One end of a string is attached to a rigid wall on a tabletop. The string is run over a frictionless pulley and the other end of the string is attached to a stationary hanging mass. The distance between the wall and the pulley is 0.405 meters, When the mass on the hook is 25.4 kg, the horizontal portion of the string oscillates with a fundamental frequency of 261.6 Hz (the same frequency as the middle C note on a piano). Calculate the linear mass density of the string.

Answer:

(a) Find the final velocity of the person and cart relative to the ground. = 1.367m/s

(b) Find the frictional force acting on the person while he is sliding across the top surface of the cart = 286.944N

(c) How long does the frictional force act on the person?  = 0.5809s

(d) Find the change in momentum of the person.  = 166.774N

(e) Determine the displacement of the person relative to the ground while he is sliding on the cart. = 1.5878m

(f) Determine the displacement of the cart relative to the ground while the person is sliding. = 0.3970m

(g) Find the change in kinetic energy of the person. = -455.71J

(h) Find the change in kinetic energy of the cart = 113.99j

(i) Explain why the answers to (g) and (h) differ.

the force  exerted on the cart by the person must be equal in magnitude and opposite in direction to the force exerted on the cart by the person. The changes in momentum  of the two cart must be equal in magnitude and must add up to zero.  The following represents two way thinking about "WAY". The distance the cart moves is different from the distance moved by the point of application of frictional force on the cart.

Explanation:

check attachment for explanation.

Answer:

Frad = 2IA/C

Explanation:

see attached file

Answer:

1) tensile stress = 76.648 Mpa

2) extension = 0.0215 m

Explanation:

Detailed explanation and calculation is shown in the image below

Final answer:

Tensile stress and the force constant for the Achilles tendon can be calculated using Young's modulus, Hooke's Law, and the given dimensions. A 75 kg sprinter exerting a force 13 times his weight would cause a specific amount of stretch in the tendon, calculated by applying Hooke's Law with the determined spring constant.

Explanation:

The tensile stress required to stretch the Achilles tendon by 5.2% of its length can be calculated using Hooke's Law and the definition of stress and strain. Stress (σ) is the force applied per unit area (A) and strain (ε) is the relative change in length (ΔL/L). The Young's modulus (E) relates stress and strain through σ = Eε.

First, calculate the strain which is 5.2% or 0.052. Since the Young's modulus (E) is given as 1474 MPa and the strain (ε) is 0.052, we can now calculate the stress:

σ = Eε = 1474 MPa × 0.052 = 76.648 MPa

Next, we model the tendon as a spring to find the force constant (k). Hooke's Law states that F = kΔx, where F is the force applied and Δx is the change in length. To find k, we rearrange the formula to k = F/Δx. Here, F is the tensile force, which is σ × A. We substitute the stress we found and the area of the tendon to find k.

For a 75 kg sprinter exerting a force of 13.0 times his weight, the force F would be 13.0 × 75 kg × 9.8 m/s² (acceleration due to gravity). To find the stretch (Δx), we use Hooke's Law again with the calculated force constant k.

The Achilles tendon will stretch according to that force, proportionally to the spring constant k. The exact calculations require substitution of the calculated force into the Hooke's Law equation to solve for Δx.

Answer:

A) R = 1019.11 Ω

B) V = 101.91 V

Explanation:

a) The resistance is given by the formula;

R = ρL/A

Where;

ρ is bulk density = 5.0 Ωm

L is length of cylinder = 1.6m

A is area = (π/4)D² = (π/4) x 0.1² = 0.007854 m²

Plugging in the relevant values, we obtain ;

R = (5 Ωm x 1.6m)/(0.007854 m²)

R = 1019.11 Ω

b) potential difference is given by;

V = RI

Thus, plugging in relevant values, we obtain;

V = 1019.11 Ω ∙ 0.1A

V = 101.91 V

The resistance between the hands if the skin resistance is negligible is approximately [tex]\( 1019 \, \Omega \)[/tex], the potential difference between the hands needed for a lethal shock current of 100 mA is approximately [tex]\( 101.9 \, \text{V} \).[/tex]

To solve this problem, we'll use the formulas for resistivity and Ohm's law.

Part (a): Resistance Between the Hands

The resistance R of a cylindrical conductor can be calculated using the formula:

[tex]\[ R = \rho \frac{L}{A} \][/tex]

where:

- [tex]\( \rho \)[/tex] is the resistivity of the material (in this case, the human body's resistivity is [tex](\( 5.0 \, \Omega \cdot \text{m} \))[/tex].

- L  is the length of the conductor (1.6 m).

- A is the cross-sectional area of the conductor.

First, we need to calculate the cross-sectional area A of the cylindrical conductor. The cross-sectional area of a cylinder is given by:

[tex]\[ A = \pi \left(\frac{d}{2}\right)^2 \][/tex]

where d is the diameter of the cylinder. Here, [tex]\( d = 0.10 \, \text{m} \)[/tex].

So,

[tex]\[ A = \pi \left(\frac{0.10 \, \text{m}}{2}\right)^2 = \pi \left(0.05 \, \text{m}\right)^2 \]\[ A = \pi \cdot (0.05)^2 \, \text{m}^2 \]\[ A \approx 3.14 \cdot 0.0025 \, \text{m}^2 \]\[ A \approx 0.00785 \, \text{m}^2 \][/tex]

Now we can calculate the resistance R:

[tex]\[ R = 5.0 \, \Omega \cdot \text{m} \frac{1.6 \, \text{m}}{0.00785 \, \text{m}^2} \]\[ R = 5.0 \cdot \frac{1.6}{0.00785} \, \Omega \]\[ R = 5.0 \cdot 203.82 \, \Omega \]\[ R \approx 1019.1 \, \Omega \][/tex]

Part (b): Potential Difference for Lethal Shock Current

Ohm's law states that the voltage V across a resistor is given by:

[tex]\[ V = I \cdot R \][/tex]

where I is the current and R is the resistance.

Given that the lethal shock current is [tex]\( 100 \, \text{mA} = 0.1 \, \text{A} \)[/tex] and the resistance [tex]\( R \) is \( 1019 \, \Omega \)[/tex]:

[tex]\[ V = 0.1 \, \text{A} \cdot 1019 \, \Omega \]\[ V = 101.9 \, \text{V} \][/tex]

Answer:

see detailed solution attached.

Explanation:

Final answer:

In the Heisenberg picture of quantum mechanics, the creation and annihilation operators for a one-dimensional harmonic oscillator evolve in time as â(t) = â(0)e-iwt and â¹(t) = â¹(0)eiwt, respectively, which are consistent with the time evolution of the position and momentum operators derived from the Heisenberg equations of motion.

Explanation:

Time-Dependent Creation and Annihilation Operators

In the Heisenberg picture of quantum mechanics, unlike the Schrödinger picture, the state vectors are stationary and the operators evolve with time. For the one-dimensional harmonic oscillator, the time-dependent creation (â¹(t)) and annihilation (â(t)) operators can be solved explicitly. The Heisenberg equations of motion for these operators are given by:

â(t)= â(0)e-iwt
â¹(t) = â¹(0)eiwt

where â(0) and â¹(0) are the initial operators at t=0, and w is the angular frequency of the oscillator. These time-dependent operators are then consistent with the previously derived time-dependent position (q(t)) and momentum (p(t)) operators:

q(t) = q(0)cos(wt) + (p(0)/mw)sin(wt)
p(t) = p(0)cos(wt) - mwq(0)sin(wt)

Here, m is the mass of the oscillator, and w is again the angular frequency. This consistency is because the position and momentum operators can be expressed in terms of the creation and annihilation operators. The expressions for â(t) and â¹(t) in the Heisenberg equations demonstrate that these operators oscillate with time in a manner that corresponds to the harmonic nature of the oscillator's motion in quantum mechanics.

The time evolution of any quantum mechanical operator in the Heisenberg picture can be described by the time evolution operator, U, which is unitary. This allows time propagation of operators while keeping the wavefunction unchanged.

Answer:

567.321nm

Explanation:

See attached handwritten document for more details

Answer:

The observed wavelenght on earth will be 5.51x10^-7 m

Explanation:

Speed of light c = 3x10^8 m/s

Ship speed u = 0.203 x 3x10^8 = 60900000 = 6.09x10^7 m/s

Wavelenght of laser w = 691x10^-9 m

Observed wavelenght w' = w(1 - u/c)

u/c = 0.203

w' = 691x10^-9(1 - 0.203)

w' = 5.51x10^-7 m

Answer:

The average induced emf around the border of the circular region is [tex]8.48\times 10^{-5}\ V[/tex].

Explanation:

Given that,

Radius of circular region, r = 1.5 mm

Initial magnetic field, B = 0

Final magnetic field, B' = 1.5 T

The magnetic field is pointing upward when viewed from above, perpendicular to the circular plane in a time of 125 ms. We need to find the average induced emf around the border of the circular region. It is given by the rate of change of magnetic flux as :

[tex]\epsilon=\dfrac{-d\phi}{dt}\\\\\epsilon=A\dfrac{-d(B'-B)}{dt}\\\\\epsilon=\pi (1.5\times 10^{-3})^2\times \dfrac{1.5}{0.125}\\\\\epsilon=8.48\times 10^{-5}\ V[/tex]

So, the average induced emf around the border of the circular region is [tex]8.48\times 10^{-5}\ V[/tex].

Answer:

[tex]84.8\times 10^{-6} V[/tex]

Explanation:

We are given that

Radius,r=1.5 mm=[tex]1.5\times 10^{-3} m[/tex]

[tex]1mm=10^{-3} m[/tex]

Initial magnetic field,[tex]B_0=0[/tex]

Final magnetic field,[tex]B=1.5 T[/tex]

Time,[tex]\Delta t=[/tex]125 ms=[tex]125\times 10^{-3} s[/tex]

[tex]1 ms=10^{-3}s [/tex]

We know that average induced emf

[tex]E=\frac{d\phi}{dt}=-\frac{d(BA)}{dt}=A\frac{dB}{dt}=A\frac{(B-B_0)}{dt}[/tex]

Substitute the values

[tex]E_{avg}=\pi (1.5\times 10^{-3})^2\times \frac{1.5-0}{125\times 10^{-3}}[/tex]

[tex]E_{avg}=84.8\times 10^{-6} V[/tex]

Answer:

1.208

Explanation:

L = Length of tube

c = Speed of light in air

v = Speed of light in jelly

Time taken by light in tube

[tex]\dfrac{L}{c}=8.72[/tex]

Time taken when jelly is present

[tex]\dfrac{L}{v}=8.72+1.82\\\Rightarrow \dfrac{L}{v}=10.54\ ns[/tex]

Dividing the above equations we get

[tex]\dfrac{v}{c}=\dfrac{8.72}{10.54}\\\Rightarrow \dfrac{c}{v}=\dfrac{10.54}{8.72}\\\Rightarrow n=1.208[/tex]

The refractive index of the jelly is 1.208

Answer:

the velocity of the point P located on the horizontal diameter of the wheel at t = 1.4 s  is   [tex]P = 104.04 \hat{i} -314.432 \hat{j}[/tex]

Explanation:

The free-body  diagram below shows the interpretation of the question; from the diagram , the wheel that is rolling in a clockwise directio will have two velocities at point P;

Now;

[tex]V_x = \frac{d}{dt}(12t^3+2) = 36 t^2[/tex]

[tex]V_x = 36(1.7)^2\\\\V_x = 104.04\ ft/s[/tex]

Also,

[tex]-V_y = R* \omega[/tex]

where [tex]\omega[/tex](angular velocity) = [tex]\frac{d\theta}{dt} = \frac{d}{dt}(8t^4)[/tex]

[tex]-V_y = 2*32t^3)\\\\\\-V_y = 2*32(1.7^3)\\\\-V_y = 314.432 \ ft/s[/tex]

∴ the velocity of the point P located on the horizontal diameter of the wheel at t = 1.4 s  is   [tex]P = 104.04 \hat{i} -314.432 \hat{j}[/tex]

Answer:

17.54N in -x direction.

Explanation:

Amplitude (A) = 3.54m

Force constant (k) = 5N/m

Mass (m) = 2.13kg

Angular frequency ω = √(k/m)

ω = √(5/2.13)

ω = 1.53 rad/s

The force acting on the object F(t) = ?

F(t) = -mAω²cos(ωt)

F(t) = -2.13 * 3.54 * (1.53)² * cos (1.53 * 3.50)

F(t) = -17.65 * cos (5.355)

F(t) = -17.57N

The force is 17.57 in -x direction

Answer:

A) ω = 13.38 rev/s

B) ω = 9.167 rev/s

C) In clockwise direction

Explanation:

We are given;

Rotational Inertia of first disk; I_1 = 3.76 kg·m²

Angular velocity of first disk; ω_1 = 436 rev/min = 7.267 rev/s

Rotational Inertia of second disk; I_2 = 9.2 kg·m²

Angular velocity of second disk; ω_2 = 953 rev/min = 15.883 rev/s

Total rotational inertia is;

I_total = I_1 + I_2

I_total = 3.76 + 9.2 = 12.96 kg·m²

Now; total angular momentum will be;

L_total = L_1 + L_2

Where L_1 is angular momentum of first disk and L_2 is angular momentum of second disk.

Thus;

I_total•ω = I_1•ω_1 + I_2•ω_2

Plugging relevant values in, we can find their angular speed after coupling which is ω.

Thus;

12.96ω = (3.76 x 7.267) + (9.2 x 15.883)

12.96ω = 173.44752

ω = 173.44752/12.96

ω = 13.38 rev/s

B) since second disk is now spinning clockwise, thus;

I_total•ω = I_1•ω_1 - I_2•ω_2

12.96ω = (3.76 x 7.267) - (9.2 x 15.883)

12.96ω = -118.8

ω = -118.8/12.96

ω = -9.167 rev/s

The negative sign tells us that it is clockwise.

So we would say ω = 9.167 rev/s in clockwise direction

Answer:

(a) [tex]\sqrt{FL/M}[/tex]

(b) [tex]9 ms^{-1}[/tex]

Explanation:

(a)

The speed of the wave depends on the type of the material. Here we have neoprene sheet so the speed of the wave will depend on the linear density of neoprene sheet. Linear Density is defined as Mass per unit length of the material (as materials of same type can have different thickness). The symbol used for the Linear Density is .

μ = Mass of the sheet / Length of the sheet

The speed of the wave in such material can be be found by using the equation:

[tex]\frac{1}{v^{2} } = {\frac{Linear Density}{Force} }[/tex] (where v is speed)

The equation can be rearranged:

v = [tex]\sqrt{Force/Linear Density}[/tex]

so,

v = sqrt(F/μ)

v = sqrt(F/ (M/L))

v = [tex]\sqrt{FL/M}[/tex] (answer)

(b)

Putting the values

F = 81 N

M = 4kg

L = 4m

v = [tex]\sqrt{FL/M}[/tex]

v = 9m/s

Answer:

Explanation:

The braking force in the context of stopping a vehicle involves the frictional force exerted by the brakes, and it's related to the mass and deceleration of the vehicle. Calculations often use Newton's second law, F = ma, for force, or the work-energy principle, W = F * d * cos(θ), to determine stopping distances.

The formula for braking force isn't provided with a single standard equation, as it relates to several physical quantities, such as friction, mass, and acceleration. However, in the context of vehicle braking, we often analyze the frictional force exerted by the brakes on the car's wheels to determine stopping distance or to calculate the deceleration of the vehicle. The basic physics equation used in this context is Newton's second law, F = ma, where F is the force, m is the mass of the vehicle, and a is the acceleration (which will be negative when braking).

Based on the provided contexts, if a car has a mass (m) and applies a braking force (F), and you want to find the stopping distance (d), you can also use energy equations. The work done by the brakes (W) is equal to the change in the car's kinetic energy, which can be calculated using the equation W = F * d * cos(θ), where θ is the angle at which the force is applied - typically 0 degrees, as the force is in the opposite direction of motion.

Answer:

b.

The merger between two companies allows for several customer options and substantial competition within the industry.

Explanation:

Antitrust authorities will only come in if the merger was to remove competition and reduce consumer options.

Final answer:

Antitrust authorities intervene when firms engage in practices that reduce competition. These practices include abusive use of market power, anticompetitive mergers and acquisitions, and restrictive practices. A merger enhancing competition does NOT warrant such intervention. Thus, option B is correct.

Explanation:

The intervention of antitrust authorities is generally warranted when actions are taken by firms that reduce competition and harm the economic ideal of a competitive market. These actions may include abusive use of market power, mergers and acquisitions that significantly increase market concentration and reduce competition, and various restrictive practices that limit competition, such as tie-in sales, bundling, and predatory pricing.

However, not all actions that affect competition trigger antitrust intervention. For example, if the merger between two companies allows for several customer options and substantial competition within the industry, that would not be a cause for concern for antitrust authorities. In this case, the merger does not lead to abusive market power or reduce competition, and therefore, option b 'The merger between two companies allows for several customer options and substantial competition within the industry' would be the correct answer as it is NOT a cause for intervention by antitrust authorities.

Find the attached photo for the solution

Answer:

2 amps

Explanation:

you just divide

Answer:

0.243 m/s

Explanation:

From law of conservation of motion,

mu+m'u' = V(m+m')................. Equation 1

Where m = mass of the first car, m' = mass of the second car, initial velocity of the first car, u' = initial velocity of the second car, V = Final velocity of both cars.

make V the subject of the equation

V = (mu+m'u')/(m+m')................. Equation 2

Given: m = 260000 kg, u = 0.32 m/s, m' = 52500 kg, u' = -0.14 m/s

Substitute into equation 2

V = (260000×0.32+52500×(-0.14))/(260000+52500)

V = (83200-7350)/312500

V = 75850/312500

V = 0.243 m/s

Answer:

a) [tex]\omega_{f} = 1.012\,\frac{rad}{s}[/tex], b) [tex]\Delta K = - 149.352\,J[/tex]

Explanation:

a) The initial angular speed of the merry-go-round is:

[tex]\omega_{o} = \left(\frac{1\,rev}{4\,s}\right)\cdot \left(\frac{2\pi\,rad}{1\,rev} \right)[/tex]

[tex]\omega_{o} \approx 1.571\,\frac{rad}{s}[/tex]

The final angular speed of the merry-go-round is computed with the help of the Principle of Angular Momentum:

[tex]\left(340\,\frac{kg}{m^{2}}\right)\cdot \left(1.571\,\frac{rad}{s} \right) = \left[340\,\frac{kg}{m^{2}}+(25\,kg)\cdot (2.74\,m)^{2} \right]\cdot \omega_{f}[/tex]

[tex]\omega_{f} = 1.012\,\frac{rad}{s}[/tex]

b) The change in kinetic energy is:

[tex]\Delta K = \frac{1}{2}\cdot \left\{\left[340\,\frac{kg}{m^{2}} + \left(25\,kg\right)\cdot \left(2.74\,m\right)^{2}\right]\cdot \left(1.012\,\frac{rad}{s} \right)^{2} - \left(340\,\frac{kg}{m^{2}} \right)\cdot \left(1.571\,\frac{rad}{s} \right)^{2} \right\}[/tex][tex]\Delta K = - 149.352\,J[/tex]

Answer:

A. 4.40m/s²

B. 4.615N

C. 0.7511J

Explanation:

A. Ac= V²/L

= (2.15)²/1.05

= 4.50m/s²

B. T =Mv²/L + mg

0.325(4.40)+ 0.325(9.8)

= 4.615N

C. K.E = 1/2mv²

=0.7511J

You can also refer to attached handwritten document for more details

Answer:

(a) 4.4 m/s²

(b) 4.615 N.

(c) 0.751 J

Explanation:

(a)

Using,

a' = v²/r..................... Equation 1

Where a' = centripetal acceleration, v = speed of the pendulum bob, r = radius or length of the pendulum bob.

Given: v = 2.15 m/s, r = 105 cm = 1.05 m

Substitute into equation 1

a' = 2.15²/1.05

a' = 4.4 m/s².

(b) The force of tension in the string = Tangential force + weight of the bob.

T = ma'+mg..................... Equation 2

Where T = Force of tension in the string, m = mass of the bob, g = acceleration due to gravity.

Given: m = 325 g = 0.325 kg, a' = 4.4 m/s², g = 9.8 m/s²

Substitute into equation 2

T = 0.325×4.4+0.3325×9.8

T = 1.43+3.185

T = 4.615 N.

(c) Kinetic energy of he bob at that point = 1/2mv²

Ek = 1/2mv²...................... Equation 3

Where Ek = kinetic energy of the bob

Given: m = 0.325 kg, v = 2.15 m/s

Substitute into equation 3

Ek = 1/2(0.325)(2.15²)

Ek = 0.751 J

Answer:

10.16 degrees

Explanation:

Apply Snells Law for both wavelenghts

\(n_{1}sin\theta_{1} = n_{2}sin\theta_{2}\)

For red

(1.620)(sin 25.5) = (1)(sin r)

For red, the angle is 35.45degrees

For violet

(1.660)(sin 25.5) = (1)(sin v)

For violet, the angle is 45.6 degrees

The difference is 45.6- 35.45 = 10.16 degrees

Answer:

the normal to the area of ​​the loop parallel to the wire to induce the maximum electromotive force

Explanation:

 Faraday's law is

       ε = - dΦ / dt

where Ф  magnetic flow

the flow is

      Ф = B. dA = B dA cos θ

 therefore, to obtain the maximum energy, the cosine function must be maximum, for this the direction of the fluctuating magnetic field and the normal direction to the area must be parallel.

The magnetic field in a cable through which current flows is circular, so the loop must be perpendicular to the wire, this is the normal to the area of ​​the loop parallel to the wire to induce the maximum electromotive force

an outline is shown in the attachment

the correct answer is b

Answer:

Explanation:

solution found below

The electric field at a midpoint between two finite charged sheets can be calculated using Gauss's Law. While the field strength would theoretically be zero if the sheets were infinite, because real sheets are finite, the field will not be exactly zero.

This question concerns the physics concept of electric fields originating from two finite charged sheets. Given a point 'a/2' on the x-axis in-between these sheets, the magnitude E of the electric field can be calculated using Gauss's Law. The electric field E due to an infinite sheet of charge is given by σ/2ε₀ (σ is the charge density), which is independent of the distance from the sheet. Hence, for a point which is midway between two such sheets, and each sheet carries charge of opposite polarity, the field strength at that point will be zero. However, since real sheets will not be infinitely large, the field will not be exactly zero. The exact value will depend on the exact geometry of the problem and on the distance from the sheets to the point.

https://brainly.com/question/31366250

#SPJ3

Answer:

(C) The impossibility of having a 100% efficient heat engine is always due to friction or other dissipative effects such as the system is perfectly designed or the material needed for the system design is not available.

Explanation:

The above option was never stated in the law

Answer:

Explanation:

We shall apply law of conservation of momentum .

m₁u₁ + m₂u₂ = m₁v₁ + m₂v₂ ,   m₁ ,m₂ are masses of two bodies colliding with velocities u₁ and u₂ respectively . v₁ and v₂ are their velocities after collision.

m₁ = 1750 , m₂ = 1450 , u₁ = 1.6 m /s , u₂ = - 1.1 m /s , v₁ = .26 m /s

substituting the values

1750 x 1.6 + 1450 x - 1.1 = 1750 x .26 + 1450 v₂

2800 - 1595 = 455 + 1450v₂

1450v₂ = 750

v₂ = .517 m /s

B )  initial kinetic energy

= 1/2 x 1750 x 1.6²+ 1/2 x 1450 x -1.1²

= 2240+ 877.25

= 3117.25 J

final kinetic energy

= 1/2 x 1750 x .26²+ 1/2 x 1450 x .517²

= 59.15 + 193.78

= 252.93

loss of kinetic energy

= 3117.25 - 252.93

= 2864.32 J

Answer:

This structure is determined by the combined effect of deterministic forces and stochastic forces.

Explanation:

Genetic drift refers to random fluctuations in allele frequencies due to chance events , a stochastic (random) force which scrambles the predictable effects of selection, mutation, and gene flow.

Genetic drift is not a potent evolutionary force in very large randomly mating populations. to illustrate the consequences of genetic drift we will consider what happens when drift alone is altering the frequencies of alleles among many small populations. To prove this, we need to understand Population structure, which describes how individuals (or allele frequencies) in breeding populations vary in time and space.

Answer:

Pls refer to attached file

Explanation:

In the case when the frequency and wavelength of this sound wave in air (20 C) so it should be Same frequency, shorter wavelength.

here the speed of the wave should be provided by the following equation.

v = fλ

λ = v/f

here,

f = Frequency

λ = Wavelength

Also, the wavelength is directly proportional to the velocity.

So,  the frequency remains same and the wavelength shortens.

So based on this we can say that In the case when the frequency and wavelength of this sound wave in air (20 C) so it should be Same frequency, shorter wavelength.

learn more about frequency here: https://brainly.com/question/15853432?referrer=searchResults

Final answer:

The sound wave produced by a vibrating guitar string will maintain the same frequency as it travels through the air to our ears because the frequency of a wave depends on its source and doesn't change in a uniform medium. Although the wavelength can change in different mediums, the question context does not specify a medium change; hence, the frequency and wavelength when heard would be the same as produced by the string.

Explanation:

The question is about the behavior of sound waves produced by a vibrating guitar string when they travel through the air. Specifically, it examines how the frequency and wavelength of the sound wave change once it reaches the listener's ear compared to when it is produced by the string.

It's important to note that when a guitar string vibrates at a certain frequency, it creates sound waves that propagate through the air with the same frequency. This is because the frequency of a wave is determined by its source and remains constant as it travels through a uniform medium. However, the wavelength may change if the speed of the wave changes, which depends on the medium's properties.

In the context of sound waves in air at 20°C, the speed of sound is approximately 343 m/s. Considering this, the frequency of the sound wave when it reaches our ears remains the same as the frequency of the vibrating string, because the frequency of a wave only changes if the speed of the wave's source relative to the observer changes, which is not the case here.

The wavelength of the sound wave in the air might differ from the wavelength on the string due to the different speeds of wave propagation in different mediums (the string versus air), but for the purpose of this specific question, such details are beyond the scope provided.

Therefore, the correct answer is 'Same frequency, same wavelength', under the assumption that both the measurements were taken in the air or that the provided wavelength already accounts for the transition from the string to the air.

Answer:

0.255 m

Explanation:

We are given that

Diameter=d=63.5 cm=[tex]63.5\times 10^{-2} m[/tex]

[tex]1 cm=10^{-2} m[/tex]

L=265 km =[tex]265\times 1000=265000 m[/tex]

Wavelength,[tex]\lambda=500nm=500\times 10^{-9} m[/tex]

[tex]1nm=10^{-9} m[/tex]

We have to find the minimum distance between two objects on the ground if their images are to be resolved by this lens.

[tex]sin\theta=1.22\frac{\lambda}{d}[/tex]

[tex]sin\theta=\frac{1.22\times 500\times 10^{-9}}{63.5\times 10^{-2}}[/tex]

[tex]sin\theta=\approx \theta=9.606\times 10^{-7} rad[/tex]

[tex]\frac{y}{L}=tan\theta\approx \theta[/tex]

[tex]y=L\theta=265000\times 9.606\times 10^{-7}=0.255 m[/tex]

Answer:

Explanation:

Given,

initial angular speed, ω = 3,700 rev/min

                                      = [tex]3700\times \dfrac{2\pi}{60}=387.27\ rad/s[/tex]

final angular speed = 0 rad/s

Number of time it rotates= 46 times

angular displacement, θ = 2π x 46 = 92 π

Angular acceleration

[tex]\alpha = \dfrac{\omega_f^2 - \omega^2}{2\theta}[/tex]

[tex]\alpha = \dfrac{0 - 387.27^2}{2\times 92\ pi}[/tex]

[tex]\alpha = -259.28 rad/s^2[/tex]

Answer:

Explanation:

Force on Q due to q₁

= k Q.q₁ / r² , r is distance between two.

X component

= k Q.q₁ / r²  x cos θ ,  θ is angle r makes with x - axis.

= k Q.q₁ / r²  x cos θ

r = a / sinθ

X component

= k Q.q₁ sin²θ . cosθ/ a²  

= k Q.q₁ / 2 a² x sin2θ . sinθ

for maximum value of it ,

sin2θ = 1  , θ = 45°

a / d = tan45

a = d .