Buffy is rolling along in her 10.4 kg wagon at 3.4 m/s (in the positive direction) when she jumps off the back. She continues to move forward at 1.7 m/s relative to the ground. This causes her wagon to go speeding forward at 8.04 m/s relative to the ground. How much does Buffy weigh

The wavelength of the sound waves is equal to 1.714 m. Therefore, option (d) is correct.

Sound waves can transmit through liquids, and gases, as well as plasma as longitudinal waves, called compression waves. It requires a medium to travel so it can be traveled through solids in the form of both longitudinal waves and transverse waves.

Given, the distance between two speakers, d₁ = 4.52 m

The distance between two walls, d₂ = 10.2 m

The expression to calculate wavelength: pd =(n + 0.5 λ)

As there is no slit, n =0 therefore,  pd = 0.5 λ                        ...........(1)

Given, the triangle-1, the value of s₁ = 10.7 m

The value of s₂ = (4.52/2) - 2.11 = 0.15 m

The value of s₃ is equal to: [tex]s_3 =\sqrt{(10.7)^2+(0.15)^2}[/tex]

s₃ = 10.7 m

Given, the triangle-2, the value of a₁ = 10.7 m

The value of a₂ = (4.52/2) + 2.11 = 4.37 m

The value of s₃ is equal to: [tex]s_3 =\sqrt{(10.7)^2+(4.37)^2}[/tex]

a₃ = 11.557 m

The constructive interference, pd =  a₃ - s₃ = 11.557 - 10.7 = 0.857 m

From the equation (1) we can determine wavelength:

pd = 0.5 λ

0.857 = 0.5 λ

λ = 1.714 m

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Answer:

a) ∆x∆v = 5.78*10^-5

   ∆v = 1157.08 m/s

b) 4.32*10^{-11}

Explanation:

To solve this problem you use the Heisenberg's uncertainty principle, that is given by:

[tex]\Delta x\Delta p \geq \frac{\hbar}{2}[/tex]

where h is the Planck's constant (6.62*10^-34 J s).

If you assume that the mass of the electron is constant you have:

[tex]\Delta x \Delta (m_ev)=m_e\Delta x\Delta v \geq \frac{\hbar}{2}[/tex]

you use the value of the mass of an electron (9.61*10^-31 kg), and the uncertainty in the position of the electron (50nm), in order to calculate ∆x∆v and ∆v:

[tex]\Delta x \Delta v\geq\frac{\hbar}{2m_e}=\frac{(1.055*10^{-34}Js)}{2(9.1*10^{-31}kg)}=5.78*10^{-5}\ m^2/s[/tex]

[tex]\Delta v\geq\frac{5.78*10^{-5}}{50*10^{-9}m}=1157.08\frac{m}{s}[/tex]

If the electron is a classical particle, the time it takes to traverse the channel is (by using the edge of the uncertainty in the velocity):

[tex]t=\frac{x}{v}=\frac{50*10^{-9}m}{1157.08m/s}=4.32*10^{-11}s[/tex]

Answer:

the​ difference, in miles per​ hour, in the linear speeds of Brett and​ Will;

∆v = 1.38 mph

Explanation:

Given;

Angular speed w = 2.7 revolutions per minute

Converting to revolutions per hour

w = 2.7 × 60 revolutions per hour

w = 162 rev/hour

Linear speed v = angular speed × 2πr

the​ difference, in miles per​ hour, in the linear speeds of Brett and​ Will;

∆v = w × 2π(r1 - r2)

r1 = Brett radius in miles

r2 = Will radius in miles

r1 = 19ft 1in = (19×12 + 1) = 229 in

r1 = 229 × 1.57828283 × 10^-5 miles

r2 = 11 ft 11 in = (11×12 + 11) = 143 in

r2 = 143 × 1.57828283 × 10^-5 miles

Substituting the values;

∆v = 162 × 2π × (229-143)×1.57828283 × 10^-5 mph

∆v = 1.38 mph

Answer:(b)

Explanation:

Optical fiber works on the principle of total internal reflection . Total internal reflection occurs when the following two conditions are met

(1) When the angle of incidence of light is greater than the critical angle and,

(2) When a ray of light travels from a optically denser medium to optically rarer medium .

We know that light bend away from normal when it travels from denser to rarer medium. If we we choose such an angle that the refraction angle is [tex]90^{\circ}[/tex] then the incident angle is called critical angle.

So, the refractive index of cladding must be must be less than the refractive index of core material.

Answer:

Explanation:

Given

[tex]N=3680 cm^{-1}[/tex]

therefore slit spacing [tex]d=\frac{1}{N}=\frac{1}{3680}=2.717\times 10^{-4}\ cm[/tex]

since [tex]d\sin \theta =n\lambda [/tex]

for [tex]n=1[/tex]

[tex]d\sin \theta =\lambda [/tex]

Now,at [tex]\theta _1=12.9^{\circ},\Rightarrow \lambda _1=6.0657\times 10^{-7}\ m=606.57\ nm[/tex]

at [tex]\theta _2=14.2^{\circ}\Rightarrow \lambda_2=666.5\ nm[/tex]

at [tex]\theta _3=15^{\circ}\Rightarrow \lambda_3=703.21\ nm[/tex]

Answer:

Check the attached image

Explanation:

To solve the problem for time you will have to use the formula for time, t = d/s which means time equals distance divided by speed.

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

Answer:

the color is green

the observation is that there is a change of visible color

Explanation:

A) wavelength of visible light that is most strongly reflected from a point on a soap

refraction n = 1.33

wall thickness (t) = 290 nm

2nt = (2m +1 ) ∝/2 -----equation 1

note when m = 0

therefore ∝ =  4nt/ 1 = 4 * 1.33 * 290 = 1542.8nm we will discard this

when m = 1

equation 1 becomes

∝ = 4nt/3 =( 4 * 1.33 * 290) /  3 = 1542.8 / 3 = 514.27 ( wavelength )

the color is green

B) the wavelength when the wall thickness is 340 nm

∝ = 4nt / 2m +1

where m = 1

∝ = (4 * 1.33 * 340 ) / 3  = 1808.8 / 3 = 602.93 nm  ( orange color )

the observation is that there is a change of visible color

Final answer:

The wavelength of visible light most strongly reflected for a soap bubble wall thickness of 290 nm and index of refraction of 1.33 is 770 nm, corresponding to the red color. For a thickness of 340 nm, the wavelength is 904 nm, which falls outside the visible spectrum, in the infrared range. As the thickness increases, the reflected wavelength shifts toward longer wavelengths.

Explanation:

The phenomenon described in the question is known as thin film interference, which is a physical effect that occurs when light waves reflected off the top and bottom surfaces of a thin film interfere with each other. To find the wavelength (λ) of visible light that is most strongly reflected, we use the formula for constructive interference in thin films:

2nt = mλ,

where n is the index of refraction of the film, t is the thickness of the film, and m is the order of the fringe (which is an integer).

For part (a), we have a soap bubble thickness of 290 nm and an index of refraction n = 1.33. Assuming the light is perpendicular to the surface (m = 1 for the first order of constructive interference), we calculate the wavelength using the given formula as follows:

λ = 2nt/m = 2 * 1.33 * 290 nm / 1 = 770 nm.

The wavelength of 770 nm corresponds to red light in the visible spectrum.

For part (b), with a wall thickness of 340 nm, we calculate the wavelength in a similar fashion:

λ = 2 * 1.33 * 340 nm / 1 = 904 nm.

However, a wavelength of 904 nm falls outside the visible spectrum and cannot be seen as a color. It is in the infrared range.

Comparing answers from (a) and (b), we observe that as the thickness of the soap bubble increases, the wavelength of light most strongly reflected shifts towards the longer wavelengths, moving out of the visible range into the infrared.

Answer: c

Explanation:

Answer:

Explanation:

Part A

- Work function ( ∅ ) is the minimum energy required by the photon to knock an electron out of the metal surface. That is the portion of energy of a photon transferred to an electron so that it can escape the metal.

- We can mathematically express it:

               ∅ = Ep - Ek

                    = [tex]\frac{h*c}{lamba} - 0.5*m_e*v^2_e\\[/tex]

Where,

            Planck's constant ( h ) = 6.6261*10^-34

            Speed of light ( c ) = 3*10^8 m/s

            mass of an electron ( m_e ) = 9.1094*10^-31 kg

Given:-

           Incident light's wavelength ( λ ) = 250*10^-9 m

           The maximum speed o electron ( v_e ) = 4*10^5 m/s

Solution:-

- Plug the values into the expression derived before:

               ∅ = [tex]\frac{(6.6261*10^-^3^4)*(3*10^8)}{250*10^-^9} \\\\[/tex]

               ∅ = [tex]7.22257*10^-^1^9 J * \frac{6.242*10^1^8 eV}{J}[/tex]

               ∅ = 4.508 eV  ... Answer

Part B

- 2.5% of the energy emitted by a 100-W light bulb was visible light with wavelength ( λ ) = 500*10^-9 m. In 1.0 min the amount of energy harbored by a stream of photons are:  

              [tex]E_p = n_p*\frac{h*c}{lambda} = P*t*e[/tex]

Where,

            Planck's constant ( h ) = 6.6261*10^-34

            Speed of light ( c ) = 3*10^8 m/s

Given:-

            visible light's wavelength ( λ ) = 500*10^-9 m

            Power of light bulb ( P ) = 100 W

            Time taken ( t ) = 1.0 min = 60 s

            Portion of energy as light ( e ) = 0.025

Solution:-

- Plug the values into the expression derived before:

             [tex]n_p = \frac{(lambda)*(P)*(t)*(e)}{h*c} \\\\n_p = \frac{(500*10^-^9)*(100)*(60)*(0.025)}{(6.6261*10^-^3^4)*(3*10^8)} \\[/tex]

             n_p = 3.773 * 10^20 ... Answer

Part C

- A blood vessel of radius ( r ) with length ( L ) carries blood with viscosity ( μ ). The pressure drop ( ΔP ) in the blood vessel was witnessed.

- Pressure loss ( ΔP ) in a cylindrical blood vessel is given by the Darcy's equation given below:

                    [tex]\frac{dP}{p} = f*\frac{L}{D}*\frac{v^2}{2}[/tex]

Where,

                  ρ: Density of blood

                  f: Friction factor

                  D: Diameter of vessel

                  v: Average velocity

- The friction factor is a function of Reynolds number and relative roughness of blood vessel. We will assume the blood vessel to be smooth, round and the flow to be laminar ( later verified ).

- The flow rate ( Q ) in a smooth blood vessel subjected to laminar flow conditions is given by the Poiseuille's Law. The law states:

                  [tex]Q = \frac{\pi*dP*r^4 }{8*u*L}[/tex]

- The velocity ( v ) in a circular tube is given by the following relation:

                 [tex]v = \frac{Q}{\pi*r^2 }[/tex]

Given:-

           dP ( Pressure loss ) = 2.5 Pa

           radius of vessel ( r ) = 10μm = 10*10^-6 m

           viscosity of blood ( μ ) = 0.0027 Pa.s

           Length of vessel ( L ) = 1μm = 10^-6 m

Solution:-    

- Use the Poiseuille's Law to determine the flow rate ( Q ) of the blood in the vessel:

               [tex]Q = \frac{\pi*(2.5)*(10*10^-^6)^4 }{8*(0.0027)*(10^-^6)}[/tex]

               Q = 3.6361*10^-12 m^3 / s

- The corresponding velocity ( v ) of the blood flow would be:

               [tex]v = \frac{3.6361*10^-^1^2}{\pi*(10*10^-^6)^2 }[/tex]

              v = 0.01157 m/s

- Use the Poiseuille's Law to determine the flow rate ( Q ) of the blood blood in the enlarged vessel ( r = 12 μm = 10*10^-6 m ) :

               [tex]Q = \frac{\pi*(2.5)*(12*10^-^6)^4 }{8*(0.0027)*(10^-^6)}[/tex]

               Q = 7.54*10^-12 m^3 / s

- The corresponding velocity ( v ) of the blood flow would be:

               [tex]v = \frac{7.53982*10^-^1^2}{\pi*(12*10^-^6)^2 }[/tex]

              v = 0.01666 m/s

Part D

- A radioactive isotope of Cobalt ( Co - 60 ) undegoes Beta decay ( 0.31 MeV ) and emits two gamma rays of energy ( 1.17 & 1.33 ) MeV.

- The radioactive decay for the ( Cobalt - 60 ) can be expressed in form of an equation:

              [tex]_2_7Co ( 60 ) ---> _2_8 Ni ( 60 ) + e^- + v_e^- + gamma[/tex]

- The half life ( T_1/2 ) of the Co-60 can be used to determine the decay constant ( λ ):

             λ = [tex]lambda = \frac{Ln(2)}{T_1/2}\\[/tex]

Where,

             T_1/2 = 5.2 yrs = 1.68*10^8 s

Hence, the decay constant is

              λ = [tex]\frac{Ln ( 2 ) }{1.68*10^8}[/tex] = 4.22*10^-9 s^-1

- The activity ( A ) of any radioactive isotope is function of time ( t ) defined by negative exponential distribution:

            [tex]A = A_o*e^(^-^l^a^m^b^d^a^*^t^)[/tex]

Where,

             A_o: The initial activity ( Bq )

- The activity of the radioactive isotope Co-60 was A = 10 Ci after t = 30 months. The initial activity ( A_o ) can be determined:

            [tex]A_o= \frac{A}{e^(^-^l^a^m^b^d^a^*^t^)} \\\\A_o= \frac{(10Ci)*(3.7*10^1^0 Bq/Ci)}{e^(^-^4^.^2^2^*^1^0^-^9*^7^.^8^8^*^1^0^7^)} \\[/tex]

            A_o = 5.016 * 10^11 Bq

- The initial number of nuclei in the sample ( N_o ) is given by:

           [tex]N_o = (A_o) / (lambda)\\\\N_o = \frac{5.016*10^1^1}{4.22*10^-^9} = 1.22*10^2^2[/tex]

- The initial mass of Co-60 used as a sample can be determined:

           [tex]m_o = M_r*N_o\\\\m_o = (59.933822u)*(1.66*10^-^2^7)*(1.22*10^2^2)\\[/tex]

           m_o = 12.2 * 10^-6 kg  ... Answer

- The total energy ( E ) released from the beta decay transformation:

          E = E(β) + E(γ1) + E(γ2) = 0.31 + 1.17 + 1.33 = 2.81 MeV

- The rate at which the source emits energy after 30 months:

        P = E*A = [tex]( 2.81 MeV * \frac{1.6*10^-^1^3 J}{MeV} ) * ( 10 Ci * \frac{3.7*10^1^0 Bq}{Ci} )[/tex]

        P = 0.166 W  .. Answer

Answer:

Explanation:

Given

Slope of inclination [tex]\theta =19^{\circ}[/tex]

Mass of cyclist and bicycle is [tex]m=85\ kg[/tex]

When cyclist is going up then there is two components of its weight , one is parallel to inclination and other is perpendicular to inclination

Weight of person is mg

it can be resolved in [tex]mg\cos \theta[/tex] and  [tex]mg\sin \theta [/tex]

[tex]mg\cos \theta[/tex] is perpendicular to the inclination

and [tex]mg\sin \theta[/tex] is parallel to inclination as shown in diagram

Parallel component [tex]=mg\sin \theta=85\times 9.8\times \sin 19=271.2\ N[/tex]

Normal reaction [tex]N=mg\cos \theta =85\times 9.8\times \cos 19=787.61\ N[/tex]

The normal reaction on the bicycle by the inclined slope is 787.62 N.

The parallel on the bicycle along the inclined slope is 271.2 N.

The given parameters;

The normal reaction on the bicycle by the inclined slope is calculated as; follows;

[tex]F_n = W cos \theta\\\\F_n = mg \ cos \theta \\\\F_n = 85 \times 9.8 \times cos \ (19)\\\\F_n = 787.62 \ N[/tex]

The parallel on the bicycle along the inclined slope is calculated as

[tex]F_x = Wsin\theta\\\\F_x = mg \ sin \ \theta \\\\F_x = 85 \times 9.8 \times sin(19) \\\\F_ x = 271 .2 \ N[/tex]

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Answer:

5,400 Newtons.

Explanation:

Force = 1,800 kg * 3 m/s^2 = 5,400 kg*m/s^2 = 5,400 N

Answer:

Explanation:

Using the magnification formula.

Magnification = Image distance(v)/object distance(u) = Image Height(H1)/Object Height(H2)

M = v/u = H1/H2

v/u = H1/H2...1

3) Given the radius of curvature of the concave lens R = 20cm

Focal length F = R/2

f = 20/2

f = 10cm

Object distance u = 5cm

Object height H2= 5cm

To get the image distance v, we will use the mirror formula

1/f = 1/u+1/v

1/v = 1/10-1/5

1/v = (1-2)/10

1/v =-1/10

v = -10cm

Using the magnification formula

(10)/5 = H1/5

10 = H1

H1 = 10cm

Image height of the peg is 10cm

4) If u = 15cm

1/v = 1/f-1/u

1/v = 1/10-1/15

1/v = 3-2/30

1/v = 1/30

v = 30cm

30/15 = H1/5

15H1 = 150

H1/= 10cm

5) if u = 20cm

1/v = 1/f-1/u

1/v = 1/10-1/20

1/v = 2-1/20

1/v = 1/20

v = 20cm

20/20 = H1/5

20H1 = 100

H1 = 5cm

6) If u = 30cm

1/v = 1/f-1/u

1/v = 1/10-1/30

1/v = 3-1/30

1/v = 2/30

v = 30/2 cm

v =>15cm

15/30 = Hi/5

30H1 = 75

H1 = 75/30

H1 = 2.5cm

Answer:

Explanation:

The specific heat of gold is 129 J/kgC

It's melting point is 1336 K

It's Heat of fusion is 63000 J/kg

Assuming that the mixture will be solid, the thermal energy to solidify the gold has to be less than that needed to raise the solid gold to the melting point. So,

The first is E1 = 63000 J/kg x 1.5 = 94500 J

the second is E2 = 129 J/kgC x 2 kg x (1336–1000)K = 86688 J

Therefore, all solid is not correct. You will have a mixture of solid and liquid.

For more detail, the difference between E1 and E2 is 7812 J, and that will melt

7812/63000 = 0.124 kg of the solid gold

The question involves a thermodynamic analysis using heat transfer and phase change principles to determine if a mixture of solid and liquid gold will become entirely solid or remain mixed upon reaching thermal equilibrium.

To determine whether the mixture of 2.0 kg of solid gold at 1000K and 1.5 kg of liquid gold at 1336K will be entirely solid or in a mixed solid/liquid phase upon reaching thermal equilibrium, a thermodynamic analysis involving the principles of heat transfer and phase change is required. This analysis will utilize the concept of conservation of energy, accounting for the specific heats of solid and liquid gold as well as the latent heat of fusion if a phase change occurs. The calculations will involve setting the heat lost by the liquid gold equal to the heat gained by the solid gold until both reach the same temperature. If the final temperature is below the melting point of gold without all the solid gold melting, the result will be a mixture. If all the solid melts before reaching the equilibrium temperature, the final state will be all liquid. It's critical to remember that the process must comply with the melting point of gold, which is 1064K.

Answer:

Torque = 35.60 N.m (rounded off to 3 significant figures.

Explanation:

Given details:

The mass of the rock on the left, ms = 2.25 kg

The total mass of the rocks, mp = 10.1 kg

The distance from the fulcrum to the center of the pile of rocks, rp = 0.360 m

(a) The torque produced by the pile of rock, T = F*rp = m*g*rp

Torque = 9.8*0.360*10.1 = 35.6328

Torque = 35.60 N.m (rounded off to 3 significant figures).

Answer:

a) falso

b) verdadero

c) falso

d) falso

e) verdadero

Explanation:

A) FALSO: la distancia recorrida es independiente del punto de partida y del punto de llegada

B) VERDADERO: para que el ciclista recorra la pista de ida y vuelta es necesario que su velocidad cambie, por lo tanto la aceleración es diferente de cero.

C) FALSO

D) FALSO: en todo momento hay una distancia recorrida en un tiempo en específico, es decir, una rapidez.

E) VERDADERO: el despazamiento sí depende de la distancia entre el punto de llegada y el punto de salida.

Answer:

Explanation:

Given that,

A point charge is placed between two charges

Q1 = 4 μC

Q2 = -1 μC

Distance between the two charges is 1m

We want to find the point when the electric field will be zero.

Electric field can be calculated using

E = kQ/r²

Let the point charge be at a distance x from the first charge Q1, then, it will be at 1 -x from the second charge.

Then, the magnitude of the electric at point x is zero.

E = kQ1 / r² + kQ2 / r²

0 = kQ1 / x²  - kQ2 / (1-x)²

kQ1 / x² = kQ2 / (1-x)²

Divide through by k

Q1 / x² = Q2 / (1-x)²

4μ / x² = 1μ / (1 - x)²

Divide through by μ

4 / x² = 1 / (1-x)²

Cross multiply

4(1-x)² = x²

4(1-2x+x²) = x²

4 - 8x + 4x² = x²

4x² - 8x + 4 - x² = 0

3x² - 8x + 4 = 0

Check attachment for solution of quadratic equation

We found that,

x = 2m or x = ⅔m

So, the electric field will be zero if placed ⅔m from point charge A, OR ⅓m from point charge B.

Answer:

The receptors that sense the Earth's magnetic field are probably located in the birds' eyes. Now, researchers at Lund University have studied different proteins in the eyes of zebra finches and discovered that one of them differs from the others: only the Cry4 protein maintains a constant level throughout the day and in different lighting conditions

Explanation:

Final answer:

The bird will be able to detect the power line at a much smaller distance than calculated due to the concentration of the magnetic field close to the wire.

Explanation:

The distance at which a migratory bird could detect the presence of a power line can be calculated using the equation for the magnetic field produced by a long straight wire. However, since the bird's sensitivity to magnetic fields is much smaller than the field produced by the power line, the real answer will be much smaller than the calculated distance. This is because power lines are typically arranged in such a way that the magnetic field they produce is concentrated close to the wire, diminishing rapidly with distance.

To find the double-slit characteristics of width and separation, one must use the data from a single-slit diffraction pattern to calculate the slit width and then the interference pattern from both slits to find the slit separation.

The student's question is about the characteristics of a double-slit diffraction pattern produced when a laser beam with a specific wavelength is projected through two slits. To deduce the slit width and separation, we use the information provided about the diffraction and interference patterns observed.

Firstly, we use the minima separation from the single slit diffraction to find the slit width using the diffraction formula d sin(θ) = mλ, where d is the slit width, m is an integer denoting the order of the minima, λ is the wavelength, and θ is the angle of the minima. Since the screen is 1 meter away and the minima are 6.5 mm apart, we can approximate sin(θ) as the ratio of minima separation to the distance to the screen to solve for the slit width d.

Next, we apply the formula for double-slit interference, d sin(θ) = nλ (where d is now the slit separation, n is an integer denoting the order of the maxima) to the observed interference maxima separation to calculate the slit separation.

Slit separation: [tex]\(97.23 \times 10^{-6}\)[/tex] m. Slit width: [tex]\(1194.34 \times 10^{-6}\)[/tex] m. Calculated using interference formula and provided data.

To solve this problem, we can use the double-slit interference formula:

[tex]\[ \Delta y = \frac{\lambda L}{d} \][/tex]

where:

- [tex]\( \Delta y \)[/tex] is the distance between adjacent maxima or minima on the observation screen,

- [tex]\( \lambda \)[/tex] is the wavelength of the laser beam,

- [tex]\( L \)[/tex] is the distance between the screen and the slits, and

- [tex]\( d \)[/tex] is the slit separation.

Given:

- Wavelength [tex]\( \lambda = 632.8 \)[/tex] nm = [tex]\( 632.8 \times 10^{-9} \)[/tex] m,

- Distance between the screen and the slits [tex]\( L = 1 \)[/tex] m = 1 m,

- Distance between adjacent minima [tex]\( \Delta y_{\text{min}} = 6.5 \)[/tex] mm = [tex]\( 6.5 \times 10^{-3} \)[/tex] m, and

- Distance between adjacent maxima [tex]\( \Delta y_{\text{max}} = 0.53 \)[/tex] mm = [tex]\( 0.53 \times 10^{-3} \)[/tex] m.

First, let's find the slit separation [tex]\( d \)[/tex] using the minima data:

[tex]\[ d = \frac{\lambda L}{\Delta y_{\text{min}}} \][/tex]

Then, let's find the slit width [tex]\( w \)[/tex] using the maxima data:

[tex]\[ w = \frac{\lambda L}{\Delta y_{\text{max}}} \][/tex]

Let's calculate these values.

First, let's calculate the slit separation [tex]\(d\)[/tex] using the minima data:

[tex]\[ d = \frac{\lambda L}{\Delta y_{\text{min}}} = \frac{(632.8 \times 10^{-9} \, \text{m})(1 \, \text{m})}{6.5 \times 10^{-3} \, \text{m}} \][/tex]

[tex]\[ d \approx \frac{(632.8)(1)}{6.5} \times 10^{-6} \, \text{m} \][/tex]

[tex]\[ d \approx 97.23 \times 10^{-6} \, \text{m} \][/tex]

Now, let's calculate the slit width [tex]\(w\)[/tex] using the maxima data:

[tex]\[ w = \frac{\lambda L}{\Delta y_{\text{max}}} = \frac{(632.8 \times 10^{-9} \, \text{m})(1 \, \text{m})}{0.53 \times 10^{-3} \, \text{m}} \][/tex]

[tex]\[ w \approx \frac{(632.8)(1)}{0.53} \times 10^{-6} \, \text{m} \][/tex]

[tex]\[ w \approx 1194.34 \times 10^{-6} \, \text{m} \][/tex]

So, the slit separation [tex]\(d\)[/tex] is approximately [tex]\(97.23 \times 10^{-6}\)[/tex] m, and the slit width [tex]\(w\)[/tex] is approximately [tex]\(1194.34 \times 10^{-6}\)[/tex] m.

Answer:

[tex]r_{min}=\frac{kq^2}{5m_ev^2}[/tex]

Explanation:

The total kinetic energy of both electrons will be electrostatic potential energy, when the electrons reach the minima distance due to electrostatic repulsion. Then, you have:

[tex]E_{k}=U_E\\\\\frac{1}{2}m_ev_1^2+\frac{1}{2}m_ev_2^2=k\frac{q^2}{r_{min}}[/tex]

me: mass of the electron

q: charge of the electron

k: Coulomb's constant

you take into account that v2=3v1=3v and do rmin the subject of the formula:

[tex]\frac{1}{2}m_e[v^2+9v^2]=5m_ev^2=k\frac{q^2}{r_{min}}\\\\r_{min}=\frac{kq^2}{5m_ev^2}[/tex]

The minimum separation rmin of two electrons moving towards each other due to their electric repulsion can be calculated using the equation rmin = 2q2 / (mkv2), where q is the charge of the electron, m is its mass, v is the initial speed of one electron, and k is the electrostatic constant.

When two electrons with mass m and charge q move towards each other along the x-axis, their repulsion causes them to slow down. Eventually, they reach a point where their repulsion is strong enough to push them away from each other. This point of minimum separation, denoted by rmin, can be found by equating the electrical force of repulsion to the centripetal force of motion. Since the electrical force between two point charges q1 and q2 separated by a distance r is given by F = k(q1q2)/r2, where k is the electrostatic constant, the equation for rmin is:

rmin = 2q2/ (mkv2)

where v is the initial speed of one electron towards the other.

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Answer:

0.8024

Explanation:

From the given question; we can say that the angular momentum of the system is conserved if the net torque is  is zero.

So; [tex]I_o \omega _o = I_2 \omega_2[/tex]

At the closest distance ; the friction is :

[tex]f_s = \mu_s (mg)[/tex]

According to Newton's Law:

F = ma

F = mrω²

From conservation of momentum:

[tex]I_o \omega _o = I_2 \omega_2[/tex]

[tex]\omega_2= \frac { I_o \omega _o}{ I_2 }[/tex]

[tex]\omega_2=( \frac { I_1+ mr_o^2}{ I_1 + mr^2 })* \omega_o[/tex]

However ; since the static friction is producing the centripetal force :

[tex]\mu_s (mg) = mr \omega_2^2[/tex]

[tex]\mu _s = \frac{ \omega^2_2 *r }{g}[/tex]

The coefficient of static friction between the bottoms of your feet and the surface of the turntable can now be calculated by using the formula :

[tex]\mu _s = \frac{ \omega^2_2 *r }{g}[/tex]

=  [tex]( \frac { I_1+ mr_o^2}{ I_1 + mr^2 })^2 * \frac{ \omega^2_o *r }{g}[/tex]

= [tex][\frac{1200+(73(6)^2)}{((1200)+(73)(3)^2)} ]^2*[\frac{(\frac{\pi}{4})^2(3)} {9.8}][/tex]

= 0.8024

The friction force between the bottom of the feet and the surface of the

turntable balance the centrifugal force due to rotation.

Reasons:

Radius of the turntable, r₀ = 6.00 m

The period of rotation of the turntable, T₀ = 8.00s

Moment of inertia of the turntable, [tex]I_t[/tex] = 1,200 kg·m²

Mass of the person, m = 73.0 kg

The point at which the feet starts to slip, r₁ = 3.00 m

Required:

The friction between the bottom of the feet and the surface of the turntable.

Solution:

The moment of inertia of the person and the turntable combined, J, can be

found by considering the person as a point mass.

Therefore;

At the rim, J₀ = [tex]I_t[/tex] + m·r² = 1,200 + 73×6² = 3828

J₀ = 3,828 kg·m²

At 3.00 m from the center, J₁ = [tex]I_t[/tex] + m·r² = 1,200 + 73×3² = 1,857

J₁ = 1,857 kg·m²

Angular momentum, L = J·ω

Whereby the angular momentum is conserved, we have;

L₀ = L₁

J₀·ω₀ = J₁·ω₁

[tex]\displaystyle \omega_1 = \mathbf{ \frac{J_0 \cdot \omega_0}{J_1}}[/tex]

Which gives;

To remain at equilibrium, the friction force, [tex]F_f[/tex] = The centrifugal force, [tex]F_c[/tex]

[tex]\displaystyle F_c = \frac{m \cdot v^2}{r} = \frac{m \cdot (\omega \cdot r)^2}{r} = m \cdot r \cdot \omega^2[/tex]

Where;

[tex]\mu_s[/tex] = The coefficient of static friction

g = Acceleration due to gravity which is approximately 9.81 m/s²

r = The radius of rotation

ω = The angular speed

Therefore;

Therefore, at 3.00 m from the center of the turntable, we have;

[tex]\displaystyle F_f = \mu_s \cdot m \cdot g = \mathbf{ m \cdot r_1 \cdot \omega_1^2}[/tex]

[tex]\displaystyle\mu_s \cdot g = r_1 \cdot \omega_1^2[/tex]

[tex]\displaystyle\mu_s = \frac{r_1 \cdot \omega_1^2}{g} = \mathbf{\frac{r_1 \cdot \left(\displaystyle \frac{J_0 \cdot \omega_0}{J_1}\right)^2}{g}}[/tex]

Which gives;

[tex]\displaystyle\mu_s =\frac{3 \times \left(\displaystyle \frac{3,828 \times \frac{2 \cdot \pi}{8} }{1,857}\right)^2}{9.81} \approx \mathbf{0.802}[/tex]

The coefficient of static friction between the bottom of the feet and the surface of the turntable, at 3.00 m from the center, [tex]\mu_s[/tex] ≈ 0.802.

Learn more about the conservation of angular momentum here:

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Answer:60000 joules

Explanation:

power=500watts

Time=2minutes=120seconds

Heat energy=power x time

Heat energy=500 x 120

Heat energy=60000J

An electric toaster rated at 500 watts converts electrical energy into heat energy at a rate of 500 joules per second. To find the energy used in one minute, we simply multiply the wattage by the seconds in a minute, resulting in 30,000 joules.

An electric toaster rated at 500 watts converts electrical energy into heat energy at a rate of 500 joules per second. Since watts are joules per second, to find out how much energy you would use in one minute, you need to multiply the number of watts by the number of seconds in one minute. There are 60 seconds in a minute so the computation is 500 joules/second × 60 seconds = 30000 joules. Therefore, in one minute, a 500-watt toaster will convert 30,000 joules of electrical energy into heat energy.

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Answer:

B

Explanation:

i had a test on this and got it correct

Answer: when the wave encounters something, it can bounce (reflection) or be bent (refraction). In fact, you can "trap" waves by making them bounce back and forth between two or more surfaces. Musical instruments take advantage of this; they produce pitches by trapping sound waves.

Explanation:  Any bunch of sound waves will produce some sort of noise. But to be a tone - a sound with a particular pitch - a group of sound waves has to be very regular, all exactly the same distance apart. That's why we can talk about the frequency and wavelength of tones.

Final answer:

The human ear hears different instruments in music at once due to the superposition of sound waves and the ear's ability to process overlapping sounds, determining their pitch, loudness, and direction.

Explanation:

The human ear can hear all the different instruments in a musical piece simultaneously because of the principle of superposition of sound waves. Sound waves combine without affecting each other, so multiple sounds can reach our ears at the same time. Additionally, our ears and brain are capable of processing and interpreting these overlapping waves, enabling us to differentiate between the various sources of sound.

This is partly due to the design of the ear, which is sensitive to a wide range of frequencies, and the ear's ability to discern pitch, loudness, and direction of sound. The cochlea inside the ear uses temporal and place theories to help us perceive pitch, which allows us to enjoy the complexities of music and speech.

Answer:

Explanation:

When 238U which is radioactive turns into 206Pb , it becomes stable and no further disintegration is done . Hence in the initial period ratio of 238U undecayed and 206Pb formed  will be very high because no of atoms of 238U in the beginning will be very high. Gradually number of 238U undecayed will go down and number of 206Pb formed will go up . In this way the ratio of 238U and 206Pb in the mixture will gradually reduce to be equal to one or even less than one .

In the given option we shall calculate their raio

1 ) ratio of 238U and 206Pb = 5

2 ) ratio of 238U and 206Pb = 4

3 )ratio of 238U and 206Pb = 1

4 ) ratio of 238U and 206Pb = 20

5 )ratio of 238U and 206Pb = 3

lowest ratio is 1 , hence this sample will be oldest.

Ranking from youngest to oldest

4 , 1 , 2 , 5 , 3 .

Answer:

the answer is B

Explanation:

hope this helps

Answer:

b

Explanation:

Answer:

Explanation:

We shall apply law of conservation of momentum to calculate the common velocity of pendulum and bullet after collision

m v = ( m + M ) V

m is mass of bullet M is mass of pendulum , v is velocity of bullet and V is their final velocity after collision.

V = m v / ( m + M )

= .030 x 185 / 3.18

= 1.745 m /s

The kinetic energy of bullet+pendulum  will be converted into potential energy.

1/2 (m+M) V² = ( m + M ) g h

h is height by which pendulum and bullet rises after collision

Putting the values

.5 x 3.18 x 1.745² = 3.18 x 9.8 x h

h = .155 m

If θ be the angle that the pendulum is making at deflected position

l - lcosθ = h , l is length of pendulum

2.85 ( 1 - cosθ) = .155

1 - cosθ = .054

cosθ = .946

θ = 19 degree

Horizontal displacement = 2.85 sin 19

= .9278 m

92.78 cm

Using the principle of conservation of momentum and kinetic energy transformation, we calculate the vertical displacement of the pendulum after the bullet embeds. This is then used to compute the horizontal displacement using the Pythagorean theorem. Finally, the angle of displacement is determined with the trigonometric principle of arcsine.

To solve this question, we will use the principle of conservation of momentum to the bullet and pendulum system. After the bullet embeds into the pendulum, they move together, and due to the conservation of momentum, the joint velocity will be lower than the initial velocity of the bullet. We can calculate this joint velocity using the formula: (Mass of bullet x bullet velocity + Mass of pendulum x pendulum velocity) / (Mass of bullet + Mass of pendulum).

Next, we calculate the kinetic energy of the bullet-pendulum system after the bullet embeds itself using the formula: 1/2 x Mass of system x Velocity of system². This kinetic energy is then transformed into potential energy as the pendulum swings upward, which can be calculated using the formula: Mass of system x gravitational acceleration (9.81 m/s²) x vertical displacement.

We can solve for vertical displacement by equating the kinetic and potential energies. The horizontal displacement can then be calculated by using the Pythagorean theorem, where the hypotenuse is the length of the pendulum string, and one side is the length of the string less the vertical displacement (calculated earlier). Using these, the horizontal displacement is calculated as the square root of (length of string² - vertical displacement²).

The angle of maximum displacement with the vertical can then be calculated using the principle of trigonometry, namely the Arcsine formula, where arcsin (vertical displacement/length of string).

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Answer:

Check the explanation

Explanation:

1) Pressure acting on the plug = Patm + P

Pressure = Patm + rho*g*h (Here h = D2)

Pressure = 101325 + 1000*9.8*7

Pressure = 169925 Pa

so, Force = PA

Force = 169925*pi*0.0152

Force = 120.1 N

Answer:14.2 mV

Explanation:

Given

Length of steel beam [tex]L=17\ m[/tex]

Magnetic field [tex]B=30\ \muT[/tex]

speed of beam [tex]v=28\ m/s[/tex]

Now consider as beam slides it encloses an area of rectangle of

width [tex]w=17\ m and length L'=v\times t [/tex]

Area [tex]A=17v\cdot t[/tex]

and Induced EMF is [tex]V=-\frac{d(BA)}{dt}[/tex]

[tex]V=-B\frac{d(17vt)}{dt}[/tex]

[tex]V=-17Bv[/tex]

[tex]V=-17\times 30\times 10^{-6}\times 28[/tex]

[tex]V=-14.2\ mV[/tex]

Magnitude of EMF[tex]=14.2\ mV[/tex]

Answer:

z = 1.16m

Explanation:

The electric field in a point of the axis of a charged ring, and perpendicular to the plane of the ring is given by:

[tex]E_z=\frac{Qz}{(z^2+r^2)^{\frac{3}{2}}}[/tex]

z: distance to the plane of the ring

r: radius of the ring

Q: charge of the ring

you have that:

E_{z->0} = 0

E_{z->∞} = 0

To find the value of z that maximizes E you use the derivative respect to z, and equals it to zero:

[tex]\frac{dE_z}{dz}=Q[\frac{1}{(z^2+r^2)^{3/2}}+z(-\frac{3}{2})\frac{1}{(z^2+r^2)^{5/2}}(2z)]=0\\\\(z^2+r^2)^{5/2}=3z^2(z^2+r^2)^{3/2}\\\\(z^2+r^2)^2=3z^4\\\\z^4+2z^2r^2+r^4=3z^4\\\\2z^4-2z^2r^2-r^4=0\\\\z^2_{1,2}=\frac{-(-2)+-\sqrt{4-4(2)(-1)}}{2(2)}=\frac{2\pm 3.464}{4}\\\\[/tex]

you take the positive value:

[tex]z^2=\frac{2+3.464}{4}=1.366\\\\z=1.16m[/tex]

hence, the distance in which the magnitude if the electric field is maximum is 1.16m