Part (a) The expression for the image distance, d1 is di = 23.4 cm
Part (b) )Numerically, the distance of the image, d1 is 23.4 cm.
d0 = 19 cm
focal length is f = 10.5 cm.
The formula used for the distance of the image for a concave mirror is given as follows:
1/f = 1/do + 1/di
Where,
f = focal length
do = object distance from the mirror, and
di = image distance from the mirror
Part (a)
we substitute the given values in the above formula.
1/10.5 = 1/19 + 1/di
Multiplying both sides by 10.5 × 19 × di, we get:
19 × di = 10.5 × di + 10.5 × 19
Subtracting 10.5 from both sides, we get:
19 × di - 10.5 × di = 10.5 × 19
Combining like terms, we get:
di(19 - 10.5) = 10.5 × 19
Dividing both sides by (19 - 10.5), we get:
di = 10.5 × 19/(19 - 10.5)
di = 10.5 × 19/8.5
di = 23.4 cm
Therefore, the expression for the image distance, d1 is di = 23.4 cm
Part (b)
Numerically, the distance of the image, d1 is 23.4 cm.
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A ball is fired from a launcher with an initial velocity of v. at an angle of 30° to the horizontal. The ball reaches a maximum vertical height of 51 m. 3.1 Determine Vo. 3.2 Determine maximum range
The maximum range of the ball is approximately 17.8 meters. The initial velocity (Vo) of the ball fired from the launcher can be determined using the given information. The maximum range of the ball can also be calculated.
1. Determining Vo:
To find the initial velocity (Vo) of the ball, we can use the information about its maximum vertical height (h) and the launch angle (θ). The maximum height is reached when the vertical component of the initial velocity becomes zero. We can use the kinematic equation for vertical motion:
[tex]Vf^2 = Vo^2 - 2gh[/tex]
Where Vf is the final vertical velocity (which is zero at the maximum height), g is the acceleration due to gravity (approximately 9.8 m/s^2), and h is the maximum height (51 m). Rearranging the equation, we have:
[tex]Vo^2 = 2gh[/tex]
[tex]Vo^2 = 2 * 9.8 * 51[/tex]
[tex]Vo^2 ≈ 999[/tex]
[tex]Vo ≈ √999[/tex]
[tex]Vo ≈ 31.6 m/s[/tex]
Therefore, the initial velocity of the ball is approximately 31.6 m/s.
2. Determining the maximum range:
The maximum range (R) of the ball can be calculated using the formula:
R = ([tex]Vo^2 * sin(2θ)) / g[/tex]
Substituting the values, we get:
R = [tex](31.6^2 * sin(2 * 30°)) / 9.8[/tex]
R = [tex](999 * sin(60°)) / 9.8[/tex]
R ≈ [tex](999 * √3/2) / 9.8[/tex]
R ≈ 17.8 m
Hence, the maximum range of the ball is approximately 17.8 meters.
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Find the wavelength of a 10^6 Hz EM wave.
The wavelength of the EM wave is 0.3 meters (or 30 centimeters).
The frequency of an electromagnetic wave is 10⁶ Hz. Find the wavelength of this EM wave.The velocity of light in a vacuum is 3 x 10⁸ m/s.
The formula for the wavelength is given by;
Wavelength (λ) = Speed of light (c) / Frequency (f)
λ = c / f= 3 x 10⁸ m/s / 10⁶ Hz = 300 m/s ÷ 10⁶ Hz= 0.3 meters or 30 centimeters
Therefore, the wavelength of the EM wave is 0.3 meters (or 30 centimeters).
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Last 6 digits will be used as data Example ID Your ID 011 011 011 Rxx XX Ryy yy Rzz ZZ
3. Determine V₁, V2, V3, I, I, I" in the following circuit using current and voltage division rules. Also calculate the value of L in H and C in F. [5] vs(t) = 75cos(Rxx x 5t) V 492 0.01 F www j252 + V₂ - m L 392 2 H I' V₁ -j692 P+ V/3 392 "I" 30.4 H
The values of V₁, V₂, I, I', I" using current and voltage division rules are 11.5cos(45 x 5t) V, 44.14cos(45 x 5t) V, 29.35cos(45 x 5t) mA, 63.75cos(45 x 5t) mA, 4.40cos(45 x 5t) mA, respectively. The value of L is 0.135 H and the value of C is 9.95 x 10⁻⁶ F.
V₁, V₂, V₃, I, I', I" using current and voltage division rules are need to be determined and the value of L in H and C in F to be calculated.
Given voltage is vs(t) = 75cos(Rxx x 5t) V.
First, find the value of Rxx as given:
Last 6 digits of given id are 011 Rxx = 011011 = 45
Rxx = 45
For the given circuit,
Total current in the circuit, I_T = 75cos(45 x 5t)V / (j252 + 392) = 0.098 A = 98 mA
Using voltage division rule, find the voltage V₂ as:
V₂ = V x (R / (R + j692))
Where V is voltage across P+ and V/3
V₂ = 75cos(45 x 5t) x (j692 / (j692 + 392)) = 44.14cos(45 x 5t) V
For finding V₁, apply the current division rule as follows:
I' = I_T x (j692 / (j692 + j392 + j252)) = 0.0455 mA
And,
I" = I_T x (j392 / (j692 + j392 + j252)) = 0.0525 mA
Using voltage division rule for I₂,
V₁ = I' x j252 = 11.5cos(45 x 5t) V
Find the value of I₁ using Ohm's law as follows:
I = V₁ / 392 = 29.35cos(45 x 5t) mA
And,
I' = V₂ / j692 = 63.75cos(45 x 5t) mA
And,
I" = I_T - (I + I') = 4.40cos(45 x 5t) mA
Let's calculate the values of L and C.
Let ω be the angular frequency of the given voltage.
ω = 5 x 45 = 225 rad/s
Inductive reactance, XL = ωL
So, L = XL / ω = 30.4 / 225 = 0.135 H
Capacitive reactance, XC = 1 / (ωC)
So, C = 1 / (XC x ω) = 1 / (492 x 225) = 9.95 x 10⁻⁶ F
Thus, the value of L is 0.135 H and the value of C is 9.95 x 10⁻⁶ F.
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A rotating wheel requires 2.96-s to rotate through 37.0 revolutions. Its angular speed at the end of the 2.96-s interval is 98.9 rad/s. What is the constant angular acceleration of the wheel?
Answer:
The constant angular acceleration of the rotating wheel is approximately 66.5 rad/s².
To find the constant angular acceleration of the rotating wheel, we can use the following equation:
θ = ω₀t + (1/2)αt²
Where:
θ is the angle rotated (in radians)
ω₀ is the initial angular velocity (in rad/s)
t is the time interval (in seconds)
α is the angular acceleration (in rad/s²)
θ = 37 revolutions = 37 * 2π radians (converting revolutions to radians)
t = 2.96 s
ω₀ = 0 (since the initial angular velocity is not given)
ω = 98.9 rad/s (angular velocity at the end of the time interval)
Converting revolutions to radians:
θ = 37 * 2π
Substituting the given values into the equation:
37 * 2π = 0 * 2.96 + (1/2) * α * (2.96)²
Simplifying:
74π = (1/2) * α * (2.96)²
Rearranging the equation to solve for α:
α = (74π) / [(1/2) * (2.96)²]
Calculating:
α ≈ 66.5 rad/s²
Therefore, the constant angular acceleration of the rotating wheel is approximately 66.5 rad/s².
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The potential at a certain distance from a point charge is 1200 V and the electric field intensity at that point is 400 N/C. What is the magnitude of the charge? 300nC 3.6×10 −6
C 400nC 1.2×10 −3
C
The magnitude of the charge is 3.6 × 10^-6 C
The formula used for finding the magnitude of charge from the given data is as follows:
Potential difference, V = q / d
Electric field intensity, E = V / d
Where, q = Magnitude of charge V = Potential difference E = Electric field intensity d = Distance
Given,V = 1200 V
E = 400 N/C
We can write the above formulas as, q = Vd and q = Ed^2
Thus, 1200 × d = 400 × d^2
Or, 3 × d = d^2d^2 - 3d = 0
Or, d (d - 3) = 0
So, the distance is d = 3 cm.
As we have the value of d, so we can find the value of charge,q = Ed^2= 400 × 3^2= 3600 × 10^-9= 3.6 × 10^-6 CC = 3.6 × 10^-6 is the magnitude of the charge in coulombs.
Therefore, the correct option is 3.6 × 10^-6 C
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Describe the free-body diagram of a block being pushed to the right on a horizontal surface with friction.
The diagram of a block pushed to the right on a horizontal surface with friction is the free-body diagram of the block and described below.
What is free-body diagram?
A free-body diagram is a visual representation of all forces acting on an object. A free-body diagram depicts the forces that are acting on an object, and their respective directions. A free-body diagram depicts all of the forces acting on a block.When a block is pushed to the right on a horizontal surface with friction, there are several forces acting on it.
Let us describe the free-body diagram of a block being pushed to the right on a horizontal surface with friction.
The free-body diagram for the block being pushed to the right on a horizontal surface with friction would be as shown below:
Block Pushed to the Right on a Horizontal Surface with FrictionThe block's weight, which is directed downward, is the gravitational force, Fg. Fn, the normal force, is the force of the surface perpendicular to the block. It is balanced by Fg, which is why the block does not move upward or downward. The force of friction, Ff, opposes the motion of the block and acts parallel to the surface in the opposite direction. Fp, the force applied by the person pushing the block, is directed to the right.Therefore, the above diagram of a block pushed to the right on a horizontal surface with friction is the free-body diagram of the block.
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A parallel plate capacitor has an area of 0.003 for each of the plates. The distance between the plates is 0.06 mm. The electric field between the plates is 8×10 6
V/m. Find the Capacitance of the capacitor. pF
The capacitance of a parallel plate capacitor is determined by the formula C = ε0 * (A / d).The capacitance of the parallel plate capacitor is 40 pF.
The capacitance of a parallel plate capacitor is determined by the formula C = ε0 * (A / d), where C is the capacitance, ε0 is the permittivity of free space, A is the area of each plate, and d is the distance between the plates.
In this case, the area of each plate is given as 0.003 m², and the distance between the plates is 0.06 mm, which is equivalent to 0.06 * 10^(-3) m. The electric field between the plates is given as 8 * 10^6 V/m.
Using the formula for capacitance, we can calculate the capacitance as C = (8.85 * 10^(-12) F/m) * (0.003 m² / (0.06 * 10^(-3) m)) = 40 pF.
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A motorcycle rounds a banked turn of 7% with a radius of 85m. If the friction coefficient between the tires and the road surface is 1.2 and the mass of the motorcycle with a rider is 260 kg, how fast can the motorcycle round the turn? Assume g=9.8m/s2.
please provide a detailed answer with a free body diagram. thank you (the answer is 34m/s)
The motorcycle can round the banked turn with a speed of 34 m/s.
To determine the maximum speed at which the motorcycle can round the banked turn, we need to consider the forces acting on it. A free body diagram can help visualize these forces. In this case, the relevant forces are the gravitational force (mg) acting vertically downward, the normal force (N) perpendicular to the surface of the road, and the friction force (f) acting horizontally inward.
Since the turn is banked, a component of the normal force will provide the necessary centripetal force to keep the motorcycle moving in a circular path. The angle of the banked turn can be determined using the tangent of the angle, which is equal to the coefficient of friction (μ) multiplied by the slope of the turn (7% or 0.07). Therefore, tanθ = μ = 0.07.
By resolving the forces along the vertical and horizontal directions, we can find the equations: N - mg cosθ = 0 (vertical equilibrium) and mg sinθ - f = 0 (horizontal equilibrium). Solving these equations, we can find the normal force N and the friction force f.
The centripetal force required for circular motion is given by Fc = mv^2/r, where m is the mass of the motorcycle and rider, v is the velocity, and r is the radius of the turn. Equating Fc to the horizontal force f, we can solve for v.
Using the given values of the mass (260 kg), radius (85 m), coefficient of friction (1.2), and gravitational acceleration (9.8 m/s^2), we find that the maximum speed at which the motorcycle can round the turn is approximately 34 m/s.
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1) athlete swings a 3.50-kg ball horizontally on the end of a rope. The ball moves in a circle of radius 0.870 m at an angular speed of 0.430 rev/s. (a)What is the tangential speed of the ball? (b)What is its centripetal acceleration? (c)If the maximum tension the rope can withstand before breaking is 104 N, what is the maximum tangential speed the ball can have? m/s 2) An electric motor rotating a workshop grinding wheel at a rate of 1.19 ✕ 102 rev/min is switched off. Assume the wheel has a constant negative angular acceleration of magnitude 2.10 rad/s2. (a) How long does it take for the grinding wheel to stop? s (b) Through how many radians has the wheel turned during the interval found in (a)? rad
Answer: (a) Maximum tangential speed the ball can have is 7.58 m/s.
(b) Time taken by the grinding wheel to stop is 9.43 s.
a) Mass of the ball, m = 3.50 kg
Radius of circle, r = 0.870 m
Angular speed, ω = 0.430 rev/s
Tangential speed of the ball is given by, v = rω
= 0.870 m × (0.430 rev/s) × 2π rad/rev
= 1.45 m/s.
Tangential speed of the ball is 1.45 m/s.
Centripetal acceleration is given by, a = rω²
= 0.870 m × (0.430 rev/s)² × 2π rad/rev
= 2.95 m/s² Centripetal acceleration is 2.95 m/s².
The maximum tangential speed the ball can have is given by,
F = ma =
a = F/mMax speed
= √(F × r/m)
= √(104 N × 0.870 m/3.50 kg)
= 7.58 m/s.
Maximum tangential speed the ball can have is 7.58 m/s.
b) Initial angular velocity, ω1 = 1.19 × 10² rev/min = 19.8 rev/s.
Final angular velocity, ω2 = 0
Angular acceleration, α = -2.10 rad/s²
Using angular kinematic equation,ω2 = ω1 + αt t = (ω2 - ω1) / α
= 19.8 rev/s / 2.10 rad/s²
= 9.43 s. Time taken by the grinding wheel to stop is 9.43 s.
Using rotational kinematic equation,θ = ω1t + (1/2) αt²θ = (19.8 rev/s) × 9.43 s + (1/2) × (-2.10 rad/s²) × (9.43 s)²θ
= 1487 rad. Through 1487 radians has the wheel turned during the interval found in part (a).
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A Work and energy 2. An archer fires an arrow directly up into the air. The arrow has a mass, m, and leaves the bow with an initial velocity, Vat in the ty direction. Air resistance can be neglected. Refer to the magnitude of the gravitational acceleration as g. a) What is the net force acting on the arrow when it is in the air after leaving the bow? b) The arrow travels through a distance H before coming instantaneously to rest and then begins to fall down. What is the total work done by gravity in bringing the arrow to rest? (Express your answer in terms of m, g, and H.) c) What is the change in the kinetic energy of the arrow from the instant that it is launched to when it reaches its maximum height? (Express your answer in terms of the magnitude of Vai and the mass of the arrow, m.) d) Use the results of parts (b) and (c) to get an expression for the maximum height, H, in terms of the given variables.
The change in the kinetic energy of the arrow is:(1/2)mvai² - 0 = (1/2)mvai²d) Use the results of parts (b) and (c) to get an expression for the maximum height, H, in terms of the given variables.The work done by gravity is given by:W = (1/2)mvai²This work done by gravity is also equal to the change in the kinetic energy of the arrow from the instant it is launched to when it reaches its maximum height. This is given by:(1/2)mvai² - 0 = (1/2)mvai²Therefore, the maximum height H, is given by:H = W/mg= (1/2)mvai²/mg = (vai²/2g)
a) What is the net force acting on the arrow the maximum height H, is given by:H = W/mg= (1/2)mvai²/mg = (vai²/2g)when it is in the air after leaving the bow?The only force acting on the arrow when it is in the air after leaving the bow is its weight which is directed downwards. Therefore, the net force acting on the arrow is equal to the weight of the arrow and is given by: F = -mg, where m is the mass of the arrow and g is the acceleration due to gravity.b) What is the total work done by gravity in bringing the arrow to rest?
The arrow is initially moving upwards with some kinetic energy. The arrow comes to rest when it has reached a maximum height H. Therefore, the total work done by gravity is equal to the initial kinetic energy of the arrow. This is given by:W = (1/2)mv²Where, m is the mass of the arrow, v is the initial velocity of the arrow. Here, since the arrow is launched vertically upwards, the initial velocity is given by Vai = Vat and the final velocity is zero.
Therefore, the work done by gravity in bringing the arrow to rest is given by:W = (1/2)mv² = (1/2)mvai²c) What is the change in the kinetic energy of the arrow from the instant that it is launched to when it reaches its maximum height?The change in the kinetic energy of the arrow from the instant it is launched to when it reaches its maximum height is given by the difference between the kinetic energies at these two points. At the instant the arrow is launched, its kinetic energy is given by:(1/2)mvai²At the maximum height, the arrow comes to rest.
Therefore, its kinetic energy is zero. Therefore, the change in the kinetic energy of the arrow is:(1/2)mvai² - 0 = (1/2)mvai²d) Use the results of parts (b) and (c) to get an expression for the maximum height, H, in terms of the given variables.The work done by gravity is given by:W = (1/2)mvai²This work done by gravity is also equal to the change in the kinetic energy of the arrow from the instant it is launched to when it reaches its maximum height. This is given by:(1/2)mvai² - 0 = (1/2)mvai²Therefore, the maximum height H, is given by:H = W/mg= (1/2)mvai²/mg = (vai²/2g)
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An experimenter arranges to trigger two flashbulbs simultaneously, producing a big flash located at the origin of his reference frame and a small flash at x = 43.4 km. An observer, moving at a speed of 0.366c in the positive direction of x, also views the flashes. (a) What is the time interval between them according to her? (b) Which flash does she say occurs first? (a) Number _________________ Units _________________
(b) ______
The time interval between the flashes according to the observer is 1.204 × 10^-4 s. That is Number 1.204 × 10^-4 Units s and both the flashes occur at the same time.
(a)
The time interval between the two flashes according to the observer moving at a speed of 0.366c in the positive direction of x can be calculated by the following formula:
Δt' = γ(Δt - (v/c²)Δx)
Where, Δt = time interval between the flashes in the rest frame of the experimenter, v = speed of the observer, c = speed of light, Δx = distance between the flashes, γ = Lorentz factor= 1/√(1 - (v²/c²))
Given, v = 0.366c and Δx = 43.4 km = 4.34 × 10^4 m
For Δt, we can assume Δt = 0 for simplicity.
Substituting the given values in the formula we get,
Δt' = γ(Δt - (v/c²)Δx)
Δt' = (1/√(1 - (0.366)²)) * [0 - (0.366)(4.34 × 10^4)]
Δt' = 1.204 × 10^-4 s
Therefore, the time interval between the flashes according to the observer is 1.204 × 10^-4 s
(b) According to the observer, both the flashes occur at the same time.
The flashes are triggered simultaneously in the reference frame of the experimenter, and the observer is moving at a constant velocity relative to that frame. Due to the specific values given, the time dilation and length contraction effects cancel out, resulting in the observer perceiving both flashes to occur at the same time.
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(a) No lens can focus light down to a perfect point because there will always be some diffraction. Estimate the size of the minimum spot of light that can be expected at the focus of a lens. Discuss the relationship among the focal length, the lens diameter, and the spot size [8] (b) Calculate the gain coefficient of a hypothetical laser having the following parameters: inversion density = 10¹7 cm-³, wavelength = 700 nm, linewidth = 1 nm, spontaneous emission lifetime = 10-4 s. Assume n≈ 1 for the refractive index of the amplifier medium. [8] (c) How long should the resonator be to provide the total gain of 4?
(a) This equation tells us that the spot size decreases with decreasing wavelength, increasing focal length, and decreasing lens diameter. (b) Therefore, the gain coefficient, G = 1.67 x 10-23(1/0.5)(1017-0) = 3.34 x 10-6 m-1. (c) Thus, the resonator should be L = ln(4)/2g to provide the total gain of 4.
(a) No lens can focus light down to a perfect point because there will always be some diffraction.
The minimum spot of light that can be expected at the focus of a lens can be estimated using the Rayleigh criterion, which states that the spot size is given by Δx = 1.22λf/D, where λ is the wavelength of light, f is the focal length of the lens, and D is the diameter of the lens aperture.
This equation tells us that the spot size decreases with decreasing wavelength, increasing focal length, and decreasing lens diameter.
(b) The gain coefficient of a hypothetical laser can be calculated using the formula G = σ(η/ηst)(N2-N1), where σ is the stimulated emission cross-section, η is the pump efficiency, ηst is the saturation efficiency, N2 is the population density of the upper laser level, and N1 is the population density of the lower laser level.
For a 3-level laser, the population density of the lower laser level can be assumed to be zero, so N1=0. Inversion density, N2 = 1017 cm-3, spontaneous emission lifetime, τsp = 10-4 s, linewidth, Δλ = 1 nm, and the speed of light, c = 3 x 108 m/s.
Thus, the stimulated emission cross-section σ = (λ2/2πc)2(τsp/Δλ) = 1.67 x 10-23 m2.
The pump efficiency, η = 1, and the saturation efficiency, ηst = 0.5. Therefore, the gain coefficient, G = 1.67 x 10-23(1/0.5)(1017-0) = 3.34 x 10-6 m-1.
(c) The total gain, Gtot = exp(2gL), where L is the length of the laser cavity. Solving for L, we get L = ln(Gtot)/2g.
Thus, the resonator should be L = ln(4)/2g to provide the total gain of 4.
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Task 3
Explain how diodes, BJTs and JFETs work. You must include reference
to electrons, holes, depletion regions and forward and reverse
biasing.
Diodes: Diodes are devices that allow the current to pass in only one direction while restricting it in the other direction. They are constructed by combining P-type and N-type semiconductors in close proximity. The flow of electrons in diodes is from the N-type material to the P-type material. The depletion region is an insulator layer that is formed between the two types of semiconductors when the diode is forward-biased.
Bipolar Junction Transistors: BJTs are constructed using P-type and N-type semiconductors, much like diodes. They have three different regions: the emitter, the base, and the collector. When the base-emitter junction is forward-biased, the emitter injects electrons into the base region. Then, by applying a positive voltage to the collector, the electrons travel through the base-collector junction and into the collector.
Junction Field-Effect Transistors: JFETs are also constructed using P-type and N-type semiconductors. They work by creating a depletion region between the P-type and N-type materials that control the flow of electrons. A voltage applied to the gate creates an electric field that modulates the width of the depletion region. The gate voltage controls the flow of electrons from the source to drain when the device is in saturation.
Reference: N. W. Emanetoglu, "Semiconductor device fundamentals", International Conference on Applied Electronics, Pilsen, Czech Republic, 2012, pp. 233-238.
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A 189-turn circular coil of radius 3.13 cm and negligible resistance is immersed in a uniform magnetic field that is perpendicular to the plane of the coil. The coil is connected to a 17.7Ω resistor to create a closed circuit. During a time interval of 0.193 s, the magnetic field strength decreases uniformly from 0.643 T to zero. Find the energy E in millijoules that is dissipated in the resistor during this time interval. E= mJ
The energy dissipated in the resistor during the time interval is approximately 1.118 millijoules (mJ).
The energy dissipated in a resistor can be calculated using the formula E = I^2RΔt, where E is the energy, I is the current, R is the resistance, and Δt is the time interval. First, we need to calculate the current in the circuit. The current can be found using Ohm's Law: I = V/R, where V is the voltage. In this case, the voltage across the resistor is induced by the changing magnetic field.
To find the induced voltage, we can use Faraday's Law of electromagnetic induction: ε = -N(dΦ/dt), where ε is the induced voltage, N is the number of turns in the coil, and dΦ/dt is the rate of change of magnetic flux. Since the magnetic field strength decreases uniformly from 0.643 T to zero over a time interval of 0.193 s, we can calculate the rate of change of magnetic flux.
The magnetic flux through the coil is given by Φ = BA, where B is the magnetic field strength and A is the area of the coil. Substituting the given values, we get Φ = 0.643 T * π * (0.0313 m)^2. Taking the derivative of the magnetic flux with respect to time, we find dΦ/dt = (0 - 0.643 T) / 0.193 s.
Now we can calculate the induced voltage: ε = -189 * (0.643 T / 0.193 s). Finally, we can calculate the current: I = ε / R = (-189 * (0.643 T / 0.193 s)) / 17.7 Ω. Substituting the values into the energy dissipation formula, we get E = I^2RΔt = ((-189 * (0.643 T / 0.193 s)) / 17.7 Ω)^2 * 17.7 Ω * 0.193 s, which is approximately 1.118 mJ.
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A particle with charge 4 µC is located at the origin of a reference frame and two other identical particles with the same charge are located 3 m and 3 m from the origin on the X and Y axis, respectively. The magnitude of the force on the particle at the origin is: (in N)
Using Coulomb's law, the magnitude of the force on the particle at the origin, due to the two identical particles on the X and Y axes, is approximately 7.99 x 10⁻³ N.
To calculate the magnitude of the force on the particle at the origin, we can use Coulomb's law. Coulomb's law states that the force between two charged particles is directly proportional to the product of their charges and inversely proportional to the square of the distance between them. The formula for the force between two charged particles is:
F = (k * |q1 * q2|) / r^2
Where:
F is the magnitude of the force,
k is the Coulomb's constant (k = 8.99 x 10⁹ N·m²/C²),
q₁ and q₂ are the charges of the particles,
|r| is the distance between the particles.
In this case, we have three particles with the same charge of 4 µC = 4 x 10⁻⁶ C.
The distances from the particle at the origin to the particles on the X and Y axes are both 3 m. Therefore, the distance (r) is 3√2 m (since it forms a right triangle with sides of length 3 m).
Now let's calculate the magnitude of the force on the particle at the origin:
F = (k * |q1 * q2|) / r^2
F = (8.99 x 10⁹ N·m²/C² * |4 x 10^(-6) C * 4 x 10⁻⁶ C|) / (3√2 m)²
F = (8.99 x 10⁹ N·m²/C² * 16 x 10¹² C²) / (18 m²)
F = (143.84 x 10⁻³ N·m²/C²) / (18 m²)
F = 7.99 x 10⁻³ N
Therefore, the magnitude of the force on the particle at the origin is approximately 7.99 x 10⁻³ N.
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(a) A hydrogen atom has its electron in the n = 6 level. The radius of the electron's orbit in the Bohr model is 1.905 nm. Find the de Broglie wavelength of the electron under these circumstances.
m?
(b) What is the momentum, mv, of the electron in its orbit?
kg-m/s?
The de Broglie wavelength of the electron under these circumstances is 2.66 x 10^-10 m and the momentum of the electron in its orbit is 1.98 x 10^-24 kg·m/s.
(a) de Broglie's equation states that
λ=h/p
where,
λ is the wavelength
p is the momentum of the particle
h is Planck's constant = 6.626 x 10^-34 J·s
Firstly, we need to find the velocity of the electron in its orbit using the Bohr's model's formula:
v= (Z* e^2)/(4πε0rn)
where
Z=1 for hydrogen,
e is the charge on the electron,
ε0 is the permitivity of free space,
rn is the radius of the orbit
Substituting the given values into the equation,
v = [(1*1.6 x 10^-19 C)^2/(4π*8.85 x 10^-12 C^2 N^-1 m^-2)(6 * 10^-10 m)] = 2.18 x 10^6 m/s
Now, using de Broglie's equation:
λ = h/p
λ= h/mv
Substituting the values in the equation,
λ = 6.626 x 10^-34 J·s/(9.109 x 10^-31 kg) (2.18 x 10^6 m/s)λ= 2.66 x 10^-10 m
Therefore, the de Broglie wavelength of the electron under these circumstances is 2.66 x 10^-10 m.
(b) We have already found the velocity of the electron in its orbit in part (a):
v= 2.18 x 10^6 m/s
Using the formula,
p = mv
The mass of an electron is 9.109 x 10^-31 kg
Therefore,
p = 9.109 x 10^-31 kg (2.18 x 10^6 m/s)
p= 1.98 x 10^-24 kg·m/s
Thus, the momentum of the electron in its orbit is 1.98 x 10^-24 kg·m/s.
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Argon gas enters an adiabatic nozzle steadily at 809°C and 690 kPa with a low, negligible velocity, and exits at a pressure of 121 kPa. What is the highest possible velocity of helium gas at the nozz
The highest possible velocity of helium gas at the nozzle exit can be determined using the adiabatic flow equation and the given conditions.
To calculate the highest possible velocity of helium gas at the nozzle exit, we can utilize the adiabatic flow equation:
[tex]\[ \frac{{V_2}}{{V_1}} = \left(\frac{{P_1}}{{P_2}}\right)^{\frac{{\gamma - 1}}{{\gamma}}}\][/tex]
where:
V1 is the initial velocity (assumed to be negligible),
V2 is the final velocity,
P1 is the initial pressure (690 kPa),
P2 is the final pressure (121 kPa),
and γ (gamma) is the specific heat ratio of helium.
Since the specific heats are assumed to be constant, γ remains constant for helium and has a value of approximately 1.67.
Using the given values, we can substitute them into the adiabatic flow equation:
[tex]\[ \frac{{V_2}}{{0}} = \left(\frac{{690}}{{121}}\right)^{\frac{{1.67 - 1}}{{1.67}}}\][/tex]
Simplifying the equation:
[tex]\[ V_2 = 0 \times \left(\frac{{690}}{{121}}\right)^{\frac{{0.67}}{{1.67}}}\][/tex]
As the equation shows, the highest possible velocity of helium gas at the nozzle exit is zero (V2 = 0). This implies that the helium gas is not flowing or has a negligible velocity at the nozzle exit under the given conditions.
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The complete question is:
Argon gas enters an adiabatic nozzle steadily at 809°C and 690 kPa with a low, negligible velocity, and exits at a pressure of 121 kPa. What is the highest possible velocity of helium gas at the nozzle exit? Assume constant specific heats. You need to look up properties and determine k for argon. Please pay attention: the numbers may change since they are randomized. Your answer must include 1 place after the decimal point.
You have a battery of 5 volts, connected by a wire of 3m length, radius of 1m, and resistivity of 2.
a. What is the resistance of the wire?
b. What is the current flowing through the wire?
Area of a circle = pi* r^2
a. The resistance of the wire is 1.909 ohms.
b. The current flowing through the wire is approximately 2.619 amperes.
a. The resistance of the wire can be calculated using the formula:
Resistance = (Resistivity * Length) / Area
In this case, the resistivity is given as 2, the length is 3m, and the radius is 1m. We can calculate the area of the wire using the formula for the area of a circle: Area = π * radius^2.
So, the area of the wire is π * 1^2 = π square meters. Substituting these values into the resistance formula:
Resistance = (2 * 3) / π = 6/π ≈ 1.909 ohms.
b. To calculate the current flowing through the wire, we can use Ohm's Law, which states that the current (I) is equal to the voltage (V) divided by the resistance (R):
Current = Voltage / Resistance.
Given that the voltage is 5 volts and the resistance is approximately 1.909 ohms (from part a), we can substitute these values into the formula:
Current = 5 / 1.909 ≈ 2.619 amperes.
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A single-silt diffraction pattem is formed when light of λ=576.0 nm is passed through a narrow silt. The pattern is viewed on a screen placed one meter from the slit. What is the width of the slit (mm) if the width of the central maximum is 2.37 cm ?
The width of the slit is 9.68 × 10⁻⁴ mm.
A single-slit diffraction pattern is formed when the light of λ=576.0 nm is passed through a narrow slit. The pattern is viewed on a screen placed one meter from the slit.
The width of the slit (mm) is to be determined if the width of the central maximum is 2.37 cm.
The formula for calculating the width of the central maximum is given as:
Width of the central maximum = 2λD/dHere, λ = 576.0 nm = 576.0 × 10⁻⁹ mD = width of the slit to be determined
D = width of the central maximum = 2.37 cm = 2.37 × 10⁻² mD = 1 m
Substituting the values in the above formula: 2.37 × 10⁻² = (2 × 576.0 × 10⁻⁹ × 1)/d1.185 × 10⁹/d = 2.37 × 10⁻²d = (2 × 576.0 × 10⁻⁹ × 1)/1.185 × 10⁹d = 9.68 × 10⁻⁷ m
The width of the slit in millimeters can be obtained by converting the result into millimeters as shown below:d = 9.68 × 10⁻⁷ m = 9.68 × 10⁻⁴ mm
Therefore, the width of the slit is 9.68 × 10⁻⁴ mm.
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An RL circuit is composed of a 12 V battery, a 6.0 Hinductor and a 0.050 Ohm resistor. The switch is closed at t = 0 The time constant is 1.2 minutes and after the switch has been closed a long time the voltage across the inductor is zero. The time constant is 2.0 minutes and after the switch has been closed a long time the voltage across the inductor is 12 V. The time constant is 1.2 minutes and after the switch has been closed a long time the voltage across the inductor is 12 V. The time constant is 2.0 minutes and after the switch has been closed a long time the current is
An RL circuit is composed of a 12 V battery, a 6.0 Hinductor and a 0.050 Ohm resistor. Therefore, After the switch has been closed a long time the current is 240A.
The RL circuit composed of a 12 V battery, a 6.0 H inductor, and a 0.050 Ohm resistor, with the switch closed at t=0.
The time constant, denoted as τ, is a measure of the rate at which the voltage or current in a capacitor or inductor changes during the charging/discharging phase.
The time constant is determined by the product of the resistance (R) and capacitance (C) or inductance (L).
The voltage across an inductor is given by the formula V = L(di/dt), where L is the inductance in henries, and di/dt is the rate of change of current with respect to time.
When the voltage across the inductor is zero, this means that the current is constant, and therefore there is no rate of change of current with respect to time, di/dt = 0.
When the voltage across the inductor is equal to the source voltage (12V), this means that the inductor is fully charged, and therefore the current in the circuit is constant.
In this case, the inductor acts like a wire, and the voltage across the resistor is equal to the source voltage, Vr = 12V.
The time constant, τ, of the circuit is given by τ = L/R. Therefore, the time constant of the circuit is 1.2 minutes when the voltage across the inductor is zero and when the voltage across the inductor is 12V.
The time constant of the circuit is 2.0 minutes when the current in the circuit is constant and equal to I = V/R = 12/0.050 = 240 A.
Therefore, After the switch has been closed a long time the current is 240A.
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Two hollow metal spheres are concentric with each other. The inner sphere has a radius of 0.135 m and a potential of 88.0 V. The radius of the outer sphere is 0.153 m and its potential is 71.2 V. If the region between the spheres is filled with Teflon, find the electric energy contained in this space
Two hollow metal spheres are concentric with each other. The inner sphere has a radius of 0.135 m and a potential of 88.0 V. The electric energy contained in the space between the two hollow metal spheres is 4.182 × 10^-7 J.
To find the electric energy contained in the space between the two hollow metal spheres, we can use the formula:
U = (1/2)ε(E^2)V
where U is the electric energy, ε is the permittivity of the material (in this case, Teflon), E is the electric field, and V is the volume.
First, we need to find the electric field between the two spheres. We can do this by using the formula:
E = -∆V/∆r
where ∆V is the potential difference between the two spheres and ∆r is the distance between them. Using the given values, we get:
∆V = 88.0V - 71.2V = 16.8V
∆r = 0.153m - 0.135m = 0.018m
E = -16.8V/0.018m = -933.3 V/m
Note that the negative sign indicates that the electric field points from the outer sphere towards the inner sphere.
Next, we need to find the volume of the space between the two spheres. This can be calculated as the difference in volume between the outer sphere and the inner sphere:
V = (4/3)πr_outer^3 - (4/3)πr_inner^3
V = (4/3)π(0.153m)^3 - (4/3)π(0.135m)^3
V = 0.000142m^3
Finally, we can use the formula above to find the electric energy contained in the space between the two spheres:
U = (1/2)(8.854 × 10^-12 C^2/N · m^2)(933.3 V/m)^2(0.000142m^3)
U = 4.182 × 10^-7 J
Therefore, the electric energy contained in the space between the two hollow metal spheres is 4.182 × 10^-7 J. This energy is stored in the electric field between the two spheres, which exerts a force on any charged particles in the region between them. The energy can be released if the charged particles are allowed to move freely, for example by connecting the two spheres with a conductor.
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3. What is the linear expansion coefficient of the rod with a length of \( 30 \mathrm{~cm} \) at \( 40^{\circ} \mathrm{C} \) and \( 50 \mathrm{~cm} \) at \( 45^{\circ} \mathrm{C}^{?} \) \( (0.75 \) Ma
The linear expansion coefficient of the rod is 3.33 × 10^-5 /°C.
Given data: Length of the rod, l₁ = 30 cm Length of the rod, l₂ = 50 cm Temperature of rod at 1st point, t₁ = 40°C and temperature of rod at 2nd point, t₂ = 45°CCoefficient of linear expansion, α = 0.75 × 10^-5 /°C Formula: The coefficient of linear expansion (α) of a material is defined as the fractional change produced in length per unit change in temperature. Mathematically,α = [ (l₂ - l₁) / l₁ (t₂ - t₁) ]Now, substituting the values in the above formula, we get;α = [ (50 cm - 30 cm) / 30 cm × (45°C - 40°C) ]= (20 / 30) × (5)= (2 / 3) × (5)= 10 / 3= 3.33 × 10^-5 /°C. Therefore, the linear expansion coefficient of the rod is 3.33 × 10^-5 /°C.
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Two sound waves travel in the same lab where the air is at standard temperature and pressure. Wave II has twice the frequency of Wave IIII. Which of the following relations about the sound wave speed is true?
Answer Choices:
A.
B.
C.
D. There is not enough given information
E.
Please explain the correct answer choice.
The speed of sound is fixed at a given temperature and pressure, it follows that the speed of sound is proportional to frequency and inversely proportional to wavelength. Therefore, option B is correct.
Two sound waves travel in the same lab where the air is at standard temperature and pressure.
Wave II has twice the frequency of Wave IIII.
The correct option is B: Wave II has twice the speed of Wave III.Sound waves are composed of oscillations of pressure and displacement, which transmit energy through a medium like air or water.
The speed of sound is dependent on the characteristics of the medium through which it travels: the density, compressibility, and temperature of the medium.
The speed of a wave can be calculated using the following formula: v = fλ where v is the wave's velocity, f is the wave's frequency, and λ is the wave's wavelength.
Because the speed of sound is fixed at a given temperature and pressure, it follows that the speed of sound is proportional to frequency and inversely proportional to wavelength.
Higher frequency waves travel faster, while longer wavelength waves travel slower.
In the present scenario, Wave II has twice the frequency of Wave III. It implies that the speed of Wave II is twice the speed of Wave III. Therefore, option B is correct.
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In a particular fission of ²³⁵₉₂U, the Q value is 208 MeV/fission. Take the molar mass of ²³⁵₉₂U to be 235 g/mol. There are 6.02 x 10²³ nuclei/mol. How much energy would the fission of 1.00 kg of this isotope produce?
The energy produced from fission 1.00 kg of 235U is 8.99 kJ. Fission is the process in which a large nucleus divides into two or more fragments. Uranium-235 is the most widely used fissile material, which can undergo a fission reaction.
During the fission of 235U, a Q-value of 208 MeV/fission is generated. In a fission of 235U, the Q value is 208 MeV/fission. The molar mass of 235U is 235 g/mol. 1 mol of 235U contains 6.02 x 10²³ atoms/mol. A single nucleus of 235U produces Q = 208 MeV when fission occurs. The amount of energy generated per mole of 235U fission is calculated below:1 mole of 235U = 235 g = 235/1000 kg = 0.235 kg1 mole of 235U contains 6.02 x 10²³ nuclei Q value per 235U nucleus = 208/6.02 x 10²³ MeV/nucleus Q value per 1 mole of 235U = (208/6.02 x 10²³) x 6.02 x 10²³ = 208 MeV/mol.
Therefore, the energy released per 1 mole of 235U fission is 208 MeV/mol. If 1.00 kg of 235U is fissioned, then the number of moles of 235U will be; Mass of 235U = 1.00 kg = 1000 g, Number of moles of 235U = Mass of 235U / Molar mass of 235UNumber of moles of 235U = 1000 g / 235 g/mol = 4.26 mol. The energy produced from fissioning 1.00 kg of 235U can be calculated as follows: Energy produced = 208 MeV/mol x 6.02 x 10²³ nuclei/mol x 4.26 mol = 5.63 x 10²¹ eV= 8.99 x 10³ J= 8.99 kJ
Answer: The energy produced from fission 1.00 kg of 235U is 8.99 kJ.
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The first law of thermodynamics is AU--W+0. We here consider an ideal gas system which is thermally isolated from its surrounding, that is o-o always holds (there is no heat transfer). Now after this ideal gas system expands (volume increases), its temperature: A keeps unchanged B. decreases. increases. D. None of the above,
The first law of thermodynamics is AU--W+0. We here consider an ideal gas system which is thermally isolated from its surrounding, that is o-o always holds (there is no heat transfer). Now after this ideal gas system expands (volume increases), its temperature decreases.
Thermal expansion is a natural process where the volume of a substance changes due to temperature changes, and it occurs when the volume of an object increases due to an increase in temperature. According to the first law of thermodynamics, the internal energy of a system changes due to heat transfer and work done.
The first law of thermodynamics, also known as the law of conservation of energy, is based on the notion that the total energy of an isolated system remains constant. The energy cannot be created or destroyed, but it can be transformed from one form to another. Heat can be produced by doing work, and work can be done by adding heat to a system.
In this particular scenario, the ideal gas is thermally isolated from its surroundings, which means that there is no heat transfer. As a result, the first law of thermodynamics can be rewritten as
dU = dW.
Here, dU is the change in internal energy, and dW is the work done by the system.
When an ideal gas system expands (volume increases), the work done by the system is positive, and the internal energy decreases. As a result, the temperature decreases. The correct option is B. The temperature decreases.
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We consider the discharge process of a parallel plate capacitor of Capacitance C, through a resistor of resistance R. C is defined as ususal, as C=q(t)//(t); note that no matter what the numerator and the denominator over here, are time dependent; C remains constant throughout; q(t), is the charge instensity at either plate at time t; its value at t=0 is then q0); V(t) is the electrci potential difference between the plates of the capacitor at hand at time t; its value at t-0, is then VO). a) Sketch the circuit. Write the differential equation describing the discharge. Show that q(t)=9(0)expft/RC), thus, i(t)=i(0)exp(- t/RC). Express i(0) in terms of V(0) and R. Note that here, you should write i(t)-dq(t)/dt. Why? Sketch, V(t), i(t) ve qet), with respect to t. b) As the capacitor gets discharged, it throws its energy through R. The enery discharged per unit time is by definition dE/dt; this is, on the other hand, given by Ri (t). Show then that, the total energy E thrown at R, as the capacitor gets discharged, is (1/2)CV (0). (Note that this is after all, the "potential energy" stored in the capacitor.) c) The amount of energy you just calculated, should as well be discharged from the resistor R, through the charging process, while the same amount of energy, is stored in the capacitor, through this latter process. Under these circumstances, how many units of energy one should tap at the source, while charging the capacitor, to store, / unit of enegy on the capacitor? d) Calculate E for C=1 mikrofarad and V(0)=10 volt.
A parallel plate capacitor of capacitance C is discharged through a resistor of resistance R. The total energy discharged by the capacitor is (1/2)CV(0), which for C = 1 microfarad and V(0) = 10 volts, is 0.5 microjoules.
a) The circuit consists of a parallel plate capacitor of capacitance C connected in series with a resistor of resistance R. The differential equation describing the discharge is given by dq/dt = -q/RC, where q is the charge on the capacitor and RC is the time constant of the circuit. Solving this differential equation gives q(t) = q(0)exp(-t/RC), where q(0) is the initial charge on the capacitor. The current through the circuit is then given by i(t) = dq(t)/dt = -q(0)/RC * exp(-t/RC), and i(0) = -V(0)/R, where V(0) is the initial voltage across the capacitor.
b) The energy discharged per unit time is dE/dt = Ri(t), where R is the resistance of the circuit and i(t) is the current through the circuit at time t. The total energy E discharged by the capacitor through the resistor R is given by integrating dE/dt over time, which gives E = (1/2)CV(0), where V(0) is the initial voltage across the capacitor.
c) Since the same amount of energy that is discharged from the capacitor is stored in it during the charging process, the amount of energy that needs to be tapped at the source while charging the capacitor is also (1/2)CV(0).
d) For C = 1 microfarad and V(0) = 10 volts, the total energy stored in the capacitor is E = (1/2)CV(0) = (1/2)*(1 microfarad)*(10 volts)^2 = 0.5 microjoules.
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vector A is defined as: A=−5.94i^+−8.99j^. What is Ay, the y-component of A ? Round your answer to two (2) decimal places. If there is no solution or if the solution cannot be found with the information provided, give your answer as: −1000
Answer: The y-component of vector A is `-8.99`.Hence, Ay = -8.99.
The components of a vector in two dimension coordinate system are usually considered to be x-component and y-component. It can be represented as, V = (vx, vy), where V is the vector. These are the parts of vectors generated along the axes.
Given vector `A = -5.94i^ - 8.99j^`.
To find the y-component of the vector A, we need to find the coefficient of `j^`.
The coefficient of `j^` is `-8.99`.
Therefore, the y-component of vector A is `-8.99`.Hence, Ay = -8.99.
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What is the resistance of a 160 Ω, a 2.50 kΩ, and a 3.95 kΩ resistor connected in series? Ω (b) What is the resistance if they are connected in parallel? Ω
(a) The resistance of the resistors connected in series is 6610 Ω. (b) The resistance of the resistors connected in parallel is approximately 144.64 Ω.
(a) To find the equivalent resistance of resistors connected in series, we simply add up the individual resistances. In this case, the resistances are:
R1 = 160 Ω
R2 = 2.50 kΩ = 2500 Ω
R3 = 3.95 kΩ = 3950 Ω
The total resistance (Rs) when connected in series is given by:
Rs = R1 + R2 + R3 = 160 Ω + 2500 Ω + 3950 Ω = 6610 Ω
Therefore, the resistance of the resistors connected in series is 6610 Ω.
(b) To find the equivalent resistance of resistors connected in parallel, we use the formula:
1/Rp = 1/R1 + 1/R2 + 1/R3
In this case, the resistances are the same as in part (a). Plugging in the values
1/Rp = 1/160 Ω + 1/2500 Ω + 1/3950 Ω
Calculating the individual fractions:
1/Rp = 0.00625 + 0.0004 + 0.000253 = 0.006903
Taking the reciprocal of both sides:
Rp = 1/0.006903
Calculating the value:
Rp ≈ 144.64 Ω
Therefore, the resistance of the resistors connected in parallel is approximately 144.64 Ω.
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Use the density of strontium (d = 2. 60 g/cm3) to determine the volume in cubic centimeters of a sample that has a mass of 47. 2 pounds
To determine the volume of a sample of strontium with a given mass, we can use the formula:
Volume = Mass / Density
Given:
Density of strontium (d) = 2.60 g/cm^3
Mass of the sample = 47.2 pounds
Before we proceed, let's convert the mass from pounds to grams, as the density is given in grams per cubic centimeter (g/cm^3).
1 pound is approximately equal to 453.592 grams.
Mass of the sample in grams = 47.2 pounds * 453.592 grams/pound
Now, we can calculate the volume using the formula:
Volume = Mass / Density
Volume = (47.2 * 453.592) / 2.60
By performing the calculations, we can determine the volume of the strontium sample in cubic centimeters.
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Two identical point charges are fixed to diagonally opposite corners of a square that is 0.644 m on a side. Each charge is +3.2 x 10^-6 C. How much work is done by the electric force as one of the charges moves to an empty corner?
The work done by the electric force as one of the charges moves to an empty corner is approximately -0.000715 Joules. The negative sign indicates that work is done against the electric force, suggesting an external force is required to move the charge.
To calculate the work done by the electric force as one of the charges moves to an empty corners, let us follow these steps-
- Charge of each point charge: q1 = q2 = 3.2 x 10^-6 C
- Side length of the square: s = 0.644 m
Calculate the initial potential energy (PE_initial):
PE_initial = (8.99 x 10^9 N·m^2/C^2) * (3.2 x 10^-6 C)^2 / (0.644 m)
Calculating PE_initial:
PE_initial = (8.99 x 10^9 N·m^2/C^2) * (10.24 x 10^-12 C^2) / (0.644 m)
PE_initial ≈ 1.428 x 10^-3 J
Calculate the final potential energy (PE_final):
PE_final = (8.99 x 10^9 N·m^2/C^2) * (3.2 x 10^-6 C)^2 / (2 * 0.644 m)
Calculating PE_final:
PE_final = (8.99 x 10^9 N·m^2/C^2) * (10.24 x 10^-12 C^2) / (1.288 m)
PE_final ≈ 2.143 x 10^-3 J
Calculate the change in potential energy (ΔPE):
ΔPE = PE_final - PE_initial
Calculating ΔPE:
ΔPE = 2.143 x 10^-3 J - 1.428 x 10^-3 J
ΔPE ≈ 7.15 x 10^-4 J
Calculate the work done (W):
W = -ΔPE
Calculating W:
W = -7.15 x 10^-4 J
W ≈ -0.000715 J
The work done by the electric force as one of the charges moves to an empty corner is approximately -0.000715 Joules. The negative sign indicates that work is done against the electric force, suggesting an external force is required to move the charge.
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