calculate the percentage of power lost in transmission from the power plant to the substation, we can use the formula:
Percentage of Power Loss = (Power Loss / Power Produced) * 100.
Power is given by the equation:
Power = Voltage * Current.
Let's denote the power produced at the power plant as P1, and the power received at the substation as P2.
The power produced at the power plant is given by:
P1 = (v * i) kW.
After stepping up the voltage by the transformer, the power at the substation can be calculated as:
P2 = (w * i) kW.
The power loss in transmission can be calculated as :
Power Loss = P1 - P2.
Now, substituting the values:
Power Loss = (v * i) - (w * i) kW.
Finally, we can calculate the percentage of power lost:
Percentage of Power Loss = (Power Loss / P1) * 100
= ((v * i) - (w * i)) / (v * i) * 100.
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why is the magnetic field most uniform when the distance between two coils is r
The magnetic field between two coils is most uniform when the distance between them is equal to the radius of the coils. This is because the magnetic field produced by a coil is strongest near its center and gradually decreases as you move away from it.
When the distance between the coils is equal to the radius, the coils are aligned in such a way that the center of one coil aligns with the center of the other. This alignment allows for a more symmetrical distribution of magnetic field lines between the coils.
At this specific distance, the magnetic field lines from each coil are parallel and in the same direction, resulting in a more uniform and consistent magnetic field between the coils.
This uniformity is desirable in applications where a homogeneous magnetic field is needed, such as in scientific experiments, medical imaging, or industrial processes.
If the distance between the coils is smaller than the radius, the magnetic field will be stronger near the coils' centers and gradually diminish as you move away from them.
On the other hand, if the distance between the coils is larger than the radius, the magnetic field will be weaker and less uniform between the coils.
Therefore, to achieve the most uniform magnetic field between two coils, it is optimal to have the distance between them equal to the radius of the coils.
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If a curve is banked to accommodate cars traveling at 15 m/s, what will happen during an ice storm (no friction with the road) to a car moving at a faster speed?
1-It will gradually slide down the bank.
2-It will continue to follow the curve as if there were no ice.
3-It will gradually slide up the bank.
4-It will quickly slide up the bank.
chose one
If a curve is banked to accommodate cars traveling at 15 m/s, It will gradually slide up the bank.
Hence the correct option is 3.
When a curve is banked, it is designed to provide a centripetal force that helps vehicles navigate the curve safely at a specific speed. In the absence of friction, such as during an ice storm, there is no lateral force acting on the car to counteract the car's tendency to continue in a straight line due to inertia.
As a result, the car will continue to move in a straight line and gradually slide up the bank of the curve. The lack of friction prevents the car from maintaining its intended trajectory along the banked curve, causing it to veer upwards.
This is because the horizontal component of the car's velocity cannot be balanced by friction, leading to an imbalance of forces and causing the car to slide in an upward direction.
Therefore, option 3 - "It will gradually slide up the bank" is the most accurate choice.
Hence the correct option is 3.
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a small coin, initially at rest, begins falling. if the clock starts when the coin begins to fall, what is the magnitude of the coin's displacement between 1=0.233 s and 2=0.621 s ?
The magnitude of the coin's displacement between 0.233 s and 0.621 s is determined by the equations of motion. Assuming uniform acceleration due to gravity, we can use the equation of motion to calculate the displacement.
When the coin falls, it experiences a constant acceleration due to gravity, which we can approximate as 9.8 m/s². The equation of motion for displacement under constant acceleration is given by:
[tex]\[ \text{displacement} = \text{initial velocity} \times \text{time} + \frac{1}{2} \times \text{acceleration} \times \text{time}^2 \][/tex]
Since the coin starts at rest, the initial velocity is zero. Plugging in the given values, we have:
[tex]\[ \text{displacement} = 0 \times 0.233 + \frac{1}{2} \times 9.8 \times (0.621 - 0.233)^2 \][/tex]
Simplifying this expression, we get:
[tex]\[ \text{displacement} = 0 + \frac{1}{2} \times 9.8 \times (0.388)^2 \][/tex]
[tex]\[ \text{displacement} = \frac{1}{2} \times 9.8 \times 0.150544 \][/tex]
[tex]\[ \text{displacement} = 0.7334 \, \text{m} \][/tex]
Therefore, the magnitude of the coin's displacement between 0.233 s and 0.621 s is approximately 0.7334 meters.
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: if the cable ab is unwound with a speed of 3m/s and the gear rack c has a speed of 1.5m/s determine the angular velocity of its center o.
The angular velocity of center O is ω = vC / OC where vC = 1.5 m/s and OC is the distance from point C to the IC.
To determine the angular velocity of the center of a gear rack, we can use the instantaneous center of zero velocity (IC) method. The IC is the point on the gear that has zero velocity at a given instant in time. For a gear rack, the IC is located at the point where the gear contacts the rack.
If we know the linear velocities of two points on the gear (or gear rack), we can use the IC method to determine its angular velocity. In this case, we know that cable AB is unwound with a speed of 3 m/s and that gear rack C has a speed of 1.5 m/s.
To determine the angular velocity of center O, we can follow these steps:
Draw a line perpendicular to cable AB at point B.
Draw a line perpendicular to gear rack C at point C.
The intersection of these two lines is the IC.
Draw a line from the IC to center O.
The angular velocity of center O is equal to the linear velocity of point C divided by the distance from point C to the IC.
Using this method, we can determine that the angular velocity of center O is:
ω = vC / OC
where vC = 1.5 m/s and OC is the distance from point C to the IC.
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how far from a converging lens with a focal length of 29 cmcm should an object be placed to produce a real image which is the same size as the object?
In this case, since the focal length of the lens is given as 29 cm, the object should be placed 2 * 29 cm = 58 cm away from the lens.
To produce a real image that is the same size as the object using a converging lens, the object should be placed at a distance equal to twice the focal length of the lens. In this case, since the focal length of the lens is given as 29 cm, the object should be placed 2 * 29 cm = 58 cm away from the lens.
When the object is placed at this specific distance, the converging lens will form a real image that is the same size as the object. The image will be formed on the opposite side of the lens and will be located at a distance of 58 cm from the lens.
This placement ensures that the rays of light coming from the object converge after passing through the lens, creating an image that is the same size as the object. The distance between the object and the lens is critical in achieving this specific image size.
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A 67 kg box is initially at rest when a student uses a rope to pull on it with 380 N of force for 3.0 m. There is negligible friction between the box and floor. What is the best estimate of the speed of the box after the displacement interval of 3.0m? Assume rightwards is the positive direction. Choose 1 answer: A. 6.4 m/s B. 5.8 m/s C. 7.8 m/s D. 4.9 m/s
The best estimate of the speed of the box after the displacement interval of 3.0 m is 4.9 m/s (Option D).
To determine the speed of the box, we need to apply the work-energy principle, which states that the work done on an object is equal to the change in its kinetic energy.
Work (W) done on the box can be calculated as the product of the force applied (F) and the displacement (d):
W = F * d
In this case, the force applied is 380 N and the displacement is 3.0 m:
W = 380 N * 3.0 m
W = 1140 J
The work done on the box is equal to the change in its kinetic energy (ΔKE). Since the box starts from rest, the initial kinetic energy (KE_initial) is zero:
ΔKE = KE_final - KE_initial
ΔKE = KE_final - 0
ΔKE = KE_final
Therefore, ΔKE = 1140 J.
Using the equation for kinetic energy:
KE = (1/2) * m * v^2
Where m is the mass of the box (67 kg) and v is the speed of the box.
We can rearrange the equation to solve for v:
v = √(2 * ΔKE / m)
v = √(2 * 1140 J / 67 kg)
v ≈ 4.9 m/s
The best estimate of the speed of the box after the displacement interval of 3.0 m is approximately 4.9 m/s (Option D).
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If the temperature of a gas is increased from 20°C to 100°C, by what factor does the rms speed of an ideal molecule change? 1.1 1.3 2.2 1.6
When the temperature rises from 20°C to 100°C, the RMS speed of an ideal gas molecule varies by a factor of roughly 1.303.
The root mean square (RMS) speed of an ideal gas molecule is given by the equation:
[tex]\begin{equation}v = \sqrt{\frac{3kT}{m}}[/tex]
Where:
v is the RMS speed of the molecule,
k is Boltzmann's constant (1.38 × 10⁻²³ J/K),
T is the temperature in Kelvin,
m is the mass of the molecule.
To find the factor by which the RMS speed changes when the temperature is increased from 20°C to 100°C, we need to compare the initial and final RMS speeds.
Let's denote the initial RMS speed as v₁ and the final RMS speed as v₂. We can express the ratio of the two speeds as follows:
[tex]\[\frac{v_2}{v_1} = \frac{\sqrt{\frac{3kT_2}{m}}}{\sqrt{\frac{3kT_1}{m}}}\][/tex]
Since the masses of the gas molecules are the same, they cancel out in the ratio. We're left with:
[tex]\[\frac{v_2}{v_1} = \sqrt{\frac{T_2}{T_1}}\][/tex]
Now let's convert the temperatures from Celsius to Kelvin:
T₁ = 20°C + 273.15 = 293.15 K
T₂ = 100°C + 273.15 = 373.15 K
Substituting these values into the ratio equation, we get:
[tex]\[\frac{v_2}{v_1} = \sqrt{\frac{373.15}{293.15}}\][/tex]
Calculating this ratio, we find:
[tex]\[\frac{v_2}{v_1} \approx 1.303\][/tex]
Therefore, the factor by which the RMS speed of an ideal gas molecule changes when the temperature increases from 20°C to 100°C is approximately 1.303.
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(a) A bicycle generator rotates at 1875 rad/s, producing an 18.0 V peak emf. It has a 1.00 by 3.00 cm rectangular coil in a 0.640 T field. How many turns are in the coil? (b) Is this number of turns of wire practical for a 1.00 by 3.00 cm coil?
A bicycle generator rotates at 1875 rad/s, producing an 18.0 V peak emf. It has a 1.00 by 3.00 cm rectangular coil in a 0.640 T field, the number of turns in the coil is approximately 1582.
(a) The equation for the induced emf in a generator can be used to determine the coil's number of turns:
emf = N * B * A * ω
N = emf / (B * A * ω)
= 18.0 V / (0.640 T * 0.0003 m² * 1875 rad/s)
≈ 1582 turns
Therefore, the number of turns in the coil is approximately 1582.
(b) Whether a coil with a diameter of 1 by 3 cm can have a certain number of turns depends on the requirements and limitations of the application.
The voltage output of the generator can often be increased by increasing the number of revolutions.
However, there are real restrictions that must be taken into account, such as the amount of space that is available, the needed power output, and the materials and manufacturing procedures that must be used.
Thus, in order to evaluate whether winding such a large number of turns on a small coil is feasible and practical, it is vital to take into account variables like wire size, insulation, and mechanical stability.
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T/F : an exercise program, if designed well, will be perfect for everyone. please select the best answer from the choices provided.
False. An exercise program, even if designed well, will not be perfect for everyone. An exercise program that is well-designed takes into consideration various factors such as individual goals, fitness level, health conditions, and personal preferences.
However, people have different body types, fitness abilities, and unique considerations that must be taken into account. What may be suitable and effective for one person may not be appropriate for another. For example, someone with a medical condition or injury may require modifications or specific exercises that cater to their needs. Additionally, individual preferences play a significant role in adherence and enjoyment of an exercise program. What one person finds enjoyable and motivating may be unappealing to someone else. Moreover, people have different goals, such as weight loss, muscle gain, or improving cardiovascular fitness, which require tailored approaches. Therefore, an exercise program that is designed well can serve as a great starting point, but adjustments and customization may be necessary to cater to the individual needs and circumstances of each person.
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a jk flip flop has a condition of j=0, k=0, and both preset and clear are inactive. if a 100hz pulse is applied to the clock, the output of q will be
a.0
b.1
c.100 hz
d.50 hz
e.unpredictable
The output of Q will be unpredictable.
In a JK flip-flop, the output state depends on the current state and the inputs J and K. The given condition states that J = 0, K = 0, and both the preset and clear inputs are inactive.
In this case, the output of Q will depend on the current state of the flip-flop, which is not provided in the given information. The behavior of the JK flip-flop is such that if J = K = 0, the flip-flop will remain in its current state.
Since the initial state is not given, it is not possible to determine the output of Q with certainty. It could either be 0 or 1, depending on the initial state of the flip-flop.
The frequency of the clock pulse (100 Hz) does not directly affect the output state of the flip-flop. It only determines the timing at which the flip-flop transitions between states.
The output of Q cannot be determined with certainty based on the given information. It could be either 0 or 1, depending on the initial state of the flip-flop. The frequency of the clock pulse (100 Hz) does not affect the output state.
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A 60 kg woman stands on the very end of a uniform board of length l, which is supported one quarter of the way from one end and is balanced.
What is the mass of the board?
A.15 kg.
B. 20 kg.
C.30 kg.
D. 60 kg.
E. 120 kg.
The mass of the board is 80 kg which matches none of the options.
What is mass and it's SI unit?
Mass is a fundamental property of matter that quantifies the amount of material an object contains. It is a scalar quantity and is independent of gravity. The SI unit of mass is the kilogram (kg).
Let's denote the length of the board as l and the distance from the pivot point to the woman as d. The distance from the pivot point to the center of mass of the board is then (3/4)l (given that the board is supported one quarter of the way from one end).
Since the woman's weight is mg (where m is her mass and g is the acceleration due to gravity), the torque equation becomes:
mgd = (m_board)(g)(3/4)l.
Canceling out the acceleration due to gravity and rearranging the equation:
d = (3/4)l(m_board / m).
We know that the woman's mass is 60 kg and she stands at the very end of the board, so d = l. Substituting these values into the equation:
l = (3/4)l(m_board / 60 kg).
Simplifying:
1 = (3/4)(m_board / 60 kg).
Solving for m_board:
m_board = (1 kg)(60 kg) / (3/4).
m_board = 80 kg.
Therefore, the mass of the board is 80 kg. None of the given options (A, B, C, D, E) matches this result.
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1) Use Laplace Transforms to solve the IVP where y(0) = 0 and y' (0) = 0. y" + y = t 0 2 for 0 < t < 2 for t > 2
The solution for the IVP is:y(t) = (-1/2)cos(t) + (1/2)t - (1/2)sin(t) for 0 < t < 2and y(t) = 0 for t > 2.
We are given an IVP:
y" + y = t for 0 < t < 2, and y" + y = 0 for t > 2
Also given is that y(0) = 0 and y'(0) = 0.
The Laplace Transform of y'' is s²Y(s) - sy(0) - y'(0), which gives us:
s²Y(s) - 0 - 0 = Y''(s)
Laplace Transform of y is Y(s).
Laplace Transform of t is 1/s².
Laplace Transform of 0 is 0.
We get:
s²Y(s) - 0 - 0 + Y(s) = 1/s²(since y'' + y = t) (s² + 1)
Y(s) = 1/s²Y(s) = 1/s²(s² + 1)
Let F(s) = 1/s²(s² + 1)
We can use partial fractions to solve for Y(s):
1/s²(s² + 1) = A/s + B/s² + Cs + D/(s² + 1)
Multiplying through by s²(s² + 1) gives: 1 = As(s² + 1) + B(s² + 1) + Cs³ + Ds²
Expanding and equating coefficients of s³, s², s, and 1 gives:
A + C = 0B + D = 0A = 0, B = -1/2, C = 0, D = 1/2
Therefore, Y(s) = -1/2s/s² + 1 - 1/2/s² + 1
Taking the inverse Laplace Transform:
y(t) = (-1/2)cos(t) + (1/2)t - (1/2)sin(t) for 0 < t < 2 and y(t) = Ae^(-t) + Be^t for t > 2
Using the initial conditions:
y(0) = 0 gives A + B = 0y'(0) = 0 gives -A + B = 0So A = 0, B = 0
Therefore, the solution for the IVP is:y(t) = (-1/2)cos(t) + (1/2)t - (1/2)sin(t) for 0 < t < 2and y(t) = 0 for t > 2.
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how to calculate the wavelength of electromagnetic radiation needed to remove an electron from the valance shell of an atom of the element
Tocalculate the wavelength of electromagnetic radiation needed to remove an electron from the valance shell of an atom of the element can be calculated using the equation: E = hc/λ
Where E is the energy required to remove the electron from the valence shellh is Planck's constanctc is the speed of lightλ is the wavelength of the electromagnetic radiation usedThe energy required to remove an electron from the valence shell of an atom is known as ionization energy.
Once you know the ionization energy of the element, you can use the above equation to calculate the wavelength of electromagnetic radiation needed to remove an electron from the valence shell of the atom of the element. The wavelength calculated will be the minimum wavelength required to remove the electron from the valence shell of the atom. So therefore the wavelength of electromagnetic radiation needed to remove an electron from the valance shell of an atom of an element can be calculated using the equation: E = hc/λ.
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a) a heater supplies 1 w power to one end of a cylindrical rod of al with diameter 4 mm and length 20 cm. the other end is held at room temperature (20ºc). find the temperature at the hot end.
b) Find the temperature of the hot end if the rod is copper. c) Assume that the aluminum and copper rods (each with length 20 cm, diameter 4 mm") are connected together with a joint of perfect thermal conductance. One end of the Cu is held at 0 degree C and one end of the AI is held at 50 degree C. Find the heat current through the rod and the temperature of the joint, T_joint.
The temperature at the recent cease [tex]Th = Troom + ΔT.[/tex] The heat current through the rod and the temperature of the joint, T_joint by applying the heat switch equation: [tex]Q_joint = I * A_joint * ΔT_joint.[/tex]
A) To locate the temperature at the recent stop of the aluminum rod, we will use the formula for warmth transfer:
Q = P * t
[tex]Q = m * c * ΔT[/tex]
Where:
Q is the warmth transferred
P is the strength provided to the rod (1 W)
t is the time for which the electricity is furnished
m is the mass of the aluminum rod
c is the specific warmness potential of aluminum
ΔT is the temperature distinction between the new end and the room temperature
First, let's calculate the mass of the aluminum rod:
Volume = π * (radius)² * period
= π * (0.002 m)² * 0.20 m
Density of aluminum = 2700 kg/m³ (approximate value)
Mass = Volume * Density
Next, calculate the temperature difference:
ΔT = Th - Troom
Using the formulation[tex]Q = m * c * ΔT,[/tex]we are able to clear up for ΔT:
[tex]Q = m * c * ΔT[/tex]
Finally, we will discover the temperature at the recent cease:
[tex]Th = Troom + ΔT[/tex]
b) To locate the temperature at the new quit of the copper rod, we can observe the equal steps as in component (a), but with the unique warmth capacity of copper instead of aluminum. The rest of the calculations stay identical.
C) Since the aluminum and copper rods are linked collectively with the best thermal conductance, they will attain a thermal equilibrium where the temperature on the joint is the same for each substance. This means that the temperature of the joint, T_joint, will be a cost between the preliminary temperatures of the aluminum and copper ends (0°C and 50°C).
To calculate the warmth present day via the rod, we want to recollect the thermal equilibrium condition. The warmness flowing into the joint from the aluminum side has to be the same as the heat flowing out of the joint to the copper aspect.
The warmth of modern-day may be calculated by the use of the system:
[tex]I = (k1 * A1 * ΔT1) / L1 = (k2 * A2 * ΔT2) / L2[/tex]
Where:
I is the heat of the present day
k1 and k2 are the thermal conductivities of aluminum and copper, respectively
A1 and A2 are the cross-sectional areas of aluminum and copper, respectively
ΔT1 and ΔT2 are the temperature variations across aluminum and copper, respectively
L1 and L2 are the lengths of aluminum and copper, respectively
By fixing this equation, we will locate the heat contemporary.
The temperature of the joint, T_joint, can be located by using thinking about the thermal equilibrium condition. The warmth flowing into the joint from the aluminum facet ought to be identical to the warmth flowing out of the joint to the copper side.
Once we have the warmth modern, we can use it to locate T_joint by applying the heat switch equation:
[tex]Q_joint = I * A_joint * ΔT_joint[/tex]
Where Q_joint is the warmth transferred on the joint, I is the warmth cutting-edge, A_joint is the cross-sectional vicinity at the joint, and ΔT_joint is the temperature distinction across the joint.
By fixing these equations, we can decide the heat modern via the rod and the temperature of the joint, T_joint.
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a particle travels at v=0.12c . by what percentage will a calculation of its momentum be wrong if you use the classical formula?
The calculation of the particle's momentum using the classical formula would be approximately 0.772% wrong when compared to the relativistic formula.
When a particle travels at relativistic speeds, the classical formula for momentum (p = mv) becomes inaccurate. To determine the percentage error in the calculation of momentum using the classical formula for a particle moving at v = 0.12c, we need to consider the effects of special relativity.
The relativistic formula for momentum is given by:
p = γmv
where γ is the Lorentz factor, m is the rest mass of the particle, and v is its velocity.
The Lorentz factor is defined as:
γ = 1 / √(1 - (v/c)²)
Substituting the given velocity into the Lorentz factor equation:
γ = 1 / √(1 - (0.12c/c)²)
= 1 / √(1 - 0.0144)
≈ 1 / √0.9856
≈ 1.0078
Using the relativistic formula for momentum:
p = (1.0078)m(0.12c)
Now, let's compare this result to the classical formula:
p_classical = mv
= (1.0)m(0.12c)
To calculate the percentage error, we need to find the difference between the relativistic momentum (p) and the classical momentum (p_classical), divide it by the relativistic momentum, and multiply by 100:
Percentage error = (p - p_classical) / p * 100
= [(1.0078)m(0.12c) - (1.0)m(0.12c)] / [(1.0078)m(0.12c)] * 100
= [(0.0078)m(0.12c)] / [(1.0078)m(0.12c)] * 100
= 0.0078 / 1.0078 * 100
≈ 0.772%
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A 0.095 kg tennis ball is traveling 40 m/s when it bounces off a wall and travels in the opposite direction it came from. The bounced ball leaves the wall with a speed of 30 m/s.
What is the change in momentum of the ball?
The change in momentum of the ball when it bounces off a wall is 7.6 kg m/s. Note that the negative sign indicates that the momentum is in the opposite direction to the initial momentum.
Here's how to solve for it: Given: Mass of ball, m = 0.095 kg, Initial velocity of the ball, u = 40 m/s. Final velocity of the ball, v = -30 m/s Change in momentum, p = ?To solve for the change in momentum, we can use the formula: p = m × (v - u)Substituting the given values, p = 0.095 kg × (-30 m/s - 40 m/s)p = 0.095 kg × (-70 m/s)p = -6.65 kg m/s. The magnitude of the change in momentum is: p = |-6.65 kg m/s |p ≈ 7.6 kg m/s. Therefore, the change in momentum of the ball when it bounces off a wall is 7.6 kg m/s.
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i) A circular coil with radius 20 cm is placed with it's plane parallel and between two straight
wires P and Q. The coil carries current I = 0. 5A. I for coil is in clockwise direction when viewed
from left side. Wire P is located 40 cm to the left of a circular coil and carries current I = 0. 2A
while wire Q is located 80 cm to the right of the circular coil and carries current l = 0. 6A. Both
I for P and l for Q are in the same directions into the paper. Determine the resultant of magnetic field at
the centre of a circular coil from the top view.
ii) If the current in wire P is out of the page, determine the resultant of magnetic field at the centre
of a circular coil.
i) The resultant of magnetic field at the center of a circular coil from the top view is given by:
[tex]B= µ0I1 / 2πr1 + µ0I2 / 4πr2[/tex]
Here, I1 = current in wire P = 0.2AI2 = current in wire Q = 0.6Ar1 = radius of circular coil = 20cm = 0.2mr2 = distance between wire P and the center of the coil = 40cm = 0.4m.
Distance between wire Q and center of the [tex]coil = 80cm = 0.8mB= µ0I1 / 2πr1 + µ0I2 / 4πr2= (4π × 10-7 T m A-1)(0.2A / 2π × 0.2m) + (4π × 10-7 T m A-1)(0.6A / 4π × 0.4m)= (10-6 T)(0.2 / 0.2) + (10-6 T)(0.6 / 0.8)= 1 × 10-6 T + 0.75 × 10-6 T= 1.75 × 10-6 Tii)[/tex] If the current in wire P is out of the page, then the magnetic field due to wire P is directed away from the circular coil.
[tex]B= µ0I1 / 2πr1 - µ0I2 / 4πr2= (4π × 10-7 T m A-1)(0.2A / 2π × 0.2m) - (4π × 10-7 T m A-1)(0.6A / 4π × 0.4m)= (10-6 T)(0.2 / 0.2) - (10-6 T)(0.6 / 0.8)= 1 × 10-6 T - 0.75 × 10-6 T= 0.25 × 10-6[/tex] TTherefore, the resultant of magnetic field at the center of a circular coil is [tex]0.25 × 10-6 T[/tex].
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when must temperature values in gas law calculations be expressed in kelvin units?
Temperature values in gas law calculations must be expressed in Kelvin units when using the ideal gas law or any other gas laws that involve temperature.
This is because the Kelvin scale is an absolute temperature scale that starts from absolute zero, which is the lowest possible temperature. The Kelvin scale is directly proportional to the average kinetic energy of gas molecules.
The use of Kelvin ensures that temperature is measured relative to absolute zero, where the kinetic energy of gas molecules theoretically ceases.
It allows for accurate calculations of gas behavior and avoids negative values or inconsistencies that may occur when using Celsius or Fahrenheit scales, which have arbitrary zero points and can result in incorrect interpretations of gas laws.
Therefore, Kelvin units provide a more reliable and consistent basis for gas law calculations.
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The index of refraction for a particular silica fiber is n=1.44. If you shine light on the fiber at an angle of θ i = 38 degrees from the air, what would the refracted angle be? How would your answer change if the diamond were immersed in water (that is, the light was coming from a region with n=1.33)?
When light passes from air to a silica fiber with an index of refraction of 1.44, and the incident angle is 38 degrees, the refracted angle can be calculated using Snell's law.
The refracted angle in this case would be approximately 24.2 degrees. If the light were coming from a region with an index of refraction of 1.33 (such as water), the refracted angle would be different.
Snell's law relates the angles of incidence and refraction to the indices of refraction of the two media involved. It can be expressed as n1sin(θi) = n2sin(θr), where n1 and n2 are the indices of refraction of the two media, θi is the angle of incidence, and θr is the angle of refraction.
For the first scenario, where the light is coming from air and entering a silica fiber with n = 1.44, and the incident angle is θi = 38 degrees, we can solve Snell's law for the refracted angle. Plugging in the values, we get:
1sin(38) = 1.44sin(θr)
sin(θr) = (1*sin(38))/1.44
θr ≈ 24.2 degrees
Therefore, the refracted angle in this case would be approximately 24.2 degrees.
For the second scenario, where the light is coming from a region with n = 1.33 (such as water) and entering the silica fiber with n = 1.44, the refracted angle would be different. The specific value of the refracted angle would depend on the incident angle, which is not provided in the question. However, we can determine that the refracted angle would be smaller compared to the first scenario because water has a lower index of refraction than air. This means that light would bend less when entering the fiber from water compared to air.
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The absence of any mechanical linkage between the throttle pedal and the throttle body requires the use of a _______ motor.
A. Throttle
B. AC
C. DC
D. Stepper
The absence of any mechanical linkage between the throttle pedal and the throttle body requires the use of a . Stepper motor. Option D.
In modern vehicles, the throttle system is commonly controlled electronically using a stepper motor. A stepper motor is a type of electric motor that moves in discrete steps or increments, as directed by an electronic control unit (ECU) based on inputs from sensors, including the throttle pedal position sensor.
With the use of a stepper motor, there is no direct mechanical connection between the throttle pedal and the throttle body. Instead, the ECU interprets the position of the throttle pedal and commands the stepper motor to move the throttle plate accordingly, regulating the airflow into the engine.
The stepper motor provides precise control over the throttle position, allowing for smooth and accurate adjustments based on driving conditions and engine demands. The ECU can precisely control the throttle opening angle and adjust it in real-time, optimizing fuel efficiency, emissions, and overall engine performance.
Stepper motors are particularly suitable for this application as they can hold their position without power, provide precise control over angular displacement, and offer good torque characteristics.
They are commonly used in drive-by-wire throttle systems, where electronic signals replace mechanical linkages, providing improved responsiveness and integration with other vehicle control systems.
In summary, the absence of a mechanical linkage between the throttle pedal and the throttle body necessitates the use of a stepper motor for electronic throttle control, allowing for accurate and efficient regulation of the engine's air intake. So Option D is correct .
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A car travels 40 kilometers at an average speed of 80 km/h and then travels 40 kilometers at an average speed of 40 km/h. What is the average speed of the car for this 80 km trip?
(1) 40km/h
(2) 45km/h
(3) 48km/h
(4) 53km/h
The average speed of the car for the 80 km trip is 48 km/h. To find the average speed, we need to calculate the total time taken for the entire trip and divide it by the total distance traveled.
The first part of the trip covers 40 kilometers at an average speed of 80 km/h. Using the formula time = distance/speed, we find that the time taken for this part is 0.5 hours. The second part of the trip also covers 40 kilometers but at an average speed of 40 km/h.
Again, using the formula, we calculate the time taken as 1 hour. Adding the individual times, we get a total time of 1.5 hours for the entire journey. Dividing the total distance (80 km) by the total time (1.5 hours), we find that the average speed of the car for the 80 km trip is 48 km/h.
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Unpolarized light with intensity I0 is incident on an ideal polarizing filter. The emerging light strikes a second ideal polarizing filter whose axis is at 43.0 degree to that of the first. Part A Determine the intensity of the beam after it has passed through the second polarizer.
Substituting the given angle of 43.0 degrees, we have: I = I0/2 * [tex]cos^{2}[/tex](43.0°). When unpolarized light passes through a polarizing filter, it becomes polarized with an intensity reduced to half of its original value. This is known as Malus's Law.
In this scenario, the first polarizing filter reduces the intensity of the incident light to I0/2 since it is an ideal polarizer. The light that passes through the first filter becomes linearly polarized.
The second polarizing filter is oriented at an angle of 43.0 degrees to the first polarizer. To find the intensity of the light after passing through the second polarizer, we apply the equation: I = I0/2 * [tex]cos^{2}[/tex](θ), where θ is the angle between the transmission axes of the two polarizers.
Substituting the given angle of 43.0 degrees, we have: I = I0/2 * [tex]cos^{2}[/tex](43.0°)
Evaluating this expression gives the intensity of the light after passing through the second polarizer.
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the decibel level of sound is 50 db greater on a busy street than in a quiet room where the intensity of sound is 10^-10 watt/m2.
the level of sound in the quiet room is ____ dB, and the intensity of sound in the busy street is ____ watt/m^2.
Use the formula β = 10log(I/Io) , where β is the sound level in decibels, l is the intensity of sound, and Io is the smallest sound intensity that can be heard by the human ear (roughly equal to 1x10^-12 watts/m^2)
The level of sound in the quiet room is 20db and the intensity of sound in the busy street is [tex]l_{2} = 10^-^5 W\cdot m^-^2[/tex]
Note, β = 10log(I/I₀)
Lets find level of sound in the quiet room given:
I = 10⁻¹⁰ W·m⁻²
I₀ = 1 × 10⁻¹² W·m⁻²
[tex]\beta = 10log[(10^-^1^0/(1 * 10^-^1^2)] = 10log(10^2) = 10 * 2 = 20 dB[/tex]
Sound level in the quiet room is 20db
Lets find the intensity of sound in the busy street given:
β(street) - β(room) = 50 dB
Let us denote the intensity level equation
[tex]\beta = 10logI - 10 logl_{0}[/tex]
Let A = the room and B = the road. Then,
(A) β₂ = 10logI₂ - 10logI₀
(B) β₁ = 10logI₁ - 10log I₀
Lets subtract (B) from (A)
[tex]\beta_{2} - \beta_{1} = 10logl_{2} - 10logl_{1}[/tex]
[tex]50 = 10logl_{2} - 10log(10^-^1^0)[/tex]
Lets divide each side by 10
[tex]5 = logl_{2} - log(10^-^1^0)[/tex]
[tex]5 = logl_{2} - (-10)[/tex]
[tex]5 = logl_{2} + 10[/tex]
Lets subtract 10 from each side:
[tex]-5 = logl_{2}[/tex]
Collect antilog of each side:
[tex]l_{2} = 10^-^5 W\cdot m^-^2[/tex]
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use equation i=∫r2dm to calculate the moment of inertia of a uniform, solid disk with mass m and radius r for an axis perpendicular to the plane of the disk and passing through its center.
For an axis perpendicular to the disk's plane and running through its center, the moment of inertia of a uniform, solid disk with mass m and radius r is given by: [tex]\begin{equation}I = \frac{1}{2}mr^4[/tex]
To calculate the moment of inertia of a uniform, solid disk with mass m and radius r for an axis perpendicular to the plane of the disk and passing through its center, we can use the equation:
I = ∫r² dm
In this case, we need to express dm (differential mass) in terms of the variables involved. Since we have a uniform, solid disk, the mass is evenly distributed across its entire area. The area of an infinitesimally small ring at a radius r with thickness dr is given by dA = 2πr dr.
The mass of this infinitesimally small ring can be calculated as follows:
dm = (mass per unit area) × dA
Since the disk is uniform, its mass per unit area is given by [tex]\frac{m}{A}[/tex], where A is the total area of the disk. The total area of the disk can be calculated as A = πr².
Substituting these values, we have:
[tex]\[dm = \frac{m}{A} \times dA\][/tex]
[tex]\begin{equation}\frac{m}{\pi r^2} \times 2\pi r dr[/tex]
= 2mr dr
Now, we can substitute dm back into the moment of inertia equation:
[tex]\[I = \int r^2 \, dm\][/tex]
[tex]\[I = \int r^2 (2mr \, dr)\][/tex]
To solve this integral, we need to determine the limits of integration. Since the axis of rotation is perpendicular to the plane of the disk and passes through its center, the integration will be performed from 0 to r, representing the radius of the disk.
[tex]\[I = \int_0^r r^2 (2mr \, dr)\][/tex]
Simplifying the expression, we have:
[tex]\[I = 2m \int_0^r r^3 \, dr\][/tex]
Evaluating this integral gives us:
[tex]\[I = 2m \left[ \frac{r^4}{4} \right]_{0}^r\][/tex]
[tex]\[= 2m \left( \frac{r^4}{4} - 0 \right)\][/tex]
=[tex]\begin{equation}I = \frac{1}{2}mr^4[/tex]
Therefore, the moment of inertia of a uniform, solid disk with mass m and radius r, for an axis perpendicular to the plane of the disk and passing through its center, is given by: [tex]\begin{equation}I = \frac{1}{2}mr^4[/tex]
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TEST REVIEW
(Show all work, including formula and units for full credit.)
a) A plane has a speed of 550 km/h west relative to the air. A wind blows 35 km/h east relative to the ground. What is the plane’s speed and direction relative to the ground?
b) A motorboat heads due west at 18 m/s relative to a river that flows due north at 4.0 m/s. What is the velocity (both magnitude and direction) of the motorboat relative to the shore?
c) Martin is riding on a ferry boat that is traveling west at 3.2 m/s. He walks south across the deck of the boat at 0.54 m/s. What is Martin’s velocity relative to the water?
d) An airplane flies due east at 440 km/h relative to the air. There is a wind blowing at 65 km/h to the southwest relative to the ground. What are the plane’s speed and direction relative to the ground?
a) plane’s speed and direction relative to the ground is 518.6 km/h, 4.06° west of the north b) velocity (both magnitude and direction) of the motorboat relative to the shore is 18.4 m/s c) Martin's velocity relative to the water is 3.25 m/s d) Therefore, the velocity of the plane relative to the ground is 444 km/h to the east and 5.91° south of the east.
a) To find the plane's speed and direction relative to the ground when a plane has a speed of 550 km/h west relative to the air and a wind blows 35 km/h east relative to the ground, we will use vector addition concept.
Vector Addition: It is a process of adding two or more vectors to obtain the resultant vector. If two vectors, A and B are acting simultaneously at a point, then their resultant vector can be given by:
R = A + B (vector)
From the question, the given values are:
Speed of plane relative to the air = 550 km/h west Speed of wind relative to the ground = 35 km/h east.
Now, we will find the speed of the plane relative to the ground using the Pythagorean theorem and speed in the west as positive and speed in the east as negative.
∆v = v_ plane + v_ wind ,
∆v = 550 km/h - 35 km/h = 515 km/h,
Speed of the plane relative to the ground =
√(∆v² + v_wind²)= √((515)² + (35)²)≈ 518.6 km/h.
Now, we will find the direction of the plane relative to the ground using the trigonometric ratio. The angle can be found by calculating the inverse tangent of the opposite side over the adjacent side.
Angle (θ) = tan^-1 (opposite/adjacent) = tan^-1 (35/515)≈ 4.06° west of the north
b) To find the velocity (both magnitude and direction) of the motorboat relative to the shore when a motorboat heads due west at 18 m/s relative to a river that flows due north at 4.0 m/s, we will use vector addition concept.
From the question, the given values are: Speed of motorboat relative to the river = 18 m/s west, Speed of river current = 4.0 m/s north.
Now, we will find the velocity of the motorboat relative to the shore using the Pythagorean theorem and speed in the west as positive and speed in the north as positive.
Velocity of motorboat relative to the shore =
√(v_m² + v_c²)= √((18)² + (4.0)²)≈ 18.4 m/s.
Now, we will find the direction of the motorboat relative to the shore using the trigonometric ratio.
The angle can be found by calculating the inverse tangent of the opposite side over the adjacent side.
Angle (θ) = tan^-1 (opposite/adjacent) = tan^-1 (4.0/18)≈ 12.53° south of the west
c) To find Martin's velocity relative to the water when he is riding on a ferry boat that is traveling west at 3.2 m/s and he walks south across the deck of the boat at 0.54 m/s, we will use vector addition concept.
From the question, the given values are:
Speed of ferry boat = 3.2 m/s west, Speed of Martin's walk = 0.54 m/s south.
Now, we will find Martin's velocity relative to the water using the Pythagorean theorem and speed in the west as positive and speed in the south as negative.
Martin's velocity relative to the water
= √(v_f² + v_m²)= √((3.2)² + (-0.54)²)≈ 3.25 m/s.
Now, we will find the direction of Martin's velocity relative to the water using the trigonometric ratio.
The angle can be found by calculating the inverse tangent of the opposite side over the adjacent side.
Angle (θ) = tan^-1 (opposite/adjacent) = tan^-1 (-0.54/3.2)≈ -9.6° south of the west
d) To find the plane's speed and direction relative to the ground when an airplane flies due east at 440 km/h relative to the air and there is a wind blowing at 65 km/h to the southwest relative to the ground, we will use vector addition concept.
From the question, the given values are:
Speed of plane relative to the air = 440 km/h east,
Speed of wind relative to the ground = 65 km/h to the southwest.
We will resolve the speed of the wind into two components, one parallel to the direction of motion of the plane and the other perpendicular to the direction of motion of the plane.
Perpendicular component (v_ perp) = 65/sqrt(2) = 45.96 km/h,
Parallel component (v_ para) = 65/sqrt(2) = 45.96 km/h.
Now, we will find the speed of the plane relative to the ground using the Pythagorean theorem and speed in the east as positive and speed in the north as positive.
Speed of the plane relative to the ground
= √(v_p² + v_para²)= √((440)² + (45.96)²)≈ 444 km/h.
Now, we will find the direction of the plane relative to the ground using the trigonometric ratio.
The angle can be found by calculating the inverse tangent of the opposite side over the adjacent side.
Angle (θ) = tan^-1 (opposite/adjacent) = tan^-1 (45.96/440)≈ 5.91° south of the east.
Therefore, the velocity of the plane relative to the ground is 444 km/h to the east and 5.91° south of the east.
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Two particles with positive charges q and q2 are both at rest and are very far apart. How much work would be done by external forces to bring the particles to rest at a distance d apart? A. Zero
B. kq1q2/d
C. -kqiq2/d
D. 2kq1q2.d
E. -2kq1q2/d
The work done by external forces to bring the particles to rest at a distance d apart is equal to the change in potential energy, which is given by :
k * (q1 * q2) / d.
Hence, the correct option is B.
The work done by external forces to bring the particles to rest at a distance d apart can be calculated by considering the electrostatic potential energy. The change in potential energy is equal to the work done.
The electrostatic potential energy between two point charges q1 and q2 is given by the formula
U = k * (q1 * q2) / d,
where U is the potential energy, k is the electrostatic constant (k = 8.99 × [tex]10^{9}[/tex] N [tex]m^{2}[/tex]/[tex]C^{2}[/tex]), q1 and q2 are the charges, and d is the distance between them.
Since the charges are brought to rest from an initial state where they are very far apart, their initial potential energy is zero. Therefore, the change in potential energy (ΔU) is equal to the final potential energy (U) in this case.
ΔU = U = k * (q1 * q2) / d.
Therefore, the work done by external forces to bring the particles to rest at a distance d apart is equal to the change in potential energy, which is given by option B:
k * (q1 * q2) / d.
Hence, the correct option is B.
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