Mercury is added to a cylindrical container to a depth d and then the rest of the cylinder is filled with water.
If the cylinder is 0.4 m tall and the absolute (or total) pressure at the bottom is 1.1 atmospheres, determine the depth of the mercury. (Assume the density of mercury to be 1.36 104 kg/m^3, and the ambient atmospheric pressure to be 1.013e5 Pa)

Answer:[tex]y_1=1.9\ mm[/tex]

Explanation:

Given

slit width [tex]d=1.15\ mm[/tex]

Distance of screen [tex]D=3.53\ m[/tex]

wavelength [tex]\lambda =639\ nm[/tex]

Position of any bright fringe is given by

[tex]y_n=\dfrac{n\lambda D}{d}[/tex]

[tex]y_1=\frac{1\times 639\times 10^{-9}\times 3.53}{1.15\times 10^{-3}}[/tex]

[tex]y_1=0.0019\ m[/tex]

[tex]y_1=1.9\ mm[/tex]

Position of dark fringe is given by

[tex]y_D=\dfrac{(2n+1)\lambda D}{2d}[/tex]

for second dark fringe [tex]n=1[/tex]

[tex]y_D=\dfrac{1.5\times 639\times 10^{-9}\times 3.53}{1.15\times 10^{-3}}[/tex]

[tex]y_D=0.00294\ m\approx 2.94\ mm[/tex]

Using the lensmaker's equation with an index of refraction of 1.59 and radii of curvature of 1.15 m and -1.80 m, we find the focal length |f| to be approximately 1.19 m and the power |P| to be about 0.84 diopters.

To calculate the magnitude of the focal length |f| and the power |P| of the lens, we use the lensmaker's equation which is given by:

1/f = (n - 1) * (1/r1 - 1/r2)

where n is the index of refraction of the lens material, r1 and r2 are the radii of curvature of the lens surfaces. Given the index of refraction n = 1.59, and the radii of curvature r1 = 1.15 m (positive for convex surface) and r2 = -1.80 m (negative for concave surface), we can substitute these values into the equation.

Calculating |f|:

1/f = (1.59 - 1) * (1/1.15 + 1/1.80)
= 0.59(0.870 + 0.556)
= 0.59 * 1.426
= 0.841

Thus, |f| = 1/0.841 m ≈ 1.19 m.

To calculate the power of the lens P, which is given in diopters (D), we use: P = 1/f in meters. So, |P| = 1/1.19 m ≈ 0.84 D.

This calculation highlights the application of physics principles in analyzing optical systems.

Answer:

B. The transfer of energy from a hot object to a cold object

Explanation:

Answer:

The answer is option B

Explanation:

Answer:

0.026 meter

Explanation:

using distance time equation to determine the time for the puck to move 16.5 meters.

distance 'd' = velocity'v' x time't'

16.5 = 44 x t    

t =0.375 second

Here momentum is conserved. Since both objects are initially at rest, the initial momentum is 0.

Next is to determine the puck’s momentum.

Momemtum 'p' = m x v => 0.15 x 44 = 6.6kg⋅m/s

The player momentum is -6.6kg⋅m/s  .

In order to determine the player’s velocity, we'll use p=mv

-6.6 = 94v

v= -0.0702 m/s

The above negative sign represents that the player is moving in the opposite direction of the puck.

Lastly, how far does the player recoil in the time it takes the puck to reach the goal 16.5 m away?

d = v x t = 0.0702 x 0.375= 0.026 meter

Final answer:

The recoil velocity of the ice hockey player is 0.07021 m/s, and the time it takes for the puck to reach the goal is 0.375 s. Therefore, the player recoils a distance of 2.633 cm in the time the puck takes to reach the goal 16.5 m away.

Explanation:

When a hockey player hits a puck on frictionless ice, this scenario is an excellent example of the conservation of momentum where the total momentum before and after the event must be equal. Since the player and the puck are initially at rest, their combined momentum is zero. Thus, when the player imparts a velocity to the puck, the player must recoil with a momentum equal in magnitude and opposite in direction to preserve the momentum balance.

To find the recoil speed of the player, we set the momentum of the puck equal to the momentum of the recoiling player:

So, \\(0.150 kg\\) \\( imes\\) 44.0 m/s = \\(94.0 kg\\) \\( imes\\) recoil velocity of player

Recoil velocity of player = \\((0.150 kg \\( imes\\) 44.0 m/s) / 94.0 kg)

Recoil velocity of player = 0.07021 m/s

To find the distance the player recoils, you first calculate the time it takes for the puck to reach the goal. Since velocity = distance / time, we rearrange to find time = distance / velocity.

Time for puck to reach the goal = Distance to goal / Speed of puck

Time for puck to reach the goal = 16.5 m / 44.0 m/s = 0.375 s

Then, we find the distance the player recoils by using the recoil velocity we found earlier:

Distance player recoils = Recoil velocity of player \\( imes\\) Time for puck to reach the goal

Distance player recoils = 0.07021 m/s \\( imes\\) 0.375 s

Distance player recoils = 0.02633 m, or 2.633 cm

Explanation:

We have,

Slit separation, d = 0.329 mm

Distance between slit and screen, D = 2.20 m

The first bright fringe is formed at a distance off 2.9 mm from the center of the pattern. We need to find the wavelength.

For double slit experiment, the fringe width is given by :

[tex]\beta=\dfrac{D\lambda}{d}[/tex]

[tex]\lambda[/tex] is wavelength

[tex]\lambda=\dfrac{\beta d}{D}\\\\\lambda=\dfrac{2.9\times 10^{-3}\times 0.329\times 10^{-3}}{2.2}\\\\\lambda=4.33\times 10^{-7}\ m\\\\\lambda=433\ nm[/tex]

So, wavelength is 433 nm.

Answer: Scientists found evidence of Earth's magnetic field reversal in rocks on the ocean floor at plate boundaries. These rocks have alternating polarity due to magnetization that were during their cooling period. Using radiometric dating, scientists estimate that reversals occur approximately every several hundred thousand years.

Explanation: The earth’s magnetic field impacts into the alignment of elements like iron in rocks due to Ferro-magnetization. This causes the elements to align in a north-south direction. Accordingly scientists have studied this alignment in ancient rocks, such as in the layers of sedimentary rocks, and realized that the earth magnetic field has flipped around 200,000 to 300,000 in the last 20 million years.

Answer:

Scientists found evidence of Earth's magnetic field reversal in rocks on the ocean floor at plate boundaries. These rocks have alternating polarity due to magnetization that occurred during their cooling period. Using radiometric dating, scientists estimate that reversals occur approximately every several hundred thousand years.

Explanation:

Answer:

1.43 Ω

Explanation:

Given that

Cross sectional area of the cord, A = 4.2*10^-7 m²

Distance meant to be used, L = 35 m

Resistivity of copper, p = 1.72*10^-8 Ωm

Temperature of copper, t = 20° C

Temperature coefficient of copper, t' = 0.004041 °C^-1

To solve this, we would use the resistance and resistivity formula

R = pL / A, on substituting

R = (1.72*10^-8 * 35) / 4.2*10^-7

R = 6.02*10^-7 / 4.2*10^-7

R = 1.43 ohm

Therefore, the resistance of the extension cord is 1.43 ohm

Complete Question

The diagram for this question is shown on the first uploaded image

Answer:

The distance traveled in horizontal direction is [tex]D = 1.38 m[/tex]

Explanation:

From the question we are told that

      The length of the string is  [tex]L = 1.6 \ m[/tex]

      The mass of the ball is  [tex]m = 200 g = \frac{200}{1000} = 0.2 \ kg[/tex]

       The height of ball is  [tex]h = 1.5 \ m[/tex]

Generally the work energy theorem can be mathematically represented as

               [tex]PE = KE[/tex]

   Where PE is the loss in potential energy which is mathematically represented as

                   [tex]PE =mgh[/tex]

Where h is the difference height of ball at A and at B  which is mathematically represented as

                 [tex]h = y_A - y_B[/tex]

So        [tex]PE =mg(y_A - y_B)[/tex]              

While KE is the gain in kinetic energy which is mathematically represented as

               [tex]KE = \frac{1}{2 } (v_b ^2 - 0)[/tex]

Where [tex]v_b[/tex] is the velocity of the of the ball

  Therefore we have from above that

                    [tex]PE =KE \equiv mg (y_A - y_B) = \frac{1}{2} m (v_b ^2 - 0)[/tex]

               Making [tex]v_b[/tex] the  subject we have

      [tex]v_b = \sqrt{2g (y_A - y_B)}[/tex]

substituting values

      [tex]v_b = \sqrt{2g (1.5 - 0.40)}[/tex]

     [tex]v_b = 4.6 \ m/s[/tex]

Considering velocity of the ball when it hits the  floor in terms of its vertical and horizontal component we have

         [tex]v_x = 4.6 m/s \ while \ v_y = 0 m/s[/tex]

The time taken to travel  vertically from the point the ball broke loose  can be obtained using the equation of motion

            [tex]s = v_y t - \frac{1}{2} g t^2[/tex]

Where s is distance traveled vertically which given in the diagram as [tex]s = -0.4[/tex]

The negative sign is because it is moving downward

     Substituting values

              [tex]-0.4 = 0 -\frac{1}{2} * 9.8 * t^2[/tex]

         solving for t we have  

               [tex]t = 0.3 \ sec[/tex]

Now the distance traveled on the horizontal is mathematically evaluated as

           [tex]D = v_b * t[/tex]

           [tex]D = 4.6 * 0.3[/tex]

           [tex]D = 1.38 m[/tex]

Answer:

bjknbjk;jln

Explanation:

Answer:

Energy used = 4KJ

Explanation:

Second law of thermodynamics states that as energy is transferred or transformed, more and more of it is wasted. The Second Law also states that there is a natural tendency of any isolated system to degenerate into a more disordered state.

Now when we apply that to heat engines, we'll see that;

Heat expelled = Heat removed + Work Done

We can write it as;

Q_h = Q_c + W

We are given that;

Heat removed; Q_c = 20KJ

Heat expelled into the room in each cycle; Q_h = 24KJ

Thus; plugging these 2 values into the equation, we obtain;

24 = 20 + W

W = 24 - 20

W = 4 KJ

Work done is energy used.

Thus, energy used = 4 KJ

Final answer:

The refrigerator uses 4 kJ of energy each cycle, calculated by the work done W, which is the difference between the heat ejected Qh (24 kJ) and the heat removed Qc (20 kJ).

Explanation:

The question is calculating the energy used by a refrigerator in each cycle. The refrigerator absorbs heat Qc from the inside and ejects a larger amount of heat Qh to the room. The extra energy being ejected comes from the work W done by the refrigerator, which is the energy used by it in each cycle.

If the refrigerator removes 20 kJ (Qc) from the freezing compartment and ejects 24 kJ (Qh) into the room each cycle, the work done (energy used) W can be found using the first law of thermodynamics which states that the conservation of energy principle - the change in internal energy of a system is equal to the heat added to the system minus the work done by the system:

W = Qh - Qc

Substituting in the given values:

W = 24 kJ - 20 kJ

W = 4 kJ

Thus, the work done (energy used) by the refrigerator in each cycle is 4 kJ.

Answer:

no, because if he was pushing the box with constant force the box would have to move with constant speed

Explanation:

Answer:[tex]\Delta L=0.0101\ m[/tex]

Explanation:

Given

Length of track [tex]L_o=28\ m[/tex] when

[tex]T_o=2^{\circ}C[/tex]

Coefficient of linear expansion [tex]\alpha =11\times 10^{-6}\ ^{\circ}C^{-1}[/tex]

When Temperature rises to [tex]T=35^{\circ}C[/tex]

[tex]\Delta T=35-2=33^{\circ}C[/tex]

and we know length expand on increasing temperature

[tex]L=L_o[1+\alpha \Delta T][/tex]

[tex]L-L_o=L_o\alpha \Delta T[/tex]

[tex]\Delta L=28\times 11\times 10^{-6}\times (33)[/tex]

[tex]\Delta L=0.0101=10.164\ mm[/tex]

(b)When rails are clamped thermal stress induced

we know [tex]E=\frac{stress}{strain}[/tex]

[tex]Stress=E\times strain[/tex]

[tex]Stress=20\times 10^{10}\times \frac{\Delta L}{L_o}[/tex]

[tex]Stress=20\times 10^{10}\times \frac{0.0101}{28}[/tex]

[tex]Stress=72.14\ MPa[/tex]

[tex]Stress=72.14\times 10^{6}\ N/m^2[/tex]

Answer:  Increase the amount of carbon dioxide in the ecosystem.

Explanation:

The producers are the organisms which can make their own food by conducting the process of photosynthesis. The carbon dioxide, water are the reactants and carbohydrates and oxygen are the products of photosynthesis. The entire process takes place in the presence of sunlight energy.

The carbon dioxide is the chief component for this reaction and the components of carbon are produced in the form of carbohydrates. The carbohydrates are the source of energy that are utilized by the producers for cellular metabolism and other functions. These get stored in the form of storage molecules in producers. Thus to increase the no. of storage molecules that producers can make Jaime need to increase the concentration of carbon dioxide in the ecosystem.

Answer:

Acceleration, [tex]a=5\ m/s^2[/tex]

Explanation:

We have,

Mass of the object is 20 kg

Force acting on the object is 100 N

It is required to find the resulting acceleration of the  object. Let a is the acceleration. The force acting on object is given by :

[tex]F=ma[/tex]

a is acceleration

[tex]a=\dfrac{F}{m}\\\\a=\dfrac{100\ N}{20\ kg}\\\\a=5\ m/s^2[/tex]

So, the resulting acceleration of the  object is [tex]5\ m/s^2[/tex].

Answer:

positive, positive

You throw a rock upward. The rock is moving upward, but it is slowing down. If we define the ground as the origin, the position of the rock is positive and the velocity of the rock is positive

Explanation:

Given that the ground is defined as the origin.

The position of the rock is positive since the rock is thrown upward, the position also increases with time until it reaches the maximum height. Also, since the rock is thrown upward with the ground as the origin, the velocity of the rock is positive but the velocity reduces with time (change in height per unit time as the rock moves up is positive)

The correct option for the position of the rock is positive, and for the velocity of the rock, it is positive.

When the rock is thrown upward, it moves away from the ground, which we have defined as the origin. Since the rock is above the ground, its position is positive. Although the rock is slowing down as it moves upward, it still has an upward velocity until it reaches its peak height. Therefore, the velocity of the rock is also positive because it is still moving in the upward direction, even though it is decelerating.

To summarize:

- The position of the rock is positive because it is above the origin (ground).

- The velocity of the rock is positive because it is moving upward, despite the fact that it is slowing down.

The correct answer is: positive, positive.

Answer:

The distance travelled is [tex]S = 237.36 \ m[/tex]

Explanation:

From the question we are told that

    The distance of the airplane from the ground is  [tex]L = 24.0\ km[/tex]

     The angle subtended by the moon is [tex]\theta = 9.89*10^{-3} \ radians[/tex]

The distance traveled can be mathematically represented as

            [tex]S = R \theta[/tex]

Substituting values

            [tex]S = 24 *10^3 * 9.89*10^{-3}[/tex]

           [tex]S = 237.36 \ m[/tex]

Answer: Black hole.

Explanation:

As the massive star "compacts" under its own gravity, it triggers a massive supernova, after this point the remains of the star can become a neutron star, which is a very compact star made primarily, as the name says, of neutrons. The other possibility is a black hole, which is a finite region of space wherein it's interior there is a big concentration of mass, which creates a gravitational field strong enough that there is no particle that can escape it.

Answer:

E = 3,154.37 KJ

The heat of combustion per mole of pentane is 3,154.37 KJ

Explanation:

Given;

Change in temperature of system ∆T = 23.65-20.45 = 3.2 °C

Mass of water m1 = 1 kg

Specific heat capacity of water C1 = 4.184J/g°C = 4184J/kg °C

Heat capacity of calorimeter mC2 = 2.21 kJ/°C = 2210J/°C

Heat gained by both calorimeter and water is;

H = (m1C1 + mC2)∆T

Substituting the values;

H = (1×4184 + 2210)×3.2

H = 20460.8 J

Mass of pentane burned = 0.468 g

Molecular mass of pentane = 72.15g

If 0.468g of pentane releases 20460.8 J of heat,

72.15g of pentane will release;

E = (72.15/0.468) × 20460.8 J

E = 3154373.333333J

E = 3,154.37 KJ

The heat of combustion per mole of pentane is 3,154.37 KJ

Answer:

See explaination

Explanation:

Magnetic flux density definition, a vector quantity used as a measure of a magnetic field.

It can be defined as the amount of magnetic flux in an area taken perpendicular to the magnetic flux's direction.

See attached file for detailed solution of the given problem.

The magnetic flux density inside a solenoid can be derived using the formula B = μ₀(NI)/L. As L approaches infinity, this simplifies to B = μ₀nI, aligning with the standard magnetic field expression for a long solenoid.

To find the magnetic flux density at a point on the axis of a solenoid with radius b, length L, a current I, and N turns of closely wound coil, use the following steps:

Step 1 : Consider an infinitesimal element dz of the solenoid. The element is located at a distance z from the center of the solenoid. The magnetic field contribution ( dB ) from this element at point ( P ) is given by the Biot-Savart law as -

[tex]\[ dB = \frac{\mu_0 I d\ell}{4\pi} \frac{1}{r^2} \][/tex]

Step 2 : For a solenoid, considering a differential element, the distance r from the element to the point P on the axis is -

[tex]\( \sqrt{b^2 + (z - x)^2} \).[/tex]

Step 3 : For a small segment dz, the current element is -

[tex]\[ dB = \frac{\mu_0 (n I dz)}{4\pi} \frac{1}{(b^2 + (z - x)^2)^{3/2}} \][/tex]

Step 4 :  Integrate dB from -L/2 to L/2 :

[tex]\[ B = \int_{-L/2}^{L/2} \frac{\mu_0 (n I dz)}{4\pi} \frac{1}{(b^2 + (z - x)^2)^{3/2}} \][/tex]

Substitute, [tex]\( n = \frac{N}{L}[/tex]

[tex]\[ B = \frac{\mu_0 I N}{4\pi L} \int_{-L/2}^{L/2} \frac{dz}{(b^2 + (z - x)^2)^{3/2}} \][/tex]

Solving the integral part -

[tex]\[ \int_{-L/2}^{L/2} \frac{dz}{(b^2 + (z - x)^2)^{3/2}} = \frac{z}{b^2 \sqrt{b^2 + (z - x)^2}} \Bigg|_{-L/2}^{L/2} \][/tex]

[tex]\[ \left[ \frac{L/2}{b^2 \sqrt{b^2 + (L/2 - x)^2}} - \frac{-L/2}{b^2 \sqrt{b^2 + (-L/2 - x)^2}} \right] \][/tex]

Step 5: When  L  is very large, the ends of the solenoid are far away, and we can approximate:

[tex]\[ \frac{L/2 - x}{b^2 \sqrt{b^2 + (L/2 - x)^2}} \approx \frac{1}{b^2} \quad \text{and} \quad \frac{-L/2 - x}{b^2 \sqrt{b^2 + (-L/2 - x)^2}} \approx -\frac{1}{b^2} \][/tex]

This simplifies the result to -

[tex]\[ \left[ \frac{L/2 - x}{b^2 (L/2 - x)} - \frac{-L/2 - x}{b^2 (L/2 + x)} \right] = \left[ \frac{1}{b^2} - \left(-\frac{1}{b^2}\right) \right] = \frac{2}{b^2} \][/tex]

Conclusion, For a very long solenoid:

[tex]\[B = \mu_0 \frac{N}{L} I\][/tex]

Which simplifies to,

[tex]\[B = \mu_0 n I\][/tex]

Thus, for a very long soleniod the magnetic flux density can be approximated to [tex]\[B = \mu_0 n I\][/tex].

Answer:

a) 86 atm

b) 86 atm

c) 645 m/s

Explanation:

See attachment for calculations on how i arrived at the answer

The atmospheric pressure of 2.00 km above the surface of Venus is 86 atm and the root-mean-square speed of the CO2 molecules at the surface of Venus and at an altitude of 2.00 km is 645 m/sec.

Given :

a) and b) In order to determine the atmospheric pressure of 2.00 km above the surface of Venus using the formula given below:

[tex]\rm P = P_0\times L^{\frac{Mg}{\rho T}}[/tex]   --- (1)

The value of the expression [tex]\rm Mg/\rho T[/tex] is given below:

[tex]\rm \dfrac{Mg}{\rho T} = \dfrac{44\times 10^{-3}\times 9.8\times 10^3}{8.314\times 733}[/tex]

[tex]\rm \dfrac{Mg}{\rho T}=0.02076[/tex]

Now, substitute the values of the known terms in the expression (1).

[tex]\rm P=92\times L^{0.02076}[/tex]

P = 86 atm

c) The root-mean-square speed of the CO2 molecules at the surface of Venus and at an altitude of 2.00 km can be calculated as given below:

[tex]\rm V_{rms}=\sqrt{\dfrac{3RT}{M}}[/tex]

Now, substitute the values of the known terms in the above formula.

[tex]\rm V_{rms}=\sqrt{\dfrac{3\times 8.314\times 733}{44\times 10^{-3}}}[/tex]

Simplify the above expression.

[tex]\rm V_{rms} = 645\;m/sec[/tex]

For more information, refer to the link given below:

https://brainly.com/question/7213287

Answer:

E = -118 KN / C

Explanation:

In this exercise we are given the expression of the electric field for a wire

       E = 1 /4πε₀ 2λ / r

they also indicate the linear density of charge

     λ = 6,6 10⁻⁷ C / m

ask to calculate the electric field at a position at r = 10 cm from the wire

    k = 1 /4πε₀  = 8,988 10⁹ N m² / C²

    E = 8,988 10⁹ 2 (-6.6 10⁻⁷ / 0.10)

     E = -1.18 105 N / C

we reduce to KN / C

    1 KN / C = 10³ N / C

   E = -1.18 10² KN / C

   E = -118 KN / C

the negative sign indicates that the field is directed to the charged

The intensity I2 after light passes through polarizer #2, oriented at 60° to polarizer #1, is 25% of the intermediate intensity I1.

To determine the intensity [tex]I_2[/tex] after light passes through the second polarizer, we use Malus's Law. Malus's Law states that when polarized light passes through a polarizing filter, the intensity of the transmitted light is given by:

[tex]I = I_0 * cos^2(\theta),[/tex]

where I0 is the initial intensity and θ is the angle between the light’s polarization direction and the axis of the polarizer.

In this case:

Since [tex]cos(60^o) = 0.5:[/tex]

[tex]I_2 = I_1 * (0.5)^2= I_1 * 0.25[/tex]

Hence, the intensity [tex]I_2[/tex] is 25% of [tex]I_1[/tex].

Answer:

a) The radiation pressure on the Earth is 6.065x10⁻⁶Pa

b) The atmospheric pressure is 1.665x10¹⁰ greater than the pressure exerted by the radiation.

Explanation:

Given:

I = intensity of solar radiation = 1368 W/m²

Earth reflects 33%, therefore Earth absorbs 67%

P = pressure = 101 kPa = 1.01x10⁵Pa

c = speed of light = 3x10⁸m/s

Questions:

a) Find the radiation pressure on the Earth, in pascals, at the location where the Sun is straight overhead, P = ?

b) State how this quantity compares with normal atmospheric pressure at the Earth's surface

a) To solve, it is necessary to calculate the pressure exerted by both the reflected light and the light that is absorbed, in this way:

The pressure exerted by the reflected light:

[tex]P_{1} =\frac{2*0.33*I}{c} =\frac{2*0.33*1368}{3x10^{8} } =3.01x10^{-6} Pa[/tex]

The pressure exerted by the absorbed light:

[tex]P_{2} =\frac{0.67*I}{c} =\frac{0.67*1368}{3x10^{8} } =3.055x10^{-6} Pa[/tex]

The radiation pressure on the Earth:

Pt = P₁ + P₂ = 3.01x10⁻⁶ + 3.055x10⁻⁶ = 6.065x10⁻⁶Pa

b) Comparing with normal atmospheric pressure

[tex]Ratio=\frac{P_{atm} }{P_{t} } =\frac{1.01x10^{5} }{6.065x10^{-6} } =1.665x10^{10}[/tex]

According to this result, the atmospheric pressure is 1.665x10¹⁰ greater than the pressure exerted by the radiation.

Answer:

The mass of the star would be  [tex]M = 2.644*10^{24} \ kg[/tex]    

Explanation:

From the question we are told that

     The angular speed is  [tex]w = 0.83\ rev/s = 0.83 * 2 \pi = 1.66 rad/s[/tex]

      The radius of the star is  [tex]r = 40km = 40 *1000 = 40 * 10^{3} m[/tex]    

Generally the minimum mass of the start is mathematically evaluated as

             [tex]M = \frac{r^3 w^2}{G}[/tex]

Where is the gravitational constant with a values of  [tex]G = 6.67*10^{-11} N \cdot m^2 /kg[/tex]

             [tex]M = \frac{(40*10^3)^3 * 1.66^2}{6.67*10^{-11}}[/tex]

             [tex]M = 2.644*10^{24} \ kg[/tex]    

Answer:

A) 1010430 pa

B) 1111755 pa

C) 2020860 N

Explanation:

Guage pressure = pgh

= 1030 kg/m3 x 9.81 m/s2 x 100 m

= 1010430 pa

Absolute pressure is Guage pressure + atmospheric pressure.

= 1010430 + 101325 = 1111755 pa

If the pressure inside submarine is 1 atm, then net pressure will be

1111755 - 101325 = 1010430 pa

Force required to open hatch against this pressure will be,

F = pghA

pgh = 1010430 pa

F = 1010430 pa x 2 m^2

F = 2020860 N

Based on the data provided:

The gauge pressure is calculating using the formula:

Guage pressure = pgh

where:

p is density of seawater = 1030 kg/m^3

g is acceleration due to gravity = 9.81 m/s^2

h is depth = 100 m

Substituting:

Gauge pressure = 1030 kg/m3 x 9.81 m/s2 x 100 m

Gauge pressure = 1010430 pa

Therefore, the gauge pressure is 1010420 pa

The absolute gauge pressure is calculated using the formula:

Absolute pressure = Guage pressure + atmospheric pressure.

Atmospheric pressure = 1 atm = 101325 pa

Thus:

Absolute gauge pressure = 1010430 + 101325

Absolute gauge pressure = 1111755 pa

Therefore, the absolute gauge pressure is 1111755 pa

First determine the net pressure.

Pressure inside submarine = 1 atm

Net pressure = 1111755 - 101325

Net pressure = 1010430 pa

Force required to open hatch against this pressure is then calculated from the formula:

Force = net pressure × area

Force = 1010430 pa x 2 m^2

Force = 2020860 N

Therefore, the force required to open the hatch is 2020860 N

Learn more about about guage pressure and force at: https://brainly.com/question/9376763

The bug moving toward the center of the disk changes the moment of inertia and the angular velocity, resulting in a change in the rotational kinetic energy of the system. The principles of conservation of angular momentum and calculations of kinetic energy apply here.

This problem involves the principle of conservation of angular momentum. Initially, when the bug is at the edge of the disk, the system's angular momentum (L) is conserved. The initial angular momentum (L_initial) is the sum of the angular momenta of the bug and the disk. It can be calculated as L_initial = I_bug(ω) + I_disk(ω) where I_bug = m*R², I_disk = (1/2)*M*R², m is the mass of the bug, M is the mass of the disk, R is the radius of the disk, and ω is the initial angular velocity.

When the bug moves to the center of the disk, the angular velocity will change but the total angular momentum will still remain conserved as L_final = I_bug(ω') + I_disk(ω') where ω' is the final angular velocity and I_bug is now 0 because the bug is at the center. From the conservation of angular momentum, we can solve for ω'.

The change in kinetic energy can be calculated from the difference between the initial kinetic energy and the final kinetic energy of the system. An increase or decrease in kinetic energy in this scenario is due to the displacement of the bug from the edge to the center of the disk, which changes the moment of inertia of the system and thus, the rotational kinetic energy.

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Final answer:

The explanation covers the new angular velocity of the disk, the change in kinetic energy, and the causes for the increase and decrease in kinetic energy.

Explanation:

A: The new angular velocity of the disk can be calculated using the principle of conservation of angular momentum. The bug crawling towards the center decreases the moment of inertia, resulting in an increase in angular velocity.
B: The change in kinetic energy of the system can be determined by calculating the initial and final kinetic energies and finding their difference.
C: The increase in kinetic energy is due to the bug moving towards the center, reducing the moment of inertia. The decrease in kinetic energy occurs due to the redistribution of mass towards the center of rotation.

Answer:gamma rays

Explanation:

Out of all these spectrum listed in The question , gamma rays is closest to x-ray in The electromagnetic spectrum

Answer:

12.3

Explanation:

Answer:

12.3

Explanation:

got it right

Answer:

the aquifer’s hydraulic conductivity  is K = 10.039 m/day

transmissivity T = 331.287 m/day

the drawdown 100 m away from the well is s = 1.452 m

Explanation:

Given that :

The  constant pumps rate Q = 2000 m³/day

R₁ =160 m     →    H₁  = 249 m

R₂ = 453 m    →    H₂ = 250 m

The  confined aquifer B is 33 m thick

The hydraulic conductivity K = [tex]\frac{Q*In (\frac{R_1}{R_2}) }{2 \pi B(H_2-H_1)}[/tex]

K = [tex]\frac{2000*In (\frac{160}{453}) }{2 \pi *33(250-249)}[/tex]

K = [tex]\frac{2081.43662}{207.3451151}[/tex]

K = 10.039 m/day

Transmissivity T = K × B

T = 10.039×33

T = 331.287 m/day

TO find the drawdown 100 m away from the well; we have:

K = [tex]\frac{Q* In(\frac{R_2}{R_1} )}{2 \pi B (H_2-H_1)} =\frac{Q* In(\frac{R_2}{R_3} )}{2 \pi B (H_2-H_3)}[/tex]

[tex]\frac{ In(\frac{453}{160} )}{(250-249)} =\frac{ In(\frac{453}{100} )}{ (250-H_3)}[/tex]

H₃ = 248.548 m

Drawdown (s) = H₂ - H₃

s = (250 -  248.548)m

s = 1.452 m

Complete Question

The diagram for this question is shown on the first uploaded image

Answer:

The magnitude of force is  [tex]F_R} = 5.33 \ m N[/tex]

Explanation:

 From the question we are told that

          The current in wire A , B and C are   [tex]I _a = I_b =I_c = I= 20 A[/tex]

          The distance is [tex]R = 15.0mm = \frac{15}{1000} = 0.015m[/tex]

           The length of wire C is [tex]L_c = 200cm = \frac{200}{100} = 2 m[/tex]

Generally the force exerted per unit length  that is acting in between two current carrying conductors can be mathematically represented as

             [tex]\frac{F}{L} = \frac{\mu_o }{2 \pi} \cdot \frac{I_1 I_2 }{R}[/tex]

   Where [tex]\mu_o[/tex] is the permeability  of free space with a constant value of  

              [tex]\mu_o = 4 \pi * 10^{-7} N/A^2[/tex]

When the current in the wire are of the same direction  the force is positive and when they are in opposite direction the force is negative

   Considering force between A and C

          [tex]F_{A -C} = \frac{\mu_o }{2 \pi} \cdot \frac{I_a I_c }{2R} * L[/tex]

   Considering force between B and C    

        [tex]F_{B -C} = \frac{\mu_o }{2 \pi} \cdot \frac{I_b I_c }{R} * L[/tex]

The resultant force is

        [tex]F_R = F_{B -C} - F_{A -C} = \frac{\mu_o }{2 \pi} \cdot \frac{I_a I_c }{2R} * L - \frac{\mu_o }{2 \pi} \cdot \frac{I_b I_c }{R} * L[/tex]

         [tex]F_R} = \frac{\mu_o }{2 \pi} \cdot \frac{I * I }{R} * L * ({1 - \frac{1}{2} })[/tex]

Substituting values

       [tex]F_R} = \frac{4 \pi * 10^{-7}}{2 * 3.142} \cdot \frac{ 20*20 }{0.015} * 2 ({\frac{1}{2} })[/tex]

       [tex]F_R} = 5.33 *10^{-3} N[/tex]

       [tex]F_R} = 5.33 \ m N[/tex]