For the Gaussian beam propagation, the location of the waist from the first point is 5.09 cm and the waist radius is 104 μm.
Gaussian beam wavelength, λ0 = 10.6 um
Width of the beam at first point, W1 = 1.699 mm
Width of the beam at second point, W2 = 3.38 mm
Separation between the points, d = 10 cm
Gaussian beam width at a point Z is given as,
(Z) = W0 * √[1+(λ0*Z/π*W0^2)^2] Where, W0 is the waist radius.
Location of the waist from the first point, Z1 is given by,
Z1 = d(W1^2+W2^2)/4(W2^2-W1^2) =10cm(1.699^2+3.38^2)/4(3.38^2-1.699^2)≈ 5.09 cm
The waist radius W0 is given by,
W0 = W1/√[1+(λ0*Z1/π*W1^2)^2]
W0 = 1.699/√[1+(10.6*5.09/π*1.699^2)^2]≈ 104 um
Therefore, the location of the waist from the first point is 5.09 cm and the waist radius is 104 μm.
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A buzzer attached cart produces the sound of 620 Hz and is placed on a moving platform. Ali and Bertha are positioned at opposite ends of the cart track. The platform moves toward Ali while away from Bertha. Ali and Bertha hear the sound with frequencies f₁ and f2, respectively. Choose the correct statement. A. (f₁f2) > 620 Hz B. fi > 620 Hz > f₂ C. f2> 620 Hz > f₁
Ali hears a higher frequency than the emitted frequency (620 Hz) and Bertha hears a lower frequency than the emitted frequency, the correct statement is C. f₂ > 620 Hz > f₁.
When a sound source is moving towards an observer, the frequency of the sound heard by the observer is higher than the actual frequency emitted by the source. This phenomenon is known as the Doppler effect. Conversely, when a sound source is moving away from an observer, the frequency of the sound heard is lower than the actual frequency emitted.
In this scenario, as the buzzer attached to the cart is placed on a moving platform and is approaching Ali while moving away from Bertha, Ali will hear a higher frequency f₁ compared to the emitted frequency of 620 Hz. On the other hand, Bertha will hear a lower frequency f₂ compared to the emitted frequency of 620 Hz.
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A 0.480-kg pendulum bob passes through the lowest part of its path at a speed of 7.46 m/s. (a) What he the magnitude of the tension in the pendulum cable at this point if the pendulum is 79.0 cm lang? N (b) When the pendolum feaches its highest point, what angle does the cable make with the vertical? (Enter your answer to at least ane decimat phace.) (c) What is the magnitude of the tertion in the pendulum cable when the pendulum reaches its highest point? P
(a) Mv²/2 = mgh where v = 7.46 m/s, m = 0.480 kg, g = 9.81 m/s²,h = 0.79 m. (b) Thus, sinθ = opposite/hypotenuse = 0.79/h , Hypotenuse = length of the pendulum = 0.79 m. (c) Thus, the magnitude of the tension in the pendulum cable is 4.71 N
a) Magnitude of tension in the pendulum cable: 56.58 N When the pendulum bob is at its lowest point, all its energy will be in the form of kinetic energy.
Thus, it can be stated that KE + PE = constant.
Here, PE is zero as there is no height, and thus the total energy of the system is equal to the kinetic energy of the pendulum bob.Mv²/2 = mgh wherev = 7.46 m/s, m = 0.480 kg,g = 9.81 m/s²,h = 0.79 m
By substituting these values in the above formula, we get: Tension in the pendulum cable is equal to weight component in the direction of the cable, which is given by: mg cosθ
Here,θ is the angle the cable makes with the vertical.
b) The angle that the cable makes with the vertical is: 64.67°When the pendulum bob is at its highest point, all its energy will be in the form of potential energy.
Thus, it can be stated that KE + PE = constant.
Here, KE is zero as there is no motion, and thus the total energy of the system is equal to the potential energy of the pendulum bob. mgh = mgh wherev = 0 m/s,m = 0.480 kg, g = 9.81 m/s²,h = 0.79 m
Thus, sinθ = opposite/hypotenuse = 0.79/h , Hypotenuse = length of the pendulum = 0.79 m
c) Magnitude of tension in the pendulum cable: 4.59 N
At the highest point, the tension in the cable is equal to the weight of the bob, which is given by:mg = 0.480 × 9.81 = 4.7068 N
Thus, the magnitude of the tension in the pendulum cable is 4.71 N (rounded off to two decimal places).
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A free electron has a kinetic energy 14.7eV and is incident on a potential energy barrier of U =32.3eV and width w=0.032nm. What is the probability for the electron to penetrate this barrier (in %)?
The probability for a free electron with a kinetic energy of 14.7 eV to penetrate a potential energy barrier of 32.3 eV and width 0.032 nm is very low, approximately 0.003%.
In quantum mechanics, the transmission probability of a particle through a potential energy barrier is described by the phenomenon of quantum tunneling. The probability of tunneling depends on various factors, including the width and height of the barrier, as well as the energy of the particle.
To calculate the transmission probability, we can use the transmission coefficient formula. The transmission coefficient (T) is given by T = [tex](1 + (U/E))^-2w^{2}[/tex], where U is the height of the potential energy barrier, E is the kinetic energy of the electron, and w is the width of the barrier. Plugging in the values, we have T = [tex](1 + (32.3 eV / 14.7 eV))^{2}[/tex] * 0.032 nm.
Calculating this expression, we find T ≈ 0.00003, or 0.003% when expressed as a percentage. This means that there is a very low probability for the electron to penetrate the barrier, indicating that most of the electrons will be reflected back rather than passing through.
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An object of mass m is suspended from a spring whose elastic constant is k in a medium that opposes the motion with a force opposite and proportional to the velocity. Experimentally the frequency of the damped oscillation has been determined and found to be √3/2 times greater than if there were no damping.
Determine:
a) The equation of motion of the oscillation.
b) The natural frequency of oscillation
c) The damping constant as a function of k and m
The equation of motion of the oscillation is m * d^2x/dt^2 + (c/m) * dx/dt + k * x = 0.The natural frequency of oscillation is 4km - 3k - c^2 = 0.The damping constant is = ± √(4km - 3k)
a) To determine the equation of motion for the damped oscillation, we start with the general form of a damped harmonic oscillator:
m * d^2x/dt^2 + c * dx/dt + k * x = 0
where:
m is the mass of the object,
c is the damping constant,
k is the elastic constant of the spring,
x is the displacement of the object from its equilibrium position,
t is time.
To account for the fact that the medium opposes the motion with a force opposite and proportional to the velocity, we include the damping term with a force proportional to the velocity, which is -c * dx/dt. The negative sign indicates that the damping force opposes the motion.
Therefore, the equation of motion becomes:
m * d^2x/dt^2 + c * dx/dt + k * x = -c * dx/dt
Simplifying this equation gives:
m * d^2x/dt^2 + (c/m) * dx/dt + k * x = 0
b) The natural frequency of oscillation, ω₀, can be determined by comparing the given frequency of damped oscillation, f_damped, with the frequency of undamped oscillation, f_undamped.
The frequency of damped oscillation, f_damped, can be expressed as:
f_damped = (1 / (2π)) * √(k / m - (c / (2m))^2)
The frequency of undamped oscillation, f_undamped, can be expressed as:
f_undamped = (1 / (2π)) * √(k / m)
We are given that the frequency of damped oscillation, f_damped, is (√3/2) times greater than the frequency of undamped oscillation, f_undamped:
f_damped = (√3/2) * f_undamped
Substituting the expressions for f_damped and f_undamped:
(1 / (2π)) * √(k / m - (c / (2m))^2) = (√3/2) * (1 / (2π)) * √(k / m)
Squaring both sides and simplifying:
k / m - (c / (2m))^2 = (3/4) * k / m
k / m - (c / (2m))^2 - (3/4) * k / m = 0
Multiply through by 4m to clear the fractions:
4km - c^2 - 3k = 0
Rearranging the equation:
4km - 3k - c^2 = 0
We can solve this quadratic equation to find the relationship between c, k, and m.
c) The damping constant, c, as a function of k and m can be determined by solving the quadratic equation obtained in part (b). Rearranging the equation:
c^2 - 4km + 3k = 0
Using the quadratic formula:
c = ± √(4km - 3k)
Note that there are two possible solutions for c due to the ± sign.
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A clock has a 10.0-g mass object bouncing on a spring that has a force constant of 0.9 N/m. What is the maximum velocity of the object if the object bounces 3.00 cm above and below its equilibrium position? Umax m/s How many joules of kinetic energy does the object have at its maximum velocity? KEmax x 10-4 -
A clock has a 10.0-g mass object bouncing on a spring that has a force constant of 0.9 N/m. the object has approximately 1.08 x 10^(-3) J of kinetic energy at its maximum velocity.
To find the maximum velocity of the object bouncing on the spring, we can use the principle of conservation of mechanical energy.
The maximum potential energy of the object can be calculated when it reaches its maximum displacement from the equilibrium position. Since the object bounces 3.00 cm above and below the equilibrium position, the total displacement is 2 * 3.00 cm = 6.00 cm = 0.06 m.
The maximum potential energy can be calculated using the equation:
PE_max = 0.5 * k * x^2,
where k is the force constant of the spring and x is the maximum displacement.
Substituting the given values:
PE_max = 0.5 * 0.9 N/m * (0.06 m)^2
= 0.00108 J
According to the conservation of mechanical energy, this potential energy is converted into kinetic energy when the object reaches its maximum velocity.
Therefore, the kinetic energy at maximum velocity is equal to the potential energy:
KE_max = 0.00108 J
In scientific notation, KE_max ≈ 1.08 x 10^(-3) J.
Therefore, the object has approximately 1.08 x 10^(-3) J of kinetic energy at its maximum velocity.
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A glass sheet 1.30 μm thick is suspended in air. In reflected light, there are gaps in the visible spectrum at 547 nm and 615.00 nm. Calculate the minimum value of the index of refraction of the glass sheet that produces this effect.
The case of light reflected from the upper surface of the film, we found that the minimum value of the refractive index of the glass sheet that produces the gaps in the visible spectrum at 547 nm and 615.00 nm is 1.466. Therefore, we can conclude that this is the answer.
Given data:Thickness of glass sheet (t) = 1.30 μmGaps in the visible spectrum at 547 nm and 615.00 nmWe know that when light is reflected from a thin film, we see colored fringes due to interference of light waves.
The conditions for minimum reflection from a thin film are:When the thickness of the film is odd multiples of λ/4 i.e. t = (2n+1)(λ/4)when there is no phase change at the reflection i.e. when the reflected wave is in phase with the incoming wave.
Assuming the light is reflecting from the upper surface of the film, we can find the refractive index (n) of the glass sheet using the formula: t = [(2n + 1) λ1]/4where λ1 is the wavelength of light in air.The gaps are seen at λ = 547 nm and λ = 615 nm
Therefore, applying above formulae for both wavelengths and taking the difference of the refractive indices: t = [(2n + 1) λ1]/4When λ = 547 nm ⇒ λ1 = λ/n = 547/nTherefore, t = [(2n + 1) λ]/4⇒ 1.3 × 10⁻⁶ = [(2n + 1) × 547 × 10⁻⁹]/4⇒ 2n + 1 = 4 × 1.3/547 ⇒ 2n + 1 = 0.0095n = 2⇒ Refractive index (n) = λ/λ1 = 547/λ1t = [(2n + 1) λ1]/4When λ = 615 nm ⇒ λ1 = λ/n = 615/n
Therefore, t = [(2n + 1) λ]/4⇒ 1.3 × 10⁻⁶ = [(2n + 1) × 615 × 10⁻⁹]/4⇒ 2n + 1 = 4 × 1.3/615 ⇒ 2n + 1 = 0.0085n = 2⇒ Refractive index (n) = λ/λ1 = 615/nDifference in refractive indices (Δn) = n(λ=547) - n(λ=615)= 547/n - 615/n = 547/2 - 615/2= -34To produce the effect of minimum reflection, the minimum value of the refractive index of the glass sheet is 1.5 - 0.034 = 1.466.
For the case of light reflected from the upper surface of the film, we found that the minimum value of the refractive index of the glass sheet that produces the gaps in the visible spectrum at 547 nm and 615.00 nm is 1.466. Therefore, we can conclude that this is the answer.
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. Using the image below as an aid, describe the energy conversions a spring undergoes during simple harmonic motion as it moves from the point of maximum compression to maximum stretch in a frictionless environment. Be sure to indicate the points at which there will be i. maximum speed. ii. minimum speed. iii, minimum acceleration.
As the spring moves from the point of maximum compression to maximum stretch in a frictionless environment, the following energy conversions take place:The spring’s elastic potential energy is converted to kinetic energy, which is maximum when the spring passes through the equilibrium position.
This implies that the point at which the spring has maximum speed is the equilibrium position (point C).As the spring is released from its compressed position, it moves towards the equilibrium position, slowing down and coming to a halt momentarily.
Since the kinetic energy is converted back to elastic potential energy, the point at which the spring has minimum speed is the two extreme positions at maximum compression (point A) and maximum stretch (point E).The restoring force acting on the spring is maximum at the extreme positions (points A and E), implying that the acceleration is maximum at these positions. Therefore, the point at which the spring has minimum acceleration is the equilibrium position (point C).
Therefore, in the given diagram, the points of maximum speed, minimum speed, and minimum acceleration are represented as:Maximum speed - Point CMinimum speed - Points A and EMinimum acceleration - Point C.
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loop coincides with the wire. Calculate the magnitude of the force exerted on the loop
A loop coincides with the wire.
To calculate the magnitude of the force exerted on the loop, we can use the formula:
F = BILsinθ, where F is the magnitude of the force exerted on the loop, B is the magnetic field strength, I is the current flowing through the wire, L is the length of the loop, and θ is the angle between the magnetic field and the plane of the loop.
Since the loop coincides with the wire, the angle θ between the magnetic field and the plane of the loop is 0 degrees. Therefore, sinθ = sin0 = 0. So the formula simplifies to:
F = BIL x 0 = 0
The force exerted on the loop is zero.
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The A string on a violin has a fundamental frequency of a40 Hz. The length of the vibrating portion is 30.4 cm and has a mass of 0.342 g. Under what tension must the string be placed?
Answer: The tension in the A string of the violin must be placed under 263.7 N of tension.
The A string on a violin has a fundamental frequency of a 440 Hz.
To find the tension (T) in a string: T = (m * v²) / L
Where: m = the mass of the string, L = the length of the vibrating portion, v = the speed of the wave. The speed of the wave is given by the formula: v = √(T/μ)
Where T is the tension in the string and μ is the linear density of the string. To calculate the linear density of the string, we use the formula: μ = m/L
Fundamental frequency, f = 440 Hz
Length of the vibrating portion, L = 30.4 cm = 0.304 m
Mass of the string, m = 0.342 g = 0.000342 kg.
Using the frequency and the length of the vibrating portion, we can find the speed of the wave:
v = f * λλ
= 2L = 2(0.304 m)
= 0.608 mv
= (440 Hz)(0.608 m)
= 267.52 m/s.
Now, we can find the tension in the string:
T = (m * v²) / L
T = (0.000342 kg * (267.52 m/s)²) / 0.304 m
T ≈ 263.7 N.
Therefore, the tension in the A string of the violin must be placed under 263.7 N of tension.
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A sailor uses an ultrasonic crack detector to find flaws in the rubber gasket ( S.G = 2.4, Y = 2.5 GPa) sealing water tight compartments. The crack detector produces 21.06 KHz pulses.
a) Calculate the speed of sound in the gasket in m/s
b) Calculate the wavelength
c) A crack is thought to be at a depth of 1.874 cm. Calculate the expected interval time for the pulse to make a round rip in μs.
The expected interval time for the pulse to make a round trip in the gasket is approximately 22.7 μs.
To calculate the speed of sound in the gasket, we can use the formula:
Speed of sound = Frequency × Wavelength
a) Calculate the speed of sound in the gasket in m/s:
Given:
Frequency = 21.06 KHz = 21.06 × 10^3 Hz
To calculate the speed of sound, we need the wavelength. Since the wavelength is not given directly, we can use the following formula to find it:
Wavelength = Speed of sound / Frequency
We know that the speed of sound in a material is given by:
Speed of sound = √(Young's modulus / Density)
Given:
Young's modulus (Y) = 2.5 GPa = 2.5 × 10^9 Pa
Density (ρ) = Specific gravity (SG) × Density of water
Density of water = 1000 kg/m^3 (approximate value)
Specific gravity (SG) = 2.4
Density (ρ) = 2.4 × 1000 kg/m^3 = 2400 kg/m^3
Now, we can substitute these values to calculate the speed of sound:
Speed of sound = √(2.5 × 10^9 Pa / 2400 kg/m^3)
= √(2.5 × 10^9 / 2400) m/s
≈ 1650.82 m/s
b) Calculate the wavelength:
Wavelength = Speed of sound / Frequency
= 1650.82 m/s / (21.06 × 10^3 Hz)
≈ 78.34 × 10^-6 m
≈ 78.34 μm
c) Calculate the expected interval time for the pulse to make a round trip in μs:
Given:
Depth of crack = 1.874 cm = 1.874 × 10^-2 m
The time taken for a round trip can be calculated as:
Round trip time = 2 × Depth of crack / Speed of sound
Round trip time = 2 × (1.874 × 10^-2 m) / 1650.82 m/s
≈ 2.27 × 10^-5 s
≈ 22.7 μs
Therefore, the expected interval time for the pulse to make a round trip in the gasket is approximately 22.7 μs.
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A heat engine operating between energy reservoirs at 20∘C∘C and 640 ∘C∘C has 30 %% of the maximum possible efficiency.
How much energy must this engine extract from the hot reservoir to do 1100 JJ of work?
Express your answer to two significant figures and include the appropriate units.
Answer: The engine must extract 67,000 J of energy from the hot reservoir to do 1100 J of work.
The expression for the efficiency of a heat engine operating between two energy reservoirs at temperatures T1 and T2 is;η = 1 - (T1/T2)
T1 = 20 ° C and T2 = 640 ° C.
Efficiency of 30% : η = 0.30 = 1 - (20/640)
Therefore, we can solve for the temperature T2 as follows: T2 = 20 / (1 - 0.30)(640) = 1228.57 K.
The efficiency :η = 1 - (20/1228.57) = 0.9836
Thus, we can use this efficiency to calculate the energy: QH that must be extracted from the hot reservoir to do 1100 J of work as follows:
W = QH(1 - η)1100 J
= QH(1 - 0.9836)
QH = 1100 / (1 - 0.9836)
= 67,000 J.
Therefore, the engine must extract 67,000 J of energy from the hot reservoir to do 1100 J of work
Answer: 67,000 J
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What is the magnetic field strength created at its center in T ?
The magnetic field strength created at the center of a circular loop carrying a current of 30.0 A and consisting of 250 turns with a radius of 10.0 cm is approximately 3.8 × 10^(-3) T (tesla).
The magnetic field strength at the center of a circular loop carrying current can be calculated using the formula: B = (μ₀ * I * N) / (2 * R), where B is the magnetic field strength, μ₀ is the permeability of free space (approximately 4π × 10^(-7) T·m/A), I is the current, N is the number of turns in the loop, and R is the radius of the loop.
Substituting the given values, we have:
B = (4π × 10^(-7) T·m/A * 30.0 A * 250) / (2 * 0.10 m)
B ≈ 3.8 × 10^(-3) T
Therefore, the magnetic field strength created at the center of the circular loop is approximately 3.8 × 10^(-3) T (tesla).
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The complete question is:
Inside a motor, 30.0 A passes through a 250 -turn circular loop that is 10.0 cm in radius. What is the magnetic field strength created at its center?
The position vector of a particle of mass 2.20 kg as a function of time is given by ř = (6.00 i + 5.40 tſ), whereř is in meters and t is in seconds. Determine the angular momentum of the particle about the origin as a function of time. k) kg · m²/s
The angular momentum of the particle about the origin as a function of time is L = (32.40)k kg · m²/s. The angular momentum does not depend on time and remains constant throughout the motion.
The angular momentum of a particle about the origin is given by L = m(ř × v), where m is the mass of the particle, ř is the position vector, and v is the velocity vector. To calculate the angular momentum as a function of time, we need to find the time derivative of the position vector and the velocity vector.
Given that ř = (6.00 i + 5.40 t), the velocity vector v is the derivative of ř with respect to time: v = dř/dt = (0 + 5.40) i = 5.40 i m/s.
Now we can calculate the cross product of ř and v. The cross product of two vectors in three dimensions is given by the formula (a × b) = (a_yb_z - a_zb_y)i + (a_zb_x - a_xb_z)j + (a_xb_y - a_yb_x)k. In this case, since both vectors ř and v have only i-components, the cross product simplifies to L = m(0 - 0)i + (0 - 0)j + (6.00 * 5.40 - 0)k = (0)i + (0)j + (32.40)k.
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In the circuit shown in the figure, find the magnitude of current in the middle branch. To clarify, the middle branch is the one with the 4 Ohm resistor in it (as well as a 1 Ohm). 0.2 A 0.6 A 0.8 A 3.2 A
The magnitude of current in the middle branch is 0.857 A.
Given circuit diagram is:Resistors 2 Ω and 4 Ω are in parallel:
So, equivalent resistance of 2 Ω and 4 Ω is 4/3 Ω now this is in series with 1 Ω resistor, so the total resistance is:R = 1 + 4/3 = 7/3 Ω
Total voltage in the circuit is 10 V.Now, we can use Ohm's law to find the current: I = V / RSo, I = 10 / (7/3) = 30/7 A ≈ 4.29 A
Now, the current is dividing into three branches in the ratio of inverse of resistance of each branch.
Therefore, current through the middle branch is:Im = (1 / (1+2/3)) × 30/7= (1/5) × 30/7 = 6/7 ≈ 0.857 A
Therefore, the magnitude of current in the middle branch is 0.857 A.
Answer: 0.857 A
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Analyse the stick diagram as shown in Figure Q2(b). (i) Transform the stick diagram into the equivalent schematic circuit at transistor level. (10 marks) (ii) Determine the Boolean equation representing the output Y. (4 marks) Figure Q2(b)
The above schematic circuit diagram is the equivalent schematic circuit at transistor level.
The Boolean equation representing the output Y is X + Z.
(i) Transformation of stick diagram into an equivalent schematic circuit at transistor level
The stick diagram given above represents the schematic diagram of the given Boolean expression using only MOS transistors as per the design rules. The stick diagram can be transformed into the equivalent schematic circuit at transistor level as shown below:
The above schematic circuit diagram is the equivalent schematic circuit at transistor level.
(ii) Determination of Boolean equation representing the output Y Boolean equation can be formed by observing the schematic circuit diagram obtained from the stick diagram.
The output of the given circuit diagram is represented by the output terminal Y which is labelled in the circuit diagram obtained above. The output Y is formed by OR operation of the two input terminals X and Z as seen in the diagram. Therefore the Boolean equation representing the output Y is given as:
Y = X + Z.
The Boolean equation representing the output Y is X + Z.
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It is desired to sample, by means of an ADC, any signal for which the following data is known: The maximum power of the signal reaches 800 mW The minimum power is 0.1 mW. Its maximum frequency reaches 10 kHz.
Determine:
a) The dynamic range (DR) of the signal.
b) The minimum number of bits of resolution (of the ADC) required to avoid distortion and that meets
with the SNR.
c) The conversion time required to satisfy the maximum frequency of the signal
a) The dynamic range (DR) of the signal is approximately 33.98 dB.
b) The minimum number of bits of resolution required for the ADC is 11 bits.
c) The conversion time required to satisfy the maximum frequency of the signal is 0.1 milliseconds.
a) The dynamic range (DR) of a signal is the ratio between the maximum and minimum power levels, expressed in decibels (dB). In this case, the dynamic range can be calculated using the formula DR = 10 * log10(maximum power/minimum power), which results in DR ≈ 33.98 dB.
b) The minimum number of bits of resolution required for the ADC can be determined based on the desired signal-to-noise ratio (SNR). The formula to calculate the required number of bits is N = ceil(log2(4 * SNR)), where SNR is the desired signal-to-noise ratio. Assuming a desired SNR of 6 dB, the minimum number of bits required would be N ≈ 11.
c) The conversion time required to satisfy the maximum frequency of the signal can be determined using the Nyquist-Shannon sampling theorem, which states that the sampling rate should be at least twice the maximum frequency. Therefore, the conversion time can be calculated as 1 / (2 * maximum frequency), resulting in a conversion time of approximately 0.1 milliseconds.
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Watching a car recede at 21 m/s, you notice that after 11 min the two taillights are no longer resolvable. If the diameter of your pupil is 5.0 mm in the dim ambient lighting, explain the reasoning for the steps that allow you to determine the spacing of the lights.
To determine the spacing of the taillights, you can use the concept of angular resolution. By considering the speed of the receding car, the time elapsed, the diameter of your pupil, and the distance traveled by the car, you can calculate the spacing between the taillights.
When observing a receding car, the spacing between its taillights can be determined by considering the concept of angular resolution. Angular resolution refers to the smallest angle at which two objects can be distinguished. In this scenario, you first convert the given time of 11 minutes to seconds (660 seconds) and calculate the distance traveled by the car during that time using its speed of 21 m/s (13,860 meters).
To determine the spacing between the taillights, you need to consider your line of sight. The diameter of your pupil, given as 5.0 mm, is converted to meters (0.005 meters). The angular resolution is then determined by dividing the diameter of your pupil by the distance between the taillights. By multiplying the angular resolution by the distance traveled by the car, you can calculate the spacing between the taillights. In this case, the spacing is equal to 0.005 meters.
Therefore, by following these steps and considering the relevant variables, you can determine the spacing between the taillights based on the concept of angular resolution and the given parameters.
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What is the magnitude of the initial angular momentum of the system? ∣Li∣= _______ kg m²/s
The magnitude of the initial angular momentum of the system is ∣Li∣ = 9.8584 kg m²/s.
What is angular momentum?
Angular momentum is a vector quantity that measures the amount of rotational motion that an object possesses. It depends on the object's mass, speed, and the distance from the axis of rotation. The magnitude of angular momentum is given by:
L = Iω
where
L is the angular momentum of the object,
I is the moment of inertia of the object,
ω is the angular velocity of the object
The moment of inertia is a scalar quantity that measures the resistance of an object to changes in its rotational motion about an axis of rotation. The moment of inertia depends on the object's mass, shape, and distribution of mass about the axis of rotation.
Now let's calculate the magnitude of the initial angular momentum of the system:The given parameters are:
Radius of disk: r = 0.2 m
Mass of disk: m = 3.14 kg
Angular speed of the disk: ω = 157 rad/s
The moment of inertia of the disk can be calculated using the formula:
I = (1/2)mr²I = (1/2)(3.14)(0.2)²
I = 0.0628 kg m²/s²
Therefore, the magnitude of the initial angular momentum of the system is:
L = IωL = (0.0628)(157)
L = 9.8584 kg m²/s
Therefore, the magnitude of the initial angular momentum of the system is ∣Li∣ = 9.8584 kg m²/s.
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A 1900 kg car accelerates from 12 m/s to 20 m/s in 9 s. The net force acting on the car is:
The 1900 kg car accelerates from 12 m/s to 20 m/s in 9 seconds. We need to determine the net force acting on the car is 1691 N.
To find the net force acting on the car, we can use Newton's second law of motion, which states that the net force on an object is equal to the object's mass multiplied by its acceleration
[tex](F_net = m * a)[/tex]
First, we calculate the acceleration of the car using the equation
[tex]a = (v_f - v_i) / t[/tex]
where v_f is the final velocity, v_i is the initial velocity, and t is the time taken. Plugging in the given values, we have
[tex]a = (20 m/s - 12 m/s) / 9 s = 0.89 m/s^2.[/tex]
Next, we can calculate the net force by multiplying the mass of the car by its acceleration:
[tex]F_net = 1900 kg * 0.89 m/s^2 = 1691 N.[/tex]
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The following two questions are based on having a proton as a source charge. a) Find the potential at a distance of 1.00 cm from a proton. b) What is the potential DIFFERENCE between two points that are 1.00 cm and 2.00 cm from a proton? The following two questions are based on having an electron as a source charge. a) Find the potential at a distance of 1.00 cm from an electron. b) What is the potential DIFFERENCE between two points that are 1.00 cm and 2.00 cm from an electron?
The potential at a distance of 1.00 cm from a proton is 9.0 × [tex]10^{3}[/tex] volts, and the potential difference between two points that are 1.00 cm and 2.00 cm from a proton is 4.5 ×[tex]10^{3}[/tex] volts.
The potential at a distance of 1.00 cm from an electron is -9.0 × [tex]10^{3}[/tex] volts, and the potential difference between two points that are 1.00 cm and 2.00 cm from an electron is -4.5 × [tex]10^{3}[/tex]volts.
a) The potential at a distance r from a proton can be calculated using the formula V = k*q/r, where V is the potential, k is the Coulomb's constant (8.99 × [tex]10^{9}[/tex] [tex]Nm^2/C^2[/tex]), and q is the charge of the proton (1.6 × [tex]10^{-19}[/tex]C). Plugging in the values, we get V = (8.99 × [tex]10^{9}[/tex][tex]Nm^2/C^2[/tex]) * (1.6 × [tex]10^{-19}[/tex] C) / (0.01 m) = 9.0 × [tex]10^{3}[/tex] volts.
b) The potential difference between two points can be calculated by subtracting the potentials at those points. In this case, the potential difference between two points that are 1.00 cm and 2.00 cm from a proton can be found by subtracting the potential at 2.00 cm from the potential at 1.00 cm.
Using the same formula as before, we get ΔV = V2 - V1 = (8.99 × [tex]10^{9}[/tex][tex]Nm^2/C^2[/tex]) * (1.6 × [tex]10^{-19}[/tex] C) * (1 / 0.02 m - 1 / 0.01 m) = 4.5 × 10^3 volts.
For the electron, the signs of the potentials and potential differences are opposite due to the negative charge of the electron. Therefore, the potential at a distance of 1.00 cm from an electron is -9.0 × [tex]10^{3}[/tex] volts, and the potential difference between two points that are 1.00 cm and 2.00 cm from an electron is -4.5 × [tex]10^{3}[/tex] volts.
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In a photoelectric effect experiment, if the frequency of the photons are increased while the intensity of the photons are held the same. the work function increases. the maximum kinetic energy of the photoelectrons increases. the maximum current increases. the stopping potential decreases.
The correct option is b. Increasing the frequency of photons in a photoelectric effect experiment while keeping the intensity constant will result in an increase in the maximum kinetic energy of the photoelectrons.
The photoelectric effect refers to the emission of electrons from a material when it is exposed to light. The energy of the emitted electrons is determined by the frequency of the photons that strike the material.
According to the equation E = hf, where E is the energy of a photon, h is Planck's constant, and f is the frequency of the photon, increasing the frequency of photons will lead to an increase in the energy of the individual photons. Therefore, when the frequency is increased while the intensity (number of photons per second) remains constant, the average energy of the photons increases.
The maximum kinetic energy of the photoelectrons depends on the energy of the incident photons and the work function of the material, which is the minimum energy required for an electron to be emitted. As the frequency of the photons increases, the energy of the photons increases, resulting in a higher maximum kinetic energy for the emitted electrons. Therefore, the correct option is b) the maximum kinetic energy of the photoelectrons increases.
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The complete question is:
In a photoelectric effect experiment, if the frequency of the photons is increased while the intensity of the photons is held the same. Choose the option which is best suitable
a)the work function increases.
b)the maximum kinetic energy of the photoelectrons increases.
c)the maximum current increases.
d)the stopping potential decreases.
An experimental bicycle wheel is place on a test stand so that it is free to turn on its axle. If a constant net torque of 7.5 N-m is applied to the tire for 1.5 seconds, the angular speed of the tire increases from 0 to 2 rev/min. The external torque is then removed, and the wheel is brought to rest by friction in its bearings in 175 s. a) Compute the moment of inertia of the wheel about the rotation rate. b) Compute the friction torque. c) Compute the total number of revolutions made by the wheel in the 175-second time interval.
Answer:
The total number of revolutions made by the wheel in the 175-second time interval is approximately 8.75 revolutions.
a) To compute the moment of inertia of the wheel about the rotation axis, we can use the equation:
Δθ = (1/2)αt^2
Where Δθ is the change in angle (in radians), α is the angular acceleration (in radians per second squared), and t is the time (in seconds).
Initial angular velocity, ω_i = 0 rev/min
Final angular velocity, ω_f = 2 rev/min
Time, t = 1.5 s
First, let's convert the angular velocities to radians per second:
ω_i = (0 rev/min) * (2π rad/rev) * (1 min/60 s) = 0 rad/s
ω_f = (2 rev/min) * (2π rad/rev) * (1 min/60 s) = (2π/30) rad/s
The angular acceleration can be calculated using the equation:
α = (ω_f - ω_i) / t
α = [(2π/30) rad/s - 0 rad/s] / 1.5 s = (2π/30) rad/s^2
Now, let's find the change in angle:
Δθ = (1/2) * (2π/30) rad/s^2 * (1.5 s)^2
Δθ = (π/30) rad
The moment of inertia (I) of the wheel can be determined using the equation:
Δθ = (1/2)αt^2 = (1/2) * (I * α) * t^2
Rearranging the equation:
I = (2Δθ) / (α * t^2)
Substituting the values:
I = (2 * π/30) rad / ((2π/30) rad/s^2 * (1.5 s)^2)
I = 2.222 kg·m^2
b) To compute the friction torque, we can use the equation:
τ_f = I * α
Substituting the values:
τ_f = (2.222 kg·m^2) * (2π/30) rad/s^2
τ_f ≈ 0.370 N·m
c) To compute the total number of revolutions made by the wheel in the 175-second time interval, we can use the equation:
Δθ = ω_avg * t
Where Δθ is the change in angle (in radians), ω_avg is the average angular velocity (in radians per second), and t is the time (in seconds).
Time, t = 175 s
First, let's calculate the average angular velocity:
ω_avg = (ω_i + ω_f) / 2 = (0 rad/s + (2π/30) rad/s) / 2 = (π/30) rad/s
Now, we can find the change in angle:
Δθ = (π/30) rad/s * 175 s
Δθ = 175π/30 rad ≈ 18.333π rad
To calculate the number of revolutions, we divide the change in angle by 2π:
Number of revolutions = (175π/30 rad) / (2π rad/rev) ≈ 8.75 rev
Therefore, the total number of revolutions made by the wheel in the 175-second time interval is approximately 8.75 revolutions.
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An object is placed 10cm in front of a concave mirror whose radius of curvature is 10cm calculate the position ,nature and magnification of the image produced
Answer:
The focal length, f = − 15 2 c m = − 7.5 c m The object distance, u = -10 cm Now from the mirror equation 1 v + 1 u = 1 f 1 v + 1 − 10 = 1 − 7.5 v = 10 × 7.5 − 2.5 = − 30 c m The image is 30 cm from the mirror on the same side as the object.
Since the investigative question has two variables, you need to focus on each one separately. Thinking only about the first part of the question, mass, what might be a hypothesis that would illustrate the relationship between mass and kinetic energy? Use the format of "if…then…because…” when writing your hypothesis.
In order to form a hypothesis that would illustrate the relationship between mass and kinetic energy, we first need to understand what kinetic energy and mass are and how they are related. Kinetic energy is the energy that an object possesses due to its motion, and is given by the formula KE = 0.5mv², where m is the mass of the object and v is its velocity. Mass, on the other hand, is a measure of the amount of matter in an object.
The relationship between mass and kinetic energy is direct, meaning that as mass increases, so does kinetic energy, provided that velocity remains constant. Similarly, if velocity increases, then kinetic energy will increase as well, provided that mass remains constant.
The hypothesis that illustrates this relationship can be stated as follows:If the mass of an object is increased, then the kinetic energy of the object will also increase, because kinetic energy is directly proportional to mass, assuming velocity remains constant.In other words, if the mass of an object is doubled, then its kinetic energy will also double, assuming that its velocity remains constant. This hypothesis can be tested through experiments that involve measuring the kinetic energy of objects with different masses, but with the same velocity.
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If the mass of an object increases, then its kinetic energy will increase proportionally because mass and kinetic energy have a linear relationship when graphed.
You are sitting in a bus in a depot, when suddenly you see in the window the bus next to yours start to move forward. List two scenarios that could be happening
An air parcel begins to ascent from an altitude of 1200ft and a
temperature of 81.8°F. It reaches saturation at 1652 ft. What is
the temperature at this height? The air parcel continues to rise to
22
Given information:An air parcel begins to ascent from an
altitude
of 1200ft and a temperature of 81.8°F.It reaches
saturation
at 1652 ft.Now we have to find the temperature at this height?
The air parcel continues to rise to 22To find the temperature of the air parcel at an altitude of 1652 ft, we need to use the adiabatic lapse rate.
Adabatic lapse
rate refers to the rate of decrease of temperature with altitude in the troposphere, which is approximately 6.5 °C (11.7 °F) per kilometer (or 3.57 °F per 1,000 feet) of altitude.
Let T1 = 81.8°F be the temperature at an altitude of 1200ftand T2 = temperature at an altitude of 1652 ftLet the lapse rate be -6.5°C/km (or -3.57 °F / 1000ft).
At a height difference of 452 ft (1652 - 1200), the temperature decreases by 2.94°F (0.53°C),T2 = T1 - (lapse rate x height difference)T2 = 81.8 - (3.57 x 0.452)T2 = 80.6°F.
Therefore, at an altitude of 1652 ft, the temperature of the air parcel is approximately 80.6°F.
Given an air parcel starting at an altitude of 1200 ft with a temperature of 81.8°F, it reaches saturation at an altitude of 1652 ft. It is required to find out the temperature of the air parcel at 1652 ft. It is also given that the
air parcel
continues to rise to an unknown height.The answer to this problem requires the use of the adiabatic lapse rate formula.
Adiabatic lapse rate is defined as the rate at which temperature decreases with an increase in altitude in the troposphere. The
standard adiabatic lapse rate
is 6.5°C per kilometer, or 3.57°F per 1000 feet of altitude.
Let T1 = 81.8°F be the temperature at an altitude of 1200 ft.
Let T2 be the temperature at an altitude of 1652 ft.Let the lapse rate be -6.5°C/km (or -3.57 °F / 1000ft).
The temperature at an altitude of 1652 ft can be calculated asT2 = T1 - (lapse rate x height difference)T2 = 81.8 - (3.57 x 0.452)T2 = 80.6°F.
Therefore, at an altitude of 1652 ft, the temperature of the air parcel is approximately 80.6°F.
The
temperature
of the air parcel at an altitude of 1652 ft is 80.6°F. The adiabatic lapse rate formula was used to determine the temperature at this height.
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The temperature at which an air parcel reaches saturation is known as the dew point temperature. To determine the temperature at 1652 ft, we need to use the temperature equation, which relates the temperature and altitude of an ascending air parcel.
First, let's determine the temperature lapse rate, which is the rate at which the temperature changes with altitude. This can vary depending on atmospheric conditions, but a typical value is around 3.6°F per 1000 ft.
Using this lapse rate, we can calculate the change in temperature from 1200 ft to 1652 ft.
Change in altitude = 1652 ft - 1200 ft = 452 ft
Change in temperature = lapse rate * (change in altitude / 1000)
Change in temperature = 3.6°F/1000 ft * 452 ft = 1.6272°F
Next, we subtract the change in temperature from the initial temperature of 81.8°F to find the temperature at 1652 ft.
Temperature at 1652 ft = 81.8°F - 1.6272°F = 80.1728°F
Therefore, the temperature at 1652 ft is approximately 80.17°F.
The temperature at 1652 ft is approximately 80.17°F.
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A high-voltage line operates at 500 000 V-rms and carries an rms current of 500 A. If the resistance of the cable is 0.50Ω/km, what is the resistive power loss over 200 km of the high-voltage line?
A.
500 kW
B.
25 Megawatts
C.
250 Megawatts
D.
1 Megawatt
E.
2.5 Megawatts
The resistive power loss over 200 km of the high-voltage line is 250 Megawatts. It corresponds to option C.
To calculate the resistive power loss, we need to determine the total resistance of the cable and then use the formula [tex]\text{P}=\text{I}^{2}\text{R}[/tex], where P is the power loss, I is the rms current, and R is the total resistance.
Given that the resistance of the cable is 0.50Ω/km, the total resistance for 200 km can be calculated as follows:
Total Resistance = (Resistance per kilometer) × (Total distance)
[tex]\text{R}=0.50\times200\\\text{R}=100\Omega[/tex]
Resistive power refers to the power loss or dissipation that occurs in a circuit or system due to the resistance of its components. It is the power that is converted into heat as electric current flows through a resistive element. Now, we can calculate the resistive power loss: Power Loss = (rms current)^2 × Total Resistance
[tex]\text{Power Loss}=\text{rms current}^2\times \text{total resistance}\\\\text{P}=500^{2}\times100\\\text{P}=250000\ \text{W}\\\text{P}=250\ \text{Megawatt}[/tex]
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Elon Bezos launches two satellites of different masses to orbit the Earth circularly on the same radius. The lighter satellite moves twice as fast as the heavier one. Your answer NASA astronauts, Kjell Lindgren, Pilot Bob Hines, Jessica Watkins, and Samantha Cristoforetti, are currently in the International Space Station, and experience apparent weightlessness because they and the station are always in free fall towards the center of the Earth. Your answer True or False Patrick pushes a heavy refrigerator down the Barrens at a constant velocity. Of the four forces (friction, gravity, normal force, and pushing force) acting on the bicycle, the greatest amount of work is exerted by his pushing force. Your answer One of the 79 moons of Jupiter is named Callisto. The pull of Callisto on * 2 points Jupiter is greater than that of Jupiter on Callisto.
1. True - Astronauts in the International Space Station experience apparent weightlessness because they and the station are always in free fall towards the center of the Earth.
2. False - The pushing force exerted by Patrick does not do the greatest amount of work when he pushes a heavy refrigerator at a constant velocity.
3. False - The pull of Callisto on Jupiter is not greater than that of Jupiter on Callisto.
1. True - Astronauts in the International Space Station (ISS) experience apparent weightlessness because they and the station are in a state of continuous free fall around the Earth. They are constantly accelerating towards the Earth's center due to gravity, creating the sensation of weightlessness.
2. False - When Patrick pushes a heavy refrigerator at a constant velocity, the work done by the pushing force is zero because the displacement of the refrigerator is perpendicular to the force. The force of gravity, friction, and the normal force exerted by the ground contribute to the work done in balancing the forces and maintaining a constant velocity.
3. False - According to Newton's third law of motion, the gravitational force between two objects is equal and opposite. The pull of Callisto on Jupiter is equal in magnitude to the pull of Jupiter on Callisto, as governed by the law of universal gravitation.
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The magnetic field is 1.50 uT at a distance 42.6 cm away from a long, straight wire. At what distance is it 0.150 uT? 4.26×10 2
cm Previous Tries the middle of the straight cord, in the plane of the two wires. Tries 2/10 Previous Tries
The distance from the wire is 426 cm is the answer.
Given data: The magnetic field, [tex]B = 1.50 uT[/tex]
The distance from the long, straight wire, [tex]r1 = 42.6 cm.[/tex]
The magnetic field,[tex]B' = 0.150 uT[/tex]
To find: the distance from the wire, r2
Solution: We can use the Biot-Savart law to find the magnetic field at a distance r from an infinitely long straight wire carrying current I: [tex]B = μ0I / 2πr[/tex] where [tex]μ0 = 4π[/tex]× [tex]10^-7[/tex] Tm/A is the permeability of free space.
Now we can write this as: [tex]r = μ0I / 2πB[/tex] .....(1)
At [tex]r1, B = 1.50 uT[/tex] and at[tex]r2, B' = 0.150 uT[/tex]
Therefore, from equation (1):[tex]r2 = μ0I / 2πB'[/tex].....(2)
Let us assume the current in the wire is I. Since I is constant, we can write [tex]r2/r1 = B / B'.[/tex]....(3)
Substituting the values:[tex]r2 / 42.6 = 1.50 / 0.150[/tex]
Solving for [tex]r2:r2 = (42.6 × 1.50) / 0.150 = 426 cm[/tex]
Therefore, the magnetic field is 0.150 uT at a distance of 426 cm from the wire.
Thus, the distance from the wire is 426 cm.
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I will give brainliest to whoever answers all three asap :)
1. A 1.0 g insect flying at 2.0 km/h collides head-on with an 800 kg, compact car travelling at 90 km/h. Which object experiences the greater change in momentum during the collision?
a) Neither object experiences a change in momentum
b) The insect experiences the greater change in momentum
c) The compact car experiences the greater change in momentum
d) Both objects experience the same, non-zero change in momentum
2. Why are hockey and football helmets well padded?
a) to decrease the time of a collision, decreasing the force to the head
b) to decrease the time of a collision, increasing the force to the head
c) to increase the time of a collision, decreasing the force to the head
d) to increase the time of a collision, Increasing the force to the head
3. A 68.5 kg man and a 41.0 kg woman are standing at rest before performing a figure skating routine. At the start of the routine, the two skaters push off against each other, giving the woman a velocity of 3.25 m/s [N]. Assuming there is no friction between the skate blades and the ice, what is the man's velocity due to their push?
1. b) The insect experiences the greater change in momentum during the collision.
2. C) Hockey and football helmets are well padded to increase the time of a collision, decreasing the force to the head
3. The man's velocity due to their push is 0 m/s.
1. B. The insect experiences the greater change in momentum during the collision. Change in momentum is given by the formula Δp = mΔv, where Δp is the change in momentum, m is the mass, and Δv is the change in velocity. Although the mass of the car is much larger than the insect, the change in velocity experienced by the insect is significantly greater. Since the insect collides head-on with the car, its velocity changes from 2.0 km/h to nearly zero, resulting in a substantial change in momentum. On the other hand, the change in velocity of the car is relatively small since it collides with an object of much smaller mass. Therefore, the insect experiences the greater change in momentum.
2. Hockey and football helmets are well padded C. to increase the time of a collision, decreasing the force to the head. The padding in the helmets acts as a cushion, which extends the duration of the collision between the helmet and an object, such as a puck or a player. By increasing the collision time, the force experienced by the head is reduced. This is because the force of impact is given by the equation F = Δp/Δt, where F is the force, Δp is the change in momentum, and Δt is the change in time. By increasing the time, the force is spread out over a longer duration, resulting in a decrease in the force exerted on the head.
3. To determine the man's velocity due to their push, we can apply the principle of conservation of momentum. According to this principle, the total momentum before the push is equal to the total momentum after the push. Since the woman has a velocity of 3.25 m/s [N] after the push, the man's velocity can be calculated as follows:
Total initial momentum = Total final momentum
(0 kg) + (41.0 kg)(0 m/s) = (68.5 kg + 41.0 kg)(v)
Simplifying the equation, we find:
0 = 109.5 kg * v
Dividing both sides by 109.5 kg, we get:
v = 0 m/s
Therefore, the man's velocity due to their push is 0 m/s. This means that he remains at rest while the woman gains velocity in the north direction.
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