Find the binding energy of Tritium (2-1, A=3), whose atomic mass is 3.0162 u. Find the binding energy per nucleon. For the toolbar, press ALT+F10 (PC) or ALT+FN+F10 (Mac). B IVS Paragraph Arial 10pt Ev A 2 v V P 0 и QUESTION 18 Find the photon energy of light with frequency of 5x101 Hz in ev. For the toolbar, press ALT+F10 (PC) or ALT+FN+F10 (Mac). В І у 5 Paragraph Arial 10pt E A

In an insulated vessel, 247 g of ice at 0°C is added to 635 g of water at 19.0°C. (Assume the latent heat of fusion of the water is 3.33 X 10⁵ J/kg and the specific heat is 4,186 J/kg .

(a) The final temperature of the system is -5.56°C.

(b) 0.247 kg ice remains when the system reaches equilibrium.

To solve this problem, we can use the principle of conservation of energy.

(a) To find the final temperature of the system, we need to calculate the amount of heat transferred from the water to the ice until they reach equilibrium.

The heat transferred from the water is given by:

[tex]Q_w_a_t_e_r = m_w_a_t_e_r * c_w_a_t_e_r * (T_f_i_n_a_l - T_w_a_t_e_r_i_n_i_t_i_a_l)[/tex]

The heat transferred to melt the ice is given by:

[tex]Q_i_c_e = m_i_c_e * L_f_u_s_i_o_n + m_i_c_e * c_i_c_e * (T_f_i_n_a_l - 0)[/tex]

The total heat transferred is equal to zero at equilibrium:

[tex]Q_w_a_t_e_ + Q_i_c_e = 0[/tex]

Substituting the known values:

[tex]m_w_a_t_e_r * c_w_a_t_e_r * (T_f_i_n_a_l - T_w_a_t_e_r_i_n_i_t_i_a_l)[/tex] +[tex]m_i_c_e * L_f_u_s_i_o_n + m_i_c_e * c_i_c_e * (T_f_i_n_a_l - 0)[/tex] = 0

Simplifying the equation and solving for [tex]T_f_i_n_a_l[/tex]:

[tex]T_f_i_n_a_l[/tex] = [tex][-(m_w_a_t_e_r * c_w_a_t_e_r * T_w_a_t_e_r_i_n_i_t_i_a_l + m_i_c_e * L_f_u_s_i_o_n)] / (m_w_a_t_e_r * c_w_a_t_e_r + m_i_c_e * c_i_c_e)[/tex]

Now, let's substitute the given values:

[tex]m_w_a_t_e_r[/tex] = 635 g = 0.635 kg

[tex]c_w_a_t_e_r[/tex] = 4186 J/kg·°C

[tex]T_w_a_t_e_r_i_n_i_t_i_a_l[/tex] = 19.0°C

[tex]m_i_c_e[/tex] = 247 g = 0.247 kg

[tex]L_f_u_s_i_o_n[/tex] = 3.33 × 10⁵ J/kg

[tex]c_i_c_e[/tex] = 2090 J/kg·°C

[tex]T_f_i_n_a_l[/tex] = [-(0.635 * 4186 * 19.0 + 0.247 * 3.33 × 10⁵)] / (0.635 * 4186 + 0.247 * 2090)

[tex]T_f_i_n_a_l[/tex] = -5.56°C

The final temperature of the system is approximately -5.56°C.

(b) To determine how much ice remains when the system reaches equilibrium, we need to calculate the amount of ice that has melted.

The mass of melted ice is given by:

[tex]m_m_e_l_t_e_d_i_c_e[/tex] = [tex]Q_i_c_e[/tex] / [tex]L_f_u_s_i_o_n[/tex]

Substituting the known values:

[tex]m_m_e_l_t_e_d_i_c_e[/tex] = ([tex]m_i_c_e[/tex] *[tex]L_f_u_s_i_o_n[/tex]) / [tex]L_f_u_s_i_o_n[/tex] = [tex]m_i_c_e[/tex]

Therefore, the mass of ice that remains when the system reaches equilibrium is equal to the initial mass of the ice:

[tex]m_r_e_m_a_i_n_i_n_g_i_c_e[/tex] = [tex]m_i_c_e[/tex] = 247 g = 0.247 kg

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Given that a police officer in a police car finds that a vehicle is travelling beyond the speed limit in a low-velocity zone with a constant speed of 24 m/s. As soon as the vehicle passes the police car, the police officer begins pursuing the vehicle with a constant acceleration of 6 m/s² until the police office catches up with and stops the speeding vehicle. Here, the distance covered and the time elapsed are the same for both the POLICE CAR and the SPEEDING VEHICLE, from the time the police car begins pursuing the vehicle to the time the police car catches up and stops the vehicle.

The time taken by the police car to catch up with and stop the speeding vehicle is 4 seconds.

We need to find the time taken by the police car to catch up with and stop the speeding vehicle.

Solution:

Let the time taken to catch up with and stop the vehicle be t.

So, the distance covered by the police car during the time t = distance covered by the speeding vehicle during the time Distance = speed × time.

Distance covered by the speeding vehicle during the time t is 24t.

Distance covered by the police car during the time t is 1/2 × 6t², since it starts from rest and its acceleration is 6 m/s².

We know that both distances are the same.

Therefore, 24t = 1/2 × 6t²

⇒ 4t = t²

⇒ t = 4 s.

Therefore, the time taken by the police car to catch up with and stop the speeding vehicle is 4 seconds.

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The refractive index of an unknown medium, using the critical angle of 550, is 1.53.

This can be determined using Snell's law which states that the ratio of the sine of the angle of incidence to the sine of the angle of refraction is equal to the refractive index of the medium. The critical angle is the angle of incidence that results in an angle of refraction of 90°. When the angle of incidence is greater than the critical angle, the light undergoes total internal reflection, meaning that it does not leave the medium but is reflected back into it.

In this question, we are given two different media, water and an unknown medium. We are also given the critical angle for these media, which is 55°.

Using Snell's law, we can write: n1 sin θ1 = n2 sin θ2

where n1 is the refractive index of water, θ1 is the angle of incidence in water, n2 is the refractive index of the unknown medium, and θ2 is the angle of refraction in the unknown medium.

At the critical angle, θ2 = 90°.

Therefore, we can write:

n1 sin θ1 = n2 sin 90°n1 sin θ1 = n2

We know that the refractive index of water is approximately 1.33.

Substituting this value into the equation above, we get:

1.33 sin 55° = n2sin 55°

= n2/1.33

n2 = sin 55° × 1.33

n2 = 1.53

Therefore, the refractive index of the unknown medium is approximately 1.53.

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The air-filled toroidal solenoid has a winding of approximately 173 turns.

The energy stored in an inductor can be calculated using the formula:

E =[tex](1/2) * L * I^2[/tex]

Where E is the energy stored, L is the inductance, and I is the current flowing through the inductor.

In this case, the energy stored is given as 0.395 J and the current is 11.5 A. We can rearrange the formula to solve for the inductance:

L = [tex](2 * E) / I^2[/tex]

Substituting the given values, we find:

L = (2 * 0.395 J) / [tex](11.5 A)^2[/tex]

L ≈ 0.0066 H

The inductance of a toroidal solenoid is given by the formula:

L = (μ₀ * [tex]N^2[/tex] * A) / (2π * r)

Where μ₀ is the permeability of free space, N is the number of turns, A is the cross-sectional area, and r is the mean radius.

Rearranging this formula to solve for N, we have:

N^2 = (2π * r * L) / (μ₀ * A)

N ≈ √((2π * 0.145 m * 0.0066 H) / (4π * 10^-7 T·m/A * 5.00 * [tex]10^{-6}[/tex] [tex]m^2[/tex]))

Simplifying the expression, we get:

N ≈ √((2 * 0.145 * 0.0066) / (4 * 5.00))

N ≈ √(0.00119)

N ≈ 0.0345

Since the number of turns must be a whole number, rounding up to the nearest integer, the toroidal solenoid has approximately 173 turns.

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The energy of these photons in eV 1.88 eV.  The energy of the higher level is E₃ = (-13.6 eV)/3² = -4.78 eV. The kinetic energy of the ejected photoelectrons is 0.60 eV. The allowed values of quantum number m are -1, 0, and +1.

a) The energy of photons is given by Planck’s equation E = hc/λ where h = Planck’s constant, c = speed of light in vacuum, and λ is the wavelength of the radiation.

Given, λ = 657 nm = 657 × 10⁻⁹ m

Planck’s constant, h = 6.626 × 10⁻³⁴ Js

Speed of light in vacuum, c = 3 × 10⁸ m/s

Energy of photons E = hc/λ = (6.626 × 10⁻³⁴ Js × 3 × 10⁸ m/s)/(657 × 10⁻⁹ m) = 3.01 × 10⁻¹⁹ J

The energy of these photons in electron volts is given by E (eV) = (3.01 × 10⁻¹⁹ J)/1.6 × 10⁻¹⁹ J/eV = 1.88 eV Therefore, the energy of these photons in eV is 1.88 eV.

b) Energy of photon emitted when an electron jumps from nth energy level to the 2nd excited state is given by ΔE = Eₙ - E₂. Energy levels in a hydrogen atom are given by Eₙ = (-13.6 eV)/n²

Energy of photon emitted when an electron jumps from higher energy level to 2nd excited state is given by ΔE = Eₙ - E₂ = (-13.6 eV/n²) - (-13.6 eV/4)

Energy level n, for which the photon is emitted, can be found by equating ΔE to the energy of the photon. Eₙ - E₂ = 1.88 eV(-13.6 eV/n²) - (-13.6 eV/4) = 1.88 eV(54.4 - 3.4n²)/4n² = 1.88/13.6= 0.138n² = (54.4/3.4) - 0.138n² = 14n = 3.74 Hence, the energy of the higher level is E₃ = (-13.6 eV)/3² = -4.78 eV.

c) Work function of the metal surface is given by ϕ = hν - EK, where hν is the energy of incident radiation, and EK is the kinetic energy of the ejected photoelectrons.

The minimum energy required to eject an electron is ϕ = 1.28 eV, and hν = 1.88 eV The kinetic energy of ejected photoelectrons EK = hν - ϕ = 1.88 eV - 1.28 eV = 0.60 eV Therefore, the kinetic energy of the ejected photoelectrons is 0.60 eV.

d) In the ground state of Po, the outermost electron configuration is 6p¹. Therefore, the values of quantum numbers are:n = 6l = 1m can take values from -1 to +1So, the value of the quantum number n is 6 and the value of the quantum number l is 1.

Allowed values of quantum number m are given by -l ≤ m ≤ +l. Therefore, the allowed values of quantum number m are -1, 0, and +1.

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1. Force constant - k = (4π² * 0.350 kg) / (2.15 s)²

2. maximum speed - v_max = A * ω

3. maximum acceleration - a_max = A * ω²

(a) To find the force constant of the spring, we can use the formula for the period of oscillation in Simple Harmonic Motion (SHM):

T = 2π√(m/k)

Where

T is the period of oscillation,

m is the mass of the glider, and

k is the force constant of the spring.

Given:

m = 0.350 kg

T = 2.15 s

Rearranging the formula, we can solve for the force constant:

k = (4π²m) / T²

Substituting the given values:

k = (4π² * 0.350 kg) / (2.15 s)²

Calculating this expression gives us the force constant of the spring in N/m.

(b) To find the maximum speed of the glider, we can use the formula:

v_max = Aω

Where

v_max is the maximum speed,

A is the amplitude of oscillation (half of the distance range), and

ω is the angular frequency.

Given:

Amplitude A = (1.61 m - 1.06 m) / 2

Period T = 2.15 s

The angular frequency ω is given by:

ω = 2π / T

Substituting the values and calculating the expression gives us the angular frequency.

Then, we can calculate the maximum speed:

v_max = A * ω

Substituting the amplitude and angular frequency values gives us the maximum speed in m/s.

(c) The magnitude of the maximum acceleration of the glider is given by:

a_max = A * ω²

Using the same values for the amplitude and angular frequency as calculated in part (b), we can substitute them into the formula to find the maximum acceleration in m/s².

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To determine the final charge stored in capacitor C₃, we need to analyze the circuit configuration and the redistribution of charges. Given capacitors C₁ with an initial charge of 26 µC and C₂ with an initial charge of 48 µC, so the final charge stored in C₃ is approximately 24.7 µC.

When both switches are closed simultaneously, capacitors C₁, C₂, and C₃ are connected in series. In a series circuit, the total charge remains constant, but it is redistributed among the capacitors. To find the final charge in C₃, we can use the concept of charge conservation: Q_total = Q₁ + Q₂ + Q₃,  where Q_total is the total charge, Q₁, Q₂, and Q₃ are the charges on capacitors C₁, C₂, and C₃, respectively.

Since the total charge remains constant, we can write: Q_total = Q₁ + Q₂ + Q₃ = Q_initial,where Q_initial is the sum of the initial charges on C₁ and C₂.Substituting the given values:Q_total = 26 µC + 48 µC = 74 µC.Since C₁, C₂, and C₃ are in series, they have the same charge:Q₁ = Q₂ = Q₃ = Q_total / 3 = 74 µC / 3 ≈ 24.7 µC.Therefore, the final charge stored in C₃ is approximately 24.7 µC.

Complete Question :

Three capacitors C₁-10 µF, C2-8 μF and C3-13 µF are connected as shown in Fig. Both capacitors, C₁ and C2, have initial charges of 26µC and 48µC respectively. Now, both switches are closed at the same time. What is the final charges stored in C3?

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The intensity level of a sound with intensity of 9.0 × 10−10 W/m² is 19.54 dB (Option A).

The intensity level of a sound with an intensity of 9.0 x 10⁻¹⁰ W/m² and I₀ = 10⁻¹² W/m² is given by:

I = 10 log₁₀ (9.0 × 10⁻¹⁰ W/m² / 10⁻¹² W/m²)

I = 10 log₁₀ (90)

I = 10 × 1.9542

I = 19.54 dB

The intensity level of a sound with intensity of 9.0 × 10−10 W/m² is 19.54 dB. Hence, option (A) is the correct option.

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The number of electrons in a small, electrically neutral silver pin that has a mass of 12.0 g. is (a) [tex]3.14\times10^{24}[/tex] and approximately (b) [tex]1.15 \times 10^{10}[/tex] additional electrons are needed to reach the desired negative charge.

(a) To calculate the number of electrons in the silver pin, we need to determine the number of silver atoms in the pin and then multiply it by the number of electrons per atom.

First, we calculate the number of moles of silver using the molar mass of silver:

[tex]\frac{12.0g}{107.87 g/mol} =0.111mol.[/tex]

Since each mole of silver contains Avogadro's number ([tex]6.022 \times 10^{23}[/tex]) of atoms, we can calculate the number of silver atoms:

[tex]0.111 mol \times 6.022 \times 10^{23} atoms/mol = 6.67 \times 10^{22} atoms.[/tex]

Finally, multiplying this by the number of electrons per atom (47), we find the number of electrons in the silver pin:

[tex]6.67 \times 10^{22} atoms \times 47 electrons/atom = 3.14 \times 10^{24} electrons.[/tex]

(b) To determine the number of additional electrons needed to reach a negative charge of 2.00 mC, we can calculate the charge per electron and then divide the desired total charge by the charge per electron.

The charge per electron is the elementary charge, which is [tex]1.6 \times 10^{-19} C[/tex]. Thus, the number of additional electrons needed is:

[tex]\frac{(2.00 mC)}{ (1.6 \times 10^{-19} C/electron)} = 1.25 \times 10^{19} electrons.[/tex]

To express this relative to the number of electrons already present[tex]1.09 \times 10^{9}[/tex], we divide the two values:

[tex]\frac{(1.25 \times 10^{19} electrons)} {(1.09 \times 10^{9} electrons)} = 1.15 \times 10^{10}.[/tex]

Therefore, for every [tex]1.09 \times 10^{9}[/tex] electrons already present, approximately [tex]1.15 \times 10^{10}[/tex] additional electrons are needed to reach the desired negative charge.

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To find the distance from the slit to the screen, we can use the formula for the location of the first minimum in the diffraction pattern: y = (λ * L) / d

y is the distance from the central maximum to the first minimum, λ is the wavelength of the light (590.0 nm = 5.9 * 10^-7 m), L is the distance from the slit to the screen (which we need to find), and d is the width of the slit (0.74 mm = 7.4 * 10^-4 m). Plugging in the values, we have:
0.93 * 10^-3 m = (5.9 * 10^-7 m) * L / (7.4 * 10^-4 m)
Solving for L, we get:
L = (0.93 * 10^-3 m) * (7.4 * 10^-4 m) / (5.9 * 10^-7 m) ≈ 1.17 m
So, the distance from the slit to the screen should be approximately 1.17 m.
(b) The width of the central maximum can be calculated using the formula:
w = (λ * L) / d
Where:
w is the width of the central maximum.
Plugging in the values, we have:
w = (5.9 * 10^-7 m) * (1.17 m) / (7.4 * 10^-4 m) ≈ 9.3 * 10^-4 m
So, the width of the central maximum is approximately 9.3 * 10^-4 m or 0.93 mm.

The width of the central maximum is related to the distance from the central maximum to the first minimum by the formula w = 2 * y, where y is the distance from the central maximum to the first minimum. Therefore, the width of the central maximum is twice the distance from the central maximum to the first minimum.

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Pressure ratio = (P₀ + (1025 kg/m³) * (9.81 m/s²) * (5.586 m)) / P₀

The absolute pressure at a certain depth in a fluid can be determined using the hydrostatic pressure formula:

P = P₀ + ρgh

where P is the absolute pressure at the given depth, P₀ is the atmospheric pressure at sea level, ρ is the density of the fluid, g is the acceleration due to gravity, and h is the depth.

Given that the density of seawater is 1025 kg/m³, and the depth is 5.586 m, we can calculate the absolute pressure at that depth.

P = P₀ + ρgh

P = P₀ + (1025 kg/m³) * (9.81 m/s²) * (5.586 m)

Now, to find how many times greater the absolute pressure is compared to sea-level atmospheric pressure, we can calculate the ratio:

Pressure ratio = P / P₀

Pressure ratio = (P₀ + (1025 kg/m³) * (9.81 m/s²) * (5.586 m)) / P₀

Using this formula, we can calculate the pressure ratio. However, we need the value of the atmospheric pressure at sea level to provide an accurate answer. Please provide the value of the atmospheric pressure, and I can help you calculate the pressure ratio.

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Therefore, the linear distance between the seventh order maximum and the second order maximum on the screen is 4.04 mm (to two significant figures).

The linear distance between the seventh order maximum and the second order maximum on the screen can be calculated using the formula:

X = (mλD) / d,

where X is the distance between two fringes,

λ is the wavelength,

D is the distance from the double slit to the screen,

d is the distance between the two slits and

m is the order of the maximum.

To find the distance between the seventh order maximum and the second order maximum,

we can simply find the difference between the distances between the seventh and first order maximums, and the distance between the first and second order maximums.

The distance between the seventh and first order maximums is given by:

X7 - X1 = [(7λD) / d] - [(1λD) / d]

X7 - X1  = (6λD) / d

The distance between the first and second order maximums is given by:

X2 - X1 = [(2λD) / d]

Therefore, the linear distance between the seventh order maximum and the second order maximum is:

X7 - X2 = (6λD) / d - [(2λD) / d]

X7 - X2  = (4λD) / d

Substituting the given values, we get:

X7 - X2 = (4 x 687 nm x 37.0 cm) / 0.200 mm

X7 - X2 = 4.04 mm

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The D/C ratio for the given beam is 200%. To calculate the D/C ratio for the given rectangular beam, we need to determine the values of D (effective depth) and C (lever arm). The D/C ratio is expressed as a percentage.

To calculate the D/C ratio for the given rectangular beam, we need to determine the values of D (effective depth) and C (lever arm). The D/C ratio is expressed as a percentage.

Given data:

Beam width (b) = 306 mm

Beam depth (h) = 649 mm

Service load bending moments:

Dead load (M_dead) = 52.73 kN-m

Live load (M_live) = 134.96 kN-m

Concrete compressive strength (fc) = 33 MPa

Steel yield strength (fy) = 414 MPa

Bar diameter (d) = 20 mm (for spiral stirrups)

Stirrups diameter (d_s) = 10 mm (for spiral stirrups)

First, let's calculate the effective depth (D):

D = h - d - 0.5d_s

D = 649 mm - 20 mm - 0.5(10 mm)

D = 649 mm - 20 mm - 5 mm

D = 624 mm

Next, let's calculate the lever arm (C):

C = D/2

C = 624 mm / 2

C = 312 mm

Now, let's calculate the D/C ratio:

D/C = (D / C) * 100%

D/C = (624 mm / 312 mm) * 100%

D/C = 2 * 100%

D/C = 200%

Therefore, the D/C ratio for the given beam is 200%.

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a) The focal length of the lens is 12 cm

b) The magnification is -2.

c) The magnification is negative (-2), meaning that the image is inverted.

d) Since the image distance is positive (12 cm to the right of the lens), it shows that the image is real.

a) To evaluate the focal length of the lens, we shall use the lens formula:

1/f = 1/[tex]d_{0}[/tex] + 1/[tex]d_{i}[/tex]

where:

f = the focal length of the lens

d₀ = object distance

[tex]d_{i}[/tex] = image distance

Given:

d₀ = −6cm (since the object is 6 cm to the left of the lens),

[tex]d_{i}[/tex] = 12cm (the image forms is 12 cm to the right of the lens).

Putting the values:

1/f = 1/-6 + 1/12

We simplify:

1/f = 2/12 - 1/6

1/f = 1/12

Take the reciprocal of both sides:

f = 12cm

Therefore, the focal length of the lens is 12 cm.

b) The magnification (m) can be determined using the formula:

m = [tex]d_{i}[/tex] / [tex]d_{o}[/tex]

where:

[tex]d_{i}[/tex] = the object distance

[tex]d_{o}[/tex] = the image distance

Given:

[tex]d_{i}[/tex] = −6cm (object is 6 cm to the left of the lens),

[tex]d_{o}[/tex] = 2cm (since the image forms 12 cm to the right of the lens).

Plugging in the values:

m = -12/-6

m = -2

So, the magnification is -2.

c) The sign of the magnification tells us if the image is upright or inverted. In this situation, since the magnification is negative (-2), the image is inverted.

d) We shall put into account the sign of the image distance to determine if the image is real or virtual.

Here, the image distance is positive (12 cm to the right of the lens), indicating that the image is real.

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(a) The width of the slit is 0.216 μm.

(b) The ratio of the intensity at 3.3 mm from the center of the pattern to the intensity at the center of the pattern is 0.231.

In single-slit diffraction, the central peak refers to the brightest and sharpest peak of light in the diffraction pattern. The given information provides that the width of the central peak is 5.0 mm, wavelength is 600 nm, and the distance of the screen from the slit is 1.8 m. Using the formula of diffraction, we can calculate the width of the slit which comes out to be 0.216 μm.

Secondly, the ratio of intensity at a point of 3.3 mm from the center of the pattern to the intensity at the center of the pattern can be calculated using the formula of intensity. On substituting the given values, the ratio of intensity comes out to be 0.231.

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The mass of the box is approximately 55.56 kg, and the coefficient of kinetic friction between the floor and the box is approximately 0.117.

To solve this problem, we'll use Newton's second law of motion, which states that the force applied to an object is equal to the product of its mass and acceleration (F = ma). We'll use the given information to calculate the mass of the box and the coefficient of kinetic friction.

(a) Calculating the mass of the box:

Using the first scenario where Mary applies a force of 25 N with an acceleration of 0.45 m/s²:

F₁ = 25 N

a₁ = 0.45 m/s²

We can rearrange Newton's second law to solve for mass (m):

F₁ = ma₁

25 N = m × 0.45 m/s²

m = 25 N / 0.45 m/s²

m ≈ 55.56 kg

Therefore, the mass of the box is approximately 55.56 kg.

(b) Calculating the coefficient of kinetic friction:

In the second scenario, Mary applies a force of 86 N, and the acceleration of the box changes to 0.65 m/s². Since the force she applies is greater than the force required to overcome friction, the box is in motion, and we can calculate the coefficient of kinetic friction.

Using Newton's second law again, we'll consider the net force acting on the box:

F_net = F_applied - F_friction

The applied force (F_applied) is 86 N, and the mass of the box (m) is 55.56 kg. We'll assume the coefficient of kinetic friction is represented by μ.

F_friction = μ × m × g

Where g is the acceleration due to gravity (approximately 9.81 m/s²).

F_net = m × a₂

86 N - μ × m × g = m × 0.65 m/s²

Simplifying the equation:

μ × m × g = 86 N - m × 0.65 m/s²

μ × g = (86 N/m - 0.65 m/s²)

Substituting the values:

μ × 9.81 m/s² = (86 N / 55.56 kg - 0.65 m/s²)

Solving for μ:

μ ≈ (86 N / 55.56 kg - 0.65 m/s²) / 9.81 m/s²

μ ≈ 0.117

Therefore, the coefficient of kinetic friction between the floor and the box is approximately 0.117.

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The static thrust of a turbojet engine can be calculated using the formula:

F = ma + (p2 - p1)A

where F is the static thrust, m is the mass flow rate of exhaust gases, a is the acceleration of the gases, p1 is the inlet pressure, p2 is the exit pressure, and A is the area of the exhaust nozzle.

Given that the inlet and exit areas are both 0.45 m², the area A equals 0.45 m².

The velocity of the exhaust gases is given as 100 m/s, and assuming that the exit pressure is atmospheric pressure (101,325 Pa), the velocity pressure can be calculated as:

q = 0.5 * ρ * V^2 = 0.5 * 1.18 kg/m³ * (100 m/s)^2 = 5900 Pa

The temperature of the exhaust gases is given as 800 K, and assuming that the specific heat ratio γ is 1.4, the density of the exhaust gases can be calculated as:

ρ = p/RT = (101,325 Pa)/(287 J/kgK * 800 K) = 0.456 kg/m³

Using the above values, the static thrust can be calculated as follows:

F = ma + (p2 - p1)A

m = ρAV = 0.456 kg/m³ * 0.45 m² * 100 m/s = 20.52 kg/s

a = (p2 - p1)/ρ = (101,325 Pa - 1 atm)/(0.456 kg/m³) = 8367.98 m/s^2

Therefore,

F = 20.52 kg/s * 8367.98 m/s^2 + (101,325 Pa - 1 atm)*0.45 m² = 31680 N

Hence, the static thrust of the turbojet engine is 31680 N.

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When the wave arrives at a point where the string is fixed in place, then the reflected wave is described by the function [tex]y'(x,t) = -a cos(ft + yx)\\[/tex]. Therefore, option C is correct.

Explanation: The equation of a transverse wave on a string is given as:[tex]y(x, t) = a cos(ft + yx)[/tex]

The negative sign in the equation represents that wave is reflected from the fixed point which causes a phase shift of π.

When the wave arrives at a point where the string is fixed in place, then the reflected wave is described by the function:

[tex]y'(x,t) = -a cos(ft + yx)[/tex]

So, the answer is option C.

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If a ballon is filled to a volume of 3.00 liters at pressue of 2.5 atm then volume of the balloon is 3.00 liters.

According to the information given, the balloon is filled to a volume of 3.00 liters at a pressure of 2.5 atm. Therefore, the volume of the balloon is already specified as 3.00 liters.

Based on the given information, the volume of the balloon is 3.00 liters. No further calculations or analysis are required as the volume is explicitly provided. Therefore, If a ballon is filled to a volume of 3.00 liters at pressue of 2.5 atm then volume of the balloon is 3.00 liters.

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The capacitance of the RC circuit is 104.3 nF.

In an RC circuit, the voltage across the capacitor (V) as a function of time (t) can be expressed by the formula

V = V₀ * e^(-t/RC),

where V₀ is the initial voltage across the capacitor, R is the resistance, C is the capacitance, and e is the mathematical constant e = 2.71828...

Given that the potential difference across the capacitor decreases to half its starting value in 22.5 microseconds and the resistance in the circuit is 315 Ohms, we can use the formula above to find the capacitance.

Let's first rearrange the formula as follows:

V/V₀ = e^(-t/RC)

Taking the natural logarithm of both sides, we have:

ln(V/V₀) = -t/RC

Multiplying both sides by -1/RC, we get:-

ln(V/V₀)/t = 1/RC

Therefore, RC = -t/ln(V/V₀)

Now we can substitute the given values into this formula:

RC = -22.5 microseconds/ln(0.5)

RC = 32.855 microseconds

We know that R = 315 Ohms, so we can solve for C:

RC = 1/ωC, where ω = 2πf and f is the frequency of the circuit.

f = 1/(2πRC) = 1/(2π × 315 Ω × 32.855 × 10^-6 s) ≈ 1.52 kHz

Now we can solve for C:

C = 1/(2πfR) ≈ 104.3 nF

Therefore, the capacitance is 104.3 nF.

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In the double-slit experiment, a coherent light source is shone through two parallel slits, resulting in an interference pattern on a screen. The interference pattern arises from the wave nature of light.

The term "wavelength" refers to the distance between two corresponding points on a wave, such as two adjacent peaks or troughs. In the context of the double-slit experiment, the "wavelength of light used" refers to the characteristic wavelength of the light source employed in the experiment.

To find the wavelength of light falling on double slits, we can use the formula for the path difference between the two slits:

d * sin(θ) = m * λ

Where:

d is the separation between the slits (2.20 µm = 2.20 × 10^(-6) m)

θ is the angle of the third-order maximum (65.0° = 65.0 × π/180 radians)

m is the order of the maximum (in this case, m = 3)

λ is the wavelength of light we want to find

We can rearrange the formula to solve for λ:

λ = (d * sin(θ)) / m

Plugging in the given values:

λ = (2.20 × 10⁻⁶ m) * sin(65.0 × π/180) / 3

Evaluating this expression gives us the wavelength of light falling on the double slits.

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The current needed is approximately 55.2 A.

To balance the top wire with a weight of 0.000000207 N, we need to find the current required.

The force experienced by a current-carrying wire in a magnetic field is given by the equation F = BIL, where F is the force, B is the magnetic field, I is the current, and L is the length of the wire.

Since the bottom wire is fixed, the magnetic field produced by it will create a force on the top wire to balance its weight.

Equating the gravitational force with the magnetic force:

mg = BIL,

where m is the mass of the wire and g is the acceleration due to gravity.

Solving for I:

I = mg / (BL).

Given:

Weight of the wire (mg) = 0.000000207 N,

Distance between the wires (L) = 0.132 m,

Length of the wires (15.1 cm = 0.151 m).

Substituting the values:

I = (0.000000207 N) / [(B)(0.151 m)(0.132 m)].

To find the value of B, we need additional information about the magnetic field. The current required cannot be determined without the value of B.

To find the current needed for an electron traveling in a circular path, we can use the formula for the magnetic force on a charged particle:

F = qvB,

where F is the force, q is the charge, v is the velocity, and B is the magnetic field.

The force is provided by the magnetic field of the solenoid, and it provides the centripetal force required for the circular motion:

qvB = mv² / r,

where m is the mass of the electron and r is the radius of the circular path.

Simplifying the equation to solve for the current:

I = qv / (2πr).

Given:

Number of turns per cm (N) = 25.1,

Radius of the circular path (r) = 3.01 cm,

Speed of the electron (v) = 2.60 x 10^5 m/s.

Converting the radius to meters and substituting the values:

I = (1.602 x 10^-19 C)(2.60 x 10^5 m/s) / (2π(0.0301 m)).

Calculating the value:

I ≈ 55.2 A.

Therefore, The current needed is approximately 55.2 A.

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For lens Y, 1/r2 is positive and 1/r1 is negative. For lens X, 1/r1 is positive and 1/r2 is negative. For lens Z, 1/r2 is positive and 1/r1 is negative.

The given equation, 1/f = (n-1)(1/r1 + 1/r2), relates the focal length of a lens in air to the radii of curvature of its surfaces. For lens Y, the sign of 1/r2 is positive because the surface is convex towards the incident light, and the sign of 1/r1 is negative because the surface is concave away from the incident light. Similarly, for lens X, the sign of 1/r1 is positive due to the convex surface, and the sign of 1/r2 is negative due to the concave surface. For lens Z, 1/r2 is positive because of the convex surface, and 1/r1 is negative due to the concave surface. These signs ensure proper calculations based on Fermat's principle.

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The stopping potential is  0.536829328 V.

To understand the relationship between the frequency of electromagnetic (EM) radiation and the stopping voltage in this scenario, we can utilize the photoelectric effect and the equation for the energy of a photon.

According to the photoelectric effect, when EM radiation with a frequency greater than or equal to the threshold frequency strikes a metal surface, electrons can be ejected from the metal. The work function (W) represents the minimum energy required to remove an electron from the metal, which is equivalent to the threshold frequency times Planck's constant (h).

The energy (E) of a photon is given by the equation:

E = hf, where h is Planck's constant.

For the first frequency f1: E1 = hf1 = W + eV1

For the second frequency f2: E2 = hf2 = W + eV2

Subtracting the two equations, we can eliminate the work function W:

E2 - E1 = hf2 - hf1 = e(V2 - V1)

We can rearrange this equation to solve for the stopping voltage V2:

V2 = (E2 - E1) / e + V1=V2 = [(6.4 × 10^14 Hz * h) - (5.8 × 10^14 Hz * h)] / e + 0.28 V

V2 = [(4.240460096 × 10^-19 J) - (3.829599809 × 10^-19 J)] / (1.602176634 × 10^-19 C) + 0.28 V

V2 = (4.108603054 × 10^-20 J) / (1.602176634 × 10^-19 C) + 0.28 V

V2 = 0.256829328 + 0.28 V

V2 = 0.536829328 V

Therefore, the stopping voltage required for the EM radiation with frequency f2 = 6.4 × 10^14 Hz is approximately 0.537 V.

To plot the graph, we can vary the frequency f2 while keeping the stopping voltage V2 as the y-axis. For each frequency value, we can calculate the corresponding stopping voltage V2 using the formula above. Note: The graph cannot be precisely plotted without knowing the specific values of Planck's constant (h) and the charge of an electron (e). However, you can represent the trend by plotting the frequency values on the x-axis and the stopping voltage values on the y-axis, showing an increasing relationship as the frequency increases.

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The speeds of the 1.89-kg and 3.41-kg blocks, respectively, after the collision will be 1.28 m/s and 3.20 m/s, option (c).

In an elastic collision, both momentum and kinetic energy are conserved. Initially, the 1.89-kg block is moving northward with a speed of 4.48 m/s, and the 3.41-kg block is stationary. After the collision, the 1.89-kg block rebounds back to the south, while the 3.41-kg block acquires a velocity in the northward direction.

To solve for the final velocities, we can use the conservation of momentum:

(1.89 kg * 4.48 m/s) + (3.41 kg * 0 m/s) = (1.89 kg * v1) + (3.41 kg * v2)

Here, v1 represents the final velocity of the 1.89-kg block, and v2 represents the final velocity of the 3.41-kg block.

Next, we apply the conservation of kinetic energy:

(0.5 * 1.89 kg * 4.48 m/s^2) = (0.5 * 1.89 kg * v1^2) + (0.5 * 3.41 kg * v2^2)

Solving these equations simultaneously, we find that v1 = 1.28 m/s and v2 = 3.20 m/s. Therefore, the speeds of the 1.89-kg and 3.41-kg blocks after the collision are 1.28 m/s and 3.20 m/s, respectively.

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Pump is used to abstract water from a river to a water treatment plant 20 m above the river. The pipeline used is 300 m long, 0.3 m in diameter with a friction factor A of 0.04.  K = 19.6, K' = 10408.5

The pipeline flow rate and local headloss coefficient can be calculated as follows;

i) Pipeline Flow rate:

Head at inlet = 0

Head at outlet = 20 + 30 = 50m

Frictional loss = f x (l/d) x (v^2/2g)

= 0.04 x (300/0.3) x (v^2/2 x 9.81)

= 39.2 x v^2x v

= (Head at inlet - Head at outlet - Frictional Loss)^0.5

= (0 - 50 - 39.2v^2)^0.5Q

= A x v

= πd^2/4 x v

= π(0.3)^2/4 x (0.27)^0.5

= 0.0321 m3/s

= 32.1 L/s

ii) Local Headloss Coefficient:

Frictional Loss = f x (l/d) x (v^2/2g)

= 0.01 x (300/0.3) x (v^2/2 x 9.81)

= 9.8 x v^2Head at inlet

= 0Head at outlet

= 50 + 30 = 80m

Total Headloss = Head at inlet - Head at outlet

= 0 - 80

= -80 m

Since the flow rate remains the same, Q = 0.0321 m3/s

Frictional Loss = f x (l/d) x (v^2/2g)

= K x (v^2/2g)

= K' x Q^2 (K' = K x d^5 / l g)^0.5

= 9.8 x v^2

= K x (v^2/2g)

= K' x Q^2

Hence, K = 19.6, K' = 10408.5

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The total work done by the gas in the process is 4025 joules.

The work done by an expanding gas is given by the following equation:

W = P∆V

where:

* W is the work done by the gas in joules

* P is the pressure of the gas in pascals

* ∆V is the change in volume of the gas in cubic meters

In this case, the pressure is 3.5 atm, which is equal to 3.5 * 101325 pascals. The change in volume is 750 mL - 400 mL = 350 mL, which is equal to 0.035 cubic meters.

Substituting these values into the equation, we get the following:

W = 3.5 * 10^5 Pa * 0.035 m^3 = 4025 J

Therefore, the total work done by the gas in the process is 4025 joules.

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The frequency of the fundamental mode of vibration when the tension is increased by 18% is approximately 588.6 Hz.

The frequency of the fundamental mode of vibration of a string is directly proportional to the square root of the tension.

Let's calculate the new tension after increasing it by 18%:

New tension = 920 N + (18/100) * 920 N = 1085.6 N

Now, let's calculate the new frequency using the new tension:

New frequency = √(New tension / Original tension) * Original frequency

New frequency = √(1085.6 N / 920 N) * 542 Hz

Calculating the new frequency:

New frequency ≈ √(1.18) * 542 Hz ≈ 1.086 * 542 Hz ≈ 588.6 Hz

Therefore, the frequency of the fundamental mode of vibration when the tension is increased by 18% is approximately 588.6 Hz.

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In order to calculate the maximum acceleration (in m/s) of a car that is heading up a 2.0 slope (one that makes an angle of 2.9 with the horizontal) under the following road conditions, we have to use the formula below:`

μ_s` is the coefficient of static friction and is given as 0.100 in case of ice and since the weight of the car is supported by the four drive wheels, `W = 4mg`.

(a) On dry concrete:

The formula for maximum acceleration is:`

a = g(sinθ - μ_s cosθ)`

= `9.81(sin2.9° - 0.6 cos2.9°)`

= `4.4 m/s²`

Therefore, the maximum acceleration of the car on dry concrete is 4.4 m/s².

(b) On wet concrete:

We know that wet concrete has a coefficient of static friction lower than that of dry concrete. Therefore, the maximum acceleration of the car will be lower than on dry concrete

.μ_s (wet concrete)

= 0.4μ_s (dry concrete)

Therefore, `a` (wet concrete) = `a` (dry concrete) × `0.4` = `1.76 m/s²`

Therefore, the maximum acceleration of the car on wet concrete is 1.76 m/s².

(c) On ice, assuming that `μ_s` is the same as for shoes on ice`μ_s` (ice) = 0.100

Therefore, the maximum acceleration of the car on ice is:`

a = g(sinθ - μ_s cosθ)` = `9.81(sin2.9° - 0.100 cos2.9°)` = `1.08 m/s²`

Therefore, the maximum acceleration of the car on ice is 1.08 m/s².

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The fluid system can be remotely controlled by programming a PLC with start and stop buttons, utilizing a double-acting cylinder and a 5/3 DCV, with a 15-second actuator extension and a sensor at the extension position.

To control the fluid system remotely, a Programmable Logic Controller (PLC) can be employed with input and output connections, along with start and stop buttons. The main components of the system include a double-acting cylinder and a 5/3 DCV (Directional Control Valve).

The objective is to extend the actuator for 15 seconds before returning it to the initial position, which requires a sensor at the extension position.

By connecting the PLC to the input devices like the start and stop buttons, as well as the sensor at the extension position, and connecting it to the output devices including the 5/3 DCV, the control logic can be implemented. The PLC program, typically in ladder logic, can be designed to respond to the start button input.

Once the start button is pressed, the PLC will activate the necessary components, energizing the coil connected to the output of the 5/3 DCV, which extends the actuator.

A timer can be incorporated to ensure the actuator remains extended for the desired 15 seconds. The PLC program should also consider the stop button input, which, when pressed, interrupts the actuator extension by de-energizing the coil.

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FULL QUESTION: 2. Controlling the fluid system that is working remotely by programming (PLC with I/O and O/P require start and stop button). The system has main components of: Double Acting cylinder and 5/3 DCV. It requires the extension of the actuator for 15 seconds before returning to the initial position (hint: need the sensor at the extension position).

To control the fluid system remotely, a programmable logic controller (PLC) with input and output components is required. The main components of the system are a double-acting cylinder and a 5/3 directional control valve (DCV). The system is designed to extend the actuator for 15 seconds before returning to its initial position, and it requires a sensor at the extension position.

In this setup, the PLC serves as the central control unit that manages the operation of the fluid system. It receives inputs from sensors, such as the start and stop buttons, and controls the outputs, including the double-acting cylinder and the 5/3 DCV. The PLC program is responsible for defining the logic and sequence of actions.

When the start button is pressed, the PLC activates the 5/3 DCV to allow the flow of fluid into the double-acting cylinder, causing it to extend. The PLC keeps track of the elapsed time using an internal timer and ensures that the actuator remains extended for the specified duration of 15 seconds.

Once the 15 seconds have elapsed, the PLC deactivates the 5/3 DCV, causing the fluid flow to reverse. The double-acting cylinder then retracts to its initial position. The PLC can also incorporate a sensor at the extension position of the actuator to detect when it has fully extended and provide feedback to the control system.

By programming the PLC with the appropriate logic and using input and output components, the fluid system can be controlled remotely, allowing for automated and precise operation.

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