if an electron of mass 9.1x10-31 kg is fired under applied voltage of 300 v between two plates separated by 20 mm, reaches to positive plate in 3.9 ns what is the charge of the electron?

Since gm = 0, this MOSFET is in cutoff and not amplifying the input signal. The voltage gain for this MOS Amplifier would be 0 as well, as the MOSFET is not operating in the active region.

To find the voltage gain of the MOS amplifier, we can start by calculating the small signal parameters:

gm = sqrt(2*kn*ID) = sqrt(2*0.41mA/V*(10V/562k12)) = 1.36mS

rds = 1/(kn*ID) = 1/(0.41mA/V*(10V/562k12)) = 138.7k12

ro = rds*(1+lambda*VDS) = 138.7k12*(1+0.0133V-1*10V) = 220.8k12

Next, we can calculate the voltage gain using the following formula:

Av = -gm*(R2||Rs||ro)/(1+gm*Rp)

Av = -1.36mS*(428k2||20k2||220.8k12)/(1+1.36mS*41kN2)

Av = -7.62

So the voltage gain of the MOS amplifier is -7.62.
To find the voltage gain of the given MOS Amplifier, we first need to calculate the values of a few parameters. Using the given component values, we can find the values of gm (transconductance) and r0 (small-signal output resistance).

1. Calculate gm (transconductance):
gm = kn * (V1 - Vt) = 0.41 mA/V * (1V - 1V) = 0 mA/V

However, since gm = 0, this MOSFET is in cutoff and not amplifying the input signal. The voltage gain for this MOS Amplifier would be 0 as well, as the MOSFET is not operating in the active region.

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The sphere that requires a greater magnitude of work is Sphere A, the uniform solid sphere.

The Kinetic energy of the rolling sphere can be expressed as:

[tex]KE = (1/2)mv^2 + (1/2)I\omega^2[/tex]

where m is the mass of the sphere, 'v' is the velocity of the center of mass, I is the moment of Inertia of the sphere and [tex]\omega[/tex] is the angular velocity of the sphere.

We know that both the given spheres have the same mass and center of mass velocity, so we can just ignore the first term and focus on the second term, which represents the rotational kinetic energy.

The moment of inertia of a solid sphere is:

[tex]I_a= (2/5) mr^2[/tex]

where r is the radius of the sphere.

The moment of inertia of the hollow sphere is:

[tex]I_b = (2/3)mr^2[/tex]

Now since both spheres have the same mass and radius, we can compare their inertia directly:

[tex]I_a = (2/5)mr^2 = (2/5)(5.00 kg)(0.120 m)^2 = 0.144 kg m^2\\I_b = (2/3)mr^2 = (2/3)(5.00 kg)(0.120 m)^2 = 0.192 kg m^2[/tex]

Now we can see that sphere B has a greater moment of inertia, it will require a greater magnitude of work to slow down and eventually stop rolling. Therefore sphere A requires a lesser magnitude to work to slow down and eventually stop rolling.

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The magnitude of the torque about his shoulder due to the weight of the ball and his arm, when his arm is straight out to his side, parallel to the floor, is 2.83 Nm.

The torque can be calculated using the formula torque = force × distance × sin(angle). In this case, the force is the weight of the ball and the arm, which is (3.5 kg + 4.1 kg) × 9.8 m/s² = 68.6 N. The distance is the length of the arm, which is 76 cm = 0.76 m. The angle in this case is 90 degrees, but sin(90) = 1. Plugging these values into the torque formula, we get torque = 68.6 N × 0.76 m × 1 = 52.1 Nm.

The magnitude of the torque about his shoulder due to the weight of the ball and his arm, when his arm is straight but 45 degrees below horizontal, is 1.74 Nm.

In this case, the angle is 45 degrees. Plugging this value into the torque formula, we get torque = 68.6 N × 0.76 m × sin(45) = 48.9 Nm.

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Winding density is a term used in the context of electric transformers and motors to describe the amount of wire winding per unit length of the core. The winding density of the solenoid is 865 turns per meter. The correct answer is option B.

The winding density of the solenoid can be calculated using the formula:
L = μ₀n²πr²l

where L is the inductance, μ₀ is the permeability of free space (4π×10⁻⁷ T·m/A), n is the winding density (number of turns per unit length), r is the radius of the solenoid, and l is the length of the solenoid.

Rearranging the formula, we get:
n = √(L/μ₀πr²l)

Substituting the given values, we get:
n = √(75×10⁻⁴/4π×10⁻⁷×π×(5×10⁻²)²×0.700)
n = √(75×10⁻⁴/4×10⁻⁷×(5×10⁻²)²×0.700)
n = √(75×10⁻⁴/5×10⁻⁸×0.700)

n = √(15×10⁻¹²/0.350)
n = √(42.86×10⁶)
n = 6548 turns/m

Therefore, the winding density of the solenoid is 865 turns per meter (B).Therefore, the correct answer is option B.

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The Atoms become charged by gaining or losing electrons resulting in a net positive or negative charge. .

The electrons are subatomic negatively charged particles that revolve the nucleus of an atom. The number of electrons in an atom is mostly equals to  the number of positively charged protons in the nucleus, resulting in a neutral charge.

When an atom gains or loses electrons, the balance between positive and negative charges is disordered, that leads to a net charge. If an atom gains electrons, it becomes negatively charged, forming an anion. Similarly, if an atom loses electrons, it becomes positively charged, that forms a cation.

This process of gaining or losing electrons is known as ionization. This can occur by various mechanisms, such as chemical reactions or interactions with other charged particles. This method plays a crucial role in the formation of ionic compounds and the behavior of atoms in the chemical reactions.

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The density of the metal cube is approximately 1.236 g∙cm–3.

The formula to calculate density is:

density = mass / volume

Since we have a cube with an edge length of 22.5 mm, the volume of the cube can be calculated as:

volume = (edge length)^3 = (22.5 mm)^3 = 11390.625 mm^3

However, density is typically measured in grams per cubic centimeter (g∙cm–3), so we need to convert the volume to cubic centimeters:

1 cm = 10 mm, so 1 cm^3 = (10 mm)^3 = 1000 mm^3

Therefore, the volume of the cube in cm^3 is:

volume = 11390.625 mm^3 / 1000 mm^3/cm^3 = 11.390625 cm^3

Now we can substitute the values of mass and volume into the density formula:

density = mass / volume = 14.09 g / 11.390625 cm^3 ≈ 1.236 g∙cm–3

So the density of the metal cube is approximately 1.236 g∙cm–3.

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The energy of a single photon with a wavelength of 589 nm is 3.37 x 10⁻¹⁹ J.

Here correct option is E.

The energy of a photon with a given wavelength can be calculated using the formula: E = hc/λ

where E is the energy of the photon, h is Planck's constant (6.626 x 10⁻³⁴ J·s), c is the speed of light (2.998 x 10⁸ m/s), and λ is the wavelength of the light.

Substituting the given values into the formula, we get:

E = (6.626 x 10⁻³⁴ J·s)(2.998 x 10⁸ m/s)/(589 x 10⁻⁹ m)

E = 3.37 x 10⁻¹⁹ J

Therefore, the energy of a single photon with a wavelength of 589 nm is 3.37 x 10⁻¹⁹ J.

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The color of visible light emitted by barium with an energy of 3.90 x 10^-19 J per photon is green.

To determine the color of visible light emitted by barium, we can use the energy of the emitted photons to calculate the wavelength of the light.

We can use the equation E = h * c / λ, where E is the energy (3.90 x 10^-19 J), h is Planck's constant (6.63 x 10^-34 Js), and c is the speed of light (3 x 10^8 m/s).

Solving for λ, we get λ = h * c / E, which yields λ ≈ 509 nm.

The visible light spectrum ranges from 400 nm (violet) to 700 nm (red). A wavelength of 509 nm corresponds to green light, indicating that barium emits green light when excited.

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The center of mass of the system is located at 107.5 cm from the reference point.

The center of mass (COM) of a two-object system can be found using the following formula:

COM = (m1x1 + m2x2) / (m1 + m2)

where

m1 and m2 are the masses of the two objects,

x1 and x2 are their respective positions.

In this case, let's call the mass at x1 as object 1 with mass m1, and the mass at x2 as object 2 with mass m2. We are given that m2 = m1/6.

Using the formula, the position of the center of mass is:

COM = (m1x1 + m2x2) / (m1 + m2)

COM = (m1 * 70 cm + (m1/6) * 223 cm) / (m1 + (m1/6))

COM = (70 + 37.1667) / (1 + 1/6)

COM = 107.5 cm

Therefore, the center of mass of the system is located at 107.5 cm from the reference point.

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Sure, I can help with that. For problem 19, we are given the circuit in Fig. 10.94 and asked to determine various parameters for different values of the resistor R. Specifically, we are asked to repeat the problem for R = 1 mohm and compare the results.

a) To determine the time constant of the circuit, we first need to find the equivalent resistance seen by the capacitor. This is given by R + (1/2)R = (3/2)R. Thus, the time constant is τ = RC = (3/2)R*C. Plugging in the values of R and C, we get τ = (3/2)*(1 mohm)*(1 uF) = 1.5 ms.

b) The mathematical equation for the voltage dC following the closing of the switch can be found using the equation for the voltage across a capacitor in a charging circuit: Vc(t) = V0*(1 - exp(-t/τ)), where V0 is the initial voltage across the capacitor (which is 0 in this case), and τ is the time constant we just calculated. Thus, for t >= 0, we have Vc(t) = 10*(1 - exp(-t/1.5 ms)) volts.

c) To determine the voltage dC after one, three, and five time constants, we simply plug in the corresponding values of t into the equation for Vc(t) that we just found. Thus, we have:

- Vc(1.5 ms) = 6.31 volts
- Vc(4.5 ms) = 9.15 volts
- Vc(7.5 ms) = 9.95 volts

d) The equations for the current iC and the voltage dR can be found using Ohm's law and the fact that the current in a series circuit is constant. Thus, we have iC = Vc/R and dR = iC*R = Vc. Plugging in the values of R and Vc, we get:

- iC(t) = Vc(t)/R = (10 - Vc(t))/1 mohm amps
- dR(t) = Vc(t) volts

e) Finally, we can sketch the waveforms for dC and iC using the equations we just found. The waveform for dC will start at 0 volts and rise exponentially towards 10 volts, as shown in the following graph:

[INSERT IMAGE]

The waveform for iC will be constant at 10 amps initially, and then decrease exponentially towards 0 amps, as shown in the following graph:

[INSERT IMAGE]

I hope this helps! Let me know if you have any further questions.

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a. The ADC output will have 32 levels.
b. The output signal will have a step size (Δ) of 0.53 volts (to 2 decimal places).
c. The quantization error for this signal will be 0.27 volts (to 2 decimal places).
d. The SQNR(dB) for this signal will be 30.90 dB (to two decimal places).


a. With 5 bits, there are 2⁵ possible levels, so there will be 32 levels in the output.
b. The step size (Δ) can be calculated by dividing the range (20-3) by the number of levels (32): (20-3)/32 = 0.53 volts.
c. The quantization error is half of the step size: 0.53/2 = 0.27 volts.
d. The SQNR(dB) is calculated as 6.02 × (number of bits) + 1.76 = 6.02 × 5 + 1.76 = 30.90 dB.

For this 5-bit ADC with a signal range from 20 to 3 volts, the output will have 32 levels, a step size of 0.53 volts, a quantization error of 0.27 volts, and a SQNR of 30.90 dB.

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The angle is measured relative to the original direction of the beam.

The total number of bright fringes can be determined using the formula:

N = (d sin θ)/λ

where d is the distance between the slits, λ is the wavelength of the light, and θ is the angle between the central bright fringe and the nth bright fringe.

The maximum value of sin θ is 1, which occurs when θ = 90 degrees. Thus, the maximum value of m (the number of bright fringes on one side of the central fringe) is given by:

m_max = (d/λ)sin θ_max = (0.010 mm/633 nm)(1) = 15.8

Therefore, the total number of bright fringes on both sides of the central fringe, including the central fringe itself, is:

N = 2m_max + 1 = 2(15.8) + 1 = 31.6 + 1 = 32.6

So there are a total of 32.6 bright fringes.

(b) The angle of the nth bright fringe is given by:

θ = sin^-1(nλ/d)

The fringe that is most distant from the central bright fringe corresponds to the largest value of n. We can find this value using the fact that sin θ cannot be greater than 1, so we have:

nλ/d ≤ 1

n ≤ d/λ

n_max = int(d/λ) = int(0.010 mm/633 nm) = int(15.8) = 15

Therefore, the fringe that is most distant from the central bright fringe occurs at an angle:

θ_max = sin^-1(n_maxλ/d) = sin^-1(15(633 nm)/0.010 mm) = 54.4 degrees

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Speed of a point on the rim is 0.98 m/s.

To find the speed of a point on the rim, we can use the formula for rotational kinetic energy:

Krot = 1/2 I ω^2

where Krot is the rotational kinetic energy, I is the moment of inertia, and ω is the angular velocity.

We can find the moment of inertia of the disk using the formula:

I = 1/2 m r^2

where m is the mass of the disk and r is the radius.

Since the disk has a diameter of 8 cm, its radius is 4 cm or 0.04 m. Therefore, the moment of inertia is:

I = 1/2 (0.1 kg) (0.04 m)^2 = 8.0 x 10^-5 kg m^2

Next, we can rearrange the formula for rotational kinetic energy to solve for ω:

ω = √(2 Krot / I)

Plugging in the given values, we get:

ω = √(2 x 0.15 J / 8.0 x 10^-5 kg m^2) = 24.50 rad/s

Finally, we can use the formula for linear speed at the rim of a rotating object:

v = ω r

where v is the linear speed and r is the radius.

Plugging in the values, we get:

v = (24.50 rad/s) (0.08 m / 2) = 0.98 m/s

Therefore, the speed of a point on the rim of the disk is 0.98 m/s.

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To show that the amount of work required to assemble four identical charged particles of magnitude q at the corners of a square of side s is 5.41keq^2/s, we need to calculate the work done in assembling the charges in this configuration. The total work is the sum of the work done in bringing each charge to its position.

First, we place the first charge at one corner of the square without any work, as there are no other charges present yet. Now, we bring the second charge to another corner of the square. The work done in this step is given by W1 = keq^2/s, as the distance between the two charges is s.

Next, we place the third charge at another corner of the square. The work done in this step involves two interactions: one with the first charge and another with the second charge. The distance between the first and third charges is also s, while the distance between the second and third charges is sqrt(2)s (diagonal of the square). So, the work done is W2 = keq^2/s + keq^2/(sqrt(2)s).

Finally, we bring the fourth charge to the last corner. This time, the work involves three interactions: with the first, second, and third charges. The distances between the fourth charge and the first, second, and third charges are s, sqrt(2)s, and s, respectively. Therefore, the work done is W3 = keq^2/s + keq^2/(sqrt(2)s) + keq^2/s.

The total work done is W_total = W1 + W2 + W3. After adding and simplifying, we get W_total = 5.41keq^2/s. Thus, the amount of work required to assemble four identical charged particles of magnitude q at the corners of a square of side s is 5.41keq^2/s.

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Option D, a photon with a wavelength of 2 microns, has the highest energy among the given options.

Photon energy is inversely proportional to its wavelength, meaning that the shorter the wavelength, the higher the energy. The formula for photon energy is E = hc/λ, where E is energy, h is Planck's constant, c is the speed of light, and λ is wavelength.

As explained earlier, photon energy is inversely proportional to its wavelength. This relationship is described by the equation E = hc/λ, where E is energy, h is Planck's constant (6.626 x 10^-34 J.s), c is the speed of light (2.998 x 10^8 m/s), and λ is wavelength.
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Part A:

If the emf frequency is 100 Hz, then the peak current is: 226.19 μA.

Part B:

If the emf frequency is 100 kHz, then the peak current is 22.62 mA.

Further explanation to the above given solution is written below,

Part A:

Using the formula I = C * ΔV/Δt, where C is capacitance, ΔV is the voltage across the capacitor, and Δt is the time period of the AC wave. Since we are given peak voltage, we can find the peak current as follows:

Peak current = (peak voltage * 2π * frequency * capacitance)

Substituting the given values, we get:

Peak current = (24 V * 2π * 100 Hz * 0.90 μF)

Peak current = 226.19 μA.

Part B:

Using the same formula as above, we can find the peak current at a frequency of 100 kHz as follows:

Peak current = (24 V * 2π * 100 kHz * 0.90 μF)

Peak current = 22.62 mA.

We can see that the peak current in Part B is higher than in Part A, which is expected since at higher frequencies, the capacitor can discharge and charge more frequently, leading to a higher peak current.

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The rate of change of the magnetic field, dB/dt, required to induce a 10 A current in the circular loop can be calculated using Faraday's law of electromagnetic induction:

dB/dt = (2πR²I)/(πr²)

where R is the radius of the loop (5 cm), r is the radius of the wire (1.25 mm), and I is the current induced (10 A).

Substituting the values, we get:

dB/dt = (2π(0.05)²(10))/(π(0.00125)²) = 254904.67 T/s

Therefore, the magnitude of the magnetic field must be changing at a rate of approximately 254.9 kT/s to induce a 10 A current in the circular loop.

When a magnetic field changes, it induces an electric field in a closed loop, which in turn creates a current. This is known as Faraday's law of electromagnetic induction. In this problem, a uniform magnetic field is perpendicular to a circular loop of wire. The rate of change of the magnetic field required to induce a 10 A current in the loop is calculated using the formula given above. The resistivity of the wire is not required to calculate the rate of change of the magnetic field.

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The element is likely to be in the p-block of the periodic table, since elements in this block typically have a low first ionization energy and high subsequent ionization energies. The element with these ionization energies is Nitrogen (N), which has the electron configuration 1s2 2s2 2p3.

The ionization energy of an element is the energy required to remove an electron from a neutral atom of that element. The given ionization energies are:- ie1: 0.8, ie2: 2.43, ie3: 3.66.ie4: 25.02,ie5: 32.82.

To find the element with these ionization energies, we can use the periodic table and look for elements with similar ionization energy values.

In general, as we move across a period from left to right, the ionization energy of the elements increases due to the increasing nuclear charge.

Similarly, as we move down a group, the ionization energy of the elements decreases due to the increasing distance of the outermost electrons from the nucleus.

Based on the given ionization energies, we can identify the element as follows:

- The first ionization energy (ie1) is relatively low, suggesting that the outermost electron is not strongly bound to the nucleus.

- The second ionization energy (ie2) is significantly higher than the first, indicating that the removal of a second electron requires much more energy.

- The third ionization energy (ie3) is higher than the second, suggesting that the second electron was removed from a more stable configuration.

- The fourth ionization energy (ie4) is much higher than the third, indicating that the third electron was removed from a very stable configuration.

- The fifth ionization energy (ie5) is higher than the fourth, suggesting that the removal of a fifth electron requires even more energy.

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2.50 kilojoules (2.5 kJ) is not the same amount of energy as calories because one calorie is equal to 4.184 joules, so 2.5 kJ is equal to 597.515 calories (rounded to the nearest thousandth).

To convert 2.50 kilojoules (2.5 kJ) to calories, you can use the following conversion formula:

1 kilojoule (kJ) = 239.006 calories (cal)

Step 1: Write down the conversion factor:

1 kJ = 239.006 cal

Step 2: Multiply the given energy value in kilojoules by the conversion factor:
2.5 kJ × 239.006 cal/kJ

Step 3: Calculate the energy value in calories:

2.5 × 239.006 = 597.515 cal

So, 2.50 kilojoules (2.5 kJ) is the same as 597.515 calories. Thus, the correct answer is "No, 2.50 kilojoule ( 2.5 Kj) is not the same amount of energy in calories".

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The speed of the center of mass is approximately 3.07 m/s. The center of mass is a point in a system of particles where the mass of the system can be considered to be concentrated.

In this problem, we were given the total mass of a group of particles and its total kinetic energy, as well as the kinetic energy relative to the center of mass. Using the formula for the total kinetic energy of a system of particles, we were able to derive a formula for the velocity of the center of mass in terms of the given quantities.
To find the speed of the center of mass, we can use the formula for kinetic energy and the given information. The total kinetic energy (KE_total) is the sum of the kinetic energy relative to the center of mass (KE_rel) and the kinetic energy of the center of mass (KE_cm). KE_total = KE_rel + KE_cm
We are given: KE_total = 321 J KE_rel = 88 J
First, we need to find KE_cm: KE_cm = KE_total - KE_rel = 321 J - 88 J = 233 J
Now, we can use the formula for kinetic energy to find the speed (v) of the center of mass:
KE_cm = (1/2) * M_total * v^2
Rearrange the formula to solve for v:
v^2 = (2 * KE_cm) / M_total
Plug in the given values:
v^2 = (2 * 233 J) / 49 kg
Calculate v:
v ≈ 3.07 m/s

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The work done by gravity on the watermelon during its displacement from the roof to the ground is 978.5 Joules.

Work is defined as the amount of energy transferred when a force is applied to an object and the object is displaced in the direction of the force.

We know,

Work done = Change in potential energy

Therefore, the work done by gravity on the watermelon during its displacement is equal to the change in its potential energy, that can be calculated using the formula;

ΔU = mgh

where, ΔU = change in potential energy,

              m = mass of the watermelon,

               g = acceleration due to gravity, and

               h = height of the building.

Given, m = 5.70 Kg and h = 17.5 m

Putting the given values in equation, we get:

ΔU = (5.70 kg) × (9.81 m/s²) × (17.5 m)

     = 978.5 J

Therefore, the work done by gravity on the watermelon during its displacement from the roof to the ground is 978.5 Joules.

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If a hollow sphere is rolling along a horizontal floor at 4.50 m/s when it comes to a 27.0 ∘ incline then the hollow sphere rolls up the incline a distance of approximately 0.665 meters before reversing direction.

To solve this problem, we can use the conservation of mechanical energy. At the bottom of the incline, the sphere has kinetic energy due to its motion and no potential energy. At the top of the incline, the sphere has potential energy due to its height and no kinetic energy. Therefore, the initial kinetic energy must be equal to the final potential energy, neglecting any energy losses due to friction.

Let's denote the mass of the hollow sphere as m, its radius as R, and the height it reaches on the incline as h. Then, we can write:

Initial kinetic energy = 1/2 × m × v², where v is the speed of the sphere at the bottom of the incline.

Final potential energy = m × g × h, where g is the acceleration due to gravity.

Setting these two energies equal, we get:

1/2 × m × v²= m ×g ×h

Simplifying and solving for h, we get:

h = v² / (2 ×g) × (1 - sinθ), where θ is the angle of the incline.

Substituting the given values, we get:

h = (4.50 m/s)² / (2 × 9.81 m/s²) × (1 - sin(27°)) ≈ 0.665 m

Therefore, the hollow sphere rolls up the incline a distance of approximately 0.665 meters before reversing direction.

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When a hockey puck is struck with a hockey stick, a force acts on the puck and the puck exerts an equal and opposite force on the stick.

According to Newton's third law of motion, for every action, there is an equal and opposite reaction. When the hockey stick strikes the puck, it applies a force to the puck in one direction. As a result, the puck exerts an equal magnitude of force but in the opposite direction on the stick.

This interaction between the stick and the puck is what allows the puck to be propelled forward. The force applied to the puck by the stick causes it to accelerate and move in the direction of the applied force. The reaction force exerted by the puck on the stick also affects the motion and stability of the stick in the opposite direction.

The combination of these forces and reactions contributes to the transfer of momentum and energy from the stick to the puck, enabling the puck to move with speed and travel in the desired direction on the ice.

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Related to action of light on a diffraction grating, the statements are False, True, and False.

A diffraction grating is a device with a large number of parallel and equidistant slits. When light passes through a diffraction grating, it diffracts and produces a series of bright fringes on a screen behind the grating. The distance between the bright fringes depends on several factors, including the distance between the slits in the grating, the angle of incidence of the light, the order of the bright fringe, and the wavelength of the light.

1. If the distance between the screen and the grating is halved, then distance between the bright fringes doubles. False.

If the distance between the screen and the grating is halved, the distance between the bright fringes does not double. The distance between the bright fringes is given by the equation:

d sin θ = mλ

where d is the distance between the slits in the grating

θ is the angle between the incident light and the normal to the grating

m is the order of the bright fringe

λ is the wavelength of the light.

Halving the distance between the screen and the grating will increase the angle θ, but it does not affect d, m, or λ. Therefore, the distance between the bright fringes does not double.

2. If the wavelength of the light is increased, then the distance between the bright fringes increases. True.

The distance between the bright fringes in a diffraction grating is given by the equation:

d sin θ = mλ

where d is the distance between the slits in the grating

θ is the angle between the incident light and the normal to the grating

m is the order of the bright fringe

λ is the wavelength of the light.

If the wavelength of the light is increased, the distance between the bright fringes will also increase. This is because the wavelength appears in the denominator of the equation, so an increase in λ will lead to a proportional increase in the distance between the bright fringes.

3. If the line density of the grating is halved, then the distance between the bright fringes also halves. False.

The distance between the bright fringes in a diffraction grating is given by the equation:

d sin θ = mλ

where d is the distance between the slits in the grating

θ is the angle between the incident light and the normal to the grating

m is the order of the bright fringe

λ is the wavelength of the light.

If the line density of the grating is halved (i.e., the distance between the slits in the grating is doubled), the distance between the bright fringes does not halve. In fact, the distance between the bright fringes is directly proportional to the distance between the slits, so doubling the distance between the slits will also double the distance between the bright fringes.

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The forces exerted at B and C on member BCE are 43.3 lb and 33.7 lb, respectively.

To determine the forces exerted at B and C on member BCE when F = 50 lb, we need to use the principles of equilibrium. According to these principles, the sum of all forces acting on a stationary object is zero.

Neglecting the effect of friction, we can assume that the forces acting on member BCE are only the tension forces at points B and C, and the applied force F. We can draw a free body diagram of the system and use the equations of equilibrium to solve for the unknown forces.

Using the equation of vertical equilibrium, we can write:

T_B sin 60° + T_C sin 30° = F cos 30°

Using the equation of horizontal equilibrium, we can write:

T_B cos 60° = T_C cos 30°

We can solve these equations simultaneously to obtain the values of T_B and T_C. Substituting the value of F = 50 lb, we get:

T_B = 43.3 lb and T_C = 33.7 lb

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The amplitude of the oscillation is 8.65 cm and the glider's position at t = 29.0 s is 5.63 cm.

To find the amplitude of the oscillation, we can use the maximum speed and the period of the oscillation. The maximum speed occurs at the equilibrium position, where the spring force and the frictional force balance each other.

At this point, the kinetic energy is maximum and the potential energy is minimum. The amplitude of the oscillation is half the distance between the two extreme positions of the glider.

The maximum speed of the glider is 34.0 cm/s, which occurs at the equilibrium position. The period of the oscillation is 1.60 s. We can use the formula for the period of a simple harmonic motion to find the angular frequency of the oscillation:

T = 2π/ω

ω = 2π/T = 2π/1.60 s = 3.93 rad/s

The amplitude A of the oscillation is given by:

A = vmax/ω = 34.0 cm/s / 3.93 rad/s = 8.65 cm

Therefore, the amplitude of the oscillation is 8.65 cm.

To find the glider's position at t = 29.0 s, we can use the equation for the displacement of a simple harmonic motion:

x = Acos(ωt + φ)

where A is the amplitude, ω is the angular frequency, t is the time, and φ is the phase angle. To determine the phase angle, we need to know the initial conditions of the oscillation. Since the glider is released from rest at t = 0, the initial phase angle is zero:

φ = 0

Thus, the displacement of the glider at t = 29.0 s is:

x = Acos(ωt) = (8.65 cm)cos(3.93 rad/s * 29.0 s) = -5.63 cm

Note that the negative sign indicates that the glider is to the left of its equilibrium position. Therefore, the glider's position at t = 29.0 s is 5.63 cm to the left of its equilibrium position.

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The resistance of the lamp filament is approximately 30 Ω. This can be calculated using Ohm's Law: resistance (R) = voltage (V) / current (I), where V = 12 V and I = 0.4 A.

Ohm's Law states that the resistance of a circuit element can be determined by dividing the voltage across it by the current flowing through it. In this case, the voltage is 12 V (given) and the current is 0.4 A (given). By substituting these values into the formula R = V / I, we can calculate the resistance of the lamp filament.

[tex]R = 12 V / 0.4 A[/tex]

[tex]R ≈ 30 Ω[/tex]

Therefore, the resistance of the lamp filament is approximately 30 Ω. This means that when the lamp is in use, it will draw 0.4 A of current from the car's 12 V battery.

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The attractive force between two point charges can be calculated using Coulomb's law, which states that the force is directly proportional to the product of the charges and inversely proportional to the square of the distance between them.

Therefore, we can use the equation:

F = k * q1 * q2 / r^2

where F is the force, k is the Coulomb constant, q1 and q2 are the charges, and r is the distance between them.

In this case, we know that the distance between the charges changes from 7.0 cm to 12 cm. Therefore, we can use the equation to find the new force:

F' = k * q1 * q2 / (12 cm)^2

To solve for F', we need to know the values of k, q1, and q2. Unfortunately, these values are not provided in the question. Therefore, we cannot give an exact answer to this question.

However, we can make some general observations based on the information provided. We know that the force between the charges decreases as the distance between them increases. Therefore, we would expect the force to be smaller when the charges are separated by 12 cm compared to when they are separated by 7 cm. Additionally, we know that the force between the charges is attractive, meaning that the charges have opposite signs. If the charges were of the same sign, the force would be repulsive.

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A.) The wavelength of the wave in vacuum is λ = 7.5×10^-8 m.

B.) The wavelength of the wave in vacuum is λ = 0.075 µm or 75 nm.

C.) The wavelength of the wave in water is λ_w = 5.77×10^-8 m.

(a) The wavelength of an electromagnetic wave in vacuum can be calculated using the following formula:

λ = c/f

where c is the speed of light and f is the wave frequency. By substituting the specified frequency f = 41015 Hz and the speed of light c = 3108 m/s, we obtain:

= c/f = (3108 m/s) / (41015 Hz) = 7.510-8 m

As a result, the wave's wavelength in vacuum is = 7.510-8 m.

(b) Using the given values of frequency f = 41015 Hz and light speed c = 3108 m/s in the formula = c/f, we get:

[tex]= c/f = (3108 m/s)/(41015 Hz) = 0.075 m[/tex]

As a result, the wave's wavelength in vacuum is = 0.075 m or 75 nm.

(c) The wavelength of an electromagnetic wave in water can be calculated using the following formula:

λ_w = λ/n_w

where is the wave's wavelength in vacuum and n_w is the refractive index of water. By substituting = 7.510-8 m, n_w = 1.3, and the speed of light c = 3108 m/s, we obtain:

[tex]λ_w = λ/n_w = (7.5×10^-8 m)/(1.3) = 5.77×10^-8 m[/tex]

As a result, the wavelength of a wave in water is _w = 5.7710-8 m.

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The wavelength of the electromagnetic wave in vacuum can be found using the formula λ = c/f, where c is the speed of light and f is the frequency.

Substituting the given values, we get:
λ = c/f = 3×10^8 m/s / 4×10^15 Hz = 7.5×10^-8 m
Therefore, the wavelength of the wave in vacuum, λ, in terms of f and c is 7.5×10^-8 m.
To find the numerical value of λ in m, we just need to substitute the value of c:
λ = 3×10^8 m/s / 4×10^15 Hz = 0.075 nm
Therefore, the wavelength of the wave in vacuum is 0.075 nm.
The wavelength of the wave in water can be found using the formula λ w = λ/n w, where n w is the index of

refraction of water. Substituting the given values, we get:
λ w = λ/n w = (3×10^8 m/s / 4×10^15 Hz) / 1.3 = 5.77×10^-8 m
Therefore, the wavelength of the wave in water, λ w , in terms of f, c, and n w is 5.77×10^-8 m.


(a) To find the wavelength of the electromagnetic wave in vacuum, λ, we can use the formula:
λ = c / f
where c is the speed of light (approximately 3 x 10^8 m/s) and f is the frequency (4 x 10^15 Hz).
(b) To find the numerical value of λ, we can plug in the given values for c and f:
λ = (3 x 10^8 m/s) / (4 x 10^15 Hz)
λ = 0.75 x 10^-7 m
So the wavelength of the electromagnetic wave in vacuum is 0.75 x 10^-7 meters.
(c) To find the wavelength of the wave in water, λ_w, we can use the formula:
λ_w = (c / n_w) / f
where n_w is the index of refraction of water (1.3). Plugging in the values, we get:
λ_w = ((3 x 10^8 m/s) / 1.3) / (4 x 10^15 Hz)
λ_w = (2.307 x 10^8 m/s) / (4 x 10^15 Hz)
λ_w = 0.577 x 10^-7 m
So the wavelength of the electromagnetic wave in water is 0.577 x 10^-7 meters.

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