An air-track glider is attached to a spring. The glider is pulled to the right and released from rest at t=0 s. It then oscillates with a period of 1.8 s and a maximum speed of 46 cm/s. Part A What is the amplitude of the oscillation? Express your answer in centimeters. A=13 cm What is the glider's position at t=0.26 s ? Express your answer in centimeters. A 1.10 kg block is attached to a spring with spring constant 14 N/m. While the block is sitting at rest, a student hits it with a hammer and almost instantaneously gives it a speed of 33 cm/s. Part A What is the amplitude of the subsequent oscillations? Express your answer in centimeters. A=9.3 cm What is the block's speed at the point where x=0.75A ? Express your answer in centimeters per second.

Answers

Answer 1

Part A The amplitude of the oscillation is 13 cm. the glider's position at t = 0.26 s is approximately -9.8 cm.the amplitude of the subsequent oscillations is 9.3 cm. Part B the required velocity of the block at the point where x = 0.75A is v = A√(k / m) = 9.3√(14 / 1.10) = 31 cm/s

Given,Period, T = 1.8 s Maximum Speed, vmax = 46 cm/sLet Amplitude, A be the amplitude of the oscillation.Part A Amplitude of the oscillation Amplitude of the oscillation is given by;A = vmax * T / (2 * π)Substitute the given values,A = (46 cm/s) * (1.8 s) / (2 * 3.14)A = 13 cm Therefore, the amplitude of the oscillation is 13 cm. Part B Position of the glider at t = 0.26 sThe general equation for displacement of the glider with time is given by;x = A cos (ωt + φ)Where A is the amplitude, ω is the angular frequency and φ is the phase constant.At time t = 0, x = A cos φThe velocity of the glider is maximum at the mean position and zero at the extremities.

Therefore, the glider will cross the mean position when cos(ωt + φ) = 0that is,ωt + φ = 90°ωt = 90° - φ..................(1)Also given, Period T = 1.8 sSo, Angular frequency, ω = 2π / T = 2π / 1.8 rad/s Substitute the given values in (1)0.26 s = (90° - φ) / (2π / 1.8)0.26 s = (90° - φ) * 1.8 / 2πφ = 1.397 radx = A cos (ωt + φ)x = A cos [ω(0.26) + 1.397]x = A cos (0.753 + 1.397) = A cos 2.15 = -9.8 cm (Approx)Therefore, the glider's position at t = 0.26 s is approximately -9.8 cm.

A 1.10 kg block is attached to a spring with spring constant 14 N/m. Let the amplitude of the subsequent oscillations be A. Let vmax be the maximum velocity and v be the velocity of the block when x = 0.75A.Part A Amplitude of the subsequent oscillation Amplitude of the subsequent oscillation is given by,A = vmax / ωWhere ω is the angular frequencySubstitute the given values,vmax = A * ωHence,A = vmax / ω = √(k / m) * A = √(14 N/m / 1.10 kg) * A = 3.09A = 9.3 cmTherefore, the amplitude of the subsequent oscillations is 9.3 cm.

Part B Velocity of the block at x = 0.75ATotal energy of the system is given by;E = 1/2 kA²At x = 0.75A, the block has only potential energy.E = 1/2 k(0.75A)²= 0.42 kA²Total energy is also given by,E = 1/2 mv²v = √(2E / m)= √(kA² / m)= A√(k / m)At x = 0.75A, v = A√(k / m)At x = 0.75A,A = 9.3 cmK = 14 N/mM = 1.10 kgTherefore, the required velocity of the block at the point where x = 0.75A is v = A√(k / m) = 9.3√(14 / 1.10) = 31 cm/s (Approx).

Learn more about velocity here,

https://brainly.com/question/80295

#SPJ11


Related Questions

A 66.1 kg runner has a speed of 5.10 m/s at one instant during a long-distance event. (a) What is the runner's kinetic energy at this instant (in J)? J (b) How much net work (in J) is required to double her speed? ] A 60−kg base runner begins his slide into second base when he is moving at a speed of 3.4 m/s, The coefficient of friction between his clothes and Earth is 0.70. He slides so that his speed is zero just as he reaches the base. (a) How much mechanical energy is lost due to friction acting on the runner? 1 (b) How far does he slide? m

Answers

The runner's kinetic energy at that instant is 857.30 J, and the net work required to double the runner's speed is 2574.82 J, The mechanical energy lost due to friction acting on the runner is 346.8 J, and the base runner slides approximately 0.849 meters.

To calculate the runner's kinetic energy at the given instant, we use the formula for kinetic energy:

KE = (1/2) * m * v^2

Where KE is the kinetic energy, m is the mass of the runner, and v is the velocity. Plugging in the given values, we have

KE = (1/2) * 66.1 kg * (5.10 m/s)^2 = 857.30 J.

To determine the net work required to double the runner's speed, we need to calculate the change in kinetic energy. Doubling the speed will result in a new velocity of

2 * 5.10 m/s = 10.20 m/s.

The initial kinetic energy is

KE1 = (1/2) * 66.1 kg * (5.10 m/s)^2 = 857.30 J.

The final kinetic energy is

KE2 = (1/2) * 66.1 kg * (10.20 m/s)^2 = 3432.12 J.

The change in kinetic energy is

ΔKE = KE2 - KE1 = 3432.12 J - 857.30 J = 2574.82 J.

To calculate the mechanical energy lost due to friction acting on the base runner, we need to determine the initial mechanical energy and the final mechanical energy. Mechanical energy is the sum of kinetic energy and potential energy.

The initial kinetic energy is

KE1 = (1/2) * 60 kg * (3.4 m/s)^2 = 346.8 J.

The initial potential energy is

PE1 = 60 kg * 9.8 m/s^2 * 0 = 0 J (assuming the base is at ground level).

The initial mechanical energy is

E1 = KE1 + PE1 = 346.8 J.

The final kinetic energy is

KE2 = (1/2) * 60 kg * (0 m/s)^2 = 0 J (since the speed is zero).

The final potential energy is

PE2 = 60 kg * 9.8 m/s^2 * 0 = 0 J.

The final mechanical energy is

E2 = KE2 + PE2 = 0 J.

The mechanical energy lost is

ΔE = E2 - E1 = 0 J - 346.8 J = -346.8 J

(negative sign indicates energy loss).

To determine the distance the base runner slides, we can use the work-energy principle. The work done by friction is equal to the change in mechanical energy. The work done by friction is

W = -ΔE = -(-346.8 J) = 346.8 J.

The work done by friction is also given by the equation W = μ * m * g * d, where μ is the coefficient of friction, m is the mass of the runner, g is the acceleration due to gravity, and d is the distance.Solving for d, we have

d = W / (μ * m * g) = 346.8 J / (0.70 * 60 kg * 9.8 m/s^2)

≈ 0.849 m.

To learn more about kinetic energy

brainly.com/question/999862

#SPJ11

i). A 510 grams in radionuclide decays 315 grams in 240 years. What is the half-life of the radionuclide? ii). If the energy of the hydrogen atom is -13.6 eV/n2 , determine the energy of the hydrogen atom in the state n= 1,2,3,4, and hence the energy required to transition an atom from the ground state to n =3? [1eV = 16 x10-19 J ]

Answers

The half-life of the radionuclide is approximately 412.83 years.

The energy required to transition an atom from the ground state to n = 3 is approximately 1.9344 x 10^-18 J.

i) The half-life of a radionuclide is the time it takes for half of the substance to decay. We can use the decay equation to find the half-life.

Let's denote the initial mass as m₀ and the final mass as m. The decay equation is given by:

m = m₀ * (1/2)^(t / T)

where t is the time passed and T is the half-life.

In this case, the initial mass is 510 grams and the final mass is 315 grams.

315 = 510 * (1/2)^(240 / T)

Divide both sides by 510:

(1/2)^(240 / T) = 315 / 510

Take the logarithm of both sides (base 1/2):

240 / T = log(315 / 510) / log(1/2)

Solve for T:

T = 240 / (log(315 / 510) / log(1/2))

Using a calculator, we can evaluate this expression:

T ≈ 412.83 years

ii) The energy of the hydrogen atom in the state n is given by the formula:

E = -13.6 eV/n^2

We are asked to find the energy of the hydrogen atom in states n = 1, 2, 3, and 4.

For n = 1:

E₁ = -13.6 eV/1^2 = -13.6 eV

For n = 2:

E₂ = -13.6 eV/2^2 = -13.6 eV/4 = -3.4 eV

For n = 3:

E₃ = -13.6 eV/3^2 = -13.6 eV/9 ≈ -1.51 eV

For n = 4:

E₄ = -13.6 eV/4^2 = -13.6 eV/16 = -0.85 eV

To calculate the energy required to transition from the ground state (n = 1) to n = 3, we subtract the energy of the ground state from the energy of the final state:

ΔE = E₃ - E₁ = (-1.51 eV) - (-13.6 eV) = 12.09 eV

Since 1 eV = 16 x 10^-19 J, we can convert the energy to joules:

ΔE = 12.09 eV * 16 x 10^-19 J/eV ≈ 1.9344 x 10^-18 J

To know more about hydrogen atom

https://brainly.com/question/30886690

#SPJ11

A two-turn circular wire loop of radius 0.424 m lies in a plane perpendicular to a uniform magnetic field of magnitude 0.258 T. If the entire wire is reshaped from a twoturn circle to a one-turn circle in 0.15 s (while remaining in the same plane), what is the magnitude of the average induced emf E in the wire during this time? Use Faraday's law in the form E=− Δt
Δ(NΦ)
.

Answers

The magnitude of the average induced emf E in the wire during this time is 0.728 V.

Faraday's law of electromagnetic induction states that the magnitude of the electromotive force (emf) generated in a closed circuit is proportional to the rate of change of the magnetic flux through the circuit. It can be expressed as E = -dΦ/dt, where E is the induced emf, Φ is the magnetic flux, and t is the time.Φ = BA cos θwhere Φ is the magnetic flux, B is the magnetic field strength, A is the area of the loop, and θ is the angle between the magnetic field and the plane of the loop. Given data:Radius of the wire loop, r = 0.424 mMagnetic field strength, B = 0.258 TTime taken, Δt = 0.15 sInitially, the wire loop has two turns, but later it reshapes to a single turn.

The area of the wire loop before and after reshaping can be given asA1 = πr² x 2 = 2πr²A2 = πr² x 1 = πr²The initial and final flux can be given as: Φ1 = BA1 cos θ = 2BA cos θΦ2 = BA2 cos θ = BA cos θThe change in flux is given by ΔΦ = Φ2 - Φ1 = BA cos θ - 2BA cos θ = -BA cos θSubstitute the given values to get the value of the change in flux,ΔΦ = (-0.424 m x 0.258 T) x cos 90° = -0.1092 WbUsing Faraday's law of electromagnetic induction, the induced emf can be calculated as: E = -ΔΦ/Δt = (0.1092 Wb)/(0.15 s) = 0.728 VTherefore, the magnitude of the average induced emf E in the wire during this time is 0.728 V.

Learn more about magnitude here,

https://brainly.com/question/30337362

#SPJ11

The switch is closed for a long time. It opens at t-0. i) Find i, (0+) and v₂ (0+) [3 pts] X1=0 692 12 V 2H 0.4 F For t > 0, what kind of system response does the series RLC circuit produce for i(t)? (Underdamped, overdamped, critically damped). Also, express the form of the solution. Find di(0*) and dv (0*) dt dt Iz(t) 492 :ve(t)

Answers

The current in the series RLC circuit is given by the equation i(t) = X1 * exp(-t/(2RC)) * sin(√(1/(LC) - (1/(2RC))^2)t). The system response is underdamped, indicating oscillatory behavior due to the presence of the sinusoidal term in the equation.

[tex]i(0∗)[/tex] represents the current at time

[tex]�=0+t=0 +[/tex]

 (just after the circuit switch is closed).

[tex]��(0∗)��dtdv(0 ∗ )[/tex]

​  represents the derivative of voltage with respect to time at

[tex]�=0+t=0 + .��(�)=492[/tex]

[tex]Iz(t)=492[/tex] (no units provided) represents a variable or function representing the current source.

[tex]��(�)v e​[/tex]

(t) represents the voltage across the capacitor as a function of time.

The current in the series RLC circuit is given by the equation:

[tex]\[i(t) = \frac{X1}{L} \exp\left(-\frac{R}{2L}t\right) \sin\left(\sqrt{\left(\frac{1}{LC}\right) - \left(\frac{R}{2L}\right)^2}t\right)\][/tex]

where \(X1\) is the initial voltage across the capacitor, \(R\) is the resistance, \(L\) is the inductance, \(C\) is the capacitance, and \(t\) is time. The system response of the circuit is underdamped.

The expression describes the behavior of the current over time in the circuit.

We are given the following values:[tex]X1=0.69212 V, R = 2 Ω, L = 0.4 H, C = 1[/tex] F and i(t) is the current. Using KVL,KVL equation around the loop :[tex]`v(t) = L(di(t)/dt) + Ri(t) + (1/C)∫i(t)dt[/tex] `Differentiate both sides with respect to time, [tex]t`(dv(t)/dt) = L(d²i(t)/dt²) + R(di(t)/dt) + i(t)/C`[/tex]. Now, we have to find the value of i(0+) and v2(0+).Given, X1 = 0.69212 V. Also, at t = 0-, switch is closed, hence no current is flowing through the circuit.

Hence, [tex]X1 = v(0-) = v(0+)[/tex] .Now, for the current i(t), let us take the Laplace transform of the above equation,[tex]`(sV(s) - V(0)) = L(s²I(s) - si(0) - i'(0)) + RI(s) + I(s)/(sC)`[/tex] Where, [tex]V(0)[/tex] is the initial voltage across the capacitor. Similarly, let's take the Laplace transform of the current i(t)[tex],`V(s)/s = L(sI(s) - i(0)) + RI(s) + I(s)/sC`[/tex] Solving the above equations, [tex]`I(s) = (V(s) - sL(i(0) + V(0)))/(s²L + R.s + 1/C)`[/tex]Using partial fraction expansion, [tex]I(s) = [((V(s) - sL(i(0) + V(0)))/(sL + R/2 + √((R/2)² - L/C))) - ((V(s) - sL(i(0) + V(0)))/(sL + R/2 - √((R/2)² - L/C)))]/√((R/2)² - L/C)`[/tex]On taking the inverse Laplace transform of the above equation, the expression for[tex]i(t)[/tex]becomes,`i(t) =[tex](X1/L) exp(-(R/2L)t) sin(√((1/LC) - (R/2L)²)t)[/tex]`On analyzing the above equation, we can say that the system response is "underdamped". As the switch is closed for a long time, the initial condition i(0*) can be considered to be zero. [tex]dv(0*)/dt = (Iz - i(0+))/C.[/tex]

Now, `[tex]di(0*)/dt = d/dt [Iz - i(0+)/C]` = - d/dt [i(0+)/C] = 0.[/tex] So, [tex]di(0*)/dt = 0.[/tex] Hence, [tex]i(0*) = i(0+) = 0.[/tex]Thus, the system response of the series RLC circuit is "underdamped". The expression for the current i(t) is `i(t) = [tex](X1/L) exp(-(R/2L)t) sin(√((1/LC) - (R/2L)²)t)`.[/tex]

To know more about RLC circuit click here:

https://brainly.com/question/32069284

#SPJ11

A block with is mans of 1.50 kgia aliding along a lewel, filetionlest surface at a constant volocity of 3.10 m/s when it meats an uncomprossod spring. The spring comprossae 11.1 cm batore the block atopes. What is the SFELRG COnStant? a) 1+26 N/π b) 1110 N/x (c) 40.8 N/m d) 535 N/ti c) 358 N/m

Answers

The spring constant (k) can be determined using the given information about the block's mass, velocity, and the compression of the spring. the correct option is c) 40.8 N/m.

The spring constant (k) represents the stiffness of the spring and is calculated using Hooke's Law, which states that the force exerted by a spring is directly proportional to its displacement. The formula for the spring constant is k = F/x, where F is the force exerted by the spring and x is the displacement.

-kx = m * v.Given that the block's mass is 1.50 kg, the velocity is 3.10 m/s, and the compression of the spring is 11.1 cm (0.111 m), we can solve for the spring constant:k = -(m * v) / x

Substituting the values, we get:

k = -(1.50 kg * 3.10 m/s) / 0.111 m

Evaluating the expression gives us:

k ≈ -40.8 N/m

Learn more about spring constant here:

https://brainly.com/question/13608225

#SPJ11

Determine the length of a copper wire that has a resistance of 0.282 g and a cross-sectional area of ​​0.000038 m2. The resistivity of copper is 1.72 × 10⁻⁸ m. From your answer with no decimal place.

Answers

Answer: The length of the copper wire is 6,045 m.

Resistivity of copper, ρ = 1.72 × 10⁻⁸ m

Resistance, R = 0.282 g

Cross-sectional area, A = 0.000038 m²

We can use the formula for resistance of a wire, R = ρL / A, where L is the length of the wire. Substituting the given values,

0.282 g = (1.72 × 10⁻⁸ m) × L / 0.000038 m²

Solving for L gives; L = 0.282 g × 0.000038 m² / (1.72 × 10⁻⁸ m)L = 6.045 × 10³ m.

Therefore, the length of the copper wire is 6,045 m.

Learn more about resistance: https://brainly.com/question/17563681

#SPJ11

What is a cutoff frequency? O The frequency at which a device stops operating O The threshold between good and poor frequencies The value at which a filter 'takes effect' and begins to attenuate frequencies O A frequency either above or below a circuit's power output O The frequency at which a device can no longer receive a good connection
If we want to filter out noise at 120Hz and keep a signal at 10Hz, what kind of filter would be the best choice to use? O low-pass filter O high-pass filter O band-pass filter O band-stop filter

Answers

The cut-off frequency is the frequency at which a filter 'takes effect' and starts attenuating frequencies.

A low-pass filter is a filter that allows signals below a certain frequency, known as the cutoff frequency, to pass through while attenuating signals above the cutoff frequency. Similarly, a high-pass filter is a filter that allows signals above the cutoff frequency to pass while attenuating signals below the cutoff frequency.  The best filter choice to use when filtering out noise at 120Hz and keeping a signal at 10Hz is a low-pass filter.The reason is that a low-pass filter allows frequencies below the cutoff frequency to pass, while frequencies above the cutoff frequency are attenuated, which is exactly what is required in this case.

In the given scenario, if we want to filter out noise at 120 Hz and keep a signal at 10 Hz, the best choice of filter would be a low-pass filter. A low-pass filter allows frequencies below a certain cutoff frequency to pass through while attenuating frequencies above that cutoff. By setting the cutoff frequency of the low-pass filter to 10 Hz, it would allow the desired signal at 10 Hz to pass through while attenuating the noise at 120 Hz and higher frequencies.

To learn more about Cutoff frequency, visit:

https://brainly.com/question/32614451

#SPJ11

A student gets her car stuck in a snow drift. Not at a loss, having studied physics, she attaches one end of a rope to the vehicle and the other end to the trunk of a nearby tree, allowing for a small amount of slack. The student then exerts a force F on the center of the rope in the direction perpendicular to the car-tree line as shown. Assume equilibrium conditions and that the rope is inextensible. How does the magnitude of the force exerted by the rope on the car compare to that of the force exerted by the rope on the tree? 1. ∣F t

∣=2∣F c

∣ 2. Cannot be determined 3. ∣F t

∣>∣F c

∣ 4. ∣F t

∣=∣F c

∣=T 5. ∣F t

∣<∣F c

∣ 004 (part 2 of 2) 10.0 points What is the magnitude of the force on the car if L=19.7 m,d=2.26 m and F=596 N ? Answer in units of N.

Answers

The magnitude of the force exerted by the rope on the car is equal to the force exerted by the rope on the tree. The correct option is 4

This is because the system is in equilibrium, meaning there is no net force acting in any direction. In equilibrium, the tension in the rope is the same throughout its length.

∣Ft∣ = ∣Fc∣ = T, where T represents the tension in the rope.

Given the values L = 19.7 m, d = 2.26 m, and F = 596 N, the magnitude of the force on the car (Fc) is equal to the tension in the rope (T), which is 596 N. Both the car and the tree experience the same magnitude of force due to the inextensible nature of the rope and the equilibrium conditions. Therefore, the correct option is 4.

To know more about equilibrium, here

brainly.com/question/30694482

#SPJ4

QUESTION 2 Water flows over a waterfall of 100 m in height. Assume 1 kg of the water as the system, and take that it does not exchange energy with its surroundings. 2.1 What is the potential energy of the water at the top of the falls with respect to the base of the falls? 2.2 What is the kinetic energy of the water just before it strikes bottom? 2.3 After the 1 kg of water enters the stream below the falls, what change has occurred in its state?

Answers

2.1. The potential energy of the water at the top of the falls with respect to the base of the falls is 981 J.2.2 The kinetic energy of the water just before it strikes bottom is 981 J.2.3The state of the water changes from kinetic energy to internal energy.

2.1 Potential energy of the water at the top of the falls with respect to the base of the fallsThe potential energy of the water at the top of the falls with respect to the base of the falls is given byPE = mghWhere,m = 1 kg, g = 9.81 m/s², h = 100 mPutting the given values in the above formula we get,PE = 1 × 9.81 × 100 = 981 J.

Therefore, the potential energy of the water at the top of the falls with respect to the base of the falls is 981 J.

2.2 Kinetic energy of the water just before it strikes bottomThe kinetic energy of the water just before it strikes bottom is given byKE = 1/2 mv²Where,m = 1 kg, v = ?KE = 981 J (the potential energy of the water).

As per the law of conservation of energy, the potential energy of water at the top of the falls gets converted into kinetic energy just before it strikes the bottom.Therefore, KE = PEAs we know,KE = 1/2 mv²Therefore,1/2 mv² = 981On solving the above equation we get,v² = 1962v = √1962 = 44.28 m/sTherefore, the kinetic energy of the water just before it strikes bottom is 981 J.

2.3 After the 1 kg of water enters the stream below the falls, what change has occurred in its state?After the 1 kg of water enters the stream below the falls, the kinetic energy of the water gets converted into internal energy. This is due to the collisions of water molecules in the stream.

The internal energy in water molecules increases due to the collisions, and the temperature of the water also increases. Therefore, the state of the water changes from kinetic energy to internal energy.

Learn more about Kinetic energy here,

https://brainly.com/question/8101588

#SPJ11

Is the elastic potential energy stored in a spring greater when the spring is stretched by 3 cm or when it is compressed by 3 cm? Explain your answer.(4 marks) 4. Two people are riding inner tubes on an ice-covered (frictionless) lake. The first person has a mass of 65 kg and is travelling with a speed of 5.5 m/s. He collides head-on with the second person with a mass of 140 kg who is initially at rest. They bounce apart after the perfectly elastic collision. The final velocity of the first person is 2.1 m/s in the opposite direction to his initial direction. (a) Are momentum and kinetic energy conserved for this system? Explain your answer. (b) Determine the final velocity of the second person. (6 marks)

Answers

The elastic potential energy stored in a spring is greater when the spring is stretched by 3 cm. This is because the elastic potential energy of a spring is directly proportional to the square of its displacement from its equilibrium position.

(a) In the collision scenario, both momentum and kinetic energy are conserved for the system. Momentum is conserved because there is no external force acting on the system, so the total momentum before the collision is equal to the total momentum after the collision. The total kinetic energy before the collision is equal to the total kinetic energy after the collision.
(b) To determine the final velocity of the second person. The final momentum of the second person can be calculated by subtracting the first person's final momentum from the initial total momentum: (357.5 kg·m/s) - (-136.5 kg·m/s) = 494 kg·m/s. Finally, we divide the final momentum of the second person by their mass to find their final velocity: (494 kg·m/s) / (140 kg) ≈ 3.53 m/s. Therefore, the final velocity of the second person is approximately 3.53 m/s in the opposite direction to their initial direction.

Learn more about energy here;

https://brainly.com/question/21175118

#SPJ11

At higher frequencies of an LRC circuit, the capactive reactance becomes very large. True False

Answers

False. At higher frequencies of an LRC (inductor-resistor-capacitor) circuit, the capacitive reactance does not become very large.

In an LRC circuit, the reactance of the capacitor (capacitive reactance) and the reactance of the inductor (inductive reactance) both depend on the frequency of the applied alternating current. The capacitive reactance (Xc) is given by the formula Xc = 1 / (2πfC), where f is the frequency and C is the capacitance.

At higher frequencies, the capacitive reactance decreases rather than becoming very large. As the frequency increases, the capacitive reactance decreases inversely proportionally. This means that the capacitive reactance becomes smaller as the frequency increases.

On the other hand, the inductive reactance (Xl) of an inductor in the LRC circuit increases with increasing frequency. This implies that the inductive reactance becomes larger as the frequency increases.

Therefore, at higher frequencies, the capacitive reactance decreases while the inductive reactance increases. This behavior is fundamental to understanding the impedance of an LRC circuit at different frequencies.

Learn more about LRC circuit here:

https://brainly.com/question/17656439

#SPJ11

What is a convergent lens?
What is a divergent lens?
How do we find out the focal length of a convergent lens?
How does a refractive telescope work?
Explain the physical characteristics of the images the form by the refractive and reflective telescopes.

Answers

A convergent lens is a lens that refracts light and forms a real or virtual image of an object. This type of lens is thicker at the center than at the edges and is also known as a convex lens. Light passing through a convergent lens is brought to a focal point, causing the rays to converge on a single point.

A divergent lens is a lens that spreads out the light rays that enter it and forms a virtual image. This type of lens is thinner at the center than at the edges and is also known as a concave lens. The light passing through the lens is bent in a way that causes the rays to diverge away from a single point.

The focal length of a convergent lens can be found using the lens equation, which is given as:

1/f = 1/v - 1/u

Where f is the focal length of the lens, v is the distance from the lens to the image, and u is the distance from the lens to the object.

A refractive telescope works by using two lenses, a convergent lens to collect light and a divergent lens to magnify the image. The light enters the telescope and is collected by the convergent lens, which focuses the light to a point. The light then passes through the divergent lens, which magnifies the image and forms a virtual image for the observer to see.

The physical characteristics of the images formed by refractive and reflective telescopes are different. Refractive telescopes produce images that are chromatic, meaning they have different colors around the edges of the image. They also produce images that are slightly distorted due to the lens being curved. Reflective telescopes produce images that are not chromatic and are free of the distortion that is produced by the curvature of the lens.

A convergent lens refracts light and forms a real or virtual image, while a divergent lens spreads out the light rays and forms a virtual image. The focal length of a convergent lens can be found using the lens equation. Refractive telescopes use lenses to collect and magnify light, while reflective telescopes use mirrors to reflect the light and form an image. The physical characteristics of the images formed by refractive and reflective telescopes are different.

To know more about virtual image visit:

brainly.com/question/33019110

#SPJ11

Three charged conducting metal balls are hanging from non-conducting strings. Initially, ball #1 has a charge of -12 uc, ball #2 has 22 uC, and ball #3 has -11 PC. Ball #1 is brought in contact with ball #2 and then the two are separated. Ball #2 is then moved over and brought into contact with ball #3, after which the two are separated. What are the final charges on each ball?

Answers

The final charges on each ball are as follows:

Ball #1: 10 μC

Ball #2: -1 μC

Ball #3: -1 μC

To determine the final charges on each ball, we need to consider the transfer of charge when the balls come in contact with each other. When two conductive objects come in contact, charge can flow between them until they reach equilibrium.

Let's analyze the situation step by step:

Step 1: Ball #1 (-12 μC) is brought in contact with Ball #2 (22 μC).

When the two balls touch, electrons will flow from the negatively charged Ball #1 to the positively charged Ball #2 to equalize the charge distribution.

The net charge after contact will be the sum of the initial charges on Ball #1 and Ball #2.

Net charge = -12 μC + 22 μC = 10 μC

Ball #1 and Ball #2 now have the same charge of 10 μC each.

Step 2: Ball #2 (10 μC) is moved over and brought into contact with Ball #3 (-11 μC).

When the two balls touch, charge will flow to equalize the charge distribution.

Since Ball #2 has a higher charge, electrons will flow from Ball #2 to Ball #3.

The net charge after contact will be the sum of the initial charges on Ball #2 and Ball #3.

Net charge = 10 μC - 11 μC = -1 μC

Ball #2 now has a charge of -1 μC, and Ball #3 has a charge of -1 μC.

Step 3: Ball #1 (10 μC) is separated from Ball #2 (-1 μC).

The charges remain unchanged since they are no longer in contact.

To knwo more about electrons

https://brainly.com/question/12001116

#SPJ11

A positive charge 6.0°C at X is 6cm away north of the origin. Another positive charge 6.0°C at Y is 6cm away south of the origin. Find the electric field at point P, 8cm away east of the origin (2 marks). Provide a diagram also indicating the electric field at P as a vector sum at the indicated location Calculate the electric force at Pif a 5.04C were placed there Calculate the electric force the stationary charges were doubled Derive an equation for the electric field at P if the stationary charge at X and Y are replaced by 9x = 9,, and 9, = 9. 9. 9. . =

Answers

The electric field at point P, located 8 cm east of the origin, due to two positive charges at X and Y can be calculated. The electric force at point P can also be determined by considering a test charge.

To find the electric field at point P, we need to consider the contributions from the two charges at X and Y. The electric field at P due to a single charge can be calculated using the formula E = kQ/r^2, where E is the electric field, k is the Coulomb's constant, Q is the charge, and r is the distance between the charge and the point of interest.

Given that the charges at X and Y are both +6.0 µC (microcoulombs) and their distances from the origin are 6 cm (or 0.06 m) in opposite directions, the electric field at P can be determined by calculating the individual electric fields due to each charge and then adding them as vectors.

Next, to calculate the electric force at P, we need to introduce a test charge (Q') and use the formula F = Q'E, where F is the electric force and E is the electric field at P.

If a test charge of 5.04 C were placed at P, we can calculate the electric force by substituting the values of Q' and E into the formula.

To determine the electric force when the charges at X and Y are doubled, we can use the formula F = (2Q)(E) since the electric force is directly proportional to the magnitude of the charge.

To derive an equation for the electric field at P when the charges at X and Y are replaced by 9x and 9y respectively, we can use the formula E = (kQ)/(r^2) and substitute the new charge values.

Learn more about electric field here:

https://brainly.com/question/30544719

#SPJ11

A machinist bores a hole of diameter \( 1.34 \mathrm{~cm} \) in a Part \( A \) steel plate at a temperature of \( 27.0^{\circ} \mathrm{C} \). You may want to review (Page) What is the cross-sectional

Answers

The problem is a case of linear expansion of solids. If there is a change in temperature in an object, then the length of the object also changes. And in this situation, the diameter of the hole changes. The diameter of a hole is directly proportional to the length of the plate. Hence, the formula for this situation would be ΔL=αLΔT

Where, ΔL is the change in length of the plate, L is the initial length of the plate, ΔT is the change in temperature of the plate, and α is the coefficient of linear expansion of the plate.

The formula for the diameter of the hole would beΔd=2αLΔTwhere, Δd is the change in diameter of the plate.

It is given that the initial diameter of the hole, d = 1.34 cm, the initial temperature, T = 27 °C, ΔT = 80 °C

Therefore, the change in diameter is,Δd = 2αLΔTWe know that steel is a metal and its coefficient of linear expansion, α is 1.2 × 10^(-5) K^(-1).

The value of L is not given.

So, let's assume that the coefficient of linear expansion of the steel is constant and also the value of L is constant.

Δd = 2αLΔTΔd

= 2 × 1.2 × 10^(-5) × L × 80Δd

= 1.92 × 10^(-3) L

The value of L can be calculated as,

L = Δd / (1.92 × 10^(-3))L = 0.7 m = 70 cm

Therefore, the length of the steel plate is 70 cm.

Thus, the answer is: The length of the steel plate is 70 cm.

Learn more about change in temperature here

https://brainly.com/question/27988898

#SPJ11

A car is initially traveling along a highway at vo–30 m/s. A truck, which is S-10 meter away in front of the car, is also traveling along the highway at the same spoed vo^30 mv's in the same direction at the side lane. Atr-o the car begins to accelerate at a constant acceleration in order to pass the truck. It takes the car ty -2 seconds to pass the truck. Please calculate the acceleration of the car. a- (Please provide your numerical answer without unit! Please write your numerical answer with all digits and do not use scientific notation. If you are not sure about the number of significant figures, you can keep the number of figures as many as possible - You will not be punished for doing this. No unit in your answer.)

Answers

The acceleration of the car is 35 m/s².

Given:

Speed of car initially, vo = vo - 30 m/s

Speed of truck, vo = vo

Speed of car after passing truck = vo + 30 m/s

Distance between car and truck, S = 10 m

Time taken by car to pass the truck, t = 2 s

To calculate:

Acceleration of the car, a

We can use the formula:

S = ut + 1/2 at^2

Here, initial velocity, u = vo - 30 m/s,

final velocity, v = vo + 30 m/s, and

distance, S = 10 m.

We need to calculate the acceleration,

a.

By substituting the given values in the above formula, we get:

S = (vo - 30) × 2 + 1/2 a(2)^2

Simplifying this we get:

10 = 2vo - 60 + 2aOn

simplifying this we get:

2a = 70 - 2voa = 35 - vo

We know that, vo = vo - 30

So, a = 65 - vo

Substituting vo = 30 m/s in the above equation,

we get:

a = 35 m/s²

Therefore, the acceleration of the car is 35 m/s².

Learn more about acceleration here

https://brainly.com/question/460763

#SPJ11

Explain in your own words the statement that claims: ""Coulomb's law is the solution to the differential form of Gauss law."" You may provide examples to explain your point.

Answers

Coulomb's law is the solution to the differential form of Gauss law because Coulomb's law describes the electrostatic force between two charged particles.

1. According to Coulomb's law, the force between two point charges is directly proportional to the product of their charges and inversely proportional to the square of the distance between them.

2. Gauss's law, on the other hand, relates the distribution of electric charges to the electric field they produce.

3. Gauss's law can be used to derive Coulomb's law, but Coulomb's law is a more basic law. It provides a direct method for calculating the electric field produced by a charged object, while Gauss's law is used to calculate the electric field produced by a distribution of charges.

4. For example, consider a point charge Q. Coulomb's law states that the electric field produced by this charge at a distance r from it is given by E = kQ/r², where k is the Coulomb constant. Gauss's law, on the other hand, can be used to calculate the electric field produced by a distribution of charges, such as a uniformly charged sphere.

Learn more about Coulombs law:

https://brainly.com/question/506926

#SPJ11

Find solutions for your homework
science
earth sciences
earth sciences questions and answers
no need explanation, just give me the answer pls 11. why are there only large impact craters on venus? a. there are only large impact craters on venus because most smaller asteroids and meteors have been cleared out of the inner solar system over the last few billion years. b. there are actually impact craters of all sizes
Question: No Need Explanation, Just Give Me The Answer Pls 11. Why Are There Only Large Impact Craters On Venus? A. There Are Only Large Impact Craters On Venus Because Most Smaller Asteroids And Meteors Have Been Cleared Out Of The Inner Solar System Over The Last Few Billion Years. B. There Are Actually Impact Craters Of All Sizes
No need explanation, just give me the answer pls
11. Why are there only large impact craters on Venus?
A.There are only large impact craters on Venus because most smaller asteroids and meteors have been cleared out of the inner solar system over the last few billion years.B.There are actually impact craters of all sizes on the surface of Venus.C.There are only large impact craters on Venus because geological activity erodes impact craters over time.D.There are only large impact craters on Venus because only large meteors and asteroids survive their fall through the planet's thick and corrosive atmosphere.E.There are only large impact craters on Venus because the weather on the planet erodes impact craters over time.

Answers

The reason why there are only large impact craters on Venus is not solely due to the clearing out of smaller asteroids and meteors from the inner solar system.

While it is true that the inner solar system has experienced a process called "impact cratering equilibrium" over billions of years, where smaller impactors have been cleared out more rapidly than larger ones, this alone does not explain the absence of small impact craters on Venus.

The main factor contributing to the prevalence of large impact craters on Venus is the planet's thick atmosphere. Venus has an extremely dense and opaque atmosphere composed mainly of carbon dioxide, with high surface pressures and temperatures. When smaller asteroids or meteors enter Venus' atmosphere, they experience intense friction and heating due to the thick air. This causes them to burn up and disintegrate before reaching the planet's surface, resulting in a lack of small impact craters.

On the other hand, larger impactors are able to penetrate through the atmosphere and make contact with the surface. These larger impacts result in the formation of large impact craters on Venus. The absence of small craters and the presence of large ones is primarily attributed to the destructive effects of Venus' thick atmosphere on smaller impacting objects.

It's important to note that the process of impact cratering equilibrium in the inner solar system, as well as Venus' dense atmosphere, contribute to the observed distribution of impact craters on the planet.

Learn more about Venus

https://brainly.com/question/32829149

#SPJ11

For the circuit shown below VB = 12V. The source voltage is Vs(t) = 18 sin (240лt) V and the resistance R = 100 2, use SIMULINK to construct a model to: 1-Measre the Input voltage for three periods. 2-Measure the current flowing through the diode for three periods. R ** V₂ V₂
Previous question

Answers

The model can be used to measure the input voltage for three periods and measure the current flowing through the diode for three periods of the given circuit. To construct a model using SIMULINK to measure the input voltage for three periods and measure the current flowing through the diode for three periods of a circuit, the following steps are followed:

To construct a model in SIMULINK to measure the input voltage and current flowing through the diode for three periods in the given circuit, follow these steps:

1. Open SIMULINK and create a new model.

2. Add a Sinusoidal Source block to the model. Double-click on the block to configure it.

  - Set the Amplitude parameter to 18.

  - Set the Frequency parameter to 240.

  - Set the Phase parameter to 0.

  - Set the DC Offset parameter to 0.

3. Connect the Sinusoidal Source block to the input of the circuit.

4. Add a Voltage Measurement block to the model. This block will measure the input voltage.

5. Add a Current Measurement block to the model. This block will measure the current flowing through the diode.

6. Connect the output of the Sinusoidal Source block to the Voltage Measurement block.

7. Connect the output of the Voltage Measurement block to the input of the circuit.

8. Connect the output of the circuit to the Current Measurement block.

9. Add a Scope block to the model. This block will display the measured input voltage.

10. Add another Scope block to the model. This block will display the measured current.

11. Connect the output of the Voltage Measurement block to the first Scope block.

12. Connect the output of the Current Measurement block to the second Scope block.

13. Run the simulation for three periods to measure the input voltage and current.

14. Adjust the simulation settings to run for the desired time and display the results on the scopes.

Note: Make sure to properly configure the simulation parameters, such as simulation time and solver settings, based on the requirements of the circuit and the desired measurement duration.

The model described above will allow you to measure the input voltage and current flowing through the diode for three periods using SIMULINK.

To measure the current flowing through the diode for three periods in the circuit using SIMULINK, you need to connect the diode in the circuit model and use a current measurement block to measure the current passing through it. The resistance R and the voltage V₂ should be appropriately set in the circuit model for accurate measurement.

To know more about voltage click here:

https://brainly.com/question/13396105

#SPJ11

A 87 -kg adult sits at the left end of a 6.0−m-long board. His 34-kg child sits on the right end. Where should the pivot be placed (from the child's end, right endf so that the board is balanced ignoring the board's mass? (Write down your-answer in meters and up to two decimal points]

Answers

A 87 -kg adult sits at the left end of a 6.0−m-long board. His 34-kg child sits on the right end. the pivot should be placed approximately 0.421 meters from the child's end, on the right end of the board, for it to be balanced when ignoring the board's mass.

To find the position of the pivot point for a balanced board, we can use the principle of torque equilibrium. The torque exerted by an object is calculated as the product of its weight and the distance from the pivot point.

Given:

Mass of the adult (mA) = 87 kg

Mass of the child (mC) = 34 kg

Length of the board (L) = 6.0 m

Let x be the distance from the child's end to the pivot point. Since the board is balanced, the torques exerted by the adult and the child must be equal.

Torque exerted by the adult: TorqueA = mA * g * (L - x)

Torque exerted by the child: TorqueC = mC * g * x

Where g is the acceleration due to gravity.

Setting the torques equal to each other:

mA * g * (L - x) = mC * g * x

Simplifying the equation:

87 * 9.8 * (6.0 - x) = 34 * 9.8 * x

Solving for x:

510.6 - 87 * 9.8 * x = 333.2 * x

510.6 = (333.2 + 87 * 9.8) * x

510.6 = 1211.6 * x

x = 0.421

Therefore, the pivot should be placed approximately 0.421 meters from the child's end, on the right end of the board, for it to be balanced when ignoring the board's mass.

Learn more about torque here:

https://brainly.com/question/29361238

#SPJ11

The pressure in an ideal gas is cut in half slowly, while being kept in a container with rigid walls. In the process, 465 kJ of heat left the gas. (a) How much work was done during this process? (b) What was the change in internal energy of the gas during this process? #5) The exhaust temperature of a heat engine is 230°C. What is the high temperature if the Carnot efficiency is 34%?

Answers

(a) The work done during this process is 0 kJ. (b) The change in internal energy of the gas during this process is -465 kJ. #5) The high temperature (Th) is approximately 348.48°C.

To solve these problems, we can use the first law of thermodynamics, which states that the change in internal energy of a system is equal to the heat added to the system minus the work done by the system:

ΔU = Q - W

where:

ΔU is the change in internal energy,

Q is the heat added to the system, and

W is the work done by the system.

(a) How much work was done during this process?

In this case, the pressure is cut in half slowly while being kept in a container with rigid walls. Since the process occurs slowly, it can be considered quasi-static or reversible. In a quasi-static process, the work done can be calculated using the equation:

W = -PΔV

where P is the pressure and ΔV is the change in volume.

However, since the container has rigid walls, the volume doesn't change, and therefore the work done is zero. So, the work done during this process is 0 kJ.

(b) What was the change in internal energy of the gas during this process?

We are given that 465 kJ of heat left the gas. Since the process is reversible, we can assume that the heat transfer is at constant volume (ΔV = 0). Therefore, the change in internal energy is equal to the heat transferred:

ΔU = Q = -465 kJ

The change in internal energy of the gas during this process is -465 kJ.

#5) The exhaust temperature of a heat engine is 230°C. What is the high temperature if the Carnot efficiency is 34%?

The Carnot efficiency (η) is given by the equation:

η = 1 - (Tc/Th)

where η is the Carnot efficiency, Tc is the cold temperature, and Th is the hot temperature.

We are given that the Carnot efficiency is 34% (0.34), and the exhaust temperature (Tc) is 230°C.

Let's substitute the given values into the equation and solve for Th:

0.34 = 1 - (230/Th)

Rearranging the equation:

0.34 = 1 - 230/Th

0.34 - 1 = -230/Th

0.66 = 230/Th

Th = 230 / (0.66)

Th ≈ 348.48°C

Therefore, the high temperature (Th) is approximately 348.48°C.

To learn more about work done visit:

brainly.com/question/29989410

#SPJ11

A swimmer with a body temperature of 37 C is on the pool deck with an air temperature of 22 C. Assume an area of 2.0 m². Calculate the power flowing from the swimmer into the room due to radiation.

Answers

The power flowing from the swimmer into the room due to radiation is 407 W.

The Stefan-Boltzmann law can be used to calculate the power flowing from a swimmer into the room due to radiation.

An equation is provided by the Stefan-Boltzmann law: σ = 5.67 × 10-8 W/m²-K⁴

Here, σ = Stefan-Boltzmann constant which is equal to 5.67 × 10-8 W/m²-K⁴T = temperature in Kelvin

To calculate power due to radiation: P = σ × A × (T^4 - T₀^4) where,P is the power flowing, A is the surface area of the swimmer, T is the temperature of the swimmer, T₀ is the temperature of the surrounding airIn this problem, the swimmer's temperature is 37°C which is equal to 310 K and the surrounding air temperature is 22°C which is equal to 295 K.

The area of the swimmer is given as 2.0 m².

Now, let's substitute the values in the equation and solve for power, P = 5.67 × 10-8 W/m²-K⁴ × 2.0 m² × (310 K)^4 - (295 K)^4P = 407 W

Therefore, the power flowing from the swimmer into the room due to radiation is 407 W.

Learn more about power: https://brainly.com/question/1634438

#SPJ11

Use source transformation to reduce: (a). the circuit below to an equivalent current source in with parallel a resistor and calculate the voltage across the resistor. 60 SA 30 SV 70 3A (+ 10 www 40 www

Answers

The voltage across the resistor is 70 V.

Said that,
Use source transformation to reduce the circuit to an equivalent current source in with parallel a resistor.

Step 1: Convert the voltage source to a current source.

Isc = V/R

    = 60/30

    = 2 A

Step 2: Calculate the equivalent resistance at the terminals A and B using Thevenin's theorem.

R = 70 Ω//10 Ω + 40 Ω

  = 70 Ω//50 Ω

  = 35 Ω

Step 3: Find the current through the 35 Ω resistor using Ohm's law.

I = V/R

 = 2 A

Step 4: Find the voltage across the 35 Ω resistor using Ohm's law.

V = IR

  = 2 A × 35 Ω

  = 70 V

Therefore, the voltage across the resistor is 70 V.

Learn more about the voltage:

brainly.com/question/29867409

#SPJ11

In Milikan's experiment, a drop of radius of 1.64μm and density 0.851 g/cm 3
is suspended in the lower chamber when a downward-pointing electric field of 1.9210 5
N/C is applied. a. What is the weight of the drop? b. Find the charge on the drop, in terms of e. c. How many excess or deficit electrons does it have?

Answers

A) the weight of the drop is 6.66 x 10⁻¹⁶ N. B) the charge on the drop is approximately 0.22 times the charge of an electron. C) The drop has either 0 or 1 excess or deficit electrons.

a. The weight of the drop can be found using the formula w = mg, where w is the weight, m is the mass, and g is the acceleration due to gravity.

The density of the drop is given as 0.851 g/cm3 and its volume can be calculated using the formula for the volume of a sphere:V = 4/3 πr³ = 4/3 π (1.64 x 10⁻⁶ m)³ = 7.94 x 10⁻¹⁵ m³

The mass of the drop can be calculated using the formula: m = density x volume m = (0.851 g/cm³) (7.94 x 10⁻¹⁵ m³) m = 6.79 x 10⁻¹⁵ g

Now we can find the weight:w = mg = (6.79 x 10⁻¹⁵ g) (9.81 m/s²) = 6.66 x 10⁻¹⁶ N

Therefore, the weight of the drop is 6.66 x 10⁻¹⁶ N.

b. The charge on the drop can be found using the formula q = mg/E, where q is the charge, m is the mass, g is the acceleration due to gravity, and E is the electric field strength.

We have already calculated the weight of the drop as 6.66 x 10⁻¹⁶ N.

Therefore:q = mg/E = (6.66 x 10⁻¹⁶ N)/(1.9210⁵ N/C) = 3.48 x 10⁻²⁰ C

To find the charge in terms of e, we divide by the charge of an electron:q/e = (3.48 x 10⁻²⁰ C)/(1.60 x 10⁻¹⁹ C) ≈ 0.22

Therefore, the charge on the drop is approximately 0.22 times the charge of an electron.

c. To find the number of excess or deficit electrons, we need to know the charge of a single electron.

Since the charge on the drop is approximately 0.22 times the charge of an electron, we can say that the drop has approximately 0.22 excess or deficit electrons.

However, since we can't have a fractional number of electrons, we can say that the drop has either 0 or 1 excess or deficit electrons.

Know more about weight here,

https://brainly.com/question/31659519

#SPJ11

What is the radius (in fm) of a lithium-7 nucleus? fm

Answers

Therefore, the radius (in fm) of a lithium-7 nucleus is approximately 2.29 fm.

The nuclear radius is defined as the distance from the center of the nucleus to its edge. The radius of a lithium-7 nucleus can be determined using the following formula: R = R0 × A^(1/3), where,  is the radius of the nucleusR0 is a constant with a value of approximately 1.2 fm, A is the mass number of the nucleus which is 7 for lithium-7.Substituting these values, we get: R = 1.2 fm × 7^(1/3)R = 1.2 fm × 1.912R ≈ 2.29 fm.

Learn more about nuclear radius:

https://brainly.com/question/15255548

#SPJ11

Asterix and Obelix decide to save the Gauls by throwing 30 kg of bananas onto the highway to slow down the Romans. They are at a height of 20 m and throw the bananas at an initial speed of 10 m/s. Determine the impact velocity if drag force steal 10% of the initial energy making the system only 90% efficient.

Answers

Therefore, the impact velocity is 0.69 m/s when drag force steals 10% of the initial energy, making the system only 90% efficient. The answer is 150 words.

The problem can be solved by utilizing the conservation of energy. The sum of kinetic energy and potential energy is equal to the potential energy when the bananas hit the ground.

The potential energy of the bananas when it is at a height of 20m is given as follows;P.E = mghP.E = 30kg x 9.8m/s² x 20mP.E = 5880 JThe initial kinetic energy of the bananas is given as follows;K.E = ½ mv²K.E = ½ x 30kg x (10m/s)²K.E = 1500 JThe total mechanical energy (E) of the system is calculated as follows;E = P.E + K.EE = 5880 J + 1500 JE = 7380 J

The efficiency of the system is given as 90% and we know that efficiency (η) is the ratio of output energy (Eo) to input energy (Ei).η = Eo / EiRearranging the equation above, we get;Eo = η x EiEo = 0.9 x 7380Eo = 6642 JThe remaining energy (Elost) is calculated as follows;Elost = Ei - EoElost = 7380 J - 6642 JElost = 738 J

The work done by drag force (Wd) is equal to the lost energy and is given as follows;Wd = ElostWd = 738 JThe average force exerted on the bananas (F) can be calculated as follows;F = Wd / dF = 738 J / (20m x 30kg)F = 1.23 NThe work done by force of gravity (Wg) can be calculated as follows;Wg = Fg x dWg = (30kg x 9.8m/s²) x 20mWg = 5880 J

The kinetic energy of the bananas at impact (K.Ei) can be calculated as follows;K.Ei = Eo - Wg - WdK.Ei = 6642 J - 5880 J - 738 JK.Ei = 24 JThe final velocity (v) of the bananas when they hit the ground can be calculated as follows;K.Ei = ½ mv²24 J = ½ x 30kg x v²v = √(24 J x 2 / 30kg)v = 0.69 m/sTherefore, the impact velocity is 0.69 m/s when drag force steals 10% of the initial energy, making the system only 90% efficient. The answer is 150 words.

to know more about velocity

https://brainly.com/question/30046122

#SPJ11

Question 2 A turbojet single spool axial compressor has a pressure ratio of 6.0. Determine the total temperature and pressure at the outlet of the compressor given that the efficiency of the compressor is 0.8, the inlet stagnation temperature to the compressor is 50 °C and the compressor total inlet pressure is 149415 Pa.
Question 3 After combustion a turbojet engine has a turbine inlet stagnation temperature of 1100 K. Assuming an engine mechanical efficiency of 99% determine the total temperature after exiting the turbine. Assume the total temperature entering and exiting the compressor is 325 K and 572 K respectively, The turbine has an isentropic efficiency of 0.89. Calculate the total pressure at turbine exit. Assume the total pressure at the turbine inlet is 896490 Pa.

Answers

Therefore, the total temperature after exiting the turbine is 984.44 K, and the total pressure at the turbine exit is 394651.09 Pa.

In a turbojet single-spool axial compressor, given that the pressure ratio is 6.0, the efficiency of the compressor is 0.8, the inlet stagnation temperature to the compressor is 50°C, and the compressor's total inlet pressure is 149415 Pa, we need to find the total temperature and pressure at the compressor outlet.
Given that,Pressure Ratio = P2/P1 = 6.0Efficiency = η = 0.8Total Inlet Pressure = P1 = 149415 PaInlet Stagnation Temperature = T0 = 50°CGiven the above data, the first thing we need to do is find the temperature at the compressor outlet (T2) using the following formula:$$\frac{T_2}{T_1} = \left[\left(\frac{P_2}{P_1}\right)^{\frac{k-1}{k}} -1 \right] / η_c + 1$$Where,T1 = 50 + 273 = 323 KP2 = P1 * Pressure Ratio = 149415 * 6 = 896490 PaCp/Cv = k = 1.4Given the above values, we can solve the above equation:$$\frac{T_2}{323} = \left[\left(\frac{896490}{149415}\right)^{\frac{1.4-1}{1.4}} -1 \right] / 0.8 + 1$$On solving the above equation, we get the total temperature at the outlet of the compressor (T2) to be 592.87 K.

Next, we need to find the total pressure at the compressor outlet (P2) using the following formula:$$\frac{P_2}{P_1} = \left(\frac{T_2}{T_1}\right)^\frac{k}{k-1}$$On substituting the above values, we get the total pressure at the outlet of the compressor (P2) to be 896490 Pa.

Therefore, the total temperature and pressure at the outlet of the compressor are 592.87 K and 896490 Pa, respectively.

Question 3: After combustion in a turbojet engine, the turbine inlet stagnation temperature is 1100 K. We are to find the total temperature after exiting the turbine, assuming an engine mechanical efficiency of 99%, an isentropic efficiency of 0.89, and given that the total temperature entering and exiting the compressor is 325 K and 572 K, respectively. The total pressure at the turbine inlet is 896490 Pa. We are also to calculate the total pressure at the turbine exit.

Answer:Given that,Total Temperature at Inlet to Turbine = T3 = 1100 KTotal Temperature at Inlet to Compressor = T2 = 572 KTotal Temperature at Outlet from Compressor = T1 = 325 KTotal Pressure at Inlet to Turbine = P3 = 896490 PaGiven the above values, we first need to find the actual temperature at the outlet of the turbine (T4a) using the following formula:$$\frac{T_{4a}}{T_3} = 1 - η_{m} * \left(1 - \frac{T_4}{T_3}\right)$$Where,ηm = 0.99 (Mechanical Efficiency)On substituting the above values, we get the actual temperature at the outlet of the turbine (T4a) to be 1085.09 K.

Next, we need to find the temperature at the outlet of the turbine (T4) using the following formula:$$\frac{T_4}{T_{4a}} = \frac{T_{3s}}{T_3}$$$$T_{3s} = T_2 * \left(\frac{T_3}{T_2}\right)^{\frac{k-1}{k*\eta_c}}$$Where,ηc = 0.89 (Isentropic Efficiency)k = 1.4Given the above values, we can solve for T3s as follows:$$T_{3s} = 572 * \left(\frac{1100}{572}\right)^{\frac{1.4-1}{1.4*0.89}}$$$$T_{3s} = 835.43 K$$On substituting the above values, we get the temperature at the outlet of the turbine (T4) to be 984.44 K.

Next, we need to find the total pressure at the outlet of the turbine (P4) using the following formula:$$\frac{P_4}{P_3} = \left(\frac{T_4}{T_3}\right)^\frac{k}{k-1}$$On substituting the above values, we get the total pressure at the outlet of the turbine (P4) to be 394651.09 Pa.

Therefore, the total temperature after exiting the turbine is 984.44 K, and the total pressure at the turbine exit is 394651.09 Pa.

To know more about turbine visit:

https://brainly.com/question/31731732

#SPJ11

A series RLC circuit has an impedance of 1209 and a resistance of 642. What average power is delivered to this circuit when Vrms = 90 volts? O 36W O 100 W O 192 W 0 360 W O 12 W

Answers

A series RLC circuit has an impedance of 1209 and a resistance of 642.  The average power delivered to the circuit is 12 W (Option E)

Given;

Impedance, Z = 1209 Ω

Resistance, R = 642 Ω

Voltage, Vrms = 90 volts

We are to calculate the average power delivered to the circuit.

P = Vrms2 / R *cos(Φ) ---(1)

Where Φ = angle of phase difference between the current and voltage

Since it is not given whether the circuit is capacitive or inductive or purely resistive, we will have to calculate the value of Φ to determine the nature of the circuit.

Cos(Φ) = R/Z = 642/1209 = 0.531<0.08

Thus, the circuit is inductive (since cos(Φ) is positive and < 1)

We can determine the value of angle Φ using the following equation;

Cos(Φ) = R/ZΦ = cos-1(R/Z)Φ = cos-1(642/1209)Φ = 0.08 rad

Average power delivered to the circuit;

P = Vrms2 / R *cos(Φ)

Substituting the values of Vrms, R and cos(Φ)P = (90)2 / 642 *0.531P = 12.6 W ≈ 12 W

To learn more about resistance, refer:-

https://brainly.com/question/29427458

#SPJ11

There is a solenoid in the magnetic field. The magnetic flux density of a magnetic field as a function of time can be expressed in the form B (t) = (1.3mT / s * t) + (5.3mT / s ^ 2 * t ^ 2=)
. The solenoid has an area of ​​29cm ^ 2 and has 195,000 turns of wires. The plane of the solenoid is perpendicular to the uniform magnetic field. Calculate the magnitude of the source voltage induced in the solenoid at 5.0s

Answers

The magnitude of the source voltage induced in the solenoid at 5.0 s is approximately 8.239 V.

Given that, Magnetic flux density, B(t) = (1.3 mT/s * t) + (5.3 mT/s^2 * t^2)

Solenoid area, A = 29 cm² = 29 * 10^-4 m²

Number of turns, N = 195,000

To find: The magnitude of the source voltage induced in the solenoid at 5.0 s.

Calculate the magnetic flux at time t = 5 s using the formula Φ = B(t) * A:

Φ(t=5 s) = [(1.3 mT/s * 5 s) + (5.3 mT/s² * (5 s)²)] * (29 * 10^-4 m²)

= (6.5 mT + 133 mT) * (29 * 10^-4 m²)

= 3.9457 * 10^-3 Wb

Now, calculate the EMF using the formula emf = -N * dΦ/dt:

dΦ/dt = dB/dt = (1.3 mT/s) + (10.6 mT/s² * t)

emf(t=5 s) = -(195,000) * (3.9457 * 10^-3 Wb) * [(1.3 mT/s) + (10.6 mT/s² * 5 s)]

= -(195,000) * (3.9457 * 10^-3 Wb) * (1.3 mT/s + 53 mT/s)

= -8.2391 V

Therefore, the magnitude of the source voltage induced in the solenoid at 5.0 s is approximately 8.239 V.

Learn more about solenoid: https://brainly.com/question/1873362

#SPJ11

A three-phase A-connected generator has an internal impedance of 12+120i m/. When the load is removed from the generator, the magnitude of the terminal voltage is 14000 V. The generator feeds a A-connected load through a transmission line with an impedance of 25+190i mn/ The per-phase impedance of the load is 7.001+3.4941 n. Part A Calculate the magnitude of the line current. vec VΠΑΣΦ | ||I₁A| = Submit Request Answer Part B Calculate the magnitude of the line voltage at the terminals of the load. VAΣ vec ? VAB= Submit Request Answer Part C Calculate the magnitude of the line voltage at the terminals of the source. AΣ vec ? |Vab=

Answers

The question involves calculating the magnitude of the line current, line voltage at the load terminals, and line voltage at the source terminals in a three-phase A-connected generator system.

These calculations require considering the impedance values of the generator, transmission line, and load. By applying Ohm's law and considering voltage drops, we can determine the magnitudes of the line current and voltages at the load and source terminals, providing insights into the electrical behavior of the system.

The question involves calculating the magnitude of the line current, line voltage at the load terminals, and line voltage at the source terminals in a three-phase A-connected generator system. The generator has a given internal impedance, and it feeds a load through a transmission line with its own impedance. The load has a per-phase impedance specified.

Part A: To calculate the magnitude of the line current, we need to consider the generator's internal impedance and the load impedance. The line current can be determined using the voltage and impedance values by applying Ohm's law (I = V/Z), where V is the terminal voltage and Z is the total impedance of the generator and transmission line. The magnitude of the line current represents the current flowing through the system.

Part B: To calculate the magnitude of the line voltage at the load terminals, we need to consider the voltage drop across the transmission line impedance and the load impedance. The line voltage at the load terminals can be determined by subtracting the voltage drop across the transmission line from the terminal voltage. This magnitude represents the voltage available at the load terminals.

Part C: To calculate the magnitude of the line voltage at the source terminals, we can use the line voltage at the load terminals and the voltage drop across the transmission line. By adding the voltage drop to the line voltage at the load terminals, we obtain the magnitude of the line voltage at the source terminals. This magnitude represents the voltage supplied by the generator.

Learn more about Ohm's law here:- brainly.com/question/1247379

#SPJ11

Other Questions
Three two-port eircuits, namely Circuit 1 , Circuit 2 , and Circuit 3 , are interconnected in cascade. The input port of Circuit 1 is driven by a 6 A de current source in parallel with an internal resistance of 30. The output port of Circuit 3 drives an adjustable load impedance ZL The corresponding parameters for Circuit 1, Cireuit 2 , and Circuit 3 , are as follows. Circuit 1: G=[0.167S0.50.51.25] Circuit 2: Y=[2001068001064010640106]S Circuit 3: Z=[335340003100310000] a) Find the a-parameters of the eascaded network. (20 marks) b) Find ZL such that maximum power is transferred from the cascaded network to ZL. (10 marks) c) Evaluate the maximum power that the cascaded two-port network can deliver to ZL. The diagram below represents a monochromatic light wave passing through the double slits. A pattem of bright and dark bands is formed on the screen. 3) What is the color of the light used? A) blue B) 5. A researcher is interested in maximum-security inmates.She wants the same proportion of inmates across the type of crime committed (robbery,assault,and murder) in her sample as in the actual prison population. Describe what sampling method she should use and how she should carry out her sampling Interface a common cathode 7 segment display with PIC16F microcontroller. Write an embedded C program to display the digits in the sequence 2 5 9 2. Discuss the metamorphism that resulted in the formation of the Central Zone of the Limpopo Belt including the rock types found in the entire belt.(50) For an SN2 reaction to occur the Nucleophile must be? a. An alcohol b. A water molecule c. Negative charge d. Positive charge For some substances, such as carbon and arsenic, sublimation is much easier than evaperation from the melt, why? a. The pressure of the Triple Point is very high b. The pressure of the Critical Point is very high c. The pressure of the Triple Point is very low d. The pressure of the Critical Point is very low In the dehydration of an alcohol reaction it undergoes what type of mechanism? a. Trans mechanism with Trans isomer reacting more rapidly b. Cis mechanism with Trans isomer reacting more rapidly c. Trans mechanism with Cis isomer reacting more rapidly d. Cis mechanism with Cis isomer reacting more rapidly Tums is a common antacid that people take when they experience heartburn. The ingredient in tums that reacts with excess stomach acid calcium carbonate. Write out a complete and balanced chemical equation for the reaction of Tums with excess stomach acid. An optical fiber made of glass with an index of refraction 1.53 is coated with a plastic with index of refraction 1.28. What is the critical angle of this fiber at the glass-plastic interface? Three significant digits please. Explain what it means to be intersex? What is thedifference between the terms DSD vs intersex, and who usuallyidentifies with each term and why? A liquid-phase substitution reaction between aniline (A) and 2-chloroquinoxaline(B), A+B=products, is conducted in an isothermal, isobaric PFR. The reaction isfirst-order with respect to each reactant, with k1 = 4.0 *10-5 L*mol^-1 s-1 at 25C(Patel, 1992). Determine the reactor volume required for 80% conversion of aniline, if the initial concentration of each reactant is 0.075 mol*L^-1, and the feed rate is 1.75 L*min^-1. What is the output of the following C++ Program? #include using namespace std; int main() { cout If an R = 1-k2 resistor, a C = 1-uF capacitor, and an L = 0.2-H inductor are connected in series with a V = 150 sin (377t) volts source, what is the maximum current delivered by the source? 0 0.007 A 0 27 mA 0 54 mA 0 0.308 A 0 0.34 A "If women stop, the world stops." (Womens Strike inSpain 2018; Womens Global Strike 2020) please explainwhat this slogan meant for the movement, what it stood for and itsgoals. HELP ME PLEASE I WILL GIVE BRAINLIEST! Ammonia will decompose into nitrogen and hydrogen at high temperature. An Industrial chemist studying this reaction fills a 1.5 L flask with 2.7 atm of ammonia gas, and when the mixture has come to equilibrium measures the amount of nitrogen gas to be 0.41 atm. Calculate the pressure equilibrium constant for the decomposition of ammonia at the final temperature of the mixture. Round your answer to 2 significant digits. K-0 P X Question 1 1.1 Find the Fourier series of the odd-periodic extension of the function f(x)=3, for xe (-2,0) 1.2 Find the Fourier series of the even-periodic extension of the function f(x) = 1+ 2x, for A 0.36m square prestressed concrete pile is to be driven in a clayey soil having an unconfined compressive strength of 110 kPa. Allowable capacity of the pile is 360 kN with a factor of safety of 2. Unit weight of clay is 18 kN/m3. Use =0.28. Compute for the length of the pile. TRUE / FALSE. Please determine if the following statement is true or false: "The representativeness heuristic refers to the process by which we assume most individual instances will resemble our prototype for those instances." In the figure particle 1 of charge q1 = +e and particle 2 of charge q2 = 6e are fixed on an x axis. Distance d = 7.40 m. What is the electric potential difference (in V) VA VB? A 3.0-g bullet leaves the barrel of a gun at a speed of 400 m/s. Find the average force exerted by the expanding gases on the bullet as it moves the length of the 60-cm-long barrel.