Answer:
Explanation:
Given
Initial Volume [tex]v_1=1\ m^3[/tex]
final Volume [tex]v_2=3\ m^3[/tex]
Heat added at constant Pressure [tex]Q=200\ kJ[/tex]
Decrease in Energy of System [tex]\Delta U=-340\ kJ[/tex]
According to First law of thermodynamics
[tex]Q=\Delta U+W[/tex]
[tex]W=Q-\Delta U[/tex]
[tex]W=200-(-340)[/tex]
[tex]W=540\ kJ[/tex]
Work done in a constant Pressure Process is given by
[tex]W=P\Delta V[/tex]
where P is the constant Pressure
[tex]540=P\times (3-1)[/tex]
[tex]P=270\ kPa[/tex]
(1) Differentiate EN with respect to r, and then set the resulting expression equal to zero, since the curve of EN versus r is a minimum at E0. (2) Solve for r in terms of A, B, and n, which yields r0, the equilibrium interionic spacing.
Answer: The continuation and the last part of the question is (3) Determine the expression for E0 by substitution of r0 into the above equation for EN. What is the equation that represents the expression for E0?
Explanation:
The detailed steps and appropriate derivation and by differentiation is shown in the attachment.
The knowledge of differential calculus is applied.
Two timpani (tunable drums) are played at the same time. One is correctly tuned so that when it is struck, sound is produced that has a wavelength of 2.20 m. The second produces sound with a wavelength of 2.10 m. If the speed of sound is 343 m/s, what beat frequency is heard?
Answer:
Explanation:
Given
Wavelength of first timpani [tex]\lambda _1=2.2\ m[/tex]
Frequency corresponding to this Wavelength
[tex]f_1=\frac{v}{\lambda _1}[/tex]
where [tex]v=velocity\ of\ sound (343 m/s)[/tex]
[tex]f_1=\frac{343}{2.2}[/tex]
[tex]f_1=155.9\ Hz[/tex]
Wavelength of Second timpani [tex]\lambda _2=2.1\ m[/tex]
Frequency corresponding to this Wavelength
[tex]f_2=\frac{v}{\lambda _2}[/tex]
[tex]f_2=\frac{343}{2.1}=163.33\ Hz[/tex]
Beat frequency [tex]=f_2-f_1[/tex]
Beat frequency [tex]=163.33-155.9=7.43[/tex]
so approximately 7 beats per second
Final answer:
The beat frequency heard when two timpani are played together, with wavelengths of 2.20 m and 2.10 m and the speed of sound being 343 m/s, is 7.42 Hz.
Explanation:
When two timpani (tunable drums) are played at the same time with wavelengths of 2.20 m and 2.10 m, respectively, and the speed of sound is 343 m/s, we can calculate the frequencies of these sounds and subsequently determine the beat frequency heard.
The frequency of a wave is given by the formula f = v / λ (where f is the frequency, v is the speed of sound, and λ is the wavelength).
For the first timpani, the frequency is 343 m/s / 2.20 m = 155.91 Hz; for the second, it is 343 m/s / 2.10 m = 163.33 Hz.
The beat frequency, which is the absolute difference between these two frequencies, will be -
= 163.33 Hz - 155.91 Hz
= 7.42 Hz.
A common practice in cooking is the addition of salt to boiling water (Kb = 0.52 °C kg/mole). One of the reasons for this might be to raise the temperature of the boiling water. If 2.85 kg of water is boiling at 100 °C, how much NaCl (MW = 58.44 g/mole) would need to be added to the water to increase the boiling point by 2 °C? Must show your work.
Final answer:
To raise the boiling point of 2.85 kg of water by 2°C, one needs to add approximately 320.41 grams of sodium chloride (NaCl), calculated based on the boiling point elevation formula and considering NaCl's dissociation into ions.
Explanation:
To calculate how much NaCl is needed to increase the boiling point of 2.85 kg of water by 2°C, we use the boiling point elevation formula: ΔT = i*Kb*m, where ΔT is the change in boiling point, i is the van 't Hoff factor (which is 2 for NaCl because it dissociates into Na+ and Cl- ions), Kb is the ebullioscopic constant of water (0.52 °C kg/mole), and m is the molality of the solution. First, we solve for m knowing that we want to increase the boiling point by 2°C. With Kb = 0.52 °C kg/mole and i=2, we have 2°C = (2)*(0.52 °C kg/mol)*m. From here, m = 1.923 mol/kg.
Next, to find the mass of NaCl needed, we convert molality to moles of solute needed using the mass of the solvent (water) in kg, then multiply by the molar mass of NaCl. Since molality = moles of solute / kg of solvent, moles of NaCl = molality * kg of solvent = 1.923 mol/kg * 2.85 kg = 5.48 moles. The mass of NaCl required = moles * molar mass = 5.48 mol * 58.44 g/mol = 320.41 g.
Therefore, to increase the temperature of the boiling water by 2°C, we need to add approximately 320.41 grams of NaCl.
A long. 1.0 kg rope hangs from a support that breaks, causing the rope to fall, if the pull exceeds 43 N. A student team has built a 2.0 kg robot "mouse" that runs up and down the rope. What minimum magnitude of the acceleration should the robot have for the rope to fail? Express your answer with the appropriate units.
Answer:
6.8 m/s2
Explanation:
Let g = 9.8 m/s2. The total weight of both the rope and the mouse-robot is
W = Mg + mg = 1*9.8 + 2*9.8 = 29.4 N
For the rope to fails, the robot must act a force on the rope with an additional magnitude of 43 - 29.4 = 13.6 N. This force is generated by the robot itself when it's pulling itself up at an acceleration of
a = F/m = 13.6 / 2 = 6.8 m/s2
So the minimum magnitude of the acceleration would be 6.8 m/s2 for the rope to fail
The robot must have a minimum acceleration of 16.6 m/s^2 for the rope to fail.
Explanation:To determine the minimum magnitude of acceleration the robot should have for the rope to fail, we need to consider the forces acting on the rope. The weight of the robot is 2.0 kg multiplied by the acceleration, which we need to find. The tension in the rope is equal to the weight of the rope plus the weight of the robot. Since the rope breaks if the tension exceeds 43 N, we can set up the equation:
Tension = Weight of rope + Weight of robot
43 N = (1.0 kg)(9.8 m/s^2) + (2.0 kg)(acceleration)
Solving for the acceleration, we get:
acceleration = (43 N - 9.8 N) / 2.0 kg = 16.6 m/s^2
Learn more about Minimum acceleration for rope to fail here:https://brainly.com/question/31974917
#SPJ3
Two identical loudspeakers are driven in phase by the same amplifier. The speakers are positioned a distance of 3.2 m apart. A person stands 4.1 m away from one speaker and 4.8 m away from the other. Calculate the second lowest frequency that results in destructive interference at the point where the person is standing. Assume the speed of sound to be 343 m/s.
Answer:
f = 735 Hz
Explanation:
given,
Person distance from speakers
r₁ = 4.1 m r₂ = 4.8 m
Path difference
d = r₂ - r₁ = 4.8 - 4.1 = 0.7 m
For destructive interference
[tex]d = \dfrac{n\lambda}{2}[/tex]
where, n = 1, 3,5..
we know, λ = v/f
[tex]d = \dfrac{n v}{2f}[/tex]
v is the speed of the sound = 343 m/s
f is the frequency
[tex]f = \dfrac{n v}{2d}[/tex]
for n = 1
[tex]f = \dfrac{343}{2\times 0.7}[/tex]
f = 245 Hz
for n = 3
[tex]f = \dfrac{3\times 343}{2\times 0.7}[/tex]
f = 735 Hz
Hence,the second lowest frequency of the destructive interference is 735 Hz.
Daring Darless wishes to cross the Grand Canyon of the Snake River by being shot from a cannon. She wishes to be launched at 56° relative to the horizontal so she can spend more time in the air waving to the crowd. With what minimum speed must she be launched to cross the 520-m gap?
Answer:
She must be launched with a speed of 74.2 m/s.
Explanation:
Hi there!
The equations of the horizontal component of the position vector and the vertical component of the velocity vector are the following:
x = v0 · t · cos θ
vy = v0 · sin θ + g · t
x = horizontal distance traveled at time t.
v0 = initial velocity.
t = time.
θ = launching angle.
vy = vertical component of the velocity vector at time t.
g = acceleration due to gravity (-9.8 m/s²).
To just cross the 520-m gap, the maximum height of the flight must be reached halfway of the gap at 260 m horizontally (see attached figure).
When she is at the maximum height, her vertical velocity is zero. So, when x = 260 m, vy = 0. Using both equations we can solve the system for v0:
x = v0 · t · cos θ
Solving for v0:
v0 = x/ (t · cos θ)
Replacing v0 in the second equation:
vy = v0 · sin θ + g · t
0 = x/(t·cos(56°)) · sin(56°) + g · t
0 = 260 m · tan (56°) / t - 9.8 m/s² · t
9.8 m/s² · t = 260 m · tan (56°) / t
t² = 260 m · tan (56°) / 9.8 m/s²
t = 6.27 s
Now, let's calculate v0:
v0 = x/ (t · cos θ)
v0 = 260 m / (6.27 s · cos(56°))
v0 = 74.2 m/s
She must be launched with a speed of 74.2 m/s.
Answer:
it must be launched at a speed of 74.2 m/s
Explanation:
I really hope this helps
How much heat must be absorbed by 125 g of ethanol to change its temperature from 21.5 oC to 34.8 oC?
Q: How much heat must be absorbed by 125 g of ethanol to change its temperature from 21.5 oC to 34.8 oC? The specific heat of ethanol is 2.44 J/(gC).
Answer:
4056.5 J
Explanation:
The formula for the specific heat capacity of ethanol is given as
Q = cm(t₂-t₁)..................... Equation 1
Where q = quantity of heat, c = specific heat capacity of ethanol, m = mass of ethanol, t₁ = initial temperature of ethanol, t₂ = final temperature of ethanol.
Given: m = 125 g, t₁ = 25.5 °C, t₂ = 34.8 °C
Constant; c = 2.44 J/g.°C
Substitute into equation 1
Q = 125(2.44)(34.8-21.5)
Q = 125(2.44)(13.3)
Q = 4056.5 J.
Hence the amount of heat absorbed = 4056.5 J
A parallel-plate capacitor is made of two conducting plates of area A separated by a distance d. The capacitor carries a charge Q and is initially connected to a battery that maintains a constant potential difference between the plates. The battery is then disconnected from the plates and the separation between the plates is doubled. 1) Which of the following remains constant? Oa. Voltage across the capacitor b. Capacitance of the capacitor c. Charge on the capacitor
Answer:
C. Charge on the capacitor
Explanation:
Read further: Capacitors consist of two parallel conductive
plates (usually a metal) which are prevented
from touching each other (separated) by an
insulating material called the “dielectric”. When
a voltage is applied to these plates an
electrical current flows charging up one plate
with a positive charge with respect to the
supply voltage and the other plate with an
equal and opposite negative charge.
Then, a capacitor has the ability of being able
to store an electrical charge Q (units in
Coulombs ) of electrons. When a capacitor is
fully charged there is a potential difference,
p.d. between its plates, and the larger the area
of the plates and/or the smaller the distance
between them (known as separation) the
greater will be the charge that the capacitor
can hold and the greater will be its
Capacitance.
The capacitors ability to store this electrical
charge ( Q ) between its plates is proportional
to the applied voltage, V for a capacitor of
known capacitance in Farads.
The correct option is c which is charge on the capacitance. When a parallel-plate capacitor is disconnected from the battery, and the separation between its plates is doubled, the charge on the capacitor remains constant. Changes in plate separation affect capacitance and voltage, but not the existing charge on the plates.
The question asks which of the following remains constant when the battery is disconnected from a parallel-plate capacitor and the separation between the plates is doubled: voltage across the capacitor, capacitance of the capacitor, or the charge on the capacitor. The key to answering this question lies in understanding how capacitors work and the relationship between charge (Q), capacitance (C), and voltage (V).
Capacitance is given by C = εA/d, where A is the area of the plates, d is the separation between the plates, and ε is the permittivity of the material between the plates. When the battery is disconnected, the external voltage source is removed, but the charge on the plates does not have a path to dissipate. Therefore, the charge on the capacitor remains constant, even when the plate separation is changed. Doubling the separation would affect the capacitance and the voltage across the capacitor but not the charge.
If the humidity in a room of volume 410 m3 at 25 ∘C is 70%, what mass of water can still evaporate from an open pan? Express your answer using two significant figures.
Answer:
[tex]m=1864.68\ g[/tex]
Explanation:
Given:
volume of air in the room, [tex]V=410\ m^3[/tex]
temperature of the room, [tex]T=25+273=298\ K[/tex]
Saturation water vapor pressure at any temperature T K is given as:
[tex]p_{sw}=\frac{e^{(77.3450 + 0.0057\times T - \frac{ 7235}{T} )}}{T^{8.2}}[/tex]
putting T=298 K we have
[tex]p_{sw}=3130\ Pa[/tex]
The no. of moles of water molecules that this volume of air can hold is:
Using Ideal gas law,
[tex]P.V=n.R.T[/tex]
[tex]n=\frac{P_{sw}.V}{R.T}[/tex]
[tex]n=\frac{3130\times 410}{8.314\times 298}[/tex]
[tex]n=518\ moles[/tex] is the maximum capacity of the given volume of air to hold the moisture.
Currently we have 80% of n, so the mass of 20% of n:
[tex]m=(20\%\ of\ n)\times M}[/tex]
where;
M= molecular mass of water
[tex]m=0.2\times 518\times 18[/tex]
[tex]m=1864.68\ g[/tex] is the mass of water that can vaporize further.
On a dry road, a car with good tires may be able to brake withconstant deceleration of 4.92 m/s^2. (a) how long does such a car,initially traveling at 24.6 m/s, take to stop?(b) How far does ittravel in this time? (c) Graph x vs t and v vs t for thedeceleration.
Answer:
a) [tex]t=5\ s[/tex]
b) [tex]s=61.5\ m[/tex]
Explanation:
Given:
acceleration of the car, [tex]a=-4.92\ m.s^{-1}[/tex]
initial velocity of the car, [tex]u=24.6\ m.s^{-1}[/tex]
final velocity of the car, [tex]v=0\ m.s^{-1}[/tex]
a)
Using eq. of motion:
[tex]v=u+a.t[/tex]
[tex]0=24.6-4.92\times t[/tex]
[tex]t=5\ s[/tex]
b)
Distance travelled before stopping:
[tex]s=u.t+\frac{1}{2} a.t^2[/tex]
[tex]s=24.6\times 5-0.5\times 4.92\times 5^2[/tex]
[tex]s=61.5\ m[/tex]
c)
The car takes deceleration in 5 seconds to stop and travels a distance of 61.5 meters.
a) To find the time it takes for the car to stop, we can use the equation v = u + at, where v is the final velocity, u is the initial velocity, a is the deceleration, and t is the time elapsed. Rearranging the equation to solve for t, we have t = (v - u) / a. Substituting the given values, we get t = (0 - 24.6) / -4.92 = 5 seconds.
b) To find the distance traveled during this time, we can use the equation s = ut + (1/2)at^2, where s is the distance, u is the initial velocity, a is the deceleration, and t is the time elapsed. Substituting the given values, we have s = 24.6(5) + (1/2)(-4.92)(5)^2 = 61.5 meters.
c) The graph of x vs t would be a straight line with a negative slope, representing the car's distance decreasing over time. The graph of v vs t would also be a straight line with a negative slope, representing the car's velocity decreasing over time.
For more such questions on deceleration, click on:
https://brainly.com/question/37877673
#SPJ3
A rocket carrying a satellite is accelerating straight up from the earth’s surface. At 1.15 s after liftoff, the rocket clears the top of its launch platform, 63 m above the ground. After an additional 4.75 s, it is 1.00 km above the ground. Calculate the magnitude of the average velocity of the rocket for (a) the 4.75-s part of its flight and (b) the first 5.90 s of its flight.
Answer:
197.263157895 m/s
169.491525424 m/s
Explanation:
x Denotes position
t Denotes time
Average velocity is given by
[tex]v_a=\dfrac{x_2-x_1}{t_2}\\\Rightarrow v_a=\dfrac{1000-63}{4.75}\\\Rightarrow v_a=197.263157895\ m/s[/tex]
The average velocity is 197.263157895 m/s
[tex]v_a=\dfrac{x_2-x_1}{t_2}\\\Rightarrow v_a=\dfrac{1000-0}{5.9}\\\Rightarrow v_a=169.491525424\ m/s[/tex]
The average velocity is 169.491525424 m/s
The magnitude of the average velocity of the rocket during the 4.75-second part of the flight is 197.3 m/s, while for the first 5.90 seconds of the flight, the average velocity is 169.5 m/s.
Explanation:To find the magnitude of the average velocity of the rocket, we use the formula average velocity = displacement / time.
(a) The displacement during the 4.75-second part of the flight is 1.00 km - 63 m = 937 m (we converted km to m to keep units consistent). Hence, the average velocity in this part of the flight is 937 m / 4.75 s = 197.3 m/s.
(b) For the first 5.90 seconds of flight, the displacement is 1.00 km = 1000 m (the height above the ground) while time is 5.90 s. Therefore, for this duration, the average velocity is 1000 m / 5.90 s = 169.5 m/s.
Learn more about velocity here:https://brainly.com/question/17959122
#SPJ3
What is relative velocity? Suppose you want to design an airbag system that can protect the driver in a head on collision at a speed of 100 km/hr or 60 mph. Estimate how fast the airbag must inflate to effectively protect the driver? The car crumples within a distance of 1m.
Answer:
0.072 seconds
Explanation:
t = Time taken
u = Initial velocity = 100 km/h
v = Final velocity
s = Displacement = 1 m
a = Acceleration
[tex]v^2-u^2=2as\\\Rightarrow a=\dfrac{v^2-u^2}{2s}\\\Rightarrow a=\dfrac{0^2-(\dfrac{100}{3.6})^2}{2\times 1}\\\Rightarrow a=-385.802469136\ m/s^2[/tex]
[tex]v=u+at\\\Rightarrow t=\dfrac{v-u}{a}\\\Rightarrow t=\dfrac{0-\dfrac{100}{3.6}}{-385.802469136}\\\Rightarrow t=0.072\ s[/tex]
The time taken is 0.072 seconds
A metallic sheet has a large number of slits, 5.0 mm wide and 16 cm apart, and is used as a diffraction grating for microwaves. A wide parallel beam of microwaves is incident normally on the sheet. What is the smallest microwave frequency for which only the central maximum occurs? (The speed of these EM waves is c = 3.00 × 10 8 m/s.)
Answer:
[tex]6\times 10^{10}\ Hz[/tex]
Explanation:
d = Slit gap = 5 mm
Slit distance = 16 cm
c = Speed of light = [tex]3\times 10^8\ m/s[/tex]
[tex]\lambda[/tex] = Wavelength
We have the relation
[tex]dsin\theta=\lambda[/tex]
Here, [tex]\theta=90[/tex]
So
[tex]d=\lambda\\\Rightarrow \lambda=5\ mm[/tex]
Frequency is given by
[tex]f=\dfrac{c}{\lambda}\\\Rightarrow f=\dfrac{3\times 10^8}{5\times 10^{-3}}\\\Rightarrow f=6\times 10^{10}\ Hz[/tex]
The frequency is [tex]6\times 10^{10}\ Hz[/tex]
Is the magnitude of the force experienced by the negative charge greater than, less than, or the same as that experienced by the positive charge?
Answer:
The same
Explanation:
Charges of the same sign repel, while those of different sign attract. So, the magnitude of both electrostatic forces is the same but in the opposite direction. On the other hand, when the force on the charge is exerted by an electric field: If the charge is positive, it experiences a force in the direction of the field; If the load is negative, it experiences a force in the opposite direction to the field. Therefore, the magnitude of both forces is the same but in the opposite direction.
Final answer:
The magnitude of the force is the same on both a negative and positive charge due to Coulomb's Law, but the forces act in opposite directions with attractions between opposite charges and repulsions between like charges.
Explanation:
The magnitude of the force experienced by a negative charge is the same as that experienced by a positive charge when they are acting upon each other. This is because the electric force between two charged particles is dictated by Coulomb's Law, which states that the magnitude of the force between two charges is directly proportional to the product of the charges and inversely proportional to the square of the distance between them. This law can be summarized by the equation:
F = k * |q₁ * q₂| / r²
where F is the magnitude of the force, k is Coulomb's constant, q₁ and q₂ are the amounts of the charges and r is the distance between the charges. Importantly, the law indicates only that the magnitudes of the forces are equal; however, the directions will be opposite due to the nature of attraction and repulsion between the charges. Thus, negative and positive charges attract each other, while like charges repel each other.
The force on the negatively charged object, using the formula F = qE, where q is the charge and E is the electric field, will be equal in magnitude but opposite in direction to the force on the positively charged object assuming the charges have the same magnitude. For example, if the electric field is directed eastward, a negative charge will experience a force to the west, while a positive charge will experience a force to the east.
Because of their different masses, a proton and an electron will experience different accelerations due to their different inertia, even though the forces acting on them are of the same magnitude.
A metal cylinder is measured to have a length of 5.0 cm and a diameter of 1.26 cm. Compute the volume of the cylinder. Write your final answer with the correct number of significant figures.
Answer:
V = 6.23 cm³
Explanation:
given,
Length of the cylinder, h = 5 cm
Diameter of the cylinder, d = 1.26 cm
r = 0.63 cm
Volume of the cylinder = ?
We know,
[tex]V = \pi r^2 h[/tex]
[tex]V = \pi \times 0.63^2\times 5[/tex]
V = 6.23 cm³
Volume of the cylinder is equal to V = 6.23 cm³
The volume of a metal cylinder with a length of 5.0 cm and a diameter of 1.26 cm (-approximately 4.9 cm^3- when calculated using the formula: Volume = π * (d/2)^2 * h.
Explanation:To calculate the volume of a cylinder, you use the formula: Volume = π * (d/2)^2 * h. Here, d represents the diameter of the cylinder, h represents the height, and π (pi) is a constant approximately equal to 3.14159. Plugging the values into the formula, we get:
Volume = π * (1.26 cm/2)^2 * 5.0 cm
After performing the above computations, the volume of the metal cylinder is approximately 4.9 cm^3 when rounded to two significant figures.
https://brainly.com/question/32822827
#SPJ3
On a dry day, the temperature in Boulder (altitude: 5330’) is 40F. What is the temperature (in F) on nearby Bear Peak (altitude: 8460’)?
Answer: °C = 4.44°C
Explanation: The centigrade scale and Fahrenheit scale are related by the formulae below
9 *°C = 5(°F - 32)
Where °C = measurement of temperature in centigrade scale.
°F = measurement of temperature in Fahrenheit scale =40°F
By substituting the parameters, we have that
9 * °C = 5 (40 - 32)
9* °C = 5(8)
9 * °C = 40
°C = 40/9
°C = 4.44°C
Temperature decreases by approximately 3.5°F for every 1000 feet increase in altitude. Given the altitude difference of 3130 feet from Boulder to Bear Peak and Boulder's temperature of 40°F, we can calculate that the temperature at Bear Peak is expected to be approximately 29°F.
Explanation:The question asks for the temperature at a higher altitude given the temperature at a lower one. This involves understanding how temperature changes with altitude. It is stated that, on average, temperature decreases by about 3.5°F for every 1000 feet you climb in altitude, a phenomenon known as the lapse rate.
Given that, if the starting temperature in Boulder (altitude: 5330’) is 40F, and we need to find the temperature on Bear Peak (altitude: 8460’), we need to calculate the difference in altitude and the corresponding temperature decrease.
The altitude difference is 8460 - 5330 = 3130 feet. From this height difference, we can determine the corresponding temperature change by multiplying 3130 feet by 3.5°F per 1000 feet, yielding a temperature decrease of about 11°F.
To find the temperature at the higher altitude (Bear Peak), we then subtract this temperature change from the starting temperature. Thus, 40°F - 11°F gives 29°F as the expected temperature on Bear Peak.
Learn more about Temperature change with altitude here:https://brainly.com/question/27681105
#SPJ12
An alpha particle (atomic mass 4.0 units) experiences an elastic head-on collision with a gold nucleus (atomic mass 197 units) that is originally at rest. What is the fractional loss of kinetic energy for the alpha particle
Answer:
0.08
Explanation:
The alpha particle suffers a head-on collision with the gold nucleus, so it retraces it path after the collision.
Let us take the masses of the particles in atomic mass units.
The initial momentum and kinetic energy of the gold nucleus is 0(since it is stationary). So, applying conservation of momentum and energy, we get the following two equations:
[tex]m_{1}u_{1}=m_{1}v_{1}+m_{2}v_{2}[/tex] ..........(1)
[tex]\frac{1}{2}m_{1}u_{2}^{2}=\frac{1}{2} m_{1} v_{1}^{2} +\frac{1}{2} m_{2} v_{2}^{2}[/tex] ..........(2)
where,
[tex]m_{1}[/tex] = mass of the alpha particle = 4 units
[tex]m_{2}[/tex] = mass of the gold nucleus = 197 units
[tex]u_{1}[/tex] = initial velocity of the alpha particle
[tex]v_{1}[/tex] = final velocity of the alpha particle
[tex]v_{2}[/tex] = final velocity of the gold nucleus
Now, we shall substitute the value of [tex]v_{2}[/tex] from equation (1) in equation (2). After some simplifications, we get,
[tex]u_{1}^{2}=v_{1}^{2}+\frac{m_{1}}{m_{2}} (u_{1}^{2}+v_{1}^{2}-2u_{1}v_{1})[/tex]
Dividing both sides by [tex]u_1^2[/tex] and substituting [tex]x=\frac{v_1}{u_1}[/tex] and [tex]k=\frac{m_1}{m_2}[/tex] , we get,
[tex]1=x^2+k(1+x^2-2x)\\[/tex]
or, [tex]x^2(k+1)-2kx+(k-1)=0[/tex]
Here, [tex]k=\frac{m_1}{m_2}=\frac{4}{197}=0.02[/tex]
Therefore, [tex]x=\frac{2(0.02)\pm\sqrt{(2\times0.02)^2-(4\times1.02\times-0.98)} }{2\times1.02}[/tex]
or, [tex]x = 1, -0.96[/tex]
Our required solution is -0.96 because the final velocity([tex]v_1[/tex]) of the alpha particle will be a little less the initial velocity([tex]u_1[/tex]). The negative sign comes as the alpha particle reverses it's direction after colliding with the gold nucleus.
Fractional change in kinetic energy is given by,
[tex]\delta E=\frac{\frac{1}{2} m_1u_1^2-\frac{1}{2}m_1v_1^2 }{\frac{1}{2}m_1u_1^2 }=1-x^2=0.078\approx0.08[/tex]
The alpha particle can lose a significant amount of its kinetic energy in a head-on elastic collision with a gold nucleus due to the gold nucleus's much larger mass. The original kinetic energy of the alpha particle is converted to potential energy before being transferred mostly to the gold nucleus. Specific loss would depend upon the alpha particle's original kinetic energy.
Explanation:The question pertains to the concept of elastic collisions, specifically between an alpha particle and a gold nucleus. In an elastic collision, both momentum and kinetic energy are conserved. However, while total energy is conserved, individual kinetic energies of colliding particles may change. Since the gold nucleus, which was initially at rest, is significantly more massive (197 units) than the alpha particle (4.0 units), the alpha particle can lose a significant amount of its kinetic energy in a head-on collision.
To calculate the fractional loss of kinetic energy for the alpha particle in this instance, we would use the principle of conservation of kinetic energy and momentum. The kinetic energy of an alpha particle before the collision is transformed into both kinetic and potential energy during the collision as it approaches the gold nucleus until its original energy is converted to potential energy.
Upon collision, a good proportion of this energy is transferred to the gold atom, given its much larger mass. However, necessary calculations would require specific knowledge of the kinetic energy of the alpha particle before the collision, which may vary depending upon the specific nuclear decay process involved.
Learn more about Kinetic Energy Loss in Elastic Collision here:https://brainly.com/question/33268757
#SPJ11
A 2.0 m × 4.0 m flat carpet acquires a uniformly distributed charge of −10 μC after you and your friends walk across it several times. A 6.0 μg dust particle is suspended in midair just above the center of the carpet.
What is the charge on the dust particle?
The charge on the dust particle is [tex]-2.07 x 10^{-14} C.[/tex]
The dust particle will obtain a charge due to the electric field produced by the charged carpet. Be that as it may, calculating its correct charge requires a few presumptions and steps:
1. Charge density:
To begin with, we ought to calculate the charge density [tex]\sigma[/tex] of the carpet:
[tex]\sigma[/tex] = total Charge / Range = -10 μC / (2.0 m x 4.0 m) = -2.5 μC/m²
2. Electric Field:
The charge thickness creates an electric field (E) over the carpet. Ready to utilize the equation:
E = [tex]\sigma[/tex] / ϵ0
here, ϵ0 is the permittivity of free space which is equal to [tex]8.85 x 10^{-12[/tex]F/m
Electric field, E = (-2.5 μC/m² / [tex]8.85 x 10^{-12} F/m[/tex]) = ([tex]-2.83 x 10^{5} N/C[/tex])
3. dust particle Charge:
The dust particle will involve an electrostatic force due to the electric field. Since the molecule is suspended, the net force on it must be zero. This implies the electrostatic force must balance the gravitational force acting on the molecule.
Suspicions:
The dust particle could be a circle with uniform charge dissemination.
Discussing resistance is unimportant.
Calculations:
Tidy molecule mass (m): 6.0 μg = [tex]6.0 x 10^{-9} kg[/tex]
Gravitational force (Fg): Fg = m * g (where g is increasing speed due to gravity,= 9.81 m/s²)
Electrostatic force (Fe): Fe = q * E (where q is the charge of the dust particle)
Likening the powers:
Fg = Fe
m * g = q * E
Tackling for q:
q = Fg / E = (m * g) / E = [tex](6.0 x 10^{-9} kg[/tex] * 9.81 m/s²) / ([tex]-2.83 x 10^{5} N/C[/tex]) = [tex]-2.07 x 10^{-14}[/tex] C
Subsequently, the charge on the dust particle is[tex]-2.07 x 10^{-14}[/tex] C.
In a circuit with parallelresistors, the smaller resistance dominates; in a circuit with resistors inseries, the larger one dominates. Make some speci c examples of resistorsin parallel and in series to explain this rule of thumb.
Answer:
In a circuit with parallelresistors, the smaller resistance dominates; in a circuit with resistors inseries, the larger one dominates. Make some specific examples of resistorsin parallel and in series to explain this rule of thumb.
Explanation:
Lets start with Resistors in series:
Suppose a 12v battery is connected in a circuit with 3 resistors in series.
Voltage = 12 V
R1 = 1 ohm
R2 = 6 ohm
R3 = 13 ohm
Total resistance is simply sum of all resistors connected in series as following:
Rs = R1 + R2 + R3
Rs = 1 + 6 + 13
Rs = 20 ohm
Here Rs = Total Resistance in series circuit
Now total current can be found by using ohm's law V = IR
I = V/R
Here R = R total
I = 12/20 = 0.6 Ampere
In series circuit current remains same.
so I1 = I2 = I3 = I
Now we can find Power dissipation across every resistor to show the dominant Resistor as:
P1 = I² R1 = (0.6 A)² ( 1 ohm) = 0.36 watt. (a)
P2 = I² R2 = (0.6 A)² ( 6 ohm) = 2.16 watt. (b)
P3 = I² R3 = (0.6 A)² ( 13 ohm) = 4.68 watt. (c)
From equation a, b and c we can conclude that more power is dissipated across R3 which is the Larger than both other resistors R1 and R2.
Now lets take the case of Parallel Circuit with same Values of Voltage and resistors But now in parallel.
In parallel circuit Total resistance is calculated as following:
1/Rp = 1/R1 + 1/R2 + 1/R3
1/Rp = 1/1 + 1/6 + 1/13 = 1 + 0.1667 + 0.0769
1/Rp = 1.2436
Rp = 0.8041 ohm
Now total current is as following:
I = V/R
I = 12/0.8041 = 14.92 A
Now we calculate individual currents :
In parallel circuit Voltage remains same.
I1 = V/R1
I1 = 12/1 = 12 A
Similarly,
I2 = V/R2
I2 = 12/ 6 = 2 A
and
I3 = V/R3
I3 = 12/13 = 0.92 A
Now Power dissipation can be calculated as :
P1 = I1² * R1
P1 = 12² * 1 = 144 * 1
P1 = 144 Watt (1)
Similarly,
P2 = I2² * R2
P2 = 2² * 6 = 4 * 6
P2 = 24 Watt (2)
And
P3 = I3² * R3
P3 = (0.92)² * 13 = 0.8464 * 13
P3 = 11 Watt. (3)
Now from Equation 1, 2 and 3 we can conclude that More power is dissipated across Lower resistor .
Hence in a circuit with parallel resistors, the smaller resistance dominates; in a circuit with resistors in series, the larger one dominates.
What would the force be if the separation between the two charges in the top window was adjusted to 8.19 ✕10-11 m? (The animation will not adjust that far--you will have to calculate the answer).
q1 = q2 = 1.00 ✕ e
The electrostatic force between the two charges is [tex]3.4\cdot 10^{-8}N[/tex]
Explanation:
The electrostatic force between two charges is given by Coulomb's law:
[tex]F=k\frac{q_1 q_2}{r^2}[/tex]
where:
[tex]k=8.99\cdot 10^9 Nm^{-2}C^{-2}[/tex] is the Coulomb's constant
[tex]q_1, q_2[/tex] are the two charges
r is the separation between the two charges
In this problem, we have the following data:
[tex]q_1 = q_2 = 1.00e[/tex] is the magnitude of the two charges, where
[tex]e=1.6\cdot 10^{-19}C[/tex] is the fundamental charge
[tex]r=8.19\cdot 10^{-11}m[/tex] is the separation between the two charges
Substutiting into the equation, we find the force:
[tex]F=(8.99\cdot 10^9)\frac{(1.00\cdot 1.6\cdot 10^{-19})^2}{(8.19\cdot 10^{-11})^2}=3.4\cdot 10^{-8}N[/tex]
Learn more about electric force:
brainly.com/question/8960054
brainly.com/question/4273177
#LearnwithBrainly
An air-filled capacitor consists of two parallel plates, each with an area of 7.60 cm2, separated by a distance of 2.00 mm. If a 23.0-V potential difference is applied to these plates, calculate the following.
(a) Calculate the electric field between the plates.
(b) Calculate the surface charge density.
(c) Calculate the capacitance.
(d) Calculate the charge on each plate.
Answer:
a. 11.5kv/m
b.102nC/m^2
c.3.363pF
d. 77.3pC
Explanation:
Data given
[tex]area=7.60cm^{2}\\ distance,d=2mm\\voltage,v=23v[/tex]
to calculate the electric field, we use the equation below
V=Ed
where v=voltage, d= distance and E=electric field.
Hence we have
[tex]E=v/d\\E=\frac{23}{2*10^{-3}} \\E=11.5*10^{3} v/m\\E=11.5Kv/m[/tex]
b.the expression for the charge density is expressed as
σ=ξE
where ξ is the permitivity of air with a value of 8.85*10^-12C^2/N.m^2
If we insert the values we have
[tex]8.85*10^{-12} *11500\\1.02*10^{-7}C/m^{2} \\102nC/m^{2}[/tex]
c.
from the expression for the capacitance
[tex]C=eA/d[/tex]
if we substitute values we arrive at
[tex]C=\frac{8.85*10^{-12}*7.6*10^{-4}}{2*10^{-3} } \\C=\frac{6.726*10^{-15} }{2*10^{-3} } \\C=3.363*10^{-12}F\\C=3.363pF[/tex]
d. To calculate the charge on each plate, we use the formula below
[tex]Q=CV\\Q=23*3.363*10^{-12}\\ Q=7.73*10^{-12}\\ Q=77.3pC[/tex]
For the air-filled capacitor:
(a) The electric field is 11.5 kV/m
(b) The surface charge density is 1.02×10⁻⁷C/m²
(c) The capacitance is 3.36pF
(d) Charge on the plate: 76pC
Capacitor:Given that an air-filled capacitor consists of two parallel plates such that the:
Area of the plates, A = 7.6 cm² = 7.6×10⁻⁴ m²
distance between the plates, d = 2mm = 2×10⁻³m
voltage applied, V = 23V
(a) Electric field is given by:
E = V\d
E = 23/2×10⁻³
E = 11.5 kV/m
(b) The electric field for a parallel plate capacitor in terms of the surface charge density is given by:
E = σ/ε₀
where σ is the surface charge density:
σ = ε₀E
σ = 8.85×10⁻¹²×11.5×10³
σ = 1.02×10⁻⁷C/m²
(c) the capacitance is given by:
C = ε₀A/d
C = (8.85×10⁻¹²)×(7.6×10⁻⁴)/2×10⁻³
C = 3.36×10⁻¹²F
C = 3.36 pF
(d) The charge (Q) on the plate is given by:
Q = σA
Q = 1.02×10⁻⁷× 7.6×10⁻⁴
Q = 76 pC
Learn more about capacitors:
https://brainly.com/question/17176550?referrer=searchResults
Give the relationship(s) for any pair of protons with the proper term(s). Label – your choice. A.Heterotopic B.Heterotopic, diastereotopic C.Homotopic D.Homotopic, enantiotopic
Answer and Explanation
• Heterotopic protons are those that when substituted by the same substituent, are structurally different. They are not similar, diastereotopic or enantiotopic.
• Diastreotopic protons refers to two protons in a molecule which, if replaced by the same substituent, would generate compounds that are diastereomers. Diastereotopic groups are often, but not always, identical groups attached to the same atom in a molecule containing at least one chiral center.
For example, the two hydrogen atoms of the C3 carbon in (S)-2-bromobutane are diastereotopic (shown in the attached image). Replacement of one hydrogen atom with a bromine atom will produce (2S,3R)-2,3-dibromobutane. Replacement of the other hydrogen atom with a bromine atom will produce the diastereomer (2S,3S)-2,3-dibromobutane.
• Homotopic protons in a compound are equivalent protons. Two protons A and B are homotopic if the molecule remains the same (including stereochemically) when the protons are interchanged with some other atom (substituent) while the remaining parts of the molecule stay fixed. Homotopic atoms are always identical, in any environment.
For example, ethane, the two H atoms on C1 and C2 carbons on the same side (as shown in the attached image) are homotopic as they exhibit the phenomenon described above.
• Enantiotopic protons are two protons in a molecule which, if one or the other were replaced (by the same substituent), would generate a chiral compound. The two possible compounds resulting from that replacement would be enantiomers.
For example, in the attached image to this answer, the two hydrogen atoms attached to the second carbon in butane are enantiotopic. Replacement of one hydrogen atom with a bromine atom will produce (R)-2-bromobutane. Replacement of the other hydrogen atom with a bromine atom will produce the enantiomer (S)-2-bromobutane.
Hope this helps!!!
Plane polarized light with intensity I0 is incident on a polarizer. What angle should the principle axis make with respenct to the incident polarization to get a transmission intensity that is 0.464 I0?
Answer:
Q = 47.06 degrees
Explanation:
Given:
- The transmitted intensity I = 0.464 I_o
- Incident Intensity I = I_o
Find:
What angle should the principle axis make with respect to the incident polarization
Solution:
- The relation of transmitted Intensity I to to the incident intensity I_o on a plane paper with its principle axis is given by:
I = I_o * cos^2 (Q)
- Where Q is the angle between the Incident polarized Light and its angle with the principle axis. Hence, Using the relation given above:
Q = cos ^-1 (sqrt (I / I_o))
- Plug the values in:
Q = cos^-1 ( sqrt (0.464))
Q = cos^-1 (0.6811754546)
Q = 47.06 degrees
Under what limits does the field of a uniformly charged disk match the field of a uniformly charged infinite sheet?
Answer:
If the radius of the disk is much greater than the point where the electric field is calculated, then the field of the disk matches the field of the infinite sheet.
Explanation:
First, we have to calculate the electric field of the disk.
We should choose an infinitesimal area, 'da', on the disk and calculate the E-field of this small portion, 'dE'. Then we will integrate dE over the entire disk using cylindrical coordinates.
According to the cylindrical coordinates: da = rdrdθ
The small portion is chosen at a distance r from the axis. Let's find the dE at a point on the axis and a distance z from the center of the disk.
[tex]dE = \frac{1}{4\pi\epsilon_0}\frac{dQ}{r^2 + z^2}[/tex]
Here dQ can be found by the following relation: The charge density of the disk is equal to the total charge divided by the total area of the disk. The small portion of the disk will have the same charge density, therefore:
[tex]\frac{Q}{\pi R^2} = \frac{dQ}{da}\\dQ = \frac{Qda}{\pi R^2}[/tex]
Furthermore, we need to separate the vertical and horizontal components of dE, because it is a vector and cannot be integrated without separating the components. By symmetry, the horizontal components of dE will cancel out each other, leaving only the vertical components in the z-direction.
[tex]dE_z = dE\sin(\alpha) = dE \frac{z}{\sqrt{z^2+r^2}}\\dE_z = \frac{1}{4\pi\epsilon_0}\frac{Qzda}{\pi R^2(z^2+r^2)^{3/2}} = \frac{1}{4\pi\epsilon_0}\frac{Qz}{\pi R^2}\frac{rdrd\theta}{(z^2+r^2)^{3/2}}[/tex]
We have to use a double integral over the radius and the angle to find the total electric field due to a uniformly charged disk:
[tex]E = \int \int dE = \frac{1}{4\pi\epsilon_0}\frac{Qz}{\pi R^2}\int\limits^{2\pi}_0 {\int\limits^R_0 {\frac{1}{(z^2+r^2)^{3/2}}} \, rdr} \, d\theta\\E = \frac{1}{2\epsilon_0}\frac{Q}{\pi R^2}[1 - \frac{1}{\sqrt{(R^2/z^2) + 1}}][/tex]
If the radius of the disk is much greater than the point z, R >> z, than the term in the denominator becomes very large, and the fraction becomes zero. In that case electric field becomes
[tex]E = \frac{1}{2\epsilon_0}\frac{Q}{\pi R^2}[/tex]
This is equal to the electric field of an infinite sheet.
As a result, the condition for the field of a disk to be equal to that of a infinite sheet is R >> z.
Two stars that are 109 km apart are viewed by a telescope and found to be separated by an angle of 10-5 radians. The eyepiece of the telescope has a focal length of 1.5 cm and the objective has a focal length of 3 meters. How far away are the stars from the observer? Give your answer in kilometers.
Answer:
x = 2 x 10¹⁶ Km
Explanation:
distance between two star,d = 10⁹ Km
separation between them, θ = 10⁻⁵ radians
focal length of the eyepiece = 1.5 cm = 0.015 m
focal length of the objective = 3 m
observer distance from star, x = ?
we know,
[tex]tan \theta = \dfrac{d}{x}[/tex]
for small angle
[tex]\theta = \dfrac{d}{x}[/tex].......(1)
angular magnification of telescope
[tex]M = \dfrac{f_{objective}}{f_{eyepiece}}=\dfrac{3}{0.015} = 200[/tex]
Angular magnification of the telescope is also calculated by
[tex]M = \dfrac{observed\ angle}{original\ angle}[/tex]
[tex]M = \dfrac{\theta_0}{\theta}[/tex]
now,
[tex]\dfrac{\theta_0}{\theta}=200[/tex]
[tex]\dfrac{\theta_0}{200}=\theta[/tex]
from equation (1)
[tex]\dfrac{\theta_0}{200}=\dfrac{d}{x}[/tex]
[tex]x=\dfrac{200d}{\theta_0}[/tex]
[tex]x=\dfrac{200\times 10^9}{10^{-5}}[/tex]
x = 2 x 10¹⁶ Km
Distance between the observer and the star is x = 2 x 10¹⁶ Km
A certain satellite has a kinetic energy of 7.5 billion joules at perigee (closest to Earth) and 6.5 billion joules at apogee (farthest from Earth). As the satellite travels from apogee to perigee, how much work does the gravitational force do on it?
Answer:
Work Done by the earth's gravitational force on the satellite as it travels from apogee to perigee is
W = F*D*Cos90° = 0
Explanation:
Although there is a change in the kinetic energy of the satellite at the apogee and perigee, the work done by the earth's gravitational force on the satellite is Zero.
W = F.D, F is the gravitational force, D is the displacement. Both F and D are vectors and perpendicular to each other. That is, the angle between F and D is 90°.
While David was riding his bike around the circular cul-de-sac by his house, he wondered if the constant circular motion was having any effect on his tires. What would be the best way for David to investigate this?
A.
Measure the circumference of the tire before and after riding.
B.
Measure the total distance traveled on his bike and divide this by how long it took him.
C.
Measure the wear on his treads before and after riding a certain number of laps.
D.
Time how long it takes him to ride 5 laps around his cul-de-sac.
Answer:
C.
Measure the wear on his treads before and after riding a certain number of laps.
Answer:
Measure the wear on his treads before and after riding a certain number of laps.
Explanation:
By riding in a circular motion the inside of the tire will be in contact with the road more than the outside of the tire. Thus, to see if the constant circular motion had any effect on his tires David should measure the tread depth on both the inside and the outside of the tires before the experiment and measure the inside and the outside of the tires (at the same location on the tires) after the experiment. Then he can compare the tread loss on the inside of the tire to the tread loss on the outside of the tire.
Air temperature in a desert can reach 58.0°C (about 136°F). What is the speed of sound (in m/s) in air at that temperature?
The speed of sound in air increases with temperature. By taking the difference between the given temperature and 0°C, then multiplying by the rate of speed increase per degree Celsius, you can find the speed of sound. This comes out to approximately 365.8 m/s at 58.0°C.
Explanation:The speed of sound in air varies depending on the temperature of the air. In general, the speed of sound increases by approximately 0.6 m/s for each degree Celsius increase in temperature. Therefore, we need to find the difference between the given temperature (58.0°C) and 0°C, which is 58, and then multiply that by 0.6 to find the increase in speed due to temperature.
Step 1: Find the temperature difference = 58.0°C - 0°C = 58°C
Step 2: Multiply the temperature difference by the rate of speed increase, which is 0.6 m/s/°C. We get: (58°C) x (0.6 m/s/°C) = 34.8 m/s.
Step 3: To find the speed of sound at the higher temperature, add this increase to the speed of sound at 0°C, which is 331 m/s.
Step 4: So, the speed of sound in air at 58.0°C is 331 m/s + 34.8 m/s = 365.8 m/s (approximately).
Learn more about Speed of Sound here:https://brainly.com/question/35989321
#SPJ11
The total electric flux from a cubical box 26.0 cm on a side is 1840 N m2/C. What charge is enclosed by the box?
Final answer:
The charge enclosed by the cubical box with a total electric flux of 1840 N·m2/C is calculated using Gauss's law and is found to be 16.29 nC.
Explanation:
The question deals with the concept of electric flux and its relation to the enclosed charge using Gauss's law, which is a fundamental principle in electromagnetism. According to Gauss's law, the total electric flux through a closed surface is equal to the charge enclosed by the surface divided by the permittivity of free space (ε0).
The formula for Gauss's law in integral form is Φ = Q / ε0, where Φ is the electric flux, Q is the charge enclosed, and ε0 is the electric constant (approximately 8.854 x 10-12 C2/N·m2). Given that the total electric flux from a cubical box is 1840 N·m2/C, and using the value of ε0, the enclosed charge (Q) can be calculated.
To find the charge, we rearrange the equation as Q = Φ·ε0 and substitute the given values to get Q = 1840 N·m2/C × 8.854 x 10-12 C2/N·m2, resulting in Q = 1.629 x 10-8 C or 16.29 nC (nanocoulombs).
The charge enclosed by the cubical box,is approximately 1.63 × 10⁻⁸ C .
To determine the charge enclosed by a cubical box, we can use Gauss's Law. According to Gauss's Law, the electric flux (Φ) through a closed surface is given by:
Φ = Q / ε₀
where:
Φ is the total electric flux (1840 N·m²/C)Q is the charge enclosed by the surfaceε₀ is the permittivity of free space (8.854 × 10⁻¹² C²/N·m²)Rearranging this formula to solve for Q, we get:
Q = Φ × ε₀
Substitute the given values:
Q = 1840 N·m²/C × 8.854 × 10⁻¹² C²/N·m²
Q ≈ 1.63 × 10⁻⁸ C
Therefore, the charge enclosed by the cubical box is approximately 1.63 × 10⁻⁸ C.
Give the name and symbol of the prefixes used with SI units to indicate multiplication by the following exact quantities. (a) 103 (b) 10−2 (c) 0.1 (d) 10−3 (e) 1,000,000 (f) 0.000001
Answer:
Please see below as the answer is self - explanatory
Explanation:
a) 10³ = kilo (kilogram = 10³ grams, kilometer= 10³ meters)
Symbol : k.
b) 10⁻² = centi (it is the 100th part of a unit, like centimeter, or centigram) Symbol: c.
c) .1 = deci (it is the tenth part (deci comes from the word that means "ten"in latin) of a unit: decimeter, decigram)
Symbol: d.
d) 10⁻3 = mili (it is a 1000th part of a unit: milimeter, miligram), the name comes from the word used in latin to mean "one thousand".
Symbol: m
e) 1,000,000 = 10⁶ = mega (megawatt)
Symbol: M
f= 0.000001 = 10⁻6 = micro (micrometer, microsecond),
Symbol: μ.