An infinitely long line of charge has linear charge density 6.00×10−12 C/m . A proton (mass 1.67×10−27 kg,charge +1.60×10−19 C) is 12.0 cm from the line and moving directly toward the line at 4.10×103 m/s .

a)Calculate the proton's initial kinetic energy. Express your answer with the appropriate units.

b)How close does the proton get to the line of charge? Express your answer with the appropriate units.

Answer:

a) [tex] \theta_2 = 0.05 * \frac{3.5}{0.7} = 0.25[/tex]

b) [tex] \theta_2 = 0.05 * \frac{140}{700} = 0.01[/tex]

Explanation:

We are comparing two wavelengths with the radius and diameter constant, and if we want to compare it, we need to use the following formula:

[tex]\frac{\theta_1}{\theta_2}= \frac{\lambda_1}{\lambda_2}[/tex]

Where [tex] \theta[/tex] represent the angular resolution and [tex]\lambda[/tex] the wavelength.

So if we have a fixed resolution and wavelength 1 and we want to find the resolution for a new condition we can solve for [tex] \theta_2[/tex] and we got

[tex] \theta_2 = \theta_1 \frac{\lambda_2}{\lambda_1}[/tex]

Part a

For this case the subindex 1 is for the color red and we know that:

[tex] \lambda_1 = 700 nm *\frac{1 \mu m}{1000 nm} = 0.7 \mu m[/tex]

And the angular resolution for the color red is specified as [tex] \theta_1 = 0.05[/tex]

And for the infrared case we know that [tex] \lambda_2 = 3.5 \mu m[/tex], so if we replace we got:

[tex] \theta_2 = 0.05 * \frac{3.5}{0.7} = 0.25[/tex]

Part b

For this case the subindex 1 is for the color red and we know that:

[tex] \lambda_1 = 700 nm[/tex]

And the angular resolution for the color red is specified as [tex] \theta_1 = 0.05[/tex]

And for the ultraviolet case we know that [tex] \lambda_2 = 140 nm[/tex], so if we replace we got:

[tex] \theta_2 = 0.05 * \frac{140}{700} = 0.01[/tex]

Answer:

The potential at point P is -111 Volt.

Explanation:

Given that,

Distance = 0.033 m

Work = 111 ev

Suppose what is the potential at point P?

We need to calculate the potential at point P

Using formula of potential

[tex]W=qV[/tex]

[tex]V=\dfrac{W}{q}[/tex]

Where, W = work

q = charge

Put the value into the formula

[tex]V= \dfrac{111\times1.6\times10^{-19}}{-1.6\times10^{-19}}[/tex]

[tex]V=-111\ V[/tex]

Hence, The potential at point P is -111 Volt.

The question is about the process of bringing an electron from rest to rest near a fixed charge q at a specific distance, and the energy required for this process. The answer explains the equation for the energy required per unit charge and the concept of electron volts (eV) as an energy unit.

The question is asking about the process of bringing an electron from rest at an infinite distance to rest at a point located a distance of 0.033 m from a fixed charge q using an external agent. The process requires 111 eV of energy to perform the necessary work. The equation for the energy required per unit charge is given, which relates the potential energy to the charge and distance. The concept of electron volts (eV) as an energy unit is also mentioned.

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Answer:

3.76 m/s

Explanation:

Instantaneous velocity: This can be defined as the velocity of an object in a non uniform motion. The S.I unit is m/s.

v' = dx(t)/dt..................... Equation 1

Where v' = instantaneous velocity, x = distance, t = time.

Given the expression,

x(t) = 28.0 m + (12.4 m/s)t - (0.0450 m/s³)t³

x(t) = 28 + 12.4t - 0.0450t³

Differentiating x(t) with respect to t.

dx(t)/dt = 12.4 - 0.135t²

dx(t)/dt = 12.4 - 0.135t²

When t = 8.00 s.

dx(t)/dt = 12.4 - 0.135(8)²

dx(t)/dt = 12.4 - 8.64

dx(t)/dt = 3.76 m/s.

Therefore,

v' = 3.76 m/s.

Hence, the instantaneous velocity = 3.76 m/s

Final answer:

To find the bird's instantaneous velocity at t = 8.00s, we differentiate its position function to get v(t) = 12.4 m/s - 0.135 m/s^2 × t^2, then substitute t = 8.00s to find v(8.00) = 3.76 m/s east.

Explanation:

The question asks for the instantaneous velocity of a bird flying due east when t = 8.00s, given the position function x(t) = 28.0 m + (12.4 m/s)t – (0.0450 m/s3)t3. To find the instantaneous velocity, we need to differentiate the position function with respect to time (t) to get the velocity function, v(t).

First, let's differentiate x(t):

Derivative of 28.0 m is 0 since it's a constant.

Derivative of (12.4 m/s)t is 12.4 m/s, as the derivative of t is 1.

Derivative of (-0.0450 m/s3)t3 is -0.135 m/s2 × t2, using the power rule for derivatives.

So, the velocity function is v(t) = 12.4 m/s - 0.135 m/s2 × t2. To find the instantaneous velocity at t = 8.00s, we plug in t = 8.00 into the velocity function:

v(8.00) = 12.4 m/s - 0.135 m/s2 × (8.002)

Calculating this gives us:

v(8.00) = 12.4 m/s - 0.135 m/s2 × 64.00 = 12.4 m/s - 8.64 m/s = 3.76 m/s

Therefore, the instantaneous velocity of the bird when t = 8.00s is 3.76 m/s east.

Answer:

Explanation:

Given

Speed while running towards east is [tex]v_1=3\ m/s[/tex]

Distance traveled in east direction [tex]x_1=120\ m[/tex]

For Another interval you  run with velocity

[tex]v_2=5\ m/s[/tex]

[tex]x_2=240\ m[/tex]

Total displacement[tex]=x_1+x_2[/tex]

[tex]=120+120=240\ m[/tex]

Time for first interval

[tex]t_1=\frac{x_1}{v_1}=\frac{120}{3}[/tex]

[tex]t_1=\frac{120}{3}=40\ s[/tex]

Time for second interval

[tex]t_2=\frac{x_2}{v_2}=\frac{120}{5}=24\ s[/tex]

total time [tex]t=t_1+t_2[/tex]

[tex]t=40+24=64\ s[/tex]

average velocity [tex]v_{avg}=\frac{x_1+x_2}{t}[/tex]

[tex]v_{avg}=\frac{240}{64}=3.75\ m/s[/tex]

Therefore average velocity is less than [tex]4 m/s[/tex]  

The strength of an electric field that will balance the weight is 1.023 × 10⁷ N/C.

An electric field is a physical field that surrounds electrically charged particles and acts as an attractor or repellent to all other charged particles in the vicinity. Additionally, it refers to a system of charged particles' physical field.

Electric charges and time-varying electric currents are the building blocks of electric fields.

The strength of an electric field that will balance the plastic sphere is = weight of the object/charge on the object

= (  9.6 ×10⁻³×9.8)/(9.2×10⁻⁹) N/C

= 1.023 × 10⁷ N/C

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Answer:

Explanation:

Under constant acceleration the average velocity of a particle is half the sum of its initial and final velocities. Is this still true if the acceleration is not constant? Explain.

Answer:

If the frequency of an electromagnetic wave increases, the number of waves passing by you increase.

Explanation:

The total number  of vibration or oscillation per unit time is called frequency of a waver. It is given by :

[tex]f=\dfrac{n}{t}[/tex]

n is the number of waves passing

t is the time taken

It is clear that the frequency is directly proportional to the number of waves. Hence, if the frequency of an electromagnetic wave increases, the number of waves passing by you increase.

Answer:

9. The force is a force of attraction and it is 2.95N

10. The magnitude of acceleration 35.12m/s^2 and the direction of this acceleration is away from the other balloon.

Explanation:

Parameters given:

Q1 = 3.4 * 10^-6C

Q2 = - 5.1 * 10^-6C

Distance between the two balloons = 23cm = 0.23m

9. Force acting between the two balloons is a force of attraction because they are unlike charges. Hence, the force between them is:

F = kQ1Q2/r^2

F = (9 *10^9 * 3.4 * 10^-6 * -5.1 * 10^-6)/(2.3 * 10^-1)^2

F = (1.56 * 10^-1)/(5.29 * 10^-2)

F = - 2.95N

10. Assuming that Balloon A has a mass, m, of 0.084kg, then:

F = ma

Where a = acceleration

a = F/m

a = -2.95/0.084

a = - 35.12m/s^2

The acceleration has a magnitude of 35.12m/s^2 and its direction is away from balloon B.

The negative sign shows that the balloon A is slowing down as it moves towards balloon B. Hence, it's velocity is reducing slowly.

Answer:

(a) R = 1Ω

(b) τ = 3

Explanation:

The time constants of the given circuits are as follows

[tex]\tau_{RL} = \frac{L}{R}\\\tau_{RC} = RC[/tex]

If the two circuits have equal time constants, then

[tex]\frac{L}{R} = RC\\R^2 = \frac{L}{C} = \frac{3}{3} = 1\\R = 1\Omega[/tex]

Therefore, the time constant in any of the circuits is

[tex]\tau = RC = 3[/tex]

(a). Value of resistance R is  1 ohm.

(b). The Value of time constant will be 3 second.

The time constant is defined as, time taken by the system to reach at 63.2% of its final value.

Time constant in RL circuit is,  [tex]=\frac{L}{R}[/tex]

Time constant in RC circuit is, [tex]=RC[/tex]

Since, in question given that both circuit have same time constant.

So,    [tex]RC=\frac{L}{R}\\\\R^{2}=\frac{L}{C}\\\\R=\sqrt{\frac{L}{C} }[/tex]

substituting L = 3H and C = 3F in above expression.

         [tex]R=\sqrt{\frac{3}{3} }=1ohm[/tex]

Time constant = [tex]RC=1*3=3s[/tex]

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Answer:

q = 8.85 x 10⁻¹¹ C

Explanation:

given,

Electric field, E = 1.18 N/C

distance, r = 0.822 m

Charge magnitude = ?

using formula of electric field.

[tex]E = \dfrac{kq}{r^2}[/tex]

k is the coulomb constant

[tex]q= \dfrac{Er^2}{k}[/tex]

[tex]q= \dfrac{1.18\times 0.822^2}{9\times 10^9}[/tex]

  q = 8.85 x 10⁻¹¹ C

The magnitude of charge is equal to q = 8.85 x 10⁻¹¹ C

Answer:

[tex]W = -2.76\times 10^{-9}~J[/tex]

Explanation:

The work done on the capacitor is equal to the difference in potential energy stored in the capacitor in two different cases.

The potential energy is given by the following formula:

[tex]U = \frac{1}{2}CV^2[/tex]

where C can be calculated using the plate separation and area.

[tex]C = \epsilon\frac{A}{d} = \epsilon\frac{0.0314}{0.01} = 3.14\epsilon[/tex]

Therefore, the potential energy in the first case is

[tex]U = \frac{1}{2}3.14\epsilon (20)^2 = 628\epsilon[/tex]

In the second case:

[tex]C_2 = \epsilon\frac{A}{d} = \epsilon\frac{0.0314}{0.02} = 1.57\epsilon\\U = \frac{1}{2}C_2 V^2 = \frac{1}{2}1.57\epsilon (20)^2 = 314\epsilon[/tex]

The permittivity of the air is very close to that of vacuum, which is 8.8 x 10^-12.

So, the difference in the potential energy is

[tex]W = U_2 - U_1 = \epsilon(314 - 628) = -314 \times 8.8 \times 10^{-12} = -2.76\times 10^{-9}~J[/tex]

Answer:

The electron began in the quantum level of 4

Explanation:

Using the formula of wave number:

Wave Number = 1/λ = Rh(1/n1² - 1/n2²)

where,

Rh = Rhydberg's Constant = 1.09677 x 10^7 /m

λ = wavelength of light emitted = 486.4 nm = 486.4 x 10^-9 m

n1 = final shell = 2

n2 = initial shell = ?

Therefore,

1/486.4 x 10^-9 m = (1.09677 x 10^7 /m)(1/2² - 1/n2²)

1/4 - 1/(486.4 x 10^-9 m)(1.09677 x 10^7 /m) = 1/n2²

1/n2² = 0.06082

n2² = 16.44

n2 = 4

The principal quantum level in which the electron began is 5.

Given the following data:

Rydberg constant = [tex]1.09 \times 10^7\; m^{-1}[/tex]

To determine the principal quantum level in which the electron began, we would use the Rydberg equation:

Mathematically, the Rydberg equation is given by the formula:

[tex]\frac{1}{\lambda} = R(\frac{1}{n_f^2} -\frac{1}{n_i^2})[/tex]

Where:

Substituting the parameters into the formula, we have;

[tex]\frac{1}{486.4 \times 10^{-9}} = 1.09 \times 10^7(\frac{1}{2^2} -\frac{1}{n_i^2})\\\\\frac{1}{486.4 \times 10^{-9} \times 1.09 \times 10^7}=\frac{1}{4} -\frac{1}{n_i^2}\\\\\frac{1}{5.3018} =\frac{1}{4} -\frac{1}{n_i^2}\\\\\frac{1}{n_i^2}=\frac{1}{4}-\frac{1}{5.3018}\\\\\frac{1}{n_i^2}=0.25-0.1886\\\\\frac{1}{n_i^2}=0.0614\\\\n_i^2=\frac{1}{0.0614} \\\\n_i=\sqrt{16.29} \\\\n_i=4.0[/tex]

Initial transition = 4.0

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Answer:

a) P = 2319.6[kPa]; b) 2.6%

Explanation:

Since the problem data is not complete, the following information is entered:

A 1.78-m3 rigid tank contains steam at 220°C. One-third of the volume is in the liquid phase and the  rest is in the vapor form. Determine (a) the pressure of the steam, and (b) the quality of the saturated  mixture.

From the information provided in the problem we can say that you have a mixture of liquid and steam.

a) Using the steam tables we can see (attached image) that the saturation pressure at 220 °C is equal to:

[tex]P_{sat} =2319.6[kPa][/tex]

[tex]v_{f}=0.001190[m^{3}/hr]\\v_{g}=0.08609[m^{3}/hr]\\[/tex]

b) Since the specific volume of the gas and liquid is known, we can find the mass of each phase using the following equation:

[tex]m_{f}=\frac{V_{f} }{v_{f} } \\m_{g}=\frac{V_{g} }{v_{g} } \\where:\\V_{f}=volume of the fluid[m^3]\\v_{f}=specific volume of the fluid [m^3/kg]\\[/tex]

We know that the volume of the fluid is equal to:

[tex]V_{f}=1/3*V_{total} \\V_{total}=1.78[m^3]\\[/tex]

Now we can find the mass of the gas and the liquid.

[tex]m_{f}=\frac{1/3*1.78}{0.001190} \\m_{f}=498.6[kg]\\m_{g}=\frac{2/3*1.78}{0.08609}\\m_{g}=\ 13.78[kg][/tex]

The total mass is the sum of both

[tex]m_{total} =m_{g} + m_{fluid} \\m_{total} = 498.6 + 13.78\\m_{total} = 512.38[kg][/tex]

The quality will be equal to:

[tex]x = \frac{m_{g} }{m_{T} }\\ x= \frac{13.78}{512.38} \\x = 0.026 = 2.6%[/tex]

Answer:

a)The initial velocity of the puck is 20 ft/s.

b)The coefficient of friction is 0.062.

Explanation:

Hi there!

a)For this problem let's use the equations of position and velocity of an object moving in a straight line with constant acceleration:

x = x0 + v0 · t + 1/2 · a · t²

v = v0 + a · t

Where:

x = position of the puck after a time t.

x0 = initial position.

v0 = initial velocity.

a = acceleration.

t = time.

v = velocity of the puck at a time t.

Let's place the origin of the frame of reference at the point where the puck is hit so that x0 = 0.

We know that at t = 10 s the velocity of the puck is zero (v = 0) and its position is 100 ft (x = 100 ft):

100 ft = v0 · 10 s + 1/2 · a · (10 s)²

0 = v0 + a · 10 s

We have a system of two equations with two unknowns, so, we can solve the system.

Solving for v0 in the second equation:

0 = v0 + a · 10 s

v0 = -a · 10 s

Replacing v0 in the first equation:

100 ft = (-a · 10 s) · 10 s + 1/2 · a · (10 s)²

100 ft = -50 s² · a

100 ft / -50 s² = a

a = -2.0 ft/s²

Then the initial velocity of the puck will be:

v0 = -a · 10 s

v0 = -(-2.0 ft/s²) · 10 s

v0 = 20 ft/s

The initial velocity of the puck is 20 ft/s.

b) The friction force is calculated as follows:

Fr = N · μ

Where:

Fr = friction force.

N = normal force.

μ = coefficient of friction.

Since the only vertical forces acting on the puck are the weight of the puck and the normal force and since the puck is not being accelerated in the vertical direction, then, the normal force is equal to the weight of the puck. The weight (W) is calculated as follows:

W = m · g

Where "m" is the mass of the puck and "g" is the acceleration due to gravity (32.2 ft/s²).

Then the friction force can be calculated as follows:

Fr = m · g · μ

Since the acceleration of the puck is provided only by the friction force, then, due to Newton's second law:

Fr = m · a

Where "m" is the mass of the puck and "a" its acceleration. Then:

Fr = m · g · μ

Fr = m · a

m · g · μ = m · a

μ = a/g

μ = 2.0 ft/s² / 32.2 ft/s²

μ = 0.062

The coefficient of friction is 0.062.

Explanation:

A.

Given:

V = 13 m/s

t = 4 s

Constant acceleration, a= (V-Vi)/t

= 13/4

= 3.25 m/s^2

F = mass * acceleration

= 2.7 * 3.25

= 8.775 N.

Using equations of motion,

distance,S = (13 * 4) - (1/2)(3.25)(4^2)

= 26 m

Workdone, W = force * distance

= 8.775 * 26

= 228.15 J

B.

Instantaneous power, P = Force *Velocity

= 8.775 * 13

= 114. 075 W

C.

t = 2 s,

Constant acceleration, a= (V-Vi)/t

= 13/2

= 6.5 m/s^2

Force = mass * acceleration

= 2.7 * 6.5

= 17.55 N

Instantaneous power, P = Force *Velocity

= 17.55 * 13

= 228.15 W.

= 114. 075 W.

Answer:

W = 7591.56 J

Explanation:

given,

distance of the box, d = 37 m

Force for pulling the box, F = 217 N

angle of inclination with horizontal,θ = 19°

We know,

Work done is equal to product of force and the displacement.

W = F.d cos θ

W = 217 x 37 x cos 19°

W = 7591.56 J

Hence, the work done to pull the box is equal to W = 7591.56 J

Final answer:

The work done to slide the box is 7586.09 Joules.

Explanation:

To calculate the work done to slide a box along the ground, we can use the formula:

Work = Force x Distance x cos(theta)

Where:

Force = 217 N (the force applied to pull the box)

Distance = 37 meters (the distance the box is being slid)

theta = 19° (the angle between the applied force and the horizontal)

Plugging in these values into the formula, we get:

Work = 217 N x 37 m x cos(19°)

Calculating this using a calculator, we find that the work done to slide the box is approximately 7586.09 Joules.

Answer:

The fraction of collision is [tex]4.00\times10^{-15}[/tex]

Explanation:

Given that,

Temperature = 47°C

Activation energy = 88.20 KJ/mol

From Arrhenius equation,

[tex]k=Ae^{-\dfrac{E_{a}}{RT}}[/tex]

Here, [tex]e^{-\dfrac{E_{a}}{RT}}[/tex]=fraction of collision

We need to calculate the fraction of collisions

Using formula of fraction of collisions

[tex]f=e^{-\dfrac{E_{a}}{RT}}[/tex]

Where f = fraction of collision

E = activation energy

R = gas constant

T = temperature

Put the value into the formula

[tex]f=e^{-\dfrac{88.20}{8.314\times10^{-3}\times(47+273)}}[/tex]

[tex]f=4.00\times10^{-15}[/tex]

Hence, The fraction of collision is [tex]4.00\times10^{-15}[/tex]

Answer:

The magnitude of the electric field will decrease

Explanation:

The capacitance of a parallel plate capacitor having plate area A and plate separation d is C=ϵ0A/d.  

Where ϵ0 is the permittivity of free space.  

A capacitor filled with dielectric slab of dielectric constant K, will have a new capacitance C1=ϵ0kA/d

        C1=K(ϵ0A/d)

        C1=KC

Where C is the capacitance with no dielectric.

The new capacitance is k times the capacitance of the capacitor without dielectric slab.  

This implies that the charge storing capacity of a capacitor increases k times that of the capacitor without dielectric slab.

The charge stored in the original capacitor Q=CV

The charge stored in the original capacitor after inserting dielectric  Q1=C1V1

The law of conservation of energy states that the energy stored is constant:

i.e Charge stored in the original capacitor is same as charge stored after the dielectric is inserted.

Q   = Q1

CV = C1V1

  CV = C1V1  -------2

We derived C1=KC. Inserting this into equation 2

   CV = KCV1

 V1 = (CV)/KC

         V/K

This implies the voltage decreases when a dielectric is used within the plate.

The relationship between electric field and potential voltage is a linear one

V= Ed

Therefore the electric field will decrease

Final answer:

The capacitance of a parallel-plate capacitor with non-uniform electric field due to increased plate separation will be less than the ideal scenario calculated by C = € A/d.

Explanation:

When the separation of the plates in a parallel-plate capacitor is not small enough to maintain a uniform electric field, the field lines will bulge outwards at the edges. This bulging implies that some of the field lines that emanate from one plate do not reach the opposite plate, reducing the effective area over which the field is acting. Consequently, this non-uniform field means that the capacitance of the capacitor will be less than the ideal calculation using the formula C = € A/d, where C is the capacitance, € is the permittivity of the medium between the plates, A is the plate area, and d is the separation between the plates.

Answer:

Explanation:

Given

Gauge Pressure of a tank is

[tex]P_{gauge}=55\ kPa[/tex]

at that place atmospheric Pressure is  [tex]h=72.1\ cm\ of\ Hg[/tex]

Density of mercury [tex]\rho _{Hg}=13600\ kg/m^3[/tex]

Atmospheric Pressure in kPa is given by

[tex]P_{atm}=\rho _{Hg}\times g\times h[/tex]  

[tex]P_{atm}=13600\times 9.8\times 0.721[/tex]

[tex]P_{atm}=96.09\ kPa[/tex]

and Absolute Pressure is summation of gauge pressure and atmospheric Pressure

[tex]P_{abs}=P_{gauge}+P_{atm}[/tex]

[tex]P_{abs}=55+96.09=151.09\ kPa[/tex]                        

Answer:

The factor of the diameter is 0.95.

Explanation:

Given that,

Power of old light bulb = 54.3 W

Power = 60 W

We know that,

The resistance is inversely proportional to the diameter.

[tex]R\propto\dfrac{1}{D}[/tex]

The power is inversely proportional to the resistance.

[tex]P\propto\dfrac{1}{R}[/tex]

[tex]P\propto D^2[/tex]

We need to calculate the factor of the diameter of the filament reduced

Using relation of power and diameter

[tex]\dfrac{P_{i}}{P_{f}}=\dfrac{D_{i}^2}{D_{f}^2}[/tex]

Put the value into the formula

[tex]\dfrac{D_{i}^2}{D_{f}^2}=\dfrac{54.3}{60}[/tex]

[tex]\dfrac{D_{i}}{D_{f}}=0.95[/tex]

[tex]D_{i}=0.95 D_{f}[/tex]

Hence, The factor of the diameter is 0.95.

Answer:

Explanation:

Po = 60 W

P = 54.3 W

Let the initial diameter of the filament is do and the final diameter of the filament is d.

Let the voltage is V and the initial resistance is Ro and the final resistance is R.

The formula for power is given by

P = V²/R

The resistance of the filament is inversely proportional to the square of the diameter of the filament. As voltage is constant so the power is

Power α diameter²

So, initial power is

Po α do²     ..... (1)

Final power is

P α d²         ..... (2)

Divide equation (2) by equation (1), we get

P / Po = d² / do²

54.3 / 60 = d² / do²

d² / do² = 0.905

d = 0.95 d

Thus, the diameter of the filament is reduced to a factor of 0.95 .  

Answer:

W = 17,700 lb

Explanation:

given,

Weight limit of the Bridge = 50,000 lb

Weight of empty truck = 19800 lb

Weight on the back of the truck = 12500 lb

Now,

Total weight of truck + cargo

 = Weight of empty truck + Weight on the back of the truck

 = 19800 + 12500

 = 32300 lb

Weight of cargo which is still allowed.

W = weight limit - weight of the system at present

W = 50000 - 32300

W = 17,700 lb

Weight Truck can still carry is equal to W = 17,700 lb

Answer:

75.5g

Explanation:

From the ionic equation, we can write

[tex]CU^{2+}+SO^{2-}_{4}\\[/tex]

next we find the number of charge

Note Q=it

for i=8.5A, t=3.75 to secs 3.75*60*60=13500secs

hence

[tex]Q=8.5*13500\\Q=114750C[/tex]

Since one faraday represent one mole of electron which equal 96500C

Hence the number of mole produced by 114750C is

114750/96500=1.2mol

The mass of copper produced is

[tex]mol=\frac{mass}{molar mass} \\mass=mole*molar mass\\mass=1.2*63.5\\mass=75.5g[/tex]

Hence the amount of copper produced is 75.5g

Answer:

75.5 g.

Explanation:

Dissociation equation:

Cu2+ + SO4^2- --> CuSO4

Q = I * t

Where,

I = current

= 8.5 A

t = time

= 3.75 hours

= 13500 s

Q = 8.5 * 13500

= 114750 C

1 faraday represent one mole of electron which equal 96500C

Number of mole of Cu2+

= 114750/96500

= 1.19 mol.

Mass = number of moles * molar mass

= 1.19 * 63.5

= 75.5 g.

Answer:

Explanation:

A block of mass  M is placed on a semicircular track and released from rest at point  P , which is at vertical height H₁ above the track’s lowest point.

Its initial potential energy = mgH₁

Kinetic energy = 0

Total energy = mgH₁

When  block slides to a vertical height  H₂ on the other side of the track

Its final potential energy = mgH₂

Kinetic energy = 0

Total  final energy = mgH₂

As negative work is done by frictional force while block moves ,

final energy < initial energy

mgH₂ < mgH₁

H₂ < H₁

H₂  will be less than H₁ .

Answer:

Both choices B and C are valid

Explanation:

Sound wave are Mechanical wave. Air (or viscus fluid) is the medium of propagation. Sound is produced by the back and forth vibration of the object. Consider the vibration of object is from left to right then this back and forth vibrations of object displaces the molecules of the medium both rightward and leftward (to and fro) to the direction of the energy transport forming compression and rarefaction. This shows that the motion of the molecules of the medium is both parallel (and anti-parallel) to the direction of the sound wave propagation.

Final answer:

The motion of the particles of a medium in a sound wave is parallel to the direction of the wave motion.

Explanation:

A sound wave is a longitudinal wave, which means that the motion of the particles of the medium is parallel to the direction of the wave motion. In other words, the particles of the medium vibrate or oscillate back and forth in the same direction that the sound wave is traveling. This can be compared to compressing and stretching a coiled spring. As the wave propagates through the medium, it creates zones of compression and rarefaction, causing the air molecules to move in the same direction as the sound wave.

Answer:

[tex] x_2 = 648.46\ m[/tex]

Explanation:

given,

Average velocity due west =  1.20 m/s

case 1

Distance moved in west, x₁ = 5.63 km

speed due west, v₁ = 2.33 m/s

Case 2

Distance moved in east = x₂

speed due east, v₂ = 0.374 m/s

total distance = x₁ + x₂ = 5.62

total time = t₁ + t₂ = 5630/2.33 + x₂/0.374

now,

[tex]average\ velocity = \dfrac{total\ distance}{total\ time}[/tex]

[tex]-1.20= \dfrac{-5630 + x_2}{\dfrac{5630}{2.33}+\dfrac{x_2}{0.374}}[/tex]

negative sign is used because we want the distance in east but velocity is in west.

[tex] - 2900 - 3.21 x_2 = -5630 + x_2[/tex]

[tex]-4.21 x_2 = -2730[/tex]

[tex] x_2 = 648.46\ m[/tex]

The distance she walked in east is equal to 648.46 m

Answer:

[tex]V = 1.44\times 10^{5}~V[/tex]

Explanation:

The electric potential can be found by using the following formula

[tex]V = \frac{1}{4\pi\epsilon_0}\frac{Q}{r^2}[/tex]

Applying this formula to each charge gives the total potential.

[tex]V = V_1 + V_2 + V_3 + V_4\\V = \frac{1}{4\pi\epsilon_0}\frac{4\times 10^{-6}}{(\sqrt{2}/2)^2} + \frac{1}{4\pi\epsilon_0}\frac{4\times 10^{-6}}{(\sqrt{2}/2)^2} + \frac{1}{4\pi\epsilon_0}\frac{3\times 10^{-6}}{(\sqrt{2}/2)^2} - \frac{1}{4\pi\epsilon_0}\frac{3\times 10^{-6}}{(\sqrt{2}/2)^2}\\V = \frac{16\times 10^{-6}}{4\pi\epsilon_0}\\V = 1.44\times 10^{5}~V[/tex]

Since the potential is a scalar quantity, it is safe to sum all the potentials straightforward. And since they all placed on the corners of a square, +3 and -3 μC charges cancel out each other.

Answer:

(a). The velocity of bus at 2.0 sec is 6.8 m/s.

(b). The position of bus at 2.0 s is 11.8 m.

(c).  [tex]a_{y}-t[/tex], [tex]v_{y}-t[/tex] and x-t graphs

Explanation:

Given that,

[tex]\alha=1.2\ m/s^3[/tex]

Time t = 1.0 s

Velocity = 5.0

The Acceleration equation is

[tex]a_{x(t)}=\alpha t[/tex]

We need to calculate the velocity

Using formula of acceleration

[tex]a=\dfrac{dv}{dt}[/tex]

On integrating

[tex]\int_{v_{0}}^{v}{dv}=\int_{0}^{t}{a dt}[/tex]

Put the value into the formula

[tex]v-v_{0}=1.2\int_{0}^{t}{t dt}[/tex]

[tex]v-v_{0}=0.6t^2[/tex]

[tex]v=v_{0}+0.6t^2[/tex]

Put the value into the formula

[tex]v_{0}=5.0-0.6\times(1.0)^2[/tex]

[tex]v_{0}=4.4\ m/s[/tex]

We need to calculate the velocity at 2.0 sec

Put the value of initial velocity in the equation

[tex]v=4.4+0.6\times(2.0)^2[/tex]

[tex]v=6.8\ m/s[/tex]

(b). If the bus’s position at time t = 1.0 s is 6.0 m,

We need to calculate the position

Using formula of velocity

[tex]v=\dfrac{dx}{dt}[/tex]

On integrating

[tex]\int_{x_{0}}^{x}{dx}=\int_{0}^{t}{v dt}[/tex]

[tex]x_{0}-x=\int_{0}^{t}{v_{0}dt}+\int_{0}^{t}{0.6 t^2}[/tex]

[tex]x_{0}-x=v_{0}t+\dfrac{0.6}{3}t^3[/tex]

[tex]x=x_{0}+v_{0}t+\dfrac{0.6}{3}t^3[/tex]

[tex]x_{0}=6-4.4\times1-\dfrac{0.6}{3}\times1^3[/tex]

[tex]x=1.4\ m[/tex]

The position at t = 2.0 s

[tex]x=1.4+4.4\times2.0+\dfrac{0.6}{3}\times2^3[/tex]

[tex]x=11.8\ m[/tex]

Hence, (a). The velocity of bus at 2.0 sec is 6.8 m/s.

(b). The position of bus at 2.0 s is 11.8 m.

(c).  [tex]a_{y}-t[/tex], [tex]v_{y}-t[/tex] and x-t graphs

Answer:

False

Explanation:

Sun mass is dominating in Solar system as compared to other planets, asteroids and comets. Sun itself accounting for the 99.9% of the mass of the solar system. Hence the gravitational force exerted by the Sun dominates the other objects in the solar system. So we can conclude that solar system has non-uniform composition. The given statement is false

Answer:

11.48 degree N of W

Explanation:

We are given that

Wind velocity=[tex]v_w=-43[/tex]km/h

Because wind is blowing towards south

Air speed=[tex]v_a=-212km/h[/tex]

Because the captain want to move with air speed in west direction.

x component of relative velocity=-212 km/h

y-Component of relative velocity=-43km/h

Direction=[tex]\theta=tan^{-1}(\frac{y}{x})[/tex]

[tex]\theta=tan^{-1}(\frac{-43}{-212}=11.48^{\circ}[/tex]N of W

Hence, the direction in which the pilot should set her course to travel due west=11.48 degree N of W

Answer:

Explanation:

False

When two waves overlap or superimpose over each other then they either undergo Constructive or destructive interference.

waves are the disturbance created by a force and add up to gives constructive interference when they are in the same line i.e. in the same phase.

When these disturbances are in the opposite phase then they superimpose to give destructive interference where the amplitude of the resulting wave will be much smaller as compared to original waves.