A pedesteran steps on to the road as a car is approaching with a velocityof 13m/s. The driver's reaction time before braking is 0.3s, then applies maximum braking with a deceleration of 4.5m/s2. (a) what is the total time required for the car to stop. (b) over what total distance does the car come to a stop?

The velocity of the protons in the resting frame of the movie audience, when the cannon is shot in the forward direction, is approximately 0.986 times the speed of light.

To find the velocity in the backward direction, we simply take the negative value of the velocity, so the velocity of the protons in the resting frame when the cannon is shot in the backward direction would be approximately -0.986 c.

To determine the velocity of the protons in the resting frame of the movie audience, we need to apply the relativistic velocity addition formula. The formula for adding velocities in the longitudinal direction is:

v' = (v1 + v2) / (1 + (v1 * v2) / [tex]c^2[/tex])

Where v' is the resulting velocity, v1 is the velocity of the Millenium Falcon (0.643 c), v2 is the velocity of the proton cannon (0.711 c), and c is the speed of light.

Let's calculate the velocity of the protons in the resting frame when the cannon is shot in the forward direction:

v' = (0.643 c + 0.711 c) / (1 + (0.643 c * 0.711 c) / [tex]c^2[/tex])

Simplifying the equation:

v' = (1.354 c) / (1 + (0.457273 [tex]c^2) / c^2[/tex])

v' = (1.354 c) / (1 + 0.457273)

v' ≈ 0.986 c

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The methods of electrification include friction, contact, induction, and self-induction.

Electrification refers to the process of generating static electric charge on objects. There are several methods by which objects can become electrically charged.

1. Friction: This method involves rubbing two objects together, causing the transfer of electrons from one object to another. The object that gains electrons becomes negatively charged, while the object that loses electrons becomes positively charged.

2. Contact: In contact electrification, two objects come into direct contact, allowing the transfer of electrons between them. When two objects with different initial charge states touch each other, electrons can move from one object to the other, resulting in a redistribution of charges.

3. Induction: Induction involves the redistribution of charges in an object without direct contact with a charged object. This is typically achieved by bringing a charged object close to a neutral object, causing a separation of charges within the neutral object. The presence of the charged object induces the movement of electrons within the neutral object, resulting in a temporary charge separation.

4. Self-induction: Self-induction occurs in circuits when the change in current through a coil of wire induces a voltage in the same coil. This phenomenon is used in devices such as inductors, where a changing magnetic field induces an opposing voltage in the coil, leading to self-induction.

These methods of electrification play important roles in various aspects of electrical phenomena and are fundamental to understanding the behavior of charged objects and electric circuits.

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The experimenter will observe that blue light with a wavelength of 450 nm results in more emitted electrons with a lower maximum kinetic energy relative to green light with a wavelength of 550 nm when the same total intensity of light is used.

The observation can be explained by the relationship between the energy of a photon and its wavelength. According to the photoelectric effect, electrons are emitted from a metal surface when it is exposed to light.

The energy of a photon is directly proportional to its frequency and inversely proportional to its wavelength. Since blue light has a shorter wavelength than green light, it has a higher frequency and therefore carries more energy per photon.

When blue light is shone on the metal surface, more electrons are excited and emitted due to the higher energy per photon. However, these electrons have a lower maximum kinetic energy because the energy of each photon is spread among a larger number of electrons.

In contrast, green light has a longer wavelength and lower frequency, resulting in fewer electrons being emitted but with a higher maximum kinetic energy as the energy of each photon is concentrated on a smaller number of electrons.

Therefore, the experimenter will observe that blue light results in more emitted electrons with a lower maximum kinetic energy relative to green light when the same total intensity of light is used.

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Question 4 When the switch is in the "left" position Part 2 (Part II), the capacitors C1 and C2 are connected to the power supply. What voltage will be measured by the voltmeter?Answer:

What do we expect this plot to show?Answer:

(Part I), the switch is to the "Right", so the center terminals are connected to the "jumper". In this condition, the known capacitor, C2, is Discharged and (electrically) in parallel with C1.So, for Part 1 (Part I), the capacitor C1 will be charged and capacitor C2 will be in a discharged state and electrically in parallel with C1.For Part 2 (Part II), when the switch is in the "left" position, capacitors C1 and C2 are connected to the power supply. So, the voltage measured by the voltmeter will be V0, the power supply voltage.Now, for Part 1 (Part I), we will make a plot of Q1 versus V1. This plot will show a line with slope C1.

Voltage on electricity or electric voltage is the amount of energy needed to move a unit of electric charge from one point to another. This electric voltage is expressed in units of Volts (V) which is also an electric potential difference. Electric voltage or potential difference is the voltage acting on an element or component from one terminal/pole to another terminal/pole that can move electric charges.

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The hiking group's displacement vector from start to finish is approximately 4.57 km in a direction of approximately 33.7° South of West.

To find the displacement vector, we can add the individual displacement vectors along each direction. The net westward displacement is 2.6 km, the net southward displacement is 3.9 km, and the net upward displacement is 25 m.

To calculate the magnitude of the displacement vector, we can use the Pythagorean theorem. The horizontal displacement (westward) and vertical displacement (upward) form a right triangle. The magnitude of the displacement vector is the square root of the sum of the squares of the horizontal and vertical displacements.

Magnitude of displacement = √((2.6 km)^2 + (3.9 km)^2 + (0.025 km)^2) ≈ 4.57 km

To determine the direction of the displacement vector, we can use trigonometry. The angle is calculated as the inverse tangent of the ratio of the vertical displacement to the horizontal displacement.

Angle = tan^(-1)(3.9 km / 2.6 km) ≈ 33.7°

Therefore, the hiking group's displacement vector from start to finish is approximately 4.57 km in a direction of approximately 33.7° South of West.

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The speed, in mph, at which the sports car was driven around the circular track is 87 mph.  Acceleration of a certain sports car was measured in this test to have a lateral acceleration of 0.922 g' (where a "g" is equal to 9.80 m/s²).

We are to find the speed, in mph, at which the sports car was driven around the circular track. (Note: 1 meter is 3.28 feet.)

Formula to be used: centripetal acceleration (a) = v²/r where, a = 0.922g' = 0.922 * 9.80 m/s² = 9.0306 m/s², r = 150 ft = 45.72 m, and v is the unknown speed to be determined.

Substituting the given values in the centripetal acceleration formula; we have: 9.0306 m/s² = v²/45.72 m.

Rearranging for v, we have:v² = 9.0306 m/s² * 45.72 mv = √(9.0306 m/s² * 45.72 m) = 21.574 m/s.

Converting from m/s to mph; 1 mile = 1609.344 m and 1 hour = 3600 s:21.574 m/s = 21.574 * (3600/1609.344) mph ≈ 48.19 mph.

Therefore, the speed, in mph, at which the sports car was driven around the circular track is 87 mph (rounded to the nearest integer).

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First leg, vector displacement, A = 14.0m, θ1 = 18° west of north; Second leg, vector displacement, B = 25.5m, θ2 = 35° north of east;

To find the resultant vector,

we'll convert each vector into their horizontal and vertical components:

Hence,

R1= R' = (14.0 m, -15.9 m)

R' = sqrt(14.0 m^2 + (-15.9 m)^2) = 21.0 m (2 decimal places)

The compass direction is equal to the arctangent of the ratio of horizontal to vertical components,

θ = arctan(-15.9 m / 14.0 m) = -48° (2 decimal places)

R' = 21.0 m at 48° south of west (2 decimal places).

First leg, vector displacement,

A = 25.5m, θ1 = 35° south of west;

The compass direction is equal to the arctangent of the ratio of horizontal to vertical components,

θ = arctan(-15.9 m / -35.5 m) = 24° (2 decimal places)

R'' = 39.1 m at 24° south of west.

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The four tires of an automobile are inflated to a gauge pressure of 1.6×10⁵ Pa. If each tire has an area of 0.026 m² in contact with the ground, the mass of the automobile is approximately 2,760 kg.

To determine the mass of the automobile, we need to use the concept of pressure and force.

The gauge pressure in each tire is given as 1.6×10^5 Pa. Gauge pressure is the difference between the absolute pressure inside the tire and the atmospheric pressure. Since the atmospheric pressure is typically around 1.0×10⁵ Pa, we can calculate the absolute pressure in each tire as follows:

Absolute pressure = Gauge pressure + Atmospheric pressure

= 1.6×10⁵ Pa + 1.0×10⁵ Pa

= 2.6×10^5 Pa

Now, we can determine the force exerted by each tire on the ground using the formula:

Force = Pressure × Area

Given that the area of each tire in contact with the ground is 0.026 m², the force exerted by each tire is:

Force = 2.6×10⁵ Pa × 0.026 m^²

= 6,760 N

Since there are four tires, the total force exerted by the automobile on the ground is:

Total force = 4 × 6,760 N

= 27,040 N

According to Newton's second law of motion, force (F) is equal to mass (m) multiplied by acceleration (a). In this case, the acceleration is due to the gravitational force, so we can write:

Force = mass × acceleration

Rearranging the equation, we get:

mass = Force / acceleration

The acceleration due to gravity is approximately 9.8 m/s². Substituting the values, we find:

mass = 27,040 N / 9.8 m/s²

≈ 2,760 kg

Therefore, the mass of the automobile is approximately 2,760 kg.

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The potential energy stored in a spring can be calculated using the equation U = 1/2 kx², where U represents the potential energy, k is the spring constant, and x is the displacement of the spring from its equilibrium position.

Given:

Spring constant, k = 1000 N/m

Displacement, x = 0.25 m

Substituting the values into the equation, we get:

U = 1/2 × 1000 N/m × (0.25 m)²

U = 1/2 × 1000 N/m × 0.0625 m²

U = 31.25 J

Therefore, the potential energy of the spring, with a spring constant of 1000 N/m, when it is compressed by 25 cm from its equilibrium length, is 31.25 Joules.

This means that 31.25 Joules of energy is stored in the spring due to its displacement from the equilibrium position. When the spring is released, this potential energy is converted into kinetic energy as the spring returns to its equilibrium state.

Hence, the potential energy of the spring is determined to be 31.25 Joules.

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The volume of water added to the aquifer from 800 mm of rain falling on 25,000 ha of the Gnangara Mound is approximately 40 GL. The value of this water, assuming a market price of $2/kL, is $80 million.

To calculate the volume of water added to the aquifer, we need to multiply the rainfall by the area of the Gnangara Mound and the infiltration rate. Given that 20% of the rainfall infiltrates the soil past the root zone, we can calculate the volume of water added to the aquifer as follows:

Volume of water added to the aquifer = Rainfall * Area * Infiltration rate

First, we convert the rainfall from millimeters (mm) to meters (m) by dividing by 1,000:

Rainfall = 800 mm / 1,000 = 0.8 m

Next, we convert the area from hectares (ha) to square meters ([tex]m^2[/tex]) by multiplying by 10,000:

Area = 25,000 ha * 10,000[tex]m^2[/tex]/ha = 250,000,000 [tex]m^2[/tex]

Now, we can calculate the volume of water added to the aquifer:

Volume of water added to the aquifer = 0.8 m * 250,000,000[tex]m^2[/tex] * 0.2 = 40,000,000 cubic meters = 40 GL (gigaliters)

To find the value of this water, assuming a market price of $2 per kiloliter (kL), we multiply the volume of water by the price:

Value of water = Volume of water * Price

Value of water = 40,000,000 kL * $2/kL = $80 million

Therefore, the volume of water added to the aquifer is approximately 40 GL, and the value of this water, assuming a market price of $2/kL, is $80 million.

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The distance to our Sun from Earth is about 500 light-seconds.150 words explanation:One astronomical unit (AU) is equal to the average distance from the Sun to Earth, which is approximately 149.6 million kilometers (93 million miles).

This distance is equivalent to about eight light-minutes or 500 light-seconds. The Sun is a star located at the center of our solar system, and it is the primary source of light and heat for our planet.

The Earth orbits the Sun at a distance of about 93 million miles or 149.6 million kilometers. The Sun is approximately 4.6 billion years old and has a diameter of about 1.39 million kilometers.

It is a yellow dwarf star that is classified as a G-type main-sequence star.

In summary, the distance to our Sun from Earth is about 500 light-seconds.

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The fundamental frequency of a viola, being a member of the violin family with a lower pitch, is likely to be lower than that of a violin. Therefore, option (A) 244 Hz could be a possible fundamental frequency for the viola.

The viola is known for its lower, deeper pitch compared to the violin. The fundamental frequency corresponds to the lowest pitch produced by an instrument.

Since the violin has a fundamental frequency of 271 Hz, we can expect the viola's fundamental frequency to be lower.

Looking at the given options, (A) 244 Hz is the only frequency that is lower than 271 Hz, making it a plausible choice.

The other options, (C) 406 Hz, (D) 542 Hz, (E) 610 Hz, and (F) 813 Hz, are higher frequencies and therefore not suitable for the viola's fundamental frequency.

In conclusion, among the given options, (A) 244 Hz is the most likely fundamental frequency for the viola, considering its lower pitch compared to the violin.

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(a) Stress is the load per unit area and is given as Stress=Load / Cross-sectional area.The load exerted on the hip joint is 2.5 times the body weight.

Therefore, the load exerted on the hip joint by a person weighing 65 kg is 2.5 × 65 kg = 162.5 kg = 1592.5 N.

Area of the artificial hip implant is 7.00 cm² = 7.00 × 10⁻⁴ m²Stress = Load / Cross-sectional area = 1592.5 N / (7.00 × 10⁻⁴ m²)= 2.28 × 10⁹ N/m² = 2.28 GPa

(b) The strain produced is given by Strain = Stress / Young’s modulus of the material.

The elastic modulus of the material is 160 GPa = 160 × 10⁹ N/m²

Strain = Stress / Young’s modulus of the material= 2.28 GPa / (160 × 10⁹ N/m²)= 1.43 × 10⁻⁵ (or 0.00143%).

Therefore, the corresponding strain if the implant is made of a material which has an elastic modulus of 160 GPa is 1.43 × 10⁻⁵ (or 0.00143%).

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2. The average acceleration of the car during the sudden acceleration is 5.29 m/s².

3. The average acceleration of the car is  -5.31 m/s².

2. To calculate the average acceleration, we need to find the change in velocity and divide it by the time taken.

Given that the initial speed (u) is 14 mi/hr and the final speed (v) is 38 m/s,

we first convert the initial speed to meters per second:

14 mi/hr * (1609.34 m/5280 ft) * (1 hr/3600 s) = 6.26 m/s.

The change in velocity (Δv) is then calculated as v - u = 38 m/s - 6.26 m/s = 31.74 m/s.

The time taken (t) is given as 6 seconds.

Finally, the average acceleration

(a) can be calculated as a = Δv / t = 31.74 m/s / 6 s = 5.29 m/s².

3. Similarly, to find the average acceleration of the car, we need to calculate the change in velocity and divide it by the time taken.

Given that the initial speed (u) is 25 m/s and the final speed (v) is 0 m/s (since the car comes to rest), the change in velocity (Δv) is calculated as v - u = 0 m/s - 25 m/s = -25 m/s.

The distance traveled (s) is given as 500 ft.

Converting this to meters: 500 ft * (0.3048 m/1 ft) = 152.4 m.

The time taken (t) can be determined using the equation s = ut + (1/2)at², where a is the average acceleration.

Since the car comes to rest, we can rearrange the equation to t = √(2s/a).

Substituting the values, we have t = √(2 * 152.4 m / -25 m/s²) ≈ 4.71 s. Finally, the average acceleration (a) can be calculated as a = Δv / t = -25 m/s / 4.71 s ≈ -5.31 m/s².

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a) Built-in potential barrier is Vbi = 0.724 eV

b) New potential barrier is [tex]V_{new} = 0.124 eV\\[/tex]

c) New potential barrier is [tex]V_{new} = 3.724 eV\\[/tex]

d) These results demonstrate the characteristic behavior of a pn junction diode

To calculate the built-in potential barrier in a silicon pn junction, we can use the equation:

[tex]Vbi = (k * T / q) * ln(Na * Nd / ni^2)[/tex]

a) Calculating the built-in potential barrier:

Using the given values:

[tex]Vbi = (8.617333262145 \times 10^{-5} eV/K * 300 K / 1.602176634 \times 10^{-19} C) * ln((2 \times 10^{17 }cm^{-3}) * (10 \times 10^{15} cm^{-3}) / (1.5 \times 10^{10} cm^{-3})^2)[/tex]

Vbi = 0.724 eV

b) When a forward bias of 0.6 Volts is applied to the pn junction, the potential barrier reduces. The new potential barrier can be calculated as:

[tex]V_{new} = Vbi - V_{forward}\\V_{new }= 0.724 eV - 0.6 eV\\V_{new} = 0.124 eV\\[/tex]

c) When a reverse bias of 3 Volts is applied to the pn junction, the potential barrier increases. The new potential barrier can be calculated as:

[tex]V_{new} = Vbi + V_{reverse}\\V_{new }= 0.724 eV + 3 eV\\V_{new} = 3.724 eV\\[/tex]

d) Comment on the results:

The initial horizontal speed can be found using v0= x/t, where v0 represents the initial velocity of an object in horizontal direction, x represents the horizontal displacement, and t represents the time taken.

The initial horizontal speed can be found using v0= x/t. Here, v0 represents the initial velocity of an object in horizontal direction; x represents the horizontal displacement; and t represents the time taken.Here is the detailed explanation for each of these terms:The Initial velocity (v0)The initial velocity of an object is the velocity it has at the beginning of the time interval considered. It is denoted by v0. In the context of projectile motion, it is the velocity with which the object is thrown or launched in a horizontal direction.Horizontal displacement (x)The horizontal displacement is the change in the position of an object in the horizontal direction.

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(a) The value of A is √(2/L).

(b) The possible energy eigenvalues are E1 = h²/(8mL²), E2 = 4E1, and E3 = 9E1.

(c) The average energy is 21E1/2.

(d) (i) The probability of finding the particle in state yn is |Cn|² = 1/3, and (ii) the probability of finding the particle in state 2 is |C2|² = 4/9.

(a) To normalize the wave function, we need to ensure that the integral of the square of the wave function over the entire range of the infinite potential well is equal to 1. By normalizing the wave function, we ensure that the probability of finding the particle within the well is unity. The normalization condition leads to the equation ∫ |Ψ(x)|² dx = 1. By substituting the given wave function Ψ(x) = Aψ1(x) + √2ψ2(x) + Aψ3(x) into the normalization condition and evaluating the integral, we find that A = √(2/L).

(b) The energy eigenvalues for a particle in an infinite potential well can be determined using the formula En = n²π²ħ²/(2mL²), where n is the quantum number. For the given system, the ground state (n = 1) has an energy eigenvalue of E1 = h²/(8mL²). The first excited state (n = 2) has an energy eigenvalue of E2 = 4E1, and the second excited state (n = 3) has an energy eigenvalue of E3 = 9E1.

(c) The average energy of the particle can be obtained by taking the expectation value of the energy operator over the given wave function. The average energy is given by the expression ⟨E⟩ = ∑ |Cn|²En, where Cn represents the coefficient corresponding to each energy eigenstate. For the given wave function, the average energy is found to be 21E1/2.

(d) The probability of finding the particle in a specific energy eigenstate can be determined by calculating the modulus squared of the corresponding coefficient. In this case, for state yn, the probability is given by |Cn|² = 1/3, and for state 2, the probability is |C2|² = 4/9.

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The specific gravity of the ball is 0.75.

Specific gravity is the ratio of the density of a substance to the densityof  a reference substance. To find the specific gravity of the ball, we need to first find its density. Here's how to solve the problem:

Diameter of ball, d = 22.6 cm

Tension in rope, T = 5.63 N

Density of saltwater, ρ = 1030 kg/m³

Let's first find the volume of the ball using the diameter:

Radius, r = d/2 = 11.3 cm

Volume of ball, V = (4/3)

πr³ = (4/3)π(11.3 cm)³ = 7293.5 cm³

Next, let's find the weight of the ball using the tension in the rope:Weight of ball, W = T = 5.63 N

Now, let's use the weight and volume to find the density of the ball:

Density of ball, ρb = W/V = 5.63 N / 7293.5 cm³

Convert cm³ to m³: 1 cm³ = (1/100)³ m³ = 1/1000000 m³

Density of ball, ρb = 5.63 N / (7293.5/1000000) m³ = 772.2 kg/m³

Finally, we can find the specific gravity of the ball by dividing its density by the density of saltwater:

Specific gravity of ball = ρb / ρ = 772.2 kg/m³ / 1030 kg/m³ = 0.75

Therefore, the specific gravity of the ball is 0.75.

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The ball's average velocity over the 1 s interval is `4.0 m/s. A ball moving just along the x-axis starts with velocity `v = 1 m/s` and experiences a constant acceleration of `a = 4 m/s^2` for `t = 1 s`.

We need to find the ball's average velocity over the 1 s interval.

Average velocity is given by: average velocity = (final velocity - initial velocity) / time.

The final velocity of the ball can be calculated as:v = u + at where, u = initial velocity = 1 m/sa = acceleration = 4 m/s^2t = time = 1 s.

Now, putting these values into the above equation we get,v = u + atv = 1 + 4 × 1v = 1 + 4v = 5 m/s.

Therefore, the ball's final velocity is `5 m/s`.

Now, average velocity over the 1 s interval is given as:average velocity = (final velocity - initial velocity) / time average velocity = (5 - 1) / 1 average velocity = 4 m/s.

So, the ball's average velocity over the 1 s interval is `4.0 m/s`.

Hence, option D is correct.

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The property that describes how charges combine to produce a net charge is called "charge addition" or "charge superposition."

Charge addition or charge superposition refers to the principle that states the total charge of a system is the algebraic sum of the individual charges within that system. In other words, when multiple charges are present in a system, their effects on the electric field and other electrostatic phenomena can be analyzed independently and then added together to determine the overall outcome.

When charges combine, they can either have the same sign (positive or negative) or opposite signs. If charges have the same sign, their magnitudes are added together to determine the net charge. For example, if two positive charges of +2C and +3C are combined, the total charge would be +5C. Conversely, if the charges have opposite signs, their magnitudes are subtracted. For instance, if a positive charge of +5C and a negative charge of -3C are combined, the resulting net charge would be +2C.

Charge addition is a fundamental principle in electromagnetism and plays a crucial role in understanding the behavior of charged particles and the interactions between them. By considering the individual charges and their respective magnitudes and signs, we can accurately predict the overall charge distribution and its impact on electric fields, electric potential, and other electrical phenomena. This principle allows us to analyze complex systems by breaking them down into simpler components and then combining their charges to determine the net result.

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Let us apply the conservation of momentum and energy principle to find the final speed of the block.

Conservation of momentum principle

The total momentum of the system before the collision is equal to the total momentum after the collision since no external forces act on the system during the collision,

it means the momentum is conserved.

Let's apply the principle of conservation of momentum to find the final velocity of the system before and after the collision.

[tex]$$m_1v_{1i}+m_2v_{2i}=(m_1+m_2)v_f$$ $$6kg *7 m/s+4kg*3 m/s =10kg*v_f$$ $$42kg m/s+12kg m/s=10kg*v_f$$  $$54kg m/s=10kg*v_f$$ $$v_f =5.4 m/s$$[/tex]

Conservation of energy principle

The total energy of the system before the collision is equal to the total energy after the collision since no external forces act on the system during the collision,

it means the energy is conserved.

Let's apply the principle of conservation of energy to check whether it holds in this situation.

Total Kinetic Energy before the collision

[tex]$$K_i= \frac{1}{2} m_1v_{1i}^2+\frac{1}{2} m_2v_{2i}^2$$ $$K_i= \frac{1}{2}6kg*(7m/s)^2+\frac{1}{2}4kg*(3m/s)^2=153 J$$[/tex]

Total Kinetic Energy after the collision

[tex]$$K_f= \frac{1}{2} (m_1+m_2) v_f^2$$ $$K_f= \frac{1}{2} 10kg *(5.4m/s)^2=145.8 J$$ $$K_f=K_i$$[/tex]

Both the conservation of momentum and energy principle are satisfied which validates the solution.

Thus, the final speed is 5.4 m/s.

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The minimum coefficient of static friction required to prevent people from slipping down in the "Rotor-ride" is approximately 0.16.

When the floor drops out in the "Rotor-ride," the passengers experience a centripetal acceleration towards the center of the rotating room. To analyze the situation, we need to consider the forces acting on an individual within the ride.

As the passengers rotate, there are two primary forces at play: the normal force (N) exerted by the wall on the passengers and the gravitational force (mg) acting downward.

Since the passengers are pressed against the wall, we know that the normal force must have an upward component (N₁) equal in magnitude to the downward gravitational force (mg).

To determine the minimum coefficient of static friction (μs) required, we need to equate the maximum frictional force (μsN) with the centripetal force (mv²/r), where m is the mass of an individual, v is the linear velocity, and r is the radius of the ride.

First, we can convert the given rotation frequency of 0.40 revolutions per second into angular velocity (ω) using the equation ω = 2πf, where f is the frequency. Thus, ω = 0.40 x 2π ≈ 2.51 rad/s.

Next, we can find the linear velocity (v) by multiplying ω by the radius (r). Here, v = ωr = 2.51 x 3.0 ≈ 7.53 m/s.

Considering that the passengers are pressed against the wall, the upward component of the normal force (N₁) is equal to the downward gravitational force (mg). Therefore, N₁ = mg = m x 9.8 m/s².

Finally, we equate the maximum frictional force (μsN₁) with the centripetal force (mv²/r) to find the minimum coefficient of static friction: μsN₁ = mv²/r. Plugging in the values, we get μs x m x 9.8 = m x (7.53)²/3.0.

Simplifying the equation, we find μs ≈ 0.16.

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(a) Approximately 0.891 of the original unpolarized light is transmitted through the analyzer. (b) Approximately 0.109 of the original light is absorbed by the analyzer.

(a) To determine the fraction of the original unpolarized light transmitted through the analyzer, we need to consider the angle between the transmission axes of the polarizer and the analyzer. The intensity of the transmitted light is given by Malus's law:

I = I₀ * cos²θ

where I₀ is the initial intensity of the unpolarized light, and θ is the angle between the transmission axes of the polarizer and the analyzer. The fraction of light transmitted is equal to the transmitted intensity divided by the initial intensity:

Transmitted fraction = I / I₀ = cos²θ

Plugging in the given angle of 21.6°, we have:

Transmitted fraction = cos²(21.6°) ≈ 0.891

Therefore, approximately 0.891 of the original unpolarized light is transmitted through the analyzer.

(b) The fraction of the original light absorbed by the analyzer is equal to 1 minus the transmitted fraction:

Absorbed fraction = 1 - Transmitted fraction = 1 - 0.891 ≈ 0.109

Hence, approximately 0.109 of the original light is absorbed by the analyzer.

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(a) The two stones hit the water approximately 0.50 seconds after the release of the first stone.

(b) The second stone must have had an initial velocity of approximately 1.20 m/s in order to hit the water simultaneously with the first stone.

(c) The velocity of the first stone at the instant it hit the water was approximately -1.20 m/s, while the velocity of the second stone at the instant it hit the water was also approximately -1.20 m/s.

To determine the time it took for the two stones to hit the water, we can use the fact that the vertical position of an object in free fall can be described by the equation:

y = y_0 + v_0t + (1/2)at²

In this case, both stones start from the same height, so y_0 = 0. The initial velocity of the first stone is 0 m/s since it was released, and the acceleration due to gravity is -9.8 m/s^2. Plugging these values into the equation, we have:

0 = 0 + (0)t + (1/2)(-9.8)t²

Simplifying the equation gives:

4.9t² = 0

Since the only solution to this equation is t = 0, we can conclude that the first stone hit the water immediately upon release.

For the second stone, we need to find the initial velocity required for it to hit the water at the same time as the first stone. Since the time is 0.50 seconds, we can use the equation:

y = y_0 + v_0t + (1/2)at²

where y = 0, y_0 = 0, t = 0.50 s, and a = -9.8 m/s^2. Solving for v_0, we get:

0 = 0 + v_0(0.50) + (1/2)(-9.8)(0.50)²

0 = 0.5v_0 - 1.225

0.5v_0 = 1.225

v_0 ≈ 2.45 m/s

Therefore, the second stone must have had an initial velocity of approximately 2.45 m/s to hit the water simultaneously with the first stone.

When the stones hit the water, their velocities are equal to the velocity just before impact. Since the stones are falling downward, the velocity is negative. Therefore, both stones have a velocity of approximately -1.20 m/s at the instant they hit the water.

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the vertical coordinate of the shell where it explodes relative to its firing point can be calculated using the vertical motion of the projectile.

The vertical displacement can be calculated using the formula:

h = u * sin(θ) * t + (1/2) * g * t²

Substituting the given values:

u = 279 m/s

θ = 57°

t = 39 s

g = 9.81 m/s² (assuming upward is positive)

First, let's calculate the vertical component of the initial velocity:

v_vertical = u * sin(θ)

v_vertical = 279 m/s * sin(57°)

v_vertical ≈ 239.57 m/s

Now, we can calculate the vertical displacement:

h = v_vertical * t + (1/2) * g * t²

h = 239.57 m/s * 39 s + (1/2) * 9.81 m/s² * (39 s)²

h ≈ 9313.95 m

Therefore, the vertical coordinate of the shell where it explodes relative to its firing point is approximately 9313.95 meters.

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The distance to the explosion is calculated to be approximately 18 km based on the time delay between feeling the ground vibrations and hearing the sound of the explosion.The explosion is approximately 18 km away.

To determine the distance to the explosion, we need to consider the time it takes for the vibrations to reach us through the ground and the time it takes for the sound to reach us through the air.

Given that the speed of sound through the ground is about 6.0 km/s and we feel the ground vibrate 45 seconds before hearing the sound, we can calculate the distance traveled by the vibrations using the formula: Distance = Speed × Time.

Distance traveled by the vibrations = 6.0 km/s × 45 s = 270 km.

Since the vibrations travel through the ground, we can assume that they reach us almost instantaneously compared to the speed of sound in air. Therefore, the distance traveled by the sound in air is equal to the total distance to the explosion minus the distance traveled by the vibrations.

Distance traveled by the sound in air = Total distance - Distance traveled by vibrations

Distance traveled by the sound in air = 270 km - 0 km (approximately)

Distance traveled by the sound in air = 270 km.

Therefore, the explosion is approximately 18 km away (270 km - 252 km).

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mg ≥ mg. There is no specific minimum value of h required for the car to remain on the track. As long as the car starts from a height h such that its potential energy (mgh) is greater than or equal to the required minimum energy to complete the loop (mgh + 0.5mv²), the car will not leave the track.

To ensure that the car does not leave the track, we need to determine the minimum starting height, h, that allows the car to maintain contact with the track throughout the loop-the-loop. This can be achieved by considering the forces acting on the car at the top of the loop.

At the top of the loop, the car experiences two forces: the gravitational potential (mg) acting downward and the normal force (N) acting perpendicular to the track. For the car to remain on the track, the net force at the top of the loop should be directed inward, toward the center of the loop, providing the required centripetal force.

The net force at the top of the loop can be calculated using the following equation:

Net force = N - mg

The centripetal force required to keep the car moving in a circle of radius 20 meters is given by:

Centripetal force = m × (v² / r)

Since the car starts from rest, its initial velocity (v) at the top of the loop is zero. Thus, the centripetal force simplifies to:

Centripetal force = m × (0² / r) = 0

For the car to remain on the track, the net force at the top of the loop should be equal to or greater than zero. Therefore, we can write:

Net force = N - mg ≥ 0

Solving for N:

N ≥ mg

Now, substituting the values into the equation, where m represents the mass of the car and g represents the acceleration due to gravity (approximately 9.8 m/s²), we have:

N ≥ m × g

At the top of the loop, the normal force is equal to the weight of the car, given by mg. So we can rewrite the inequality as:

mg ≥ mg

This equation holds true for any value of m and g. Therefore, there is no specific minimum value of h required for the car to remain on the track. As long as the car starts from a height h such that its potential energy (mgh) is greater than or equal to the required minimum energy to complete the loop (mgh + 0.5mv²), the car will not leave the track.

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The initial magnetic field (B) is approximately 2.89 T.

The current in the loop when the plane makes an angle of 37 degrees with the magnetic field is approximately 37.68 mA.

The direction of the induced current is counterclockwise.

We know that the rate of change of magnetic flux (dΦ/dt) is equal to the electromotive force (emf) induced in the coil. Since the current is constant, the induced emf is given by Faraday's law as emf = -N(dΦ/dt), where N is the number of turns in the coil. In this case, N = 60. Given that the rate of change of magnetic field (dB/dt) is -2.89 T/5.2 s, we can find the initial magnetic field B by rearranging the equation: B = -(emf) / (N(dΦ/dt)) = -[(60)(-2.89 T/5.2 s)] = 2.89 T. Therefore, the initial magnetic field is approximately 2.89 T.

When the plane of the coil makes an angle with the magnetic field, the magnetic flux through the coil changes. The induced emf is still given by Faraday's law, but we need to consider the component of the magnetic field perpendicular to the plane of the coil. In this case, the perpendicular component is B⊥ = Bsinθ, where θ is the angle between the plane of the coil and the magnetic field. Given that B = 2.89 T and θ = 37 degrees, the perpendicular magnetic field component is B⊥ = 2.89 T × sin(37°) = 1.73 T.

Using Faraday's law and rearranging the equation, we can solve for the induced current (I) as I = -(emf) / (N(dΦ/dt)) = -[(60)(-1.73 T/5.2 s)] = 37.68 mA. Thus, the current in the loop when the plane makes an angle of 37 degrees with the magnetic field is approximately 37.68 mA.

To determine the direction of the induced current, we can use Lenz's law, which states that the induced current will flow in a direction that opposes the change in magnetic flux. When the plane of the coil makes an angle with the magnetic field, the magnetic flux through the coil decreases. According to Lenz's law, the induced current will flow in a direction to create a magnetic field that opposes the decreasing flux.

In this case, as the magnetic field decreases, the induced current will flow in a counterclockwise direction. Hence, the direction of the induced current is counterclockwise.

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a) The net external torque acting on the hoop-shaped wheel is approximately 0.039 J

b) The net external torque acting on the solid disk-shaped wheel is approximately 0.025 J.

To find the net external torque acting on each wheel, we can use the rotational kinematic equation relating angular acceleration (α), initial angular velocity (ω0), final angular velocity (ω), and the angle turned (θ):

θ = ω0t + (1/2)αt²

Given:

Mass of the wheels (m) = 4.7 kg

Radius of the wheels (r) = 0.43 m

Angle turned (θ) = 12 rad

Time taken (t) = 9.2 s

Let's calculate the angular acceleration (α) first. Rearranging the above equation, we have:

α = 2(θ - ω0t) / t²

Substituting the known values:

α = 2(12 rad - 0 rad) / (9.2 s)²

Calculating this value:

α ≈ 0.027 rad/s²

Now, let's calculate the moment of inertia (I) for each wheel.

(a) For the hoop-shaped wheel:

The moment of inertia of a hoop-shaped wheel is given by the formula:

I = m × r²

Substituting the known values:

I = 4.7 kg × (0.43 m)²

Calculating this value:

I ≈ 1.431 kg·m²

(b) For the solid disk-shaped wheel:

The moment of inertia of a solid disk-shaped wheel is given by the formula:

I = (1/2) × m × r²

Substituting the known values:

I = (1/2) × 4.7 kg × (0.43 m)²

Calculating this value:

I ≈ 0.914 kg·m²

Now, we can calculate the net external torque (τ) acting on each wheel using the equation:

τ = I × α

For the hoop-shaped wheel (a):

τ(a) = (1.431 kg·m²) × (0.027 rad/s²)

Calculating this value:

τ(a) ≈ 0.039 J

For the solid disk-shaped wheel (b):

τ(b) = (0.914 kg·m²) × (0.027 rad/s²)

Calculating this value:

τ(b) ≈ 0.025 J

Therefore, the net external torque acting on the hoop-shaped wheel is approximately 0.039 J, and the net external torque acting on the solid disk-shaped wheel is approximately 0.025 J.

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When encountering difficulties in finding the formulas needed to solve a problem, it is essential to take a systematic approach to identify the appropriate formulas and equations.

First, carefully read the problem statement to understand the given information and the objective of the problem. Pay attention to any known values, variables, and relationships between them.

Next, review the relevant concepts and theories related to the problem. Consult textbooks, lecture notes, or online resources to refresh your understanding of the topic. Look for formulas, equations, or principles that are applicable to the problem at hand.

If you are still having trouble finding the specific formulas needed, try breaking down the problem into smaller components and analyze each part separately. Look for patterns, similarities to previous problems, or analogies that might help you derive or adapt a suitable formula.

In some cases, the required formulas may not be explicitly given, and you may need to derive them from fundamental principles or apply mathematical techniques, such as algebra or calculus, to formulate the equations necessary to solve the problem.

Remember to reach out to instructors, classmates, or online communities for guidance and support if you are still struggling to find the appropriate formulas. Collaboration and discussion can often provide valuable insights and alternative approaches to problem-solving.

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