A visitor to a lighthouse wishes to determine the height of the tower. She ties a spool of thread to a small rock to make a simple pendulum, which she hangs down the center of a spiral staircase of the tower. The period of oscillation is 6.40 s. What is the height of the tower

From largest to smallest they are: Universe, galaxy, solar system, star, planet, moon and asteroid.

Explanation:Let's describe them from smallest to largest. In fact the size order is not exact as there are exceptions.An asteroid is a rocky body which lies in the asteroid belt between Mars and Jupiter. They are typically quite small object. The largest asteroid Ceres has been reclassified as a dwarf planet.A moon is typically a rocky body which is in orbit around a planet. Some moons such as our Moon are quite large and are typically bigger than asteroid. Some moons can actually be smaller than some asteroids.A planet is a nearly spherical body which is in orbit around the Sun. Planets are larger than moons.A star is what planets orbit around. It is the source of light and heat. Our Sun is a star which is many times bigger than all of the planets.A solar system is a star and all of its planets, asteroids, comets and other bodies. It is significantly bigger than a star.A galaxy, such as our Milky Way Galaxy, is a collection of solar systems orbiting around a central core. Most galaxies have a supermassive black hole at their centres.Galaxies also form clusters which are large scale structures.The universe is everything. It contains billions of galaxies. Lots of information RIGHT!!!!

YOUR VERY WelCoMe!!!!           :) :) :) :) :0 :)

Answer:

Universe, galaxy, solar system, star, planet, moon and asteroid. Hope this helped!

This question is about the principle of the conservation of angular momentum and how changes in moment of inertia affect angular velocity. When people step onto the merry-go-round, its moment of inertia increases causing the angular velocity to decrease, whereas when they jump off, the moment of inertia decreases, thus increasing the angular velocity.

This question falls into the realm of rotational dynamics, specifically dealing with the conservation of angular momentum and the effect of moment of inertia on angular velocity. Let's break it down:

(a) Four people step onto the merry-go-round

When the four people step onto the merry-go-round, they increase its moment of inertia, thus reducing its angular velocity according to the principle of conservation of angular momentum. We can find the new angular velocity using the equation L_initial = L_final, where L is the angular momentum. Hence, we have I_initial * ω_initial = I_final * ω_final. Rewriting for ω_final gives us ω_final = (I_initial * ω_initial / I_final).

(b) People jump off the merry-go-round

On the other hand, when people jump off the merry-go-round, they are reducing its moment of inertia, thus increasing the angular velocity under the conservation of angular momentum. Hence, a similar equation would apply, only that the final angular velocity would be higher than the initial angular velocity because the final moment of inertia is lower due to the people jumping off.

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Answer:

1.25 kgm²/sec

Explanation:

Disk inertia, Jd =

Jd = 1/2 * 3.7 * 0.40² = 0.2960 kgm²

Disk angular speed =

ωd = 0.1047 * 30 = 3.1416 rad/sec

Hollow cylinder inertia =

Jc = 3.7 * 0.40² = 0.592 kgm²

Initial Kinetic Energy of the disk

Ekd = 1/2 * Jd * ωd²

Ekd = 0.148 * 9.87

Ekd = 1.4607 joule

Ekd = (Jc + 1/2*Jd) * ω²

Final angular speed =

ω² = Ekd/(Jc+1/2*Jd)

ω² = 1.4607/(0.592+0.148)

ω² = 1.4607/0.74

ω² = 1.974

ω = √1.974

ω = 1.405 rad/sec

Final angular momentum =

L = (Jd+Jc) * ω

L = 0.888 * 1.405

L = 1.25 kgm²/sec

To find the final angular momentum of the system, we can apply the principle of conservation of angular momentum. The initial angular momentum of the turntable is equal to its final angular momentum, which can be determined using the moment of inertia and final angular velocity of the system.

The final angular momentum of the system can be determined by applying the principle of conservation of angular momentum. Since no external torques act on the system, the angular momentum of the system remains constant. Initially, the turntable has an angular momentum given by L1 = I1ω1, where I1 is the moment of inertia of the turntable and ω1 is its initial angular velocity. After the hollow cylinder slips on the turntable and acquires the same final angular velocity, the system's angular momentum becomes L2 = I1ω2. Setting L1 = L2 and solving for ω2 gives us the final angular velocity of the system. Finally, we can use the moment of inertia of the turntable to calculate its final angular momentum, Lf = I1ω2.

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Final answer:

The magnitude of the magnetic field at the center of the loops can be determined using Ampere's law. It is given by µ₀NI/(2a), where µ₀ is the permeability of free space, N is the number of turns, I is the current, and a is the radius of the loop.

Explanation:

The magnitude of the magnetic field at the center of the loops can be determined using Ampere's law. According to the law, the magnetic field inside a current-carrying wire of radius a is given by µ₀NI/(2a), where µ₀ is the permeability of free space, N is the number of turns, I is the current, and a is the radius of the loop.

In this case, the radius of the first loop is a and the current is I. Since the pattern is repeated up to the Nth loop, the radius of the Nth loop is Na and the current is NI. Therefore, the magnitude of the magnetic field at the center of the loops is µ₀NI/(2a).

Final answer:

The net magnetic field at the center of a series of alternating coaxial current loops is zero due to the cancellation of the magnetic fields of each pair of loops with opposite currents.

Explanation:

The question refers to a configuration of coaxial current loops whose radii and currents increase with each subsequent loop, and where the direction of current alternates with each loop. To find the magnetic field at the center due to each loop, we use the formula for the magnetic field (B) at the center of a current loop: B = (µ0I)/(2r), where µ0 is the permeability of free space, I is the current, and r is the radius of the loop.

For each pair of consecutive loops, the magnetic fields will be in opposite directions due to the alternating current direction. Thus, the magnetic fields generated by each pair of loops (except for the last one if N is odd) will cancel each other out. If N is even, all fields cancel out and the net magnetic field is zero; if N is odd, the net magnetic field is only due to the largest loop. In both cases, the net magnetic field at the center will be zero.

Therefore, the correct answer is (a) 0.

Answer:

2 N/m

Explanation:

Given that

The length of a wire, l = 15 m

Force on the wire, F = 60 N

Surface tension on the liquid, S = ?

The formula to solve this problem is given as

F = S * 2 L, where

F = force on the liquid

S = surface tension of the liquid

L= length of the wire

On substituting the values of each, we have

60 = S * (2 * 15)

S = 60 / 30

S = 2 N/m

Thus, we can say then, that the surface tension of the liquid is 2 N/m

To determine the distance between the slits and the screen, we can use the formula for the separation between fringes in a double-slit interference pattern. Applying the small angle approximation, we find that the screen must be placed approximately 1.065 km away from the slits.

To determine the distance between the slits and the screen, we can use the formula for the separation between fringes in a double-slit interference pattern:

d*sin(theta) = m*lambda

Where d is the separation between the slits (65.0 µm), lambda is the wavelength of light (693 nm), m is the order of the fringe (in this case, m = 21), and theta is the angle of the fringe from the central maximum. Since we want the central maximum to be at the center of the screen, we can consider the angle to be very small, and therefore sin(theta) ≈ theta. Rearranging the formula, we have:

theta = m*lambda / d = 21 * (693e-9 m) / (65.0e-6 m) = 2.241e-3 radians

Next, we can use the small angle approximation to find the distance from the slits to the screen. This approximation states that tan(theta) ≈ theta for small angles. Therefore, tan(theta) = y / L, where y is the distance between the center of the screen and the fringe, and L is the distance between the slits and the screen. Solving for L, we have:

L = y / tan(theta) = (4.75 m / 2) / tan(2.241e-3 radians) ≈ 1.065 km

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Answer:

plants depend on animals for CO2 (to use during photosynthesis) while animals depend on plants for food (consumation)

Explanation:

Answer:

plants depend on animals for CO2 (to use during photosynthesis) while animals depend on plants for food (consumation)

Explanation:

Answer:

Explanation:

The magnetic force due to lower rod must be equal to weight of upper rod for equilibrium .

magnetic field due to lower rod on upper rod

= ( μ₀ / 4π ) x(2i / r ) , i is current , r is distance between rod

= 10⁻⁷ x 2 x 15 / 1.5 x 10⁻³

= 20 x 10⁻⁴ T

force on the upper rod

= B i L , B is magnetic field , i is current in second rod and L is its length

= 20 x 10⁻⁴ x 15 x .50

= 150 x 10⁻⁴ N

= .015 N

This force can balance a wire having weight equal to .015 N .

= .00153 kg

= 1.53 g .

wire should weigh 1.53 g .

Given Information:

Velocity = v = 150 m/s

angle = θ = 12°

Required Information:

Radius of curvature = R = ?

Answer:

Radius of curvature = [tex]R = 1.079 \times 10^{4} \: m[/tex]

Explanation:

Please refer to the attached diagram,

[tex]Fcos(\theta) = m \cdot g\\Fcos(12^{\circ}) = m \cdot g \:\:\:\:\:\:eq. 1[/tex]

Where m is the mass of the plane and g is the gravitational acceleration.

[tex]Fsin(\theta) = \frac{mv^{2}}{R}\\Fsin(12^{\circ}) = \frac{m \cdot v^{2}}{R}\:\:\:\:\:\:eq. 2[/tex]

Where v is the velocity of the plane and R is the radius of curvature of the curved path of the airplane.

Dividing eq. 2 by eq. 1 yields,

[tex]tan(12^{\circ}) = \frac{v^{2}}{R\cdot g }[/tex]

[tex]since \: \frac{sin(\theta)}{cos(\theta)} = tan(\theta)[/tex]

[tex]tan(12^{\circ}) = \frac{v^{2}}{R\cdot g }\\\\R = \frac{v^{2}}{g\cdot tan(12^{\circ}) }\\\\R = \frac{150^{2}}{9.81\cdot 0.212 }\\\\R = 10793\\R = 1.079 \times 10^{4} \: m[/tex]

Therefore, the radius of curvature of the curved path of the airplane is 1.079×10⁴ m

Final answer:

The radius of curvature of an airplane's horizontal circular path can be determined by the centripetal force, provided by the horizontal component of lift when the airplane is banked at a specific angle.

Explanation:

The question involves an airplane traveling in a horizontal curved path and banking at an angle to achieve this motion. To find the radius of curvature for the airplane's path, we need to consider the centripetal force necessary for circular motion, which is supplied by the horizontal component of the lift force when the airplane is banked. The lift force itself acts perpendicular to the wings. By using trigonometry and the principles of circular motion, we can relate the banking angle, the airplane's velocity, and the force required for level flight to find the radius of curvature. Notably, this type of problem is a common application of Newton's laws of motion in a circular motion context.

Answer:

The period of the pendulum is  [tex]T = 1.68 \ sec[/tex]

Explanation:

The diagram illustrating this setup is shown on the first uploaded image

From the question we are told that

     The length of the rod is [tex]L = 80 \ cm[/tex]

       The diameter of the ring is [tex]d = 10 \ cm[/tex]

       The distance of the hole from the one end  [tex]D = 15cm[/tex]

From the diagram we see that point A is the center of the brass ring

 So the length from the axis of  rotation is mathematically evaluated as

          [tex]AP = 80 + 10 -5 -15[/tex]  

          [tex]AP = 70 \ cm = \frac{70}{100} = 0.7 \ m[/tex]

Now the period of the pendulum is mathematically represented as

             [tex]T = 2 \pi \sqrt{\frac{AP}{g} }[/tex]

             [tex]T = 2 \pi \sqrt{\frac{0.7}{9.8 } }[/tex]

             [tex]T = 1.68 \ sec[/tex]

Answer:

[tex]\phi=1.55 [eV][/tex]

Explanation:

We can use the work function equation for a photoelectric experiment:

[tex]\phi=\frac{hc}{\lambda}-K_{max}[/tex]

So we will have:

[tex]\phi=\frac{hc}{\lambda}-e\Delta V[/tex]

[tex]\phi=\frac{6.63*10^{-34}*3*10^{8}}{546.1*10^{-9}}-0.728eV[/tex]    

[tex]\phi=3.64*10^{-19}[J]-0.728 [eV][/tex]

[tex]\phi=(3.64*10^{-19}[J]*\frac{1eV}{1.6*10^{-19}[J]})-0.728 [eV][/tex]

[tex]\phi=2.28 [eV] - 0.728 [eV][/tex]

[tex]\phi=1.55 [eV][/tex]

I hope it helps you!

Answer:

The work function is [tex]\phi = 1.544eV[/tex]

Explanation:

   From the question we are told that

        The wavelength of the green light is [tex]\lambda = 546.1nm[/tex]

        The stopping potential   is  [tex]V= 0.728V[/tex]  

At  stopping potential the kinetic is also maximum because this where the electron(causing the current ) would flow at it highest speed before return to zero

   So the maximum  kinetic energy of this electron in term of electron volt is  

           [tex]KE_{max} = 0.728 eV[/tex]

This maximum kinetic energy is mathematically represented as

          [tex]KE_{max} = \frac{hc}{\lambda} - \phi[/tex]

Where h is the planck's constant with a value [tex]h = 4.1357 *10^{-15} eV[/tex]

            c is the speed of light [tex]c = 3.0 *10^8 m/s[/tex]

            [tex]\phi[/tex] is the work function

Making [tex]\phi[/tex] the subject of the formula

            [tex]\phi = \frac{hc}{\lambda} - KE_{max}[/tex]

Substituting values

           [tex]\phi = \frac{4.1357 *10^{-15} * (3.0 *10^8)}{546.1 *10^{-9}} - 0.728[/tex]

            [tex]\phi = 1.544eV[/tex]

Answer:

Option A is correct - While a guitar string is vibrating, you gently touch the midpoint of the string to ensure that the string does not vibrate at that point. The lowest-frequency standing wave that could be present on the string vibrates at twice the fundamental frequency.

Explanation:

Before touching the midpoint of the string, the string vibrates with one loop.

Fundamental frequency, f1 = v/(2*L)

Now, when the midpoint of the guitar string was touched, the string vibrates with two loops.

Hence, f2 = 2*v/(2*L)

f2 = 2*f1

Therefore, compared to the fundamental frequency the frequency would be double.

Option A is correct - While a guitar string is vibrating, you gently touch the midpoint of the string to ensure that the string does not vibrate at that point. The lowest-frequency standing wave that could be present on the string vibrates at twice the fundamental frequency.

The gravitational force on a particle due to a sphere can be calculated using Newton's Law of gravitation. Different distances result in different force magnitudes.

The magnitude of the gravitational force (F) on a particle due to a sphere can be calculated by using Newton's Law of Gravitation, F = G*(m1*m2)/r², where G is the gravitational constant (6.67 × 10-¹¹ N·m²/kg²), m1 and m2 are the masses of the two bodies, and r is the distance between their centers.

(a) For a distance of 1.4 m, F = G*(3.0 × 10⁴ kg*9.3 kg) / (1.4 m)².

(b) For a distance of 0.21 m, F = G*(3.0 × 10⁴ kg*9.3 kg) / (0.21 m)².

(c) For a general expression for the magnitude of the gravitational force on the particle at a distance r ≤ 1.0 m from the center of the sphere, the formula changes to F = G*(m1*m2)/r², where r ≤ 1.0 m.

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Answer:

B:The actual power dissipated by the resistor is less than P because the ammeter had some resistance.

Explanation:

Here,power has been calculated using current I and total EMF \ε . So,P=EMF*current= ε I will represent total power dissipated in resistor and ammeter.

Now, this total power P has been dissipated in both resistor and ammeter. So, power dissipated in resistor must be less than P as some power is also dissipated in ammeter because it has non-zero resistance.

So, the answer is B:The actual power dissipated by the resistor is less than P because the ammeter had some resistance.

Note that option A,C and E are ruled out as they state power dissipated by resistor is greater than or equal to P which is false.

Also,option D is ruled out as ammeter is connected in series.

Answer:6 joules

Explanation:

Mass(m)=3kg

Velocity(v)=2m/s

Kinetic energy=0.5 x m x v^2

Kinetic energy=0.5 x 3 x 2^2

Kinetic energy=0.5 x 3 x 2 x 2

Kinetic energy=6

Answer:

5026.55 m/s

Explanation:

Gravitation potential of a body in orbit from the center of the earth is given as

Pg = -GM/R

Where G is the gravitational constant 6.67x10^-11 N-m^2kg^-2

M is the mass of the earth = 5.98x10^24 kg

R is the distance from that point to the center of the earth = r + Re

r is the distance above earth surface, Re is the earth's radius.

R = 1610 km + 6370 km = 7980 km

Pg = -(6.67x10^-11 x 5.98x10^24)/7980x10^3

Pg = -49983208.02 J/kg

The negative sign means that the gravitational potential is higher away from earth than it is at the earth's surface (it shows convention).

This indicates the kinetic energy per kilogram that the chest of jewel will fall with to earth.

Gravitation Potential on earth's surface is

Pg = -GM/Re

= -(6.67x10^-11 x 5.98x10^24)/6370x10^3 = -62616326.53 J/kg

Difference in gravity potential = -49983208.02 - (-62616326.53)

= 12633118.51 J/kg

The velocity V of the jewel chest will be

0.5v^2 = 12633118.51

V^2 = 25266237.02

V = 5026.55 m/s

(i) Sandy's rock has a higher speed at the launch than Chris's rock at its peak. (ii) Both rocks will have the same speed just before hitting the ground due to the conservation of energy.

The subject of this question is physics, specifically pertaining to projectile motion and velocity. To answer this, we need to use the principles of the conservation of energy and the behaviour of objects in projectile motion.

(i) At the point of release, both Sandy's and Chris's rocks have the same initial speed since they were thrown with the same force. However, when Chris's rock reaches the highest point in its flight, its vertical velocity component becomes zero (it stops moving upwards). Despite this, it will retain a horizontal component of velocity, which is equivalent to the initial horizontal speed of the rock thrown by Sandy. Therefore, Sandy's rock will have a higher speed at the point of launch compared to Chris’s rock at its peak.

(ii) Just before hitting the ground, both rocks would have the same speed. This is because the final velocity of a freely falling object is independent of the direction of launch, assuming the object falls to the same height it was thrown from. Conservation of energy ensures that each rock will have the same speed it started with. This remains true irrespective of air resistance.

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(i) Sandy's thrown rock at the launch has a higher speed than Chris's rock when it reaches its highest point in its flight.

(ii) Sandy's rock has the higher speed right before hitting the ground.

(i) At the launch, both Sandy and Chris throw their rocks with the same initial speed [tex]\( v_0 \)[/tex]. Sandy throws her rock horizontally, so its initial vertical speed is 0, and its initial horizontal speed is [tex]\( v_0 \)[/tex]. Chris throws his rock at a 45° angle to the horizontal, which means the initial speed is divided equally between the horizontal and vertical components due to the symmetry of the 45° angle. Therefore, both the horizontal and vertical initial speeds of Chris's rock are [tex]\( \frac{v_0}{\sqrt{2}} \)[/tex].

At the highest point of Chris's rock's trajectory, the vertical component of its velocity becomes 0 because it momentarily stops ascending before starting to fall back down. However, it still has a horizontal component of velocity equal to [tex]\( \frac{v_0}{\sqrt{2}} \)[/tex]. Since [tex]\( \frac{v_0}{\sqrt{2}} \)[/tex] is less than [tex]\( v_0 \)[/tex], Sandy's rock has a higher speed at the launch than Chris's rock at its highest point.

(ii) When both rocks are about to hit the ground, they will both have a vertical component of velocity due to the acceleration of gravity. For Chris's rock, the horizontal component of velocity remains constant throughout the flight (assuming no air resistance), which is [tex]\( \frac{v_0}{\sqrt{2}} \)[/tex]. The vertical component of velocity for Chris's rock will be equal in magnitude to the horizontal component at the moment of release but will have changed direction due to gravity, resulting in a net speed of [tex]\( v_0 \)[/tex] it hits the ground.

Sandy's rock, on the other hand, has been accelerating downwards under gravity while maintaining its initial horizontal speed. Just before hitting the ground, the vertical component of Sandy's rock's velocity will be greater than [tex]\( \frac{v_0}{\sqrt{2}} \)[/tex] due to the acceleration of gravity. The total speed of Sandy's rock just before impact is calculated by combining the horizontal and vertical components using the Pythagorean theorem. Since the horizontal component is [tex]\( v_0 \)[/tex] and the vertical component is greater than [tex]\( \frac{v_0}{\sqrt{2}} \)[/tex], the total speed of Sandy's rock will be greater than [tex]\( v_0 \)[/tex].

Therefore, right before hitting the ground, Sandy's rock has a higher speed than Chris's rock, which has a speed of [tex]\( v_0 \)[/tex]. Sandy's rock's speed is greater because it has both the initial horizontal speed [tex]\( v_0 \)[/tex] and an additional vertical speed component due to the acceleration of gravity.

Answer:C

Explanation:

Given

mass [tex]m_1=400\ gm[/tex] is at [tex]x=20\ cm[/tex] mark

mass [tex]m_2=320\ gm[/tex] is at [tex]x=75\ cm[/tex] mark

Scale is Pivoted at [tex]x=50\ cm mark[/tex]

For scale to be in equilibrium net torque must be equal to zero

Taking ACW as positive thus

[tex]T_{net}=0.4\times g\times (0.5-0.2)-0.32\times g\times(0.75-0.50)[/tex]

[tex]T_{net}=0.12g-0.08g=0.04g[/tex]

Therefore a net torque of 0.04 g is required in CW sense which a mass [tex]400\ gm[/tex] can provide at a distance of [tex]x_o[/tex] from pivot

[tex]0.04g=0.4\times g\times x_o [/tex]

[tex]x_o=0.1\ m[/tex]

therefore in meter stick it is at a distance of [tex]x=60\ cm[/tex]

Answer:

276.19nm

Explanation:

To find the other wavelength you use the following condition for the diffraction of both wavelengths:

[tex]m_1\lambda_1=asin\theta_1\\\\m_2\lambda_2=asin\theta_2\\\\[/tex]    ( 1 )

λ1=410nm

m=1 for wavelength 1

m=2 for wavelength 2

a: width of the slit

θ1: angle of the first minimum

θ2: angle of the second minimum

you divide both equations and you obtain:

[tex]\frac{m_1\lambda_1}{m_2\lambda_2}=\frac{sin\theta_1}{sin\theta_2}\\\\\lambda_2=\frac{sin\theta_2}{sin\theta_1}\frac{m_1\lambda_1}{m_2}\\\\\lambda_2=\frac{sin60\°}{sin40\°} \frac{(1)(410nm)}{2}=276.19nm[/tex]

hence, the wavelength of the second monochromatic wave is 276.19nm

Answer:

The wavelength of the  second monochromatic light is  [tex]\lambda = 277 nm[/tex]

Explanation:

From the question we are told that

    The angle of the first minimum is [tex]\theta_1 = 40^o[/tex]

   The wavelength of the first  monochromatic light is  [tex]\lambda_1 = 410 \ nm[/tex]

    The angle of the second minima is  [tex]\theta_2 = 60^o[/tex]

For the first minima the distance of separation of diffraction patterns is mathematically represented as

       [tex]a = \frac{\lambda_1 }{sin \theta_1}[/tex]

 Substituting values

       [tex]a = \frac{410 *10^{-9}}{sin (40) }[/tex]

       [tex]a = 638 nm[/tex]

The distance between two successive diffraction is constant for the same slit

  Thus the wavelength of the second light is

             [tex]\lambda = \frac{a * sin (60)}{2}[/tex]

 Substituting value

              [tex]\lambda = \frac{638 * sin (60)}{2}[/tex]

              [tex]\lambda = 277 nm[/tex]

Answer:

Because all organisms are  

adapted

to their native habitat, human activities that result in  

habitat destruction

are the major reason for their extinction.

Explanation:

Answer:

Adapted

and

habitat destruction

Answer:

1355 days

Explanation:

Find the given attachment

Andre will not be able to use the fan at all during his working hours.

To estimate how many hot days Andre will be able to use the fan, we need to calculate the number of rotations the fan will make during his working hours and subtract the number of rotations it takes for the fan to stop once turned off. We know that the fan reaches a speed of 700 rpm in 4.0 s from rest. This means its angular velocity is 700 * 2π/60 = 73.33 rad/s. So, in 8 hours (Andre's working hours), the fan will rotate for 73.33 * 3600 * 8 = 210,624 rotations. Subtracting the rotations it takes for the fan to stop (700 * 11 = 7700 rotations), Andre will be able to use the fan for approximately 210,624 - 7700 = 202,924 rotations. Since the fan is specified to operate up to 1 billion rotations, Andre will be able to use the fan for approximately 202,924 / 1,000,000,000 = 0.0002029 (or about 0.02%) of its lifespan. Rounded to the nearest day, this is 0 days. 

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Answer:

23.5 mV

Explanation:

number of turn coil  'N' =22

radius 'r' =3.00 cm=> 0.03m

resistance = 1.00 Ω

B= 0.0100t + 0.0400t²

Time 't'= 4.60s

Note that Area'A' = πr²

The magnitude of induced EMF is given by,

lƩl =ΔφB/Δt = N (dB/dt)A

    =N[d/dt (0.0100t + 0.0400 t²)A        

    =22(0.0100 + 0.0800(4.60))[π(0.03)²]

     =0.0235

     =23.5 mV

Thus, the induced emf in the coil at t = 4.60 s is 23.5 mV

Answer: I think that you are asking about an interactive reader which talks about an exercise which asked for the person's velocity who were on the bus.

The answer is 14 m/s

Explanation: When you have to do an exercise about velocity, you can do this exercise knowing the velocity from the bus in relative the street and you ALWAYS have to define your positive or negative motion about the direction in which the person were walking to know if you have to add or subtract

In this case, the bus were travelling east at 15 m/s and the person walked toward the back of the bus at 1 m/s.

It doesn't matter if the positive is the west or the east. While you only know the positive and knowing that the person was walking toward back the bus you can deduce this:

The person's total velocity is (+15 m/s) - (+1 m/s) = +14 m/s

If positive motion is defined as motion westward, the total velocity would be the individual's speed in the westward direction. It includes both the speed and the direction, which makes velocity a vector quantity.

In the context of the question, if positive motion is defined as motion westward, then the individual's total velocity would be their speed in the westward direction with the magnitude and direction incorporated. Velocity is a vector quantity because it encompasses both magnitude (how fast an object is moving) and direction (where it is going). So if the person is walking at a speed of 3 km/h, in the westward (positive) direction, then we can say the person's total velocity is 3 km/h west.

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Answer:

p₀ = (- 20,000 i - 17,000 j) kg m / s

vₓ = -10.81 m / s ,   v_{y} = - 9,189 m / s  

Explanation:

This exercise can be solved with the conservation of the moment.

The system is formed by the two cars, so the forces during the crash are internal and the moment is conserved

initial moment. Just before the crash

      p₀ = M v₁ + m v₂

where the masses M = 1000 kg with a velocity of v₁ = - 20 i m / s for traveling west, the second vehicle has a mass m = 850 kg and a velocity of v₂ = - 20 i m / s, we substitute

     p₀ = - 1000 20 i - 850 20 j

     p₀ = (- 20,000 i - 17,000 j) kg m / s

final moment. Right after the crash

how the cars fit together

      [tex]p_{f}[/tex] = (M + m) [tex]v_{f}[/tex]

the final speed is shaped

      v_{f} = vₓ i + v_{y} j

  we substitute

     p_{f} = (M + m) (vₓ i + v_{y} j)

     p_{f} = (1000 + 850) (vₓ i + [tex]v_{y}[/tex]j)

     p₀ = p_{f}

      (- 20000 i - 17000 j) = 1850 (vₓ i + v_{y} j)

we solve for each component

    vₓ = -20000/1850

    vₓ = -10.81 m / s

    v_{y} = -17000/1850

    v_{y} = - 9,189 m / s

Answer:

See explaination

Explanation:

Please kindly check attachment for the step by step solution of the given problem.

The attached file has a detailed solution of the given problem.

Newton's second law allows us to find the average force for the impact of a particle against the wall of a container is:

        [tex]F = \frac{m v_x^2}{L_x}[/tex]  

Newton's second law is the change of the momentum with respect to time and the momentum is defined as the product of the mass and the velocity of the body.

           [tex]F = \frac{dp}{dt} \\p = m v[/tex]

where F is the force, p the moment, m the mass, t the time and v is the velocity.

Ask for the average force, therefore we change the differentials for variations.

           [tex]<F> = m \frac{\Delta v}{\Delta t}[/tex]  

They indicate that the velocity in the direction of the wall is vₓ and the mass of the container is much greater than the mass of the particle, they also indicate that the collision is elastic, therefore the speed of the particle before and after the collision is equal , but its address changes.

      Δv = vₓ - (-vₓ)

      Δv = 2 vₓ

The change in velocity occurs during the collision, in the rest of the motion the particle has a constant velocity, using the uniform motion relation.

         [tex]v = \frac{d}{t} \\t = \frac{d}{v}[/tex]  

The particle travels a distance Lₓ from inside the container to the wall and bounces, we can find the total time for the particle where the distance of the entire route is:

          d = 2 Lₓ

          t = [tex]\frac{2L_x}{v_x}[/tex]

Let's substitute in Newton's second law.

     [tex]<F>= \frac{m \ 2v_x}{ \frac{2L_x}{v_x} } \\<F>= \frac{m v_x^2}{L_x}[/tex]

In conclusion, using Newton's second law we can find the average force for the collision of a particle against the wall of a container is:

         [tex]<F> = \frac{m \ v_x^2}{L_x}[/tex]  

Learn more here: brainly.com/question/22405423

Answer:

Electrical energy

Explanation:

A power source, such as a battery, provides electrical energy for the circuit. The power source is a device or system that converts another form of energy to electrical energy.  

The function of a power source in a circuit is Electrical energy.

Electrical energy seems to be a sort of energy (Kinetic) that would be generated by transporting or shifting electric charges. This same quantity of electricity relies somewhat on the velocity of the charges – therefore more electrical energy they represent, the quicker they accelerate.

Examples of Electrical energy are:

Thus the response above is the appropriate one.

Find out more information about Electrical energy here:

https://brainly.com/question/23218537

Answer:

The voltage across the capacitor = 0.8723 V

Explanation:

From the question, it is said that the coil is quickly pulled out of the magnetic field. Therefore , the final magnetic flux linked to the coil is zero.

The change in magnetic flux linked to this coil is:

[tex]\delta \phi = \phi _f - \phi _i[/tex]

    = 0 - BA cos 0°

[tex]\delta \phi =-BA \\ \\ \delta \phi =-B( \pi r^2) \\ \\ \delta \phi =(1.0 \ mT)[ \pi ( \frac{d}{2} )^2][/tex]

[tex]\delta \phi =(1.0 \ mT)[ \pi ( \frac{0.01}{2} )^2][/tex]

[tex]\delta \phi = -7.85*10^8 \ Wb[/tex]

Using Faraday's Law; the induced emf on N turns of coil is;

[tex]\epsilon = N |\frac{ \delta \phi}{\delta t} |[/tex]

Also; the induced current I = [tex]\frac{ \epsilon}{R}[/tex]

[tex]\frac{ \delta q}{ \delta t} = \frac{1}{R} (N|\frac{\delta \phi}{\delta t } |)[/tex]

[tex]\delta q = \frac{1}{R} N|\delta \phi |[/tex]

[tex]\delta q = \frac{1}{0.30} (10)| -7.85*10^8 \ Wb |[/tex]

[tex]\delta q = 2.617*10^{-6} \ C[/tex]

The voltage across the capacitor can now be determined as:

[tex]\delta \ V =\frac{ \delta q}{C}[/tex]

= [tex]\frac{ 2.617*10^{-6} \ C}{3.0 \ *10^{-6} F}[/tex]

= 0.8723 V

Answer:

A) d = 11.8m

B) d = 4.293 m

Explanation:

A) We are told that the angle of incidence;θ_i = 70°.

Now, if refraction doesn't occur, the angle of the light continues to be 70° in the water relative to the normal. Thus;

tan 70° = d/4.3m

Where d is the distance from point B at which the laser beam would strike the lakebottom.

So,d = 4.3*tan70

d = 11.8m

B) Since the light is moving from air (n1=1.00) to water (n2=1.33), we can use Snell's law to find the angle of refraction(θ_r)

So,

n1*sinθ_i = n2*sinθ_r

Thus; sinθ_r = (n1*sinθ_i)/n2

sinθ_r = (1 * sin70)/1.33

sinθ_r = 0.7065

θ_r = sin^(-1)0.7065

θ_r = 44.95°

Thus; xonsidering refraction, distance from point B at which the laser beam strikes the lake-bottom is calculated from;

d = 4.3 tan44.95

d = 4.293 m

Answer:

a) 1.88*10^-18 N

b) 6.32*10^-19 N

c) 1.9*10^-18 N

Explanation:

The total force over the electron is given by:

[tex]\vec{F}=q\vec{E}+q\vec{v}\ X\ \vec{B}[/tex]

the first term is the electric force and the second one is the magnetic force.

You have that the velocity of the electron and the magnetic field are:

[tex]\vec{v}=2190\frac{m}{s}\ \hat{j}\\\\\vec{B}=-5.39*10^{-3}T\ \hat{i}[/tex]

by using the relation  j X (-i) =- j X i = -(-k) = k, you obtain:

[tex]\vec{v} \ X\ \vec{B}=(2190m/s)(3.59*10^{-3}T)\hat{k}=7.862\ T m/s[/tex]

a) For an electric field of 3.91V/m in +z direction:

[tex]\vec{F}=q[\vec{E}+\vec{v}\ X\ \vec{B}]=(1.6*10^{-19})[3.91\hat{k}+7.862\ \hat{k}]N\\\\\vec{F}=1.88*10^{-18}N\hat {k}\\\\F=1.88*10^{-18}N[/tex]

b) E=3.91V/m in -z direction:

[tex]\vec{F}=(1.6*10^{-19})[-3.91\hat{k}+7.862\ \hat{k}]N\\\\\vec{F}=6.32*10^{-19}N\hat {k}\\\\F=6.32*10^{-19}N[/tex]

c) E=3.91 V/m in +x direction:

[tex]\vec{F}=(1.6*10^{-19})[3.91\hat{i}+7.862\ \hat{k}]N\\\\\vec{F}=[6.25*10^{-19}\ \hat{i}+1.25*10^{-18}\ \hat{k} ]N\\\\F=\sqrt{(6.25*10^{-19})^2+(1.25*10^{-18})^2}N=1.9*10^{-18}\ N[/tex]