One way to cool a gas is to let it expand. When a certain gas under a pressure of 5.00 x 10^6 Pa at 25.°C is allowed to expand to 3 times its original
volume, its final pressure is 1.07 x 10^6 Pa. What is its final temperature:​

Answer:

Sea Food is a rich source of ______. *​

Explanation:

Seafood is a rich source of minerals, such as iron, zinc, iodine, magnesium, and potassium.

Answer:

Sea food is a rich source of protein

Explanation:

You should eat fish (if you are not vegan/ vegetarian ofc) at least 2 times a week and 1 has to be oily

Answer:

0 - Then, the ray is totally reflected

Explanation:

The ray reaches the boundary between the two mediums at 49.2°.

If the ray is totally reflected it is necessary that the crictical angle is lower that the incidet angle.

You use the following to calculate the critical angle:

[tex]\theta_c=sin^{-1}(\frac{n_2}{n_1})[/tex]       (1)

n2: index of refraction of the second medium (air) = 1.00

n1: index of refraction of the first medium (glass) = 1.51

You replace the values of the parameters in the equation (1):

[tex]\theta_c=sin^{-1}(\frac{1.00}{1.51})=41.47\°[/tex]

The critical angle is 41.47°, which is lower than the incident angle 49.2°.

Then, the ray is totally reflected.

0

Answer:

F1 = 80

Explanation:

f1= f2 √ (F1/F2)

Where f1 = 300, f2 = 260 and F2 = 60

Putting in the above formula

300 = 260√(F1/60)

Dividing both sides by 260

=> 1.15 = √(F1/60)

Squaring both sides

=> 1.33 = F1/60

Multiplying both sides by 60

=> F1 = 80

Answer:

  AB = CD = √17

Explanation:

The distance formula is used to find the length of a line segment between two points. Here, we want to show the distance AB is the same as the distance CD.

  d = √((x1 -x1)² +(y2 -y1)²)

__

AB: d = √((1 -2)² +(3 -(-1))²) = √((-1)² +4²) = √17

CD: d = √((7-6)² +(1-5)²) = √(1² +(-4)²) = √17 . . . . same as AB

Segment AB is congruent to segment CD.

Complete question is;

After doing some exercises on the floor, you are lying on your back with one leg pointing straight up. If you allow your leg to fall freely until it hits the floor, what is the tangential speed of your foot just before it lands? Assume the leg can be treated as a uniform rod x = 0.98 m long that pivots freely about the hip.

Answer:

Tangential speed of foot just before it lands is; v = 5.37m/s

Explanation:

Let U (potential energy) be zero on the ground.

So, initially, U = mgh

where, h = 0.98/2 = 0.49m (midpoint of the leg)

Now just before the leg hits the floor it would have kinetic energy as;

K = ½Iω²

where ω = v/r and I = ⅓mr²

So, K = ½(⅓mr²)(v/r)²

K = (1/6) × (mr²)/(v²/r²)

K = (1/6) × mv²

From principle of conservation of energy, we have;

Potential energy = Kinetic energy

Thus;

mgh = (1/6) × mv²

m will cancel out to give;

gh = (1/6)v²

Making v the subject, we have;

v = √6gh

v = √(6 × 9.81 × 0.49)

v = √28.8414

v = 5.37m/s

Answer:

a) V =  140.8 m/s

b) T = 2027.52 N = 2.03 KN

Explanation:

a)

The formula for the speed of the wave is given as follows:

f₁ = V/2L

V = 2f₁L

where,

V = Speed of Wave = ?

f₁ = Fundamental Frequency = 80 Hz

L = Length of Wire = 88 cm = 0.88 m

Therefore,

V = (2)(80 Hz)(0.88 m)

V =  140.8 m/s

b)

Another formula for the speed of wave is:

V = √T/μ

V² = T/μ

T = V²μ

where,

T = Tension in String = ?

μ = Linear Mass Density of Wire = Mass of Wire/L = 0.09 kg/0.88 m

μ = 0.1 kg/m

Therefore,

T = (140.8 m/s)²(0.1 kg/m)

T = 2027.52 N = 2.03 KN

Answer: The magnitude of the force exerted on the roof is 490522.5 N.

Explanation:

The given data is as follows.

Below the roof, [tex]v_{1}[/tex] = 0 m/s

At top of the roof, [tex]v_{2}[/tex] = 39 m/s

We assume that [tex]P_{1}[/tex] is the pressure at lower surface of the roof and [tex]P_{2}[/tex] be the pressure at upper surface of the roof.

Now, according to Bernoulli's theorem,

[tex]P_{1} + 0.5 \times \rho \times v^{2}_{1} = P_{2} \times 0.5 \rho \times v^{2}_{2}[/tex]

[tex]P_{1} - P_{2} = 0.5 \times \rho \times (v^{2}_{2} - v^{2}_{1})[/tex]

             = [tex]0.5 \times 1.29 \times [(39)^{2} - (0)^{2}][/tex]

             = [tex]0.645 \times 1521[/tex]

             = 981.045 Pa

Formula for net upward force of air exerted on the roof is as follows.

          F = [tex](P_{1} - P_{2})A[/tex]

             = [tex]981.045 \times 500[/tex]

             = 490522.5 N

Therefore, we can conclude that the magnitude of the force exerted on the roof is 490522.5 N.

Hope this helps....

Good luck on your assignment.....

Answer:

A.) 78.4 J for both

B.) 78.4 J for both

C.) 8.85 m/s for both

D.) 17.7 kgm/s

Explanation:

Given information:

Mass m = 2 kg

Distance d = 20 m

High h = 4 m

A.) Gravitational potential energy can be calculated by using the formula

P.E = mgh

P.E = 2 × 9.8 × 4

P.E = 78.4 J

Since the two objects are identical, the gravitational potential energy of the block for both a and b will be 78.4 J

B.) According to conservative energy,

Maximum P.E = Maximum K.E.

Therefore, the kinetic energy of the two blocks will be 78.4 J

C.) Since K.E = 1/2mv^2 = mgh

V = √(2gh)

Solve for velocity V by substituting g and h into the formula

V = √(2 × 9.8 × 4)

V = √78.4

V = 8.85 m/s

The velocities of both block will be 8.85 m/s

D.) Momentum is the product of mass and velocity. That is,

Momentum = MV

Substitute for m and V into the formula

Momentum = 2 × 8.85 = 17.7 kgm/s

Both block will have the same value since the ramp Is frictionless.

Answer:

Explanation:

(a)

The true atmospheric pressure will has more value than the reading in the barometer. If Parm is the atmospheric

pressure in the tube then the resulting vapour pressure is

Patm - pgh = Prapor

The final reading ion the barometer is

pgh = Palm - Proper

Hence, the true atmospheric pressure is greater.

you can find the answer in this book

physics principles with Applications, Global Edition Problem 67P: Chapter: CH 13 Problem:67p

Answer: not sure

Explanation:

Answer:

ΔV = -1321.73V

Explanation:

The change in potential along the path from C to D is given by the following expression:

[tex]\Delta V=-\int_a^bE dr[/tex]         (1)

E: electric field produced by a charge at a distance of r

a: distance to the sphere at position C = 0.021m

b: distance to the sphere at position D = 0.055m

The electric field is given by:

[tex]E=k\frac{Q}{r^2}[/tex]                 (2)

Q: charge of the sphere = 5nC = 5*10^-9C

k: Coulomb's constant = 8.98*10^9Nm^2/C^2

You replace the expression (2) into the equation (1) and solve the integral:

[tex]\Delta V=-kQ\int_a^b \frac{dr}{r^2}=-kQ[-\frac{1}{r}]_a^b[/tex]            (3)

You replace the values of a and b:

[tex]\Delta V=(8.98*10^9Nm^2/C^2)(5*10^{-9}C)[\frac{1}{0.055m}-\frac{1}{0.021m}]\\\\\Delta V=-1321.73V[/tex]

The change in the potential along the path C-D is -1321.73V

Answer:

0.05 N

Explanation:

Data provided in the question

The Wire carries a current of 4A to the left direction

The constant magnetic field of magnitude = 0.05 T

Pointing upward i.e Z direction

The wire is in the magnetic field = 25 cm

Based on the above information, the force on the current is

[tex]= Current \times constant\ magnetic\ field\ of\ magnitude \times magnetic\ field[/tex]

[tex]= 4 \times 0.05 \times 0.25[/tex]

= 0.05 N

The direction will be the negative Y direction

Answer:

  60 m

Explanation:

After 3 seconds of travel at 20 m/s, the projectile is 3·20 = 60 meters horizontally from the cannon.

__

The vertical height after 3 seconds is 0.9 m, so the straight-line distance from cannon to target is √(60^2 +0.9^2) ≈ 60.007 meters.

Answer:

The gauge pressure is  [tex]P_g = 2058 \ P_a[/tex]

Explanation:

From the question we are told that

       The height of the water contained is  [tex]h_w = 30 \ cm = 0.3 \ m[/tex]

        The height of liquid in the cylinder is  [tex]h_t = 40 \ cm = 0.4 \ m[/tex]

At the bottom of the cylinder the gauge pressure is  mathematically represented as

        [tex]P_g = P_w + P_o[/tex]

Where  [tex]P_w[/tex] is the pressure of water which is mathematically represented as

      [tex]P_w = \rho_w * g * h_w[/tex]

Now  [tex]\rho_w[/tex] is the density of water with a constant values of  [tex]\rho_w = 1000 \ kg /m^3[/tex]

   substituting values

      [tex]P_w = 1000 * 9.8 * 0.3[/tex]

     [tex]P_w = 2940 \ Pa[/tex]

While [tex]P_o[/tex] is the pressure of oil which is mathematically represented as

          [tex]P_o = \rho_o * g * (h_t -h_w )[/tex]

Where [tex]\rho _o[/tex] is the density of oil with a constant value

         [tex]\rho _o = 900 \ kg / m^3[/tex]

substituting values

       [tex]P_o = 900 * 9.8 * (0.4 - 0.3)[/tex]

       [tex]P_o = 882 \ Pa[/tex]

Therefore

      [tex]P_g = 2940 - 882[/tex]

      [tex]P_g = 2058 \ P_a[/tex]

Answer:Work is the energy required to move an object from one point to another. while power is the energy transferred per unit time.

Answer:

The maximum amount of meat that the butcher can sell is  [tex]3\frac{1}{12}\:lb[/tex]

Explanation:

The maximum amount can be found by taking the difference of mixed numbers.

[tex]5\frac{3}{4}-2\frac{2}{3}\\\\\mathrm{Subtract\:the\:numbers:}\:5-2=3\\\\\mathrm{Combine\:fractions:\:}\frac{3}{4}-\frac{2}{3}=\frac{1}{12}\\\\=3\frac{1}{12}\\[/tex]

Best Regards!

Answer:

Ec = 6220.56 kcal

Explanation:

In order to calculate the amount of Calories needed by the climber, you first have to calculate the work done by the climber against the gravitational force.

You use the following formula:

[tex]W_c=Mgh[/tex]        (1)

Wc: work done by the climber

g: gravitational constant = 9.8 m/s^2

M: mass of the climber = 78.4 kg

h: height reached by the climber = 5.42km = 5420 m

You replace in the equation (1):

[tex]W_c=(78.4kg)(9.8m/s^2)(5420m)=4,164,294.4\ J[/tex]     (2)

Next, you use the fact that only 16.0% of the chemical energy is convert to mechanical energy. The energy calculated in the equation (2) is equivalent to the mechanical energy of the climber. Then, you have the following relation for the Calories needed:

[tex]0.16(E_c)=4,164,294.4J[/tex]

Ec: Calories

You solve for Ec and convert the result to Cal:

[tex]E_c=\frac{4,164,294.4}{016}=26,026,840J*\frac{1kcal}{4184J}\\\\E_c=6220.56\ kcal[/tex]

The amount of Calories needed by the climber was 6220.56 kcal

Answer:

  r₂ = 1,586 m

Explanation:

For this problem we are going to solve it by parts, let's start by finding the sound intensity when we are 25 m

         β = 10 log (I / I₀)

where Io is the sensitivity threshold 10⁻¹² W / m²

          I₁ / I₀ = [tex]e^{\beta/10}[/tex]

          I₁ = I₀  e^{\beta/10}

let's calculate

          I₁ = 10⁻¹² e^{25/10}

          I₁ = 1.20 10⁻¹¹ W / m²

the other intensity in exercise is

          I₂ = 10⁻¹² e^{80/10}

          I₂ = 2.98 10⁻⁹ W / m²

now we use the definition of sound intensity

          I = P / A

where P is the emitted power that is a constant and A the area of ​​the sphere where the sound is distributed

         P = I A

the area a sphere is

         A = 4π r²

we can write this equation for two points of the found intensities

          I₁ A₁ = I₂ A₂

where index 1 corresponds to 25m and index 2 to the other distance

          I₁ 4π r₁² = I₂ 4π r₂²

          I₁ r₁² = I₂ r₂²

           r₂ = √ (I₁ / I₂) r₁

let's calculate

           r₂ = √ (1.20 10⁻¹¹ / 2.98 10⁻⁹) 25

           r₂ = √ (0.40268 10⁻²) 25

           r₂ = 1,586 m

Answer:

λ = 509 nm

Explanation:

In order to calculate the wavelength of the light you use the following formula:

[tex]y=m\frac{\lambda D}{d}[/tex]   (1)

where

y: distance of the mth fringe to the central peak = 3.30 mm = 3.30*10^-3 m

m: order of the bright fringe = 1

D: distance from the slits to the screen = 3.24 m

d: distance between slits = 0.500 mm = 0.500*10^-3 m

You first solve the equation (1) for λ, and then you replace the values of the other parameters:

[tex]\lambda=\frac{dy}{mD}\\\\\lambda=\frac{(0.500*10^{-3}m)(3.30*10^{-3}m)}{(1)(3.24m)}=5.09*10^7m\\\\\lambda=509*10^{-9}m=509nm[/tex]

The wavelength of the light is 509 nm

Answer:

E = 0.965eV

Explanation:

In order to calculate the minimum energy needed to eject the electrons you use the following formula:

[tex]E=h \nu[/tex]        (1)

h: Planck' constant = 6.626*10^{-34}J.s

v: threshold frequency = 2.47*10^14 s^-1

You replace the values of v and h in the equation (1):

[tex]E=(6.262*10^{-34}J.s)(2.47*10^{14}s^{-1})=1.54*10^{-19}J[/tex]

In electron volts you obtain:

[tex]1.54*10^{-19}J*\frac{6.242*10^{18}eV}{1J}=0.965eV[/tex]

The minimum energy needed is 0.965eV

Answer:

-15 m/s

Explanation:

The computation of the velocity of the 4.0 kg fragment is shown below:

For this question, we use the correlation of the momentum along with horizontal x axis

Given that

Weight of stationary shell = 6 kg

Other two fragments each = 1.0 kg

Angle = 60

Speed = 60 m/s

Based on the above information, the velocity = v is

[tex]1\times 60 \times cos\ 60 + 1\times 60 \times cos\ 60 - 4\ v = 0[/tex]

[tex]\frac{60}{2} + \frac{60}{2} - 4\ v = 0[/tex]

[tex]v = \frac{60}{4}[/tex]

= -15 m/s

Answer:

KE = 135,000 j or 135 KJ

Explanation:

KE=0.5mv^2

KE=0.5*1200*15^2

KE = 135,000 joules or 135 Kilo Joules

Answer:

The original volume of the first bar is half of the original volume of the second bar.

Explanation:

The coefficient of cubic expansivity of substances is given by;

γ = ΔV ÷ ([tex]V_{1}[/tex]Δθ)

Given: two metal bars with equal change in volume, equal change in temperature.

Let the volume of the first metal bar be represented by [tex]V_{1}[/tex], and that of the second by [tex]V_{2}[/tex].

Since they have equal change in volume,

Δ[tex]V_{1}[/tex]  = Δ[tex]V_{2}[/tex] = ΔV

For the first metal bar,

2γ = ΔV ÷ ([tex]V_{1}[/tex]Δθ)

⇒    Δθ =  ΔV ÷ (2γ[tex]V_{1}[/tex])

For the second metal bar,

γ = ΔV ÷ ([tex]V_{2}[/tex]Δθ)

⇒  Δθ = ΔV ÷ ([tex]V_{2}[/tex]γ)

Since they have equal change in temperature,

Δθ of first bar = Δθ of the second bar

ΔV ÷ (2γ[tex]V_{1}[/tex])     =   ΔV ÷ ([tex]V_{2}[/tex]γ)

So that;

(1 ÷ 2[tex]V_{1}[/tex]) = (1 ÷ [tex]V_{2}[/tex])

2[tex]V_{1}[/tex] =  [tex]V_{2}[/tex]

[tex]V_{1}[/tex] = [tex]\frac{V_{2} }{2}[/tex]

Thus, original volume of the first bar is half of the original volume of the second bar.

Answer:

If the particle is an electron [tex]E_y = 3.311 * 10^3 N/C[/tex]

If the particle is a proton, [tex]E_y = 6.08 * 10^6 N/C[/tex]

Explanation:

Initial speed at the origin, [tex]u = 3 * 10^6 m/s[/tex]

[tex]\theta = 38^0[/tex] to +ve x-axis

The particle crosses the x-axis at , x = 1.5 cm = 0.015 m

The particle can either be an electron or a proton:

Mass of an electron, [tex]m_e = 9.1 * 10^{-31} kg[/tex]

Mass of a proton, [tex]m_p = 1.67 * 10^{-27} kg[/tex]

The electric field intensity along the positive y axis [tex]E_y[/tex], can be given by the formula:

[tex]E_y = \frac{2 m u^2 sin \theta cos \theta}{qx} \\[/tex]

If the particle is an electron:

[tex]E_y = \frac{2 m_e u^2 sin \theta cos \theta}{qx} \\[/tex]

[tex]E_y = \frac{2 * 9.1 * 10^{-31} * (3*10^6)^2 *(sin38)( cos38)}{1.6*10^{-19} * 0.015} \\[/tex]

[tex]E_y = 3311.13 N/C\\E_y = 3.311 * 10^3 N/C[/tex]

If the particle is a proton:

[tex]E_y = \frac{2 m_p u^2 sin \theta cos \theta}{qx} \\[/tex]

[tex]E_y = \frac{2 * 1.67 * 10^{-27} * (3*10^6)^2 *(sin38)( cos38)}{1.6*10^{-19} * 0.015} \\[/tex]

[tex]E_y = 6.08 * 10^6 N/C[/tex]

Answer:

(c) 3 m/s;

Explanation:

Moment of inertia of the fish eels about its long body as axis

= 1/2 m R ² where m is mass of its body and R is radius of transverse cross section of body .

= 1/2 x m x (5 x 10⁻² )²

I  = 12.5 m x 10⁻⁴ kg m²

angular velocity of the eel

ω = 2 π n where n is revolution per second

=2 π n

= 2 π x 14

= 28π

Rotational kinetic energy

= 1/2 I ω²

= .5 x 12.5 m x 10⁻⁴  x(28π)²

= 4.8312m  J

To match this kinetic energy let eel requires to have linear velocity of V

1 / 2 m V² = 4.8312m

V = 3.10

or 3 m /s .

Answer:

The rider's speed will be approximately 35 m/s

Explanation:

Initially the rider has kinetic and potential energy, and after going down the hill, some of the potencial energy turns into kinetic energy. So using the conservation of energy, we have that:

[tex]kinetic_1 + potencial_1 = kinetic_2 + potencial_2[/tex]

The kinetic and potencial energy are given by:

[tex]kinetic = mass * speed^2 / 2[/tex]

[tex]potencial = mass * gravity * height[/tex]

So we have that:

[tex]m*v^2/2 + mgh = m*v'^2/2 + mgh'[/tex]

[tex]20^2/2 + 9.81*60 = v'^2/2 + 9.81*18[/tex]

[tex]v'^2/2 + 176.58 = 788.6[/tex]

[tex]v'^2/2 = 612.02[/tex]

[tex]v'^2 = 1224.04[/tex]

[tex]v' = 34.99\ m/s[/tex]

So the rider's speed will be approximately 35 m/s

Answer:

The beam used is a negatively charged electron beam with a velocity of

v = E / B

Explanation:

After reading this long statement we can extract the data to work on the problem.

* They indicate that when the beam passes through the plates it deviates towards the positive plate, so the beam must be negative electrons.

* Now indicates that the electric field and the magnetic field are contracted and that the beam passes without deviating, so the electric and magnetic forces must be balanced

           [tex]F_{e} = F_{m}[/tex]

           q E = qv B

           v = E / B

this configuration is called speed selector

They ask us what type of beam was used.

The beam used is a negatively charged electron beam with a velocity of v = E / B

Answer:

R(smaller) = 1.3 Ω  and  R(larger) = 5.4 Ω

Explanation:

Ohm's Law states that:

V = IR

R = V/I

where,

R = Resistance

V = Potential Difference

I = Current

Therefore, for series connection:

Rs = Vs/Is

where,

Rs = Resistance when connected in series = R(smaller) + R(larger)

Vs = Potential Difference when connected in series = 12 V

Is = Current when connected in series = 1.78 A

Therefore,

R(smaller) + R(larger) = 12 V/1.78 A

R(smaller) + R(larger) = 6.74 Ω   --------------- equation 1

R(smaller) = 6.74 Ω - R(larger)    --------------- equation 2

Therefore, for series connection:

Rp = Vp/Ip

where,

Rp = Resistance when connected in parallel = [1/R(smaller) + 1/R(larger)]⁻¹

Rp = [{R(smaller) + R(larger)}/{R(smaller).R(larger)]⁻¹

Rp = R(smaller).R(larger)/[R(smaller) + R(larger)]

Vp = Potential Difference when connected in parallel = 12 V

Ip = Current when connected in parallel = 11.3 A

Therefore,

R(smaller).R(larger)/[R(smaller) + R(larger)] = 12 V/11.3 A

using equation 1 and equation 2, we get:

[6.74 Ω - R(larger)].R(larger)/6.74 Ω = 1.06 Ω

6.74 R(larger) - R(larger)² = (6.74)(1.06)

R(larger)² - 6.74 R(larger) + 7.16 = 0

solving this quadratic equation we get:

R(larger) = 5.4 Ω (OR) R(larger) = 1.3 Ω

using these values in equation 2, we get:

R(smaller) = 1.3 Ω (OR) R(smaller) = 5.4 Ω

Since, it is given in the question that R(smaller)<R(larger).

Therefore, the correct answers will be:

R(smaller) = 1.3 Ω  and  R(larger) = 5.4 Ω

Answer:

0.00185 °C

Explanation:

From the question,

The potential energy of the bird = heat gained by the water in the fish tank.

mgh = cm'(Δt)................... Equation 1

Where m = mass of the bird, g = acceleration due to gravity, h = height, c = specific heat capacity of water, m' = mass of water, Δt = rise in temperature of water.

make Δt the subject of the equation

Δt = mgh/cm'............... Equation 2

Given: m = 1 kg, h = 40 m, m' = 50.5 kg

constant: g = 9.8 m/s², c = 4200 J/kg.K

Substitute into equation 2

Δt = 1(40)(9.8)/(50.5×4200)

Δt = 392/212100

Δt = 0.00185 °C