Suppose you are finding the weight of a beaker of water, and you have it on the balance and are ready to record the weight. Your partner dips the tip of his or her pen in the water, but does not touch the beaker or the balance. Does the presence of the pen affect the reading on the balance? If so, how? If not, why not?

Answer:

Color

Explanation:

The most obvious property of a mineral, its color, and is unfortunately also the least diagnostic.

Answer:

color

Explanation:

Answer:

Resolution of the light will be equal to [tex]872.22\times 10^{-6}radian[/tex]

Explanation:

We have given a pupil of cat  width of the slit d = 0.540 mm = [tex]0.540\times 10^{-3}m[/tex]

Average wavelength of the light [tex]\lambda =471nm=471\times 10^{-9}m[/tex]

We have to find the angular resolution for horizontally separated mice  

Angular resolution is given by [tex]\Theta =\frac{\lambda }{d}=\frac{471\times 10^{-9}}{0.540\times 10^{-3}}=872.22\times 10^{-6}radian[/tex]

So resolution of the light will be equal to [tex]872.22\times 10^{-6}radian[/tex]

Answer:

What is the average velocity of the car over the first 0.25m?  

⇒ 0.11 m/s

What is the average velocity of the car over the second 0.25m?  

⇒ 0.28 m/s

Explanation:

Just did this problem! :)

Answer:

⇒ 2.23

⇒ 0.90

⇒ 0.28

Explanation:

Just did the problem (⌐■_■)

The position of the mass after t seconds can be found using the equation of motion for a mass-spring system. We can calculate the angular frequency, determine the phase angle, and substitute the values into the equation to find the position.

The position of the mass after t seconds can be found using the equation of motion for a mass-spring system. The equation is given by:

x(t) = A * cos(ω * t + φ)

Where A is the maximum displacement, ω is the angular frequency, and φ is the phase angle. In this problem, the maximum displacement is 0.2 meters, the angular frequency can be calculated using ω = sqrt(k/m) (where k is the spring constant and m is the mass), and the phase angle can be determined using the initial conditions.

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The problem is a case of simple harmonic motion which is solved by first identifying the spring constant using Hooke's Law, then finding the equation for the motion, resulting in x(t) = 0.5 cos(sqrt(41.67) * t + π/2), which gives the position of the mass as a function of time.

The problem presented is a classical physics problem dealing with the motion of a mass attached to a spring. This is a scenario of simple harmonic motion which is characterized by an oscillating motion about a stable equilibrium.

In simple harmonic motion, the spring force is given by Hooke's law, F = -kx, where k is the spring constant and x is the displacement of the spring from its equilibrium. In this case, we are given that the force needed to stretch the spring 0.2m beyond its natural length is 50N. So we can find the spring constant k by rearranging Hooke's law: k = F/x = 50N / 0.2m = 250 N/m.

Next, we know that the equation for the position of the mass in simple harmonic motion is given by x(t) = A cos(ωt + φ), where A is the amplitude, ω is the angular frequency and φ is the phase.

Here, the amplitude A is the initial position, which is 0. The initial velocity is given as 0.5 m/s, and ω can be found using the relation ω = sqrt(k/m) = sqrt(250 / 6) = sqrt(41.67) rad/s. The phase can be found using the fact that the initial velocity v0 is v0 = ωA sin(φ), and since A=0 and v0=0.5, φ = arcsin(v0/ωA) = arcsin((0.5 m/s) / (sqrt(41.67) rad/s * 0) = π/2.

Therefore, the equation for the motion becomes x(t) = 0.5 cos(sqrt(41.67) * t + π/2). This equation gives the position x of the mass as a function of time t.

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Answer:

When the midpoint of the magnet is in the plane of the loop, the induced current in the loop viewed from above is essentially zero.

Explanation:

At some point far away from the plane of the loop of the wire, there's no flux and hence, no induced emf, and no current in the loop. As the magnet descends and gets close to the entrance of the coil, some of the magnetic field from the magnet threads the top few imaginary disks of the coil. The time changing flux induces some EMF and subsequently some induced current.

As the magnet continues to fall, and enters the coil, more of its magnetic field is threading imaginary disks in the coil, so as it moves, the time rate of change of total flux increases, so the EMF goes up. Note that the field lines above and below the magnet's midpoint point in the same direction from the the North pole to the south.

As the bar moves through the plane of the coil, the North end first, flux is added by the motion of the magnet and flux is removed by the motion of South end.

At some point, the bar reaches the middle of the coil. At this point, the amount of flux added to the top half of the coil by a small motion of the magnet is equal to the amount of flux removed from the bottom half. Therefore, at this point the EMF is zero. And hence, there is no induced current observed in the wire at this point.

Hope this Helps!!!

When viewed from the above, there is no induced current observed in the wire at this point due to zero EMF.

The given problem is based on the concept of electric flux and induced emf. The electric flux is dependent on induced emf, which is produced to current. Since,  point far away from the plane of the loop of the wire, there's no flux and hence, no induced emf, and no current in the loop.

Note: - The field lines above and below the magnet's midpoint point in the same direction from the the North pole to the south.

Thus, we conclude that when viewed from the above, there is no induced current observed in the wire at this point due to zero EMF.

Learn more about the electromagnetic induction here:

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Answer:

The  beat frequency when each string is vibrating at its fundamental frequency is 12.6 Hz

Explanation:

Given;

velocity of wave on the string with lower tension, v₁ = 35.2 m/s

the fundamental frequency of the string, F₁ = 258 Hz

velocity of wave on the string with greater tension;

[tex]v_1 = \sqrt{\frac{T_1}{\mu }[/tex]

where;

v₁ is the velocity of wave on the string with lower tension

T₁ is tension on the string

μ is mass per unit length

[tex]v_1 = \sqrt{\frac{T_1}{\mu} } \\\\v_1^2 = \frac{T_1}{\mu} \\\\\mu = \frac{T_1}{v_1^2} \\\\ \frac{T_1}{v_1^2} = \frac{T_2}{v_2^2}\\\\v_2^2 = \frac{T_2v_1^2}{T_1}[/tex]

Where;

T₁ lower tension

T₂ greater tension

v₁ velocity of wave in string with lower tension

v₂ velocity of wave in string with greater tension

From the given question;

T₂ = 1.1 T₁

[tex]v_2^2 = \frac{T_2v_1^2}{T_1} \\\\v_2 = \sqrt{\frac{T_2v_1^2}{T_1}} \\\\v_2 = \sqrt{\frac{1.1T_1*(35.2)^2}{T_1}}\\\\v_2 = \sqrt{1.1(35.2)^2} = 36.92 \ m/s[/tex]

Fundamental frequency of wave on the string with greater tension;

[tex]f = \frac{v}{2l} \\\\2l = \frac{v}{f} \\\\thus, \frac{v_1}{f_1} =\frac{v_2}{f_2} \\\\f_2 = \frac{f_1v_2}{v_1} \\\\f_2 =\frac{258*36.92}{35.2} \\\\f_2 = 270.6 \ Hz[/tex]

Beat frequency = F₂ - F₁

                          = 270.6 - 258

                          = 12.6 Hz

Therefore, the  beat frequency when each string is vibrating at its fundamental frequency is 12.6 Hz

The fundamental frequency for the second string is found to be 272 Hz, resulting in a beat frequency of 14 Hz.

To find the beat frequency when two strings are vibrating at their fundamental frequencies, follow these steps:

Therefore, the beat frequency when both strings vibrate at their fundamental frequencies is 14 Hz.

a) 10 kg

b) 60 N

c) 98 N

d) 0 N

Explanation:

a)

In this problem, there are two forces acting on the backpack:

- The restoring force from the spring, upward, of magnitude [tex]F=60 N[/tex]

- The weight of the backpack, downward, of magnitude [tex]mg[/tex], where

m = mass of the backpack

[tex]g=9.8 m/s^2[/tex] acceleration due to gravity

So the net force on the backpack is (taking upward as positive direction)

[tex]F_{net}=F-mg[/tex]

According to Newton's second law of motion, the net force must be equal to the product between the mass of the backpack and its acceleration, so

[tex]F-mg=ma[/tex]

where

[tex]a=-3.8 m/s^2[/tex] is the acceleration of the backpack and the elevator, downward (so, negative)

If we solve the formula for m, we can find the mass of the backpack:

[tex]F=m(a+g)\\m=\frac{F}{a+g}=\frac{60}{-3.8+9.8}=10 kg[/tex]

b)

In this case, the elevator is moving upward, and it is slowing down at a rate of [tex]3.8 m/s^2[/tex].

Since the elevator is slowing down, it means that the direction of the acceleration is opposite to the direction of motion: and since the elevator is moving upward, this means that the direction of the acceleration is downward: so the acceleration is negative,

[tex]a=-3.8 m/s^2[/tex]

The net force acting on the backpack is still:

[tex]F_{net}=F-mg[/tex]

where

F is the restoring force in the spring, which this time is unknown (it corresponds to the reading on the scale)

Using again Newton's second law of motion,

[tex]F-mg=ma[/tex]

Therefore in this case, the reading on the scale will be:

[tex]F=m(g+a)=(10)(9.8-3.8)=60 N[/tex]

So the reading is the same as in part a).

c)

In this case, the elevator is moving at a constant velocity.

The net force on the backpack is still:

[tex]F_{net}=F-mg[/tex]

However, since here the elevator is moving at constant velocity, and acceleration is the rate of change of velocity, this means that the acceleration of the elevator is zero:

[tex]a=0[/tex]

So Newton's second law of motion can be written as:

[tex]F_{net}=0[/tex]

So

[tex]F-mg=0[/tex]

Which means that the reading on the scale is equal to the weight of the backpack:

[tex]F=mg=(10)(9.8)=98 N[/tex]

d)

In this  case, the elevator had no brakes and the cable supporting it breaks loose.

This means that the elevator is now in free fall.

So its acceleration is simply the acceleration due to gravity (which is the acceleration of an object in free fall):

[tex]a=-9.8 m/s^2[/tex]

And the direction is downward, so it has a negative  sign.

The net force on the backpack is still

[tex]F_{net}=F-mg[/tex]

So Newton's second law can be rewritten as

[tex]F-mg=ma[/tex]

Therefore, we can re-arrange the equation to find F, the reading on the scale, and we find:

[tex]F=m(g+a)=(10)(9.8-9.8)=0 N[/tex]

So, the reading on the scale is 0 N.

Answer:

[tex]\frac{dz}{dt} = 65 mi/h[/tex]

Explanation:

let distance between two  cars  is = z  mi

we have to find  =[tex]\frac{dz}{dt}[/tex]

One travels south at  = 60 mi/h  = [tex]\frac{dx}{dt}[/tex]   (given)

the other travels west at =25 mi/h.= [tex]\frac{dy}{dt}\\[/tex]  (given)

since both car have constant speed

at t = 3 hrs

x = 3× 60  = 180 mi/h

y = 3 × 25  = 75 mi/h

from the figure (i)  we get

[tex]z = \sqrt{( x^2+ y^2)}[/tex] ...............(i)

put x and y values

we get

[tex]z = \sqrt{(180)^2 + 75^2}[/tex]

[tex]z = \sqrt{32400 + 5625} \\z = \sqrt{38025} \\z = 195 mi/h[/tex]

differentiate the equation (i) w r to t

[tex]z^2 = x^2 +y^2[/tex]

[tex]2z\frac{dz}{dt} = 2x\frac{dx}{dt}+ 2y\frac{dy}{dt}\\[/tex]

put each values

[tex]2 \times195\frac{dz}{dt} = 2 \times 180\frac{dx}{dt}+2 \times75\frac{dy}{dt}\\[/tex]

[tex]2 \times195\frac{dz}{dt} = 2 \times 180\times 60}+2 \times75\times25\\\frac{dz}{dt} = \frac{{2 \times 180\times 60+2 \times75\times25}}{ 2 \times195}\\\frac{dz}{dt} = 65 mi/h[/tex]

Answer: Both cars have equal kinetic energy

Explanation:

Answer:

A) = 0.63 m

B)This is approximately 0.21

Explanation:

Part A)

Now if spring is connected to the block then again we can use energy conservation

so we will have

[tex]\frac{1}{2}kx^2 = mg(x + x')sin\theta + \frac{1}{2}kx'^2[/tex]

so we will have

[tex]\frac{1}{2}(70)(0.5^2) = 2(9.81) (0.50 + x') sin41 + \frac{1}{2}(70)x'^2[/tex]

[tex]8.75 = 6.43 + 12.87 x' + 35 x'^2[/tex]

[tex]x' = 0.13 m[/tex]

so total distance moved upwards is

[tex]L = 0.5 + 0.13 = 0.63 m[/tex]

Part B

Now the incline has a coefficient of kinetic friction μk. If the block, attached to the spring, is observed to stop just as it reaches the spring's equilibrium position, what is the coefficient of friction μk

KE = 8.75 – 10.78 * sin 41

This is approximately 1.678 J. This is the kinetic energy at the equilibrium position. For the block to stop moving at this position, this must be equal to the work that is done by the friction force.

Ff = μ * 10.78 * cos 41

Work = 0.5 * μ * 10.71 * cos 41

μ * 10.78 * cos 41 = 8.75 – 10.78 * sin 41

μ = (10 – 8.82 * sin 41) ÷ 8.82 * cos 41

μ = 1.678/8.136

μ = 0.206

This is approximately 0.21

Answer:

A) d = 0.596m

B) μ = 0.206

Explanation:

A) The potential energy stored in a spring when it is compressed is given as;

U = (1/2)kx² - - - - - - (eq1)

Where

U is potential energy stored in spring

k is spring constant

x is compressed length of the spring

Let the height the mass moved before coming to rest be h.

Thus, the potential energy at this height is;

U = mgh - - - - - - (eq2)

Since the mass is connected to the spring, according to the principle of conservation of energy, initial potential energy of the spring is equal to the sum of the final potential energy in the spring and the potential energy of the mass. Thus, we have;

(1/2)K(x1)² = (1/2)K(x2)² + mgh

Where x1 is the initial compressed length and x2 is the final compressed length.

Now, h will be dsin41 while x2 will be d - x1

Where d is the distance the mass moves up before coming to rest

Thus, we now have;

(1/2)K(x1)² = (1/2)K(d - x1)² + mg(dsin41)

(1/2)K(x1)² = (1/2)K(d² - 2dx1 + (x1)²) + mg(dsin41)

(1/2)K(x1)² = (1/2)Kd² - Kdx1 + (1/2)K(x1)² + mg(dsin41)

(1/2)Kd² - Kdx1 + mg(dsin41) = 0

(1/2)Kd² + d[mg(sin41) - Kx1] = 0

From the question,

k = 70 N/m

m = 2.2 kg

x1 = 0.5m

g = 9.8 m/s²

Thus, plugging in these values, we now have;

(1/2)(70)d² + d[(2.2•9.8•0.6561) - (70•0.5)] = 0

35d² - 20.8545d = 0

35d² = 20.8545d

Divide both sides by d to get;

35d = 20.8545

d = 20.8545/35

d = 0.596m

B) Here we are looking for the coefficient of friction.

First of all, let's find the kinetic energy at the equilibrium position;

The potential energy of the spring;

P.E = (1/2)K(x1)² = (1/2)(70)(0.5)² = 8.75J

The energy that will cause the block to decelerate = mg(x1)sin41 = 2.2 x 9.8 x 0.5 x 0.6561 = 7.073

So,

Net KE = 8.75 – 7.073 = 1.677J

Now, for the block to stop moving at this equilibrium position, the work done by the frictional force must be equal to KE of 1.677J

Thus,

F_f(x1) = 1.677J

F_f = μmgcos 41

Where, μ is the coefficient of friction;

So, F_f = μ(2.2 x 9.8 x 0.7547)

Ff = 16.271μ

Thus,

16.271μ x 0.5 = 1.677J

8.136μ = 1.677

μ = 1.677/8.136

μ = 0.206

Answer:

Explanation:

find the solution below

Answer:

D

Explanation:

An inverse resistor giving power to the system

A capacitor hooked up to a battery acts as another battery aiding the first battery as time progresses.

As time progresses, a capacitor hooked up to a battery begins to act as another battery aiding the first battery. The capacitor acts as a temporary storehouse of energy and can drive its collected charge through a second circuit.

Answer:

The energy of the photon is  [tex]x = 2.86 eV[/tex]

Explanation:

From the question we are told that  

      The first orbit is [tex]n_1 = 5[/tex]

       The second orbit is [tex]n_2 = 2[/tex]

According to  Bohr model

     The energy of difference of the electron as it moves from on orbital to another is mathematically represented as

              [tex]\Delta E = k [\frac{1}{n^2 _1} + \frac{1}{n^2 _2} ][/tex]

  Where k is a constant which has a value of [tex]k = -2.179 *10^{-18} J[/tex]

       So

              [tex]\Delta E = - 2.179 * 10^{-18} [\frac{1}{5^2 _1} + \frac{1}{2^2 _2} ][/tex]

                     [tex]= 4.576 *10^{-19}J[/tex]

Now we are told from the question that

         [tex]1 eV = 1.602 * 10^{-19} J[/tex]

so      x eV  =  [tex]= 4.576 *10^{-19}J[/tex]

  Therefore

                [tex]x = \frac{4.576*10^{-19}}{1.602 *10^{-19}}[/tex]

                   [tex]x = 2.86 eV[/tex]

The energy of the photon produced by an electron in a Hydrogen atom moving from the 5th orbit to the 2nd orbit is 2.85 electron Volts as calculated via the Rydberg formula.

The energy of the photon produced by the transition of an electron in a hydrogen atom from the 5th orbit to the 2nd orbit can be calculated using Rydberg's formula.

Rydberg's formula for energy is given as E = 13.6 * (1/n1^2 - 1/n2^2), where n1 and n2 are the initial and final energy levels respectively, and E is the energy difference in eV (electron volts). Here n1 = 2 and n2 = 5.

So, substituting these values in the formula E = 13.6 * (1/2^2 - 1/5^2) = -13.6 * (-0.21) = 2.85 eV. Notice that the energy is negative which signifies a transition down to a lower energy level (which is exothermic), however, we are interested in the magnitude of the energy which is 2.85 eV.

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Answer:

[tex]u(t)=1.15 \sin (8.68t)cm[/tex]

0.3619sec

Explanation:

Given that

Mass,m=148 g

Length,L=13 cm

Velocity,u'(0)=10 cm/s

We have to find the position u of the mass at any time t

We know that

[tex]\omega_0=\sqrt{\frac{g}{L}}\\\\=\sqrt{\frac{980}{13}}\\\\=8.68 rad/s[/tex]

Where [tex]g=980 cm/s^2[/tex]

[tex]u(t)=Acos8.68 t+Bsin 8.68t[/tex]

u(0)=0

Substitute the value

[tex]A=0\\u'(t)=-8.68Asin8.68t+8.68 Bcos8.86 t[/tex]

Substitute u'(0)=10

[tex]8.68B=10[/tex]

[tex]B=\frac{10}{8.68}=1.15[/tex]

Substitute the values

[tex]u(t)=1.15 \sin (8.68t)cm[/tex]

Period =T = 2π/8.68

After half period

π/8.68 it returns to equilibruim

π/8.68 = 0.3619sec

Answer:

Between R and S

Explanation:

Answer:

C) Between R and S

Explanation:

Final answer:

To balance the rod with the attached objects, you need to place a support at a certain distance from the rod's center. The support should be placed at (2/3) times the length of the rod to the right of the rod's center.

Explanation:

To balance the rod with the attached objects, you need to place a support at a certain distance from the rod's center. Let's call this distance 'x'. The torque on the rod is balanced when the clockwise torque is equal to the counterclockwise torque.

The torque on the left end of the rod is given by the force on the left object times the distance from the left end of the rod to the support, which is (m * x). The torque on the right end of the rod is given by the force on the right object times the distance from the right end of the rod to the support, which is ((2m) * (L - x)). Since the torque must be balanced, we set the two torques equal to each other:

(m * x) = ((2m) * (L - x))

Simplifying this equation gives us:

x = (2/3) * L

Therefore, you should place the support at a distance of (2/3) times the length of the rod to the right of the rod's center.

Answer:

See explaination and attachment please.

Explanation:

Potential energy is defined as the energy possessed by a body by virtue of its position relative to others, stresses within itself, electric charge, and other factors.

Kinetic energy on the other hand is defined as the energy that it possesses due to its motion. It is defined as the work needed to accelerate a body of a given mass from rest to its stated velocity.

These understand will foster our knowledge to the best way of solving the question.

Please kindly check attachment for a step by step approach on the graph.

Final answer:

In a bungee jumping scenario, the stretching of the cord can be expressed in terms of length and height. Gravitational potential energy dominates early in the fall, while elastic potential energy is more significant later. Graphs can visually represent how potential energy changes with height during the jump.

Explanation:

a) Stretching of the cord: The stretching ?L of the cord can be expressed as ?L = d - z. The total potential energy U can be represented as U = UG + US, where UG is the gravitational potential energy and US is the elastic potential energy.

b) Largest potential energy: For large z (early in the fall), UG is largest. For small z (late in the fall), US is largest.

c) Graphs: Sketch a graph of UG(z) on the left plot, US(z) on the center plot, and U(z) = UG(z) + US(z) on the rightmost plot.

The angle is approximately 50°

Explanation:

We know,

h = L – L * cos θ

  = 1.55 – 1.55 (cos θ )

To determine the maximum height, we use conservation potential and kinetic energy. As 2nd ball rises to its maximum height, the increase of its potential energy is equal to the decrease of its kinetic energy. Below is the equation for determining the value of h from the 2nd ball’s initial velocity.

Potential energy, PE = mgh = m X 9.8 X h

Kinetic energy, KE = [tex]\frac{1}{2} mv^2[/tex]

Set PE equal to KE and solve for h.

h = v²/19.6  

To determine the initial kinetic energy of the second ball, we need to the velocity of the 2nd ball immediately after the collision. To do this we need to use conservation of momentum. Below is the equation for determining the value of h from the 2nd ball’s initial velocity.

For the 1st ball, horizontal momentum = 0.26 X 2.5 = 0.65

Since this ball falls straight down after the collision, its final horizontal momentum is 0.

For the 2nd ball, horizontal momentum = 0.61 X vf

0.64 * vf = 0.65

vf = 0.65/.0.64

vf = 0.02m/s

h = (0.65/0.64)²/19.6

h = 0.00002m

0.00002 = 1.45 – 1.45 * cos θ

Subtract 1.55 from both sides.

0.00002 – 1.45 = -1.45 * cos θ

θ = 50°

Answer:

[tex]-16.6 rad/s^2[/tex]

Explanation:

The torque exerted on a rigid body is related to the angular acceleration by the equation

[tex]\tau = I \alpha[/tex] (1)

where

[tex]\tau[/tex] is the torque

I is the moment  of inertia of the body

[tex]\alpha[/tex] is the angular acceleration

Here we have a solid sphere: the moment of inertia of a sphere rotating about is centre is

[tex]I=\frac{2}{5}MR^2[/tex]

where

M = 240 g = 0.240 kg is the mass of the sphere

[tex]R=\frac{2.50}{2}=1.25 cm = 0.0125 m[/tex] is the radius of the sphere

Substituting,

[tex]I=\frac{2}{5}(0.240)(0.0125)^2=1.5\cdot 10^{-5} kg m^2[/tex]

The torque exerted on the sphere is

[tex]\tau = Fr[/tex]

where

F = -0.0200 N is the force of friction

r = 0.0125 m is the radius of the sphere

So

[tex]\tau=(-0.0200)(0.0125)=-2.5\cdot 10^{-4} Nm[/tex]

Substituting into (1), we find the angular acceleration:

[tex]\alpha = \frac{\tau}{I}=\frac{-2.5\cdot 10^{-4}}{1.5\cdot 10^{-5}}=-16.6 rad/s^2[/tex]

Answer:

[tex]18.8\times 10^{-3} T[/tex]

Explanation:

We are given that

Number of turns,N=500

Radius,r=0.04 m

Length of solenoid,L=40 cm=[tex]\frac{40}{100}=0.4 m[/tex]

1 m=100 cm

Current,I=12 A

We have to find the magnitude of magnetic field near the center of the solenoid.

Number of turns per unit length,n=[tex]\frac{500}{0.4}=1250[/tex]

Magnetic field near the center of the solenoid,B=[tex]\mu_0 nI[/tex]

Where [tex]\mu_=0=4\pi\times 10^{-7}Tm/A[/tex]

[tex]B=4\pi\times 10^{-7}\times 1250\times 12=18.8\times 10^{-3} T[/tex]

[tex]B=18.8\times 10^{-3} T[/tex]

Answer:

F'=(8/3)F

Explanation:

to find the change in the force you take into account that the electric force is given by:

[tex]F=k\frac{q_1q_2}{(18.0u)^2}=k\frac{q_1q_2}{324.0}u^2[/tex]

However, if q1'=1/3*q, q2'=2*q2 and the distance is halved, that is 18/=9.o unit:

[tex]F'=k\frac{q_1'q_2'}{(9u)^2}=k\frac{(1/3)q_1(2)q_2}{81.0u^2}=\frac{2}{3}k\frac{q_1q_2}{81.0u^2}[/tex]

if you multiply this result by 4 and divide by 4 you get:

[tex]F'=\frac{8}{3}k\frac{q_1q_2}{324.0u^2}=\frac{8}{3}F[/tex]

hence, the new force is 8/3 of the previous force F.

Answer

Given,

Revolution of wheel = 23 rev.

                                  = 23 x 2π = 46 π

Time = 3 s

final angular velocity = 16 rad/s

angular acceleration of wheel = ?

Now, Calculating the initial angular speed of the wheel

Angular displacement = [tex]\dfrac{1}{2}[/tex](initial velocity + final velocity) x time.

[tex]46 π = \dfrac{\omega_o+16}{2}\times 3[/tex]

[tex]\omega_0 = 80.29\ rad/s[/tex]

now, angular acceleration

[tex]\alpha = \dfrac{\omega-\omega_0}{t}[/tex]

[tex]\alpha = \dfrac{16-80.29}{3}[/tex]

[tex]\alpha = -21.43\ rad/s^2[/tex]

Hence, the angular acceleration of wheel is negative means wheel is decelerating.

The angular acceleration of the wheel is negative (-).

The angular acceleration would be the temporal ratio during which the angular speed changes and therefore is commonly denoted by alpha (α) as well as written throughout radians/sec.

According to the question,

Revolutions, 23 rev or,

                      23 × 2π = 46π

Time, 3 seconds

Final angular velocity, 16 rad/s

We know the formula,

→ Angular displacement = [tex]\frac{1}{2}[/tex] (Initial velocity + Final velocity) × Time

By substituting the values,

                                    46 = [tex]\frac{\omega_o +16}{2}[/tex] × 3

                                     [tex]\omega_o[/tex] = 80.29 rad/s

hence,

The angular acceleration will be:

→ α = [tex]\frac{\omega - \omega_o}{T}[/tex]

      = [tex]\frac{16-80.29}{3}[/tex]

      = -21.43 rad/s²

Thus the above response is correct.

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Answer: The riders are subjected to 11.5 revolutions per minute

Explanation: Please see the attachments below

Answer:

a) The shear stress is 0.012

b) The shear stress is 0.0082

c) The total friction drag is 0.329 lbf

Explanation:

Given by the problem:

Length y plate = 2 ft

Width y plate = 10 ft

p = density = 1.938 slug/ft³

v = kinematic viscosity = 1.217x10⁻⁵ft²/s

Absolute viscosity = 2.359x10⁻⁵lbfs/ft²

a) The Reynold number is equal to:

[tex]Re=\frac{1*3}{1.217x10^{-5} } =246507, laminar[/tex]

The boundary layer thickness is equal to:

[tex]\delta=\frac{4.91*1}{Re^{0.5} } =\frac{4.91*1}{246507^{0.5} } =0.0098[/tex] ft

The shear stress is equal to:

[tex]\tau=0.332(\frac{2.359x10^{-5}*3 }{1} )(246507)^{0.5} =0.012[/tex]

b) If the railing edge is 2 ft, the Reynold number is:

[tex]Re=\frac{2*3}{1.215x10^{-5} } =493015.6,laminar[/tex]

The boundary layer is equal to:

[tex]\delta=\frac{4.91*2}{493015.6^{0.5} } =0.000019ft[/tex]

The sear stress is equal to:

[tex]\tau=0.332(\frac{2.359x10^{-5}*3 }{2} )(493015.6^{0.5} )=0.0082[/tex]

c) The drag coefficient is equal to:

[tex]C=\frac{1.328}{\sqrt{Re} } =\frac{1.328}{\sqrt{493015.6} } ==0.0019[/tex]

The friction drag is equal to:

[tex]F=Cp\frac{v^{2} }{2} wL=0.0019*1.938*(\frac{3^{2} }{2} )(10*2)=0.329lbf[/tex]

Answer:

Chloroplasts convert light energy into sugars that can be used by the cells. This conversion creates 'food' for the plant.

Explanation:

Answer:

Check the explanation

Explanation:

Stationary states might as well be illustrated in a simpler form of the Schrödinger equation, It utilizes the theory of energy conservation (Kinetic Energy + Potential Energy = Total Energy) to acquire information about an electron’s behavior that is been bound to a nucleus.

Kindly check the attached image below to get the step by step explanation to the above question.

Answer:

Using equation 2dsinФ=n*λ

given d=2.41*10^-6m

λ=512*10^-12m

θ=52.64 degrees

Answer:

a

The angle between the center and the third side bright fringe  is

       [tex]\theta = 39.60^o[/tex]

b

The third side bright fringe move away from the pattern's center

c

The distance by which it moves away is [tex]\Delta z=0.3906 m[/tex]

Explanation:

From the question the

           The wavelength is [tex]\lambda = 512nm[/tex]

In the first question we a asked to obtain the angle between the center and the third side bright fringe

  since we are considering the third side of the bright fringe the wavelength of light on  the three sides would be  evaluated as

                 [tex]\lambda_{3} = 3 * 512nm[/tex]

The slit separation is given as  [tex]d = 2.41 \mu m[/tex]

    The angle between the center and the third side bright fringe is

              [tex]\theta = sin^{-1} (\frac{\lambda_3}{d} )[/tex]

              [tex]\theta = sin^{-1} (\frac{3 *512*10^{-9}}{2.24*10^{-6}} )[/tex]

                [tex]= sin^{-1} (0.6374)[/tex]

                [tex]\theta = 39.60^o[/tex]

When the frequency of the light is reduced the wavelength is increased

                i.e [tex]f = \frac{c}{\lambda}[/tex]

and this increase would cause the third side bright to move away from the pattern's center

        Now from the question frequency is reduce to 94.5% this mean that the  wavelength would also increase by the same as mathematically represented below

                  [tex]\lambda_{new} = \frac{512 *10^{-9}}{0.945}[/tex]

                          [tex]= 0.542 \mu m[/tex]

The angle between the center and the third side bright fringe is for new wavelength

                   [tex]\theta = sin^{-1} (\frac{3 *512*10^{-9}}{2.41*10^{-6}} )[/tex]

                     [tex]= 42.46^o[/tex]

 The distance traveled away from the pattern's center is mathematically represented as

                [tex]z = A tan \theta[/tex]

 Where A is the separation between the slits and the screen

              [tex]\Delta z = 4.45(tan 42.46 - tan39.60 )[/tex]

                    [tex]\Delta z=0.3906 m[/tex]

Answer:

The third ball emerges from the right side.

Explanation:

This is a conservation of Momentum problem

In an explosion or collision, the momentum is always conserved.

Momentum before explosion = Momentum after explosion

Since the rigid pipe was initially at rest,

Momentum before explosion = 0 kgm/s

- Taking the right end as the positive direction for the velocity of the balls

- And calling the speed of the 6 g ball after explosion v

- This means the velocity of the 4 g ball has to be -2v

- Mass of the third ball = m

- Let the velocuty of the third ball be V

Momentum after collision = (6)(v) + (4)(-2v) + (m)(V)

Momentum before explosion = Momentum after explosion

0 = (6)(v) + (4)(-2v) + (m)(V)

6v - 8v + mV = 0

mV - 2v = 0

mV = 2v

V = (2/m) v

Note that since we have established that the sign on m and v at both positive, the sign of the velocity of the third ball is also positive.

Hence, the velocity of the third ball according to our convention is to the right.

Hope this Helps!!!

Answer:

the third ball emerge from right end .

Explanation:

initially the three balls are at rest so u = 0  

Given m1 = 6g

v1 = v(i) (Right end indicates positive X axis so it is represented as (i))

m2 = 4g

v2 = 2(v)(-i) (left end indicates negative X axis so it is represented as (-i))

m3 = m

v3 = v'

Applying conservation of momentum

m1(u1) + m2(u2) + m3(u3) = m1(v1) + m2(v2) + m3(v3)

u1 = u2 = u3 = u = 0 ( at rest)

0 = (6×10⁻³)(v)(i) + (4×10⁻³)(2v)(-i) + m(v')

m(v') = (2×10⁻³)(v)(i)

v' = (2×10⁻³)(v)(i)/(m)

So positive (i) indicates right end

So the third ball emerge from right end .

Answer:

Current

Explanation:

A wire loop with a current flowing through it is also within a uniform magnetic field. While the loop may have a net force equal to zero, in most cases, it will have an induced current on it.

Note: The values of the current and the radii are not given, substitute whatever the value of the current and radius are to the given solution to obtain the magnitude.

Answer:

magnitude of the B-field at the smaller coil due to the larger coil is [tex]B = \frac{7200\mu_{0}I }{2a}[/tex]

Explanation:

N₁ = 7200 turns

N₂ = 920 turns

a = 75.50 cm = 0.755 m

b = 1.00 cm = 0.01 m

From the given data, b<<a, and it is at the center of the larger coil,

so we are safe to assume that the magnetic field at the smaller coil is constant.

The formula for magnetic field due to circular loop at the center of a coil is given by:

[tex]B = \frac{N\mu_{0}I }{2R}[/tex]

Therefore, magnetic field in the smaller coil  due to the larger coil of radius a will be given by:

[tex]B = \frac{7200\mu_{0}I }{2a}[/tex]

Where [tex]\mu_{0} = 4\pi * 10^{-7} Wb/A-m[/tex]

I = current in the larger coil

The magnitude of the B-field at the smaller coil due to the larger coil will be "4π × 10⁻⁷ Wb/A-m".

According to the question,

Number of turns, N₁ = 7200 turns

                             N₂ = 920 turns

Radius, a = 75.50 cm or,

                = 0.755 m

             b = 1.00 cm or,

                = 0.01 m

We know the formula,

Magnetic field, B = [tex]\frac{N \mu_0 I}{2R}[/tex]

here, μ₀ = 4π × 10⁻⁷ Wb/A-m

By substituting the values,

                             = [tex]\frac{7200 \mu_0 I}{2a}[/tex]

Thus the above answer is correct.

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Answer:

The total mechanical energy of the system would stay the same

Explanation:

The law of conservation energy states:

In a closed system, (a system that isolated from its surroundings) the total energy of the system is conserved.

For instance, the air resistance is negligible. So non conservative force is acting on the system and so the energy is conserved for the system.

The total initial energy must be equal to the total final energy , if the energy is conserved.

Therefore, when the pebbles was launched at 45 degrees to the horizontal the total mechanical energy stay the same.