Answer: 1.6 m/s
Explanation:
The relationship between linear speed and angular speed for a rotational motion is
[tex]v=\omega r[/tex]
where
v is the linear speed
[tex]\omega[/tex] is the angular speed
r is the distance from the axis of rotation
For the vinyl record here, we have:
[tex]\omega=90 rev/min[/tex]
Keeping in mind that
[tex]1rev = 2\pi rad\\1 min =60 s[/tex]
We can convert it to rad/s:
[tex]\omega = 90 \cdot \frac{2\pi}{60}=9.4 rad/s[/tex]
The diameter of the disk is 34 cm, so the radius is
[tex]r=\frac{34}{2}=17 cm = 0.17 m[/tex]
Therefore, the linear velocity of a point on the circumference is
[tex]v=(9.4)(0.17)=1.6 m/s[/tex]
The linear velocity of a point on the circumference of the disk is approximately 1.45 meters per second.
To find the linear velocity of a point on the circumference of the disk, we need to calculate the circumference of the disk and then determine how fast a point on the edge of the disk moves in one minute.
[tex]\[ v = \frac{C}{t} \][/tex]
First, we calculate the circumference using the diameter of the disk. The radius is half of the diameter, so:
[tex]\[ r = \frac{diameter}{2} = \frac{34 \text{ cm}}{2} = 17 \text{ cm} \][/tex]
Now, the circumference is given by:
[tex]\[ C = 2\pi r = 2\pi \times 17 \text{ cm} \][/tex]
Converting centimeters to meters (1 meter = 100 centimeters), we get:
[tex]\[ C = 2\pi \times 0.17 \text{ m} \][/tex]
Next, we know that the record makes 90 rotations in a minute, so the time \( t \) for one rotation is:
[tex]\[ t = \frac{60 \text{ seconds}}{90 \text{ rotations}} \][/tex]
Now we can calculate the linear velocity \( v \):
[tex]\[ v = \frac{C}{t} = \frac{2\pi \times 0.17 \text{ m}}{\frac{60}{90} \text{ seconds}} \] \[ v = \frac{2\pi \times 0.17 \text{ m}}{\frac{2}{3} \text{ seconds}} \] \[ v = \frac{2\pi \times 0.17 \text{ m} \times 3}{2} \] \[ v = \pi \times 0.17 \text{ m} \times 3 \] \[ v = \pi \times 0.51 \text{ m} \] Using the approximation \( \pi \approx 3.14159 \), we get: \[ v \approx 3.14159 \times 0.51 \text{ m/s} \] \[ v \approx 1.594 \text{ m/s} \][/tex]
Rounding to two decimal places, the linear velocity is approximately 1.45 meters per second."
What is the change in temperature of a 2.50 L system when its volume is reduced to 1.00 L if the initial temperature was 298 K?
Answer:
-178.8 K
Explanation:
From Charles law,
V₁/T₁ = V₂/T₂.................... Equation 1
Where V₁ = Initial volume, T₁ = Initial Temperature, V₂ = Final volume, T₂ = Final Temperature.
Making T₂ the subject of the equation
T₂ = V₂T₁/V₁............... Equation 2
Given: V₂ = 1.00 L, V₁ = 2.5 L, T₁ = 298 K.
Substitute into equation 2
T₂ = 1.00(298)/2.5
T₂ = 119.2 K.
But,
Change in temperature = T₂ - T₁ = 119.2-298
Change in temperature = -178.8 K.
Hence the change in temperature = -178.8 K
The change in temperature of a system when its volume is reduced is calculated by utilizing Charles's law which states the volume of a gas is directly proportional to its absolute temperature under constant pressure.
Explanation:
To answer your query about the change in temperature when a system's volume is reduced, we would use Charles's law. Initially, the volume (V₁) is 2.50 L and the temperature (T₁) is 298 K. When the volume is reduced to 1.00 L (V₂), we're required to find the new temperature (T₂). According to Charles's law, V₁/T₁=V₂/T₂.
By manipulating this formula, we calculate the final temperature (T₂) as T₂=(V₂ * T₁)/V₁. Substituting the given values into this equation, we find T₂=(1.00 L * 298 K)/2.50 L. After performing the calculation, you will have the final temperature in Kelvin (K) when the volume is reduced to 1.00 L.
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Suppose that the resistance between the walls of a biological cell is 3.9 × 109 Ω. (a) What is the current when the potential difference between the walls is 84 mV? (b) If the current is composed of Na+ ions (q = +e), how many such ions flow in 0.73 s?
Answer:
(a) 2.154×10⁻¹¹ A.
(b) 98300000.
Explanation:
(a)
Using Ohm's law,
V = IR ........................ Equation 1
Where V = Potential difference between the walls, I = current, R = Resistance between the walls.
Make I the subject of the equation
I = V/R...................... Equation 2
Given: V = 84 mV, = 0.084 V, R = 3.9×10⁹ Ω.
Substitute into equation 2
I = 0.084/(3.9×10⁹)
I = 2.154×10⁻¹¹ A.
(b)
I = q/t
q = It .................... Equation 1
Where q = quantity of electric charge, t = time.
Given: I = 2.154×10⁻¹¹ A, t = 0.73 s.
q = 2.154×10⁻¹¹×0.73
q = 1.572×10⁻¹¹ C.
The charge on an electron e = 1.6×10⁻¹⁹ C
n = q/e
where n = number of ions.
n = 1.572×10⁻¹¹/1.6×10⁻¹⁹
n = 9.83×10⁷
n = 98300000.
The electron-volt is a unit of A. charge. B. electric potential. C. electric field. D. electric force. E. energy.
Answer:
E. Energy
Explanation:
Electron volt is a unit of energy commonly used in various branches of physics.
It is defined as the energy gained by an electron when the electrical potential of the electron increases by one volt.
The electron volt = 1.602 × 10^−12 erg, or 1.602 × 10^−19 joule
Answer:
The electron-volt is a unit of A. charge. B. electric potential. C. electric field. D. electric force. E. energy.
The answer is option E (energy)
Explanation:
There are many forms of energy which are divided into Potential Energy, Kinetic energy and the major energy sources are nonrenewable and renewable sources. Energy makes change; it does things for us. Since energy is a fundamental physical quantity, it is a property of matter that can be converted into work, heat or radiation. Energy can be converted from one form to another, but it cannot be created, nor can it be destroyed.
Energy conversion is essential for energy utilization. Energy can be measured in many different units which includes joules, calories, electron-volts, kilowatt-hours, and so many more.
The electron-volt is a unit used to measure the energy of subatomic particles. The electron-volt, symbol eV, can be defined as the amount of energy gained by the charge of a single electron (a charged particle carrying unit electronic charge) moved across an electric potential difference of one volt. One electron-volt, eV is equal to 1.602176634×10−19 J. Where J is in joules.
If a beam of electromagnetic radiation has an intensity of 120 W/m2, what is the maximum value of the electric field?
Answer:
Electric field, E = 300.65 N/C
Explanation:
Given that,
Intensity of a beam of electromagnetic radiation, [tex]I=120\ W/m^2[/tex]
We need to find the maximum value of the electric field. The intensity of electromagnetic wave in terms of electric field is given by :
[tex]I=\dfrac{1}{2}\epsilon_oE^2c[/tex]
c is the speed of light
[tex]E=\sqrt{\dfrac{2I}{\epsilon_o c}}[/tex]
[tex]E=\sqrt{\dfrac{2\times 120}{8.85\times 10^{-12}\times 3\times 10^8}}[/tex]
E = 300.65 N/C
So, the maximum value of the electric field is 300.65 N/C. Hence, this is the required solution.
The maximum value of the electric field for the given beam of electromagnetic radiation.
the electric field of an electromagnetic radiation can be calculated by,
[tex]\bold {I = \dfrac 12 \epsilon_0 E^2C}[/tex]
[tex]\bold {E = \sqrt {\dfrac {2I}{\epsilon_0 C}}}[/tex]
Where,
I - intensity of the beam = 120 W/m2
C- speed of light = [tex]\bold { 3x10^8\ m/s}}[/tex]
E - electric field
Put the value of the formula
[tex]\bold {E = \sqrt {\dfrac {2\times 20 }{8.85x10^{-12} \times 3x10^8}}}\\\\\bold {E = 300.65\ N/C}[/tex]
Therefore, the maximum value of the electric field for the given beam of electromagnetic radiation.
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You are 2m from one audio speaker and 2.1m from another audio speaker. Both generate the identical sine wave with a frequency of 680 Hz. At your location, what is the phase difference between the waves? Give the answer in radians, using 340m/s as the velocity of sound.
Answer:
the phase difference is 1.26 radian
Solution:
As per the question:
Distance, d = 2 m
Distance from the other speaker, d' = 2.1 m
Frequency, f = 680 Hz
Speed of sound, v = 340 m/s
Now,
To calculate the phase difference, [tex]\Delta \phi[/tex]:
Path difference, [tex]\Delta d = d' - d = 2.1 - 2 = 0.1\ m[/tex]
For the wavelength:
[tex]f\lambda = v[/tex]
where
c = speed of light in vacuum
[tex]\lambda [/tex] = wavelength
Now,
[tex]680\times \lambda = 340[/tex]
[tex]\lambda = 0.5\ m[/tex]
Now,
Phase difference, [tex]\Delta phi = 2\pi \frac{\Delta d}{\lambda}[/tex]
[tex]\Delta phi = 2\pi \frac{0.1}{0.5} = 1.26\ rad[/tex]
Two Resistances R1 = 3 Ω and R2 = 6 Ω are connected in series with an ideal battery supplying a voltage of ∆ = 9 Volts. Sketch this circuit diagram. Now, replace the two resistors with an equivalent resistance R connected to the same battery. Sketch this circuit. (a) What is current I in R? (b) What is the potential difference V across R? Using this information, answer the following questions about the original, two-resistor circuit. (c) What is the current I1 in R1? (d) What is the current I2 in R2? (e) What is the potential difference V1 across R1? (f) What is in the potential difference V2 across R2? (g) How are V1 and V2 related to the battery voltage? Comparing the two circuits: (h) How are I1 and I2 related to I? (i) How are V1 and V2 related to ∆?
Two Resistances R1 = 3 Ω and R2 = 6 Ω are connected in parallel with an ideal battery supplying a voltage of ∆ =
9 Volts. Now, replace the two resistors with an equivalent resistance R connected to the same battery. Sketch this circuit. (a) What is current I in R? (b) What is the potential difference V across R? Using this information, answer the following questions about the original, two-resistor circuit. (c) What is the current I1 in R1? (d) What is the current I2 in R2? (e) What is the potential difference V1 across R1? (f) What is in the potential difference V2 across R2? (g) How are V1 and V2 related to the battery voltage? Comparing the two circuits: (h) How are I1 and I2 related to I? (i) How are V1 and V2 related to ∆?
Answer:
Explanation:
Check attachment for solution
A uniformly accelerating rocket is found to have a velocity of 11.0 m/s when its height is 4.00 m above the ground, and 1.90 s later the rocket is at a height of 56.0 m. What is the magnitude of its acceleration?
Answer:
17.23 m/s²
Explanation:
Applying the equation of motion,
Δs = ut + 1/2at²..................... Equation 1
Where Δs = change in height of the rocket, u = initial velocity of the rocket, a = acceleration of the rocket, t = time
making a the subject of the equation,
a = 2(Δs-ut)/t²..................... Equation 2
Given: Δs = (56-4) m = 52 m, u = 11.0 m/s, t = 1.90 s.
Substitute into equation 2
a = 2[52-(11×1.9)]/1.9²
a = 2(52-20.9)/1.9²
a = 2(31.1)/3.61
a = 62.2/3.61
a = 17.23 m/s².
Thus the acceleration = 17.23 m/s²
Final answer:
To find the magnitude of acceleration, we used the kinematic equation s = ut + ½at². We determined the displacement due to the initial velocity and the time interval, and then solved for acceleration to find that the rocket's magnitude of acceleration is 17.2 m/s².
Explanation:
To calculate the magnitude of its acceleration, we can use the kinematic equations for uniformly accelerated motion along with the information provided about the rocket's velocity and positions at different times. We have two positions, 4.00 m and 56.0 m, and a time interval of 1.90 s. The rocket's velocity at the lower height is 11.0 m/s.
Step 1: Use the second kinematic equation
We will use the kinematic equation:
s = ut + ½at², where 's' is the displacement, 'u' is the initial velocity, 'a' is the acceleration, and 't' is the time.
Step 2: Set up the equation with the known values
Let's calculate the displacement (Δs): Δs = 56.0 m - 4.00 m = 52.0 m
Now put the known values into the equation: 52.0 m = (11.0 m/s)(1.90 s) + ½a(1.90 s)²
Step 3: Solve for acceleration 'a'
First, we calculate the distance traveled due to the initial velocity: (11.0 m/s)(1.90 s) = 20.9 m
Subtract this value from the total displacement to find the displacement caused by acceleration: 52.0 m - 20.9 m = 31.1 m
Rewrite the equation with this new information: 31.1 m = ½a(1.90 s)²
Now solve for 'a': a = (2 × 31.1 m) / (1.90 s)² = 17.2 m/s²
The magnitude of acceleration of the rocket is therefore 17.2 m/s².
A cleaner pushes a 4.50-kg laundry cart in such a way that the net external force on it is 60.0 N. Calculate the magnitude of its acceleration.
Answer:
The acceleration of the laundry cart is 13.3 m/s²
Explanation:
Hi there!
According to Newton's second law, the sum of all forces acting on an object in a given direction is equal to the mass of the object times its acceleration in that direction:
∑F = m · a
Where:
∑F = net force acting on the cart.
m = mass of the cart.
a = acceleration.
Then, solving this equation for the acceleration:
∑F / m = a
60.0 N / 4.50 kg = a
a = 13.3 m/s²
The acceleration of the laundry cart is 13.3 m/s²
Using the formula of acceleration a = F/m, where F is the net external force and m is the mass, substituting the given values yields an acceleration of 13.33 m/s².
Explanation:According to Newton's second law, the acceleration of an object as produced by a net force is directly proportional to the net force, in the same direction as the net force, and inversely proportional to the mass of the object. This can be expressed with the formula a = F/m, where F is the net external force and m is the object's mass.
Given the mass m of the laundry cart is 4.5 kg and the net external force F on the cart is 60.0 N, we can substitute these values into the formula.
Therefore, the acceleration a = F/m = 60.0 N / 4.50 kg = 13.33 m/s².
So, the magnitude of the cart's acceleration is 13.33 m/s².
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magine an astronaut on an extrasolar planet, standing on a sheer cliff 50.0 m high. She is so happy to be on a different planet, she throws a rock straight upward with an initial velocity of 20 m/s. If the astronaut were instead on Earth, and threw a ball in the same way while standing on a 50.0 m high cliff, what would be the time difference (in s) for the rock to hit the ground below the cliff in each case
Using kinematics equations, we can calculate the time for a rock to fall from the cliff on Earth. Without the value of acceleration due to gravity on the extrasolar planet, we can't quantify the time difference. A difference would exist if the gravitational accelerations of the two planets differ.
Explanation:This question pertains to kinematics and physical laws regarding free fall. On earth, when the astronaut throws a rock straight up with a certain velocity, initially, gravity will slow down the rock and finally make it fall back toward the ground. This action is governed by the equation of motion: h = vit + 1/2gt² where h is the height, vi the initial velocity, t the time and g the acceleration due to gravity on earth (-9.81 m/s²).
In the extrasolar planet scenario, considering it is not mentioned, we could assume that the acceleration due to gravity might be similar to earth's. However, without specific details about the gravity, we can still calculate the time it takes for the rock to land from the 50m high cliff using the motion equation for a free-falling body. We can conclude that if the gravity in the two settings is different, then there would be a time difference. We can’t quantify the time difference without knowing the value of the gravity on the extrasolar planet.
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If we were to construct an accurate scale model of the solar system on a football field with the Sun at one end and Neptune at the other, the planet closest to the center of the field would be (a) Earth; (b) Jupiter; (c) Saturn; (d) Uranus.
Answer:
a) Earth
Explanation:
When constructing an accurate scale model of the solar system on a football field with the Sun at one end and Neptune at the other, the planet closest to the center of the field would be Earth.
From the given options the earth is the closest planet to the center of the field. The center of the field can be considered as the sun. In reality we have mercury as the closest planet in our solar system.
A 55 kgkg meteorite buries itself 5.5 mm into soft mud. The force between the meteorite and the mud is given by F(x)F(x) = (630 N/m3N/m3 )x3x3, where xx is the depth in the mud. Find the work done on the meteorite by the mud.
Answer:
W = 1.44 10⁻⁷ J
Explanation:
The expression for the job is
W = ∫ F. dx
Where the point is the scalar product in this case the direction of the meteor and the depth is parallel, whereby the scalar product is reduced to the ordinary product
W = 630 ∫ x³ dx
W = 630 x⁴ / 4
Let's evaluate between the lower limit x = 0, w = 0 to the upper limite the point at x = 5.5 10⁻³ m
W = 157.5 ((5.5 10⁻³)⁴ -0)
W = 1.44 10⁻⁷ J
A spaceship takes off vertically from rest with an acceleration of 30.0 m/s 2 . What magnitude of force F is exerted on a 53.0 kg astronaut during takeoff?
Answer:
1590 N.
Explanation:
Force: This can be defined as the product of mass and the acceleration of a body. The S.I unit of Force is Newton (N).
The formula of force is given as
F = ma ........................ Equation 1
Where F = Force, m = mass of the astronaut, a = takeoff acceleration if the astronaut.
Given: m = 53.0 kg, a = 30 m/s²
Substitute into equation 1
F = 53(30)
F = 1590 N.
Hence the force exerted on the astronaut = 1590 N.
To calculate force, use the equation F=ma. Given an astronaut's mass of 53.0 kg and acceleration of 30.0 m/s² during a spaceship's takeoff, the exerted force totals around 1071 Newtons, subtracting the force of gravity.
Explanation:To calculate the force exerted on the astronaut, you would use the equation F=ma, where F is force, m is mass and a is acceleration. Given that the mass (m) is 53.0 kg and the acceleration (a) is 30.0 m/s², the force (F) can be calculated as follows: F = ma = (53.0 kg)(30.0 m/s²) = 1590 Newtons.
This force is a result of combining gravity and the spaceship's upward propulsion (i.e. the astronaut's weight and the force of the spaceship accelerating). The force of gravity can be calculated simply by Fgravity = mg = (53.0 kg)(9.8 m/s²) = 519.4 Newtons. Therefore, the net force exerted by the spaceship on the astronaut during takeoff is F - Fgravity = 1590N - 519.4N = 1070.6 N, rounded off to 1071 N.
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Now the same particle is removed from the thread and placed over the center of a charged plate. Are there any conditions under which it is possible for the particle to be suspended in the air above the plate? Show any relevant calculations and explain your reasoning.
Answer:
changing the direction of the electric potential, we can get the particle to be in balance between the electric force, the weight and the thrust.
Explanation:
When the particle is removed from the wire, friction can be electrically charged, either with negative charges (extra electrons) or with positive charge by electron removal, in this case when the particle is between the condenser plates it experiences a force due to the electric field given by
ΔV = E d
Where ΔV is the potential difference, d the distance between the plates and E the electric field.
In these cases we can use Newton's second law, where the acceleration is zero
[tex]F_{e}[/tex] –W + B = 0
F_{e} = W –B
q E = mg - ρ_air g V
dodne B is the hydrostatic thrust
if we know the density of the particular
ρ_particle = m / V
m = ρ_particle V
We replace
q E = g v (ρ_particle - ρ_air)
Therefore, by changing the direction of the electric potential, we can get the particle to be in balance between the electric force, the weight and the thrust.
During an auto accident, the vehicle’s air bags deploy and slow down the passengers more gently than if they had hit the windshield or steering wheel. According to safety standards, air bags produce a maximum acceleration of 60 g that lasts for only 36 ms (or less). How far (in meters) does a person travel in coming to a complete stop in 36 ms at a constant acceleration of 60 g?
Answer:
d = 0.38 m
Explanation:
As we know that the person due to the airbag action, comes to a complete stop, in 36 msec or less, and during this time, is decelerated at a constant rate of 60 g, we can find the initial velocity (when airbag starts to work), as follows:
vf = v₀ -a*t
If vf = 0, we can solve for v₀:
v₀ = a*t = 60*9.8 m/s²*36*10⁻³s = 21.2 m/s
With the values of v₀, a and t, we can find Δx, applying any kinematic equation that relates all of some of these parameters with the displacement.
Just for simplicity, we can use the following equation:
[tex]vf^{2} -vo^{2} = 2*a*d[/tex]
where vf=0, v₀ =21.2 m/s and a= -588 m/s².
Solving for d:
[tex]d = \frac{-vo^{2}}{2*a} = \frac{(21.2m/s)^{2} }{2*588 m/s2} =0.38 m[/tex]
⇒ d = 0.38 m
Answer:
A person travels 39 cm in coming to a complete stop in 36 ms at a constant acceleration of 60 g.
Explanation:
Hi there!
The equation of position of an object moving in a straight line at constant acceleration is the following:
x = x0 + v0 · t + 1/2 · a · t²
Where:
x = position at time t.
x0 = initial position.
v0 = initial velocity.
a = acceleration.
t = time.
So, let's see how much distance the person moves inside the car. Let's imagine that the person is initially at rest and suddenly is accelerated at 60 g (60 · 10 m/s² = 600 m/s²). In this case, x0 and v0 = 0 and the traveled distance will be:
x = 1/2 · 600 m/s² · (0.036)²
x = 0.39 m or 39 cm
Here, we have calculated the distance traveled by a person accelerated at 60 g from rest in 36 ms. Notice that the distance is the same if we calculate the traveled distance of a person that is brought to rest in 36 ms with an acceleration of 60 g.
A person travels 39 cm in coming to a complete stop in 36 ms at a constant acceleration of 60 g.
In the Bohr model the hydrogen atom consists of an electron in a circular orbit of radius a 0 = 5.29 × 10 − 11 m around the nucleus. Using this model, and ignoring relativistic effects, what is the speed of the electron?
To solve this problem we will apply the concept of balance of Forces in the body. For such an effect the centripetal force must be equivalent to the electrostatic force of the body, therefore
[tex]F_c = F_e[/tex]
[tex]\frac{mv^2}{r} = k \frac{q_pq_e}{r^2}[/tex]
Here
m = Mass of electron
r = Distance between them
k = Coulomb's constant
[tex]q_p[/tex] = Charge of proton
[tex]q_e[/tex] = Charge of electron
v = Velocity
Rearranging to find the velocity we have that,
[tex]v^2 = \frac{kq_pq_e}{mr}[/tex]
[tex]v = \sqrt{\frac{kq_pq_e}{mr}}[/tex]
Replacing,
[tex]v = \sqrt{\frac{(9*10^9)(1.6*10^{-19})(1.6*10^{-19})}{(9.1*10^{-31})(5.29*10^{-11})}}[/tex]
[tex]v = 2.19*10^6m/s[/tex]
Therefore the speed of the electron is [tex]2.19*10^6m/s[/tex]
A person travels by car from one city to another with differem constan1 speeds between pairs of cities. She drives for 30.0 min at 80.0 km/h, 12.0 min at 100 km/h, and 45.0 min at 40.0 km/h and spends 15.0 min eating lunch and buying ga .
(a) Determine the average peed for t he trip.
(b) Determine the d istance between the initial and final cit ies along the route.
Answer:
a.52.9 km/h
b.90 km
Explanation:
We are given that
[tex]v_1=89km/h[/tex]
[tex]t_1=30min[/tex]
[tex]v_2=100km/h[/tex]
[tex]t_2=12min[/tex]
[tex]v_3=40km/h[/tex]
[tex]t_3=45 min[/tex]
Time spend on eating lunch and buying ga=15 min.
a.Total time=30+12+45+15=102 minute=[tex]\frac{102}{60}=1.7 hour[/tex]
1 hour=60 minutes
Distance=[tex]speed\times time[/tex]
[tex]d_1=v_1\times t_1=80\times\frac{30}{60}=40km[/tex]
[tex]d_2=100\times \frac{12}{60}=20 km[/tex]
[tex]d_3=40\times \frac{45}{60}=30 km[/tex]
Total distance=[tex]d_1+d_2+d_3=40+20+30=90km[/tex]
Average speed=[tex]\frac{total\;speed}{total\;time}[/tex]
Using the formula
Average speed=[tex]\frac{90}{1.7}=52.9Km/h[/tex]
b.Total distance between the initial and final city lies along the route=90 km
A bullet is fired horizontally from the top of an ocean-based drill site. If the air resistance is negligible and the vertical distance to the water is 35.0 m, what additional information is needed to determine the time required for the bullet to hit the water? (g = 9.81 m/s2)
Answer:
no additional information required.
Explanation:
given,
vertical height, h = 35 m
acceleration due to gravity, g = 9.8 m/s²
time taken by the bullet to fall in the water = ?
initial vertical velocity of the bullet = 0 m/s
using equation of motion for the time calculation
[tex]s = ut + \dfrac{1}{2}gt^2[/tex]
[tex]h= 0\times t + \dfrac{1}{2}\times g \times t^2[/tex]
[tex]t = \sqrt{\dfrac{2h}{g}}[/tex]
[tex]t= \sqrt{\dfrac{2\times 35}{9.8}}[/tex]
t = 2.67 s
The time taken by the bullet to fall in the ocean is equal to 2.67 s.
Hence, there is no additional information required.
Two brothers push on a box from opposite directions. If one brother pushes with a force of 86 N and the other brother pushes with a force of 67 N, what is the magnitude of the net force on the box?
Answer:
R=19 N
Explanation:
Given that forces are taking opposite to each other.
Take
F₁ = 86 N ( Towards right ,take positive)
F₂ = - 67 N ( Towards left)
Given that the angle between above two forces is 180° so the resultant can be given as
Lets take the resultant = R N
R= F₁ + F₂
Now by putting the values
R= 86 N - 67 N
R=19 N
Therefore the resultant force on the block box will be 19 N.
Final answer:
The magnitude of the net force on the box is 19 N, calculated by subtracting the smaller force from the larger force since they are directed oppositely.
Explanation:
When two brothers push on a box from opposite directions, one with a force of 86 N and the other with a force of 67 N, the net force on the box is determined by subtracting the smaller force from the larger force because they are applied in opposite directions. Therefore, the magnitude of the net force on the box can be calculated as follows:
Net Force = Larger Force - Smaller Force
Net Force = 86 N - 67 N
Net Force = 19 N
Hence, the magnitude of the net force acting on the box is 19 N.
A ball is thrown upward at a speed v0 at an angle of 58.0˚ above the horizontal. It reaches a maximum height of 8.0 m. How high would this ball go if it were thrown straight upward at speed v0?
Answer:
11.245 m
Explanation:
The vertical component of the initial velocity v0 is
[tex]v_v = v_0sin58^0 = 0.848v_0[/tex]
This makes the ball reach a maximum height of 8m. If we apply the conservation law of mechanical energy, its kinetic energy is converted to potential energy when it travels to the maximum height
[tex]E_p = E_k[/tex]
[tex]mgh = mv_v^2/2[/tex]
where m is the mass and h = 8 m is the maximum vertical distance traveled, g = 9.81m/s2 is the gravitational acceleration
we can divide both sides by m
[tex]gh = v_v^2/2[/tex]
[tex](0.848v_0)^2 = 2gh = 2*9.81*8 = 156.96[/tex]
[tex]0.848v_0 = \sqrt{156.96} = 12.53[/tex]
[tex]v_0 = 12.53 / 0.848 = 14.77 m/s[/tex]
So if the ball is directed fully upward at v0 speed then we can apply the same equation to find the new H
[tex]E_p = E_k[/tex]
[tex]mgH = mv_0^2/2[/tex]
[tex]H = \frac{v_0^2}{2g} = \frac{14.77^2}{2*9.81} = \frac{218.3}{19.62} = 11.245m[/tex]
the ball would go approximately 0.454 times as high if it were thrown straight upward at speed v0 compared to when it was thrown at an angle of 58.0 degrees above the horizontal.
When a projectile is launched at an angle, its vertical motion is influenced by gravity, while its horizontal motion is independent of gravity. In this case, the ball is initially launched at an angle of 58.0 degrees above the horizontal and reaches a maximum height of 8.0 m.
If the ball were thrown straight upward at the same initial speed (v0), its vertical motion would still be influenced by gravity. In both cases, the initial vertical speed (in the upward direction) is v0. The time it takes to reach the maximum height in both scenarios would also be the same because only the vertical component of velocity affects the vertical motion.
To find how high the ball would go if thrown straight upward, you can use the following kinematic equation:
h = (v0² * sin²(θ)) / (2 * g)
Where:
h is the maximum height (which we want to find).
v0 is the initial speed (given as v0).
θ is the launch angle (58.0 degrees).
g is the acceleration due to gravity (approximately 9.81 m/s²).
First, convert the angle from degrees to radians:
θ (in radians) = 58.0 degrees * (π radians / 180 degrees) ≈ 1.01 radians
Now, plug in the values and solve for h:
h = (v0² * sin²(1.01)) / (2 * 9.81 m/s²)
h ≈ (v0² * 0.454) / 19.62 m/s²
Now, if we consider that the initial speed v0 remains the same and throw the ball straight upward (θ = 90 degrees), the equation becomes:
h_straight_up = (v0² * sin²(π/2)) / (2 * 9.81 m/s²)
h_straight_up ≈ (v0² * 1) / 19.62 m/s²
Now, compare the two expressions for h and h_straight_up:
h / h_straight_up ≈ ((v0² * 0.454) / 19.62 m/s²) / ((v0² * 1) / 19.62 m/s²)
The "v0²" terms cancel out, and you get:
h / h_straight_up ≈ 0.454 / 1
h / h_straight_up ≈ 0.454
So, the ball would go approximately 0.454 times as high if it were thrown straight upward at speed v0 compared to when it was thrown at an angle of 58.0 degrees above the horizontal.
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sinusoidal wave is described by the wave function y 5 0.25 sin (0.30x 2 40t) where x and y are in meters and t is in seconds. Determine for this wave (a) the amplitude, (b) the angular frequency, (c) the angular wave number, (d) the wavelength
For the sinusoidal wave described by y = 0.25 sin (0.30x - 40t), the amplitude is 0.25 meters, angular frequency is 40 rad/s, the angular wave number is 0.30 rad/m and the wavelength is approximately 20.94 meters.
Explanation:The given function for the sinusoidal wave is y = 0.25 sin (0.30x - 40t). We can extract the details of this wave from this function:
Amplitude (A): This is the maximum height of the wave, represented by the coefficient before the sin function. Here, A = 0.25 meters. Angular frequency (w): This value is associated with the 't' term in the function and represents how the wave frequency changes with time. So, w = 40 rad/s. Angular wave number (K): This is the coefficient of the 'x' term, providing a measure of the wave's spatial frequency. In this case, k = 0.30 rad/m.Wavelength (λ): It is connected to the angular wave number by the relation λ = 2π/k. Substituting the value of k, we get λ = 2π/0.30 = approximately 20.94 meters. Learn more about Sinusoidal Wave here:https://brainly.com/question/33443431
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A major league baseball pitcher throws a pitch that follows these parametric equations: x(t) = 142t y(t) = –16t2 + 5t + 5. The time units are seconds and the distance units are feet. The distance between the location of the pitcher and homeplate (where the batter stands) is 60.5 feet. Give EXACT answers, unless instructed otherwise. (a) Calculate the horizontal velocity of the baseball at time t; this is the function x'(t)= 142 Correct: Your answer is correct. ft/sec. (b) What is the horizontal velocity of the baseball when it passes over homeplate? 142 Correct: Your answer is correct. ft/sec (c) What is the vertical velocity of the baseball at time t; this is the function y'(t)= $$−32t+5 Correct: Your answer is correct. -32t +5 ft/sec. (d) Recall that the speed of the baseball at time t is s(t)=√ [x '(t)]2 + [y ' (t)]2 ft/sec. What is the speed of the baseball (in mph) when it passes over homeplate? $$1 Incorrect: Your answer is incorrect. (sqrt(142*142 +((-1936/142) + 5)**2)*(360/528)) mph. (e) At what time does the baseball hit the ground, assuming the batter and catcher miss the ball? $$1.1 Incorrect: Your answer is incorrect. (5+sqrt(5**2 + 320))/32 sec. (f) What is the magnitude of the angle at which the baseball hits the ground? 0.12 Incorrect: Your answer is incorrect. rad. (This is the absolute value of the angle between the tangential line to the path of the ball and the ground. Give your answer in radians to three decima
The question involves calculations using the principles of projectile motion and 2D kinematics to understand the trajectory of a baseball pitch. Values include horizontal and vertical velocity changes over time, the exact speed of the baseball and the angle at which baseball hits the ground.
Explanation:The question involves the physics of projectile motion, specifically applied to the trajectory of a pitch in baseball. The parameters of this problem can be solved using the kinematic equations and principles that govern 2D motion.
(1) To solve part (a), one must understand that for such problems involving gravity, the x (horizontal) component of the object's velocity remains constant throughout the motion, in this case 142 ft/sec. This fact is obtained from the equation x(t) = v_xt, where v_x is the constant x-component (horizontal) of velocity.
(2) For part (b), similarly, the x-component of the velocity remains same at any point in trajectory, including when it passes over home plate, so it is again 142 ft/sec.
(3) For part (c), the derivative of y(t) -16t^2 + 5t + 5 needs to be found to get the y-component (vertical) of velocity which is -32t + 5. This is because as the object moves under the effect of gravity, vertical velocity changes with time.
(4) For part (d), the magnitude of the speed at any time can be found by taking the square root of the sum of squares of x and y-components of velocity. (5) Part (e), seeks the time when the baseball hits the ground. The equation of vertical motion -16t^2 + 5t + 5 = 0 should be used, as the height of the object from ground is 0 when it hits the ground. Solving for t would give that time.
End of the problem involves understanding some trigonometric relationships to calculate the angle (in radians).
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A frictionless piston-cylinder device contains air at 300 K and 1 bar and is heated until its volume doubles and the temperature reaches 600 K. Answer the following: A. You are interested in studying the air in the piston-cylinder device as a closed system. Draw a schematic of your device and the boundary that defines your system. Assume the cylinder is in horizontal position. B. Determine the final pressure of the air at the end of the process, in bar. Hint: use the ideal gas law equation. If you need the value for the universal gas constant ???????? ????in your textbook or in a chemistry book (or on-line). Just make sure your units are dimensionally correct. C. On a different occasion (different temperature and pressure), you find the piston-cylinder device contains 0.5 kmol of H2O occupying a volume of 0.009 m3. Determine the weight of the H2O in N. Hint: Start with the relationship between number of moles, molecular mass and mass. D. Determine the specific volume of the H2O (from Part C) in m3/kg.
Answer:
Part a: The schematic diagram is attached.
Part b: The pressure at the end is 1 bar.
Part c: Weight of 0.5kmol of water is 88.2 N.
Part d: The specific volume is 0.001 m^3/kg
Explanation:
Part aThe schematic is given in the diagram attached.
Part bPressure is given using the ideal gas equation as
Here
P_1=1 barP_2=? to be calculatedV_2=2V_1T_1=300KT_2=600K[tex]\frac{P_1V_1}{T_1}=\frac{P_2V_2}{T_2}\\\frac{1\times V_1}{300}=\frac{P_2\times 2V_1}{600}\\P_2=\frac{600}{600}\\P_2=1 bar[/tex]
So the pressure at the end is 1 bar.
Part cMass of 0.5kmol is given as follows
[tex]Mass=n_{moles} \times Molar \, Mass\\Mass=0.5 \times 10^3 \times 18 \times 10^{-3}\\Mass=9.0 kg[/tex]
Weight is given as
[tex]W=mxg\\W=9 \times 9.8\\W=88.2 \, N[/tex]
So weight of 0.5kmol of water is 88.2 N.
Part dSpecific volume is given as
[tex]v=\frac{Volume}{Mass}\\v=\frac{0.009}{9}\\v=0.001 m^3/kg[/tex]
So the specific volume is 0.001 m^3/kg
A. Draw a schematic of the system with a boundary around the piston-cylinder device. B. The final pressure can be determined using the ideal gas law equation. C. The weight of H2O can be calculated using the relationship between moles, molecular mass, and mass. D. The specific volume of H2O can be determined by dividing the volume by the mass.
Explanation:A. To study the air in the piston-cylinder device as a closed system, we consider the device itself as the system and draw a boundary around it, including the air inside and excluding the surroundings. The schematic would show a cylindrical container with a piston separating the initial and final air volumes.
B. To determine the final pressure of the air, we can use the ideal gas law. The equation is PV = nRT, where P is pressure, V is volume, n is the number of moles of gas, R is the ideal gas constant, and T is temperature. Since the volume doubles and the temperature increases to 600 K, we can set up the equation (1 bar)(2V) = n(R)(600 K), and solve for the final pressure.
C. To determine the weight of H2O in the piston-cylinder device, we use the relationship between number of moles, molecular mass, and mass. The weight of H2O in N can be calculated as (0.5 kmol)(molecular mass of H2O)(Acceleration due to gravity).
D. The specific volume of H2O can be determined by dividing the volume (0.009 m3) by the mass of H2O (which we can calculate from the number of moles and molecular mass).
A firm wants to determine the amount of frictional torque in their current line of grindstones, so they can redesign them to be more energy efficient. To do this, they ask you to test the best-selling model, which is basically a diskshaped grindstone of mass 1.3 kg and radius 8.50 cm which operates at 700 rev/min. When the power is shut off, you time the grindstone and find it takes 41.3 s for it to stop rotating.
Answer:
0.00833542627085 Nm
Explanation:
[tex]\omega_f[/tex] = Final angular velocity = 700 rpm
[tex]\omega_i[/tex] = Initial angular velocity
[tex]\alpha[/tex] = Angular acceleration
m = Mass of stone = 1.3 kg
r = Radius = 8.5 cm
[tex]\omega_f=\omega_i+\alpha t\\\Rightarrow \alpha=\dfrac{\omega_f-\omega_i}{t}\\\Rightarrow \alpha=\dfrac{0-700\dfrac{2\pi}{60}}{41.3}\\\Rightarrow \alpha=-1.77491110372\ rad/s^2[/tex]
Torque is given by
[tex]\tau=-I\alpha\\\Rightarrow \tau=-\dfrac{1}{2}mr^2\alpha\\\Rightarrow \tau=-\dfrac{1}{2}1.3\times 0.085^2\times -1.77491110372\\\Rightarrow \tau=0.00833542627085\ Nm[/tex]
The frictional torque is 0.00833542627085 Nm
If we increase the temperature in a reactor by 54degrees Fahrenheit [°F], how many degrees Celsius [°C] will the temperature increase?
Answer:
If we increase the temperature in a reactor by 54 degrees Fahrenheit [54°F], the temperature will increase by 12.22 degrees Celsius [12.22 ⁰C]
Explanation:
To determine the number of degrees Celsius the temperature will be increased, we convert from Fahrenheit to Celsius.
Converting from Fahrenheit to degree Celsius
54°F -----> °C
54 = 1.8°C + 32
54-32 = 1.8°C
22 = 1.8°C
°C = 22/1.8
= 12.22 °C
Thus, 54°F -----> 12.22 °C
Therefore, If we increase the temperature in a reactor by 54degrees Fahrenheit [54°F], the temperature will increase by 12.22 degrees Celsius [12.22 ⁰C]
12.22°C
Explanation:The temperature increase in the reactor is 54°F
Now let's convert this to °C using the following relation;
(x − 32) × 5/9 = y -------------------(i)
Where;
x is the value of the degree Fahrenheit = 54
y is the value of its corresponding degree Celsius.
Substitute x = 54 into equation (i)
(54 − 32) × 5/9 = y
(22) × 5/9 = y
Solve for y;
y = 22 x 5/9
y = 12.22°C
Therefore, the increase in temperature of the reactor in °C is 12.22
The following conversions occur frequently in physics and are very useful. (a) Use 1 mi = 5280 ft and 1 h = 3600 s to convert 60 mph to units of ft/s. (b) The acceleration of a freely falling object is 32 ft/s2. Use 1 ft = 30.48 cm to express this acceleration in units of m/s2. (c) The density of water is 1.0 g/cm3. Convert this density to units of kg/m3.
To solve this exercise we will define the units of conversion between each of the variables given to facilitate the calculation in each section.
[tex]1 mile = 5280ft[/tex]
[tex]1h = 3600s[/tex]
[tex]1 ft = 30.48cm[/tex]
[tex]1 m = 100cm[/tex]
[tex]1kg = 1000g[/tex]
PART A ) For this part we have 60mph to ft/s, then
[tex]60mph = 60\frac{miles}{hour} (\frac{5280ft}{1mile})(\frac{1h}{3600s})[/tex]
[tex]60mph = 88ft/s[/tex]
PART B) Convert from [tex]ft/s^2[/tex] to [tex]m/s^2[/tex]
[tex]32ft/s^2 = 32 \frac{ft}{s^2} (\frac{30.48cm}{1ft})(\frac{1m}{100cm})[/tex]
[tex]32ft/s^2 = 9.7536m/s^2[/tex]
PART C) Convert [tex]g/cm^3[/tex] to [tex]kg/m^3[/tex]
[tex]1 g/cm^3 = 1\frac{g}{cm^3}(\frac{1kg}{1000g})(\frac{100cm}{1m})^3[/tex]
[tex]1 g/cm^3 = 1000kg/m^3[/tex]
Based on the conversion factors, the conversions are as follows:
60 mph = 88 ft/s32 ft/s² = 9.75 m/s²1 g/cm³ = 1000 Kg/m³What are the conversions for the given units?Conversions are used when converting between different units measuring the same quantity.
a. To convert 60 mph to ft/s:
1 mi = 5280 ft 1 h = 360060 mph = 60 * 5280/3600
60 mph = 88 ft/s
b. To convert 32 ft/s² to m/s
1 ft = 30.48 cm = 0.3048 m
32 ft/s² = 32 * 0.3034
32 ft/s² = 9.75 m/s²
c. To convert g/cm³ to kg/m³
1 g = 0.001 kg
1 cm³ = 0.000001 m³
1.0 g/cm3 = 1.0 * 0.001 kg/0.000001 m³
1 g/cm³ = 1000 Kg/m³
Therefore, the conversions are as follows:
60 mph = 88 ft/s32 ft/s² = 9.75 m/s²1 g/cm³ = 1000 Kg/m³Learn more about unit conversions at: https://brainly.com/question/174910
Suppose the rocket is coming in for a vertical landing at the surface of the earth. The captain adjusts the engine thrust so that rocket slows down at the rate of 2.05 m/s2 . A 6.50-kg instrument is hanging by a vertical wire inside a space ship.Find the force that the wire exerts on the instrument.
Answer:
R= 78.32 N
Explanation:
Given that
Acceleration ,a= 2.05 m/s²
Mass , m = 6.5 kg
The force due to acceleration
F= mass x Acceleration
F= ma
F= 6.5 x 2.05 N
F= 13.32 N
The force due to weight
F' = m g
F' = 6.5 x 10 N ( take g= 10 m/s²)
F'= 65 N
Therefore the net total force will be summation of force due to weight and force due to acceleration
R= F + F'
R= 65 + 13.32 N
R= 78.32 N
The force that the wire exerts on the instrument is R= 78.32 N
Calculation of force:
Given that
Acceleration ,a= 2.05 m/s²Mass , m = 6.5 kgThe force due to accelerationSince The force due to weight
[tex]F= ma\\\\F= 6.5 \times 2.05 N\\\\F= 13.32 N[/tex]
Now
[tex]F' = m g\\\\F' = 6.5 \times 10 N ( take\ g= 10 m/s^2)[/tex]
F'= 65 N
Now
R= F + F'
R= 65 + 13.32 N
R= 78.32 N
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What angular speed (in revolutions per minute) is needed for a centrifuge to produce an acceleration of 759 times the gravitational acceleration 9.8 m/s 2 at a radius of 4.83 cm ?
Answer:
Angular velocity, [tex]\omega=3747.33\ rev/min[/tex]
Explanation:
In this case, we need to find the angular speed needed for a centrifuge to produce an acceleration of 759 times the gravitational acceleration.
Radius of the circular path, r = 4.83 cm
The acceleration acting on the particle in circular path is given by :
[tex]a=r\omega^2[/tex]
[tex]\omega[/tex] is the angular speed in rad/s
[tex]\omega=\sqrt{\dfrac{a}{r}}[/tex]
[tex]\omega=\sqrt{\dfrac{759\times 9.8}{4.83\times 10^{-2}}}[/tex]
[tex]\omega=392.42\ rad/s[/tex]
or
[tex]\omega=3747.33\ rev/min[/tex]
So, there are 3747.33 revolutions per minute that is needed. Hence, this is the required solution.
A circular tube is subjected to torque T at its ends. The resulting maximum shear strain in the tube is 0.005. Calculate the minimum shear strain in the tube and the shear strain at the median line of the tube section.
Answer:
The minimum shear strain in the tube is [tex]4.162\times10^{-3}[/tex]
The shear strain at the median line of the tube section is [tex]9.15\times10^{-3}[/tex]
Explanation:
Given that,
Maximum shear strain = 0.005
We need to calculate the minimum shear strain
Using formula of maximum shear strain
[tex]\gamma_{max}=\dfrac{d_{2}}{2}\times\theta[/tex]
[tex]\theta=\dfrac{2\times\gamma_{max}}{d_{2}}[/tex]
Where, [tex]\gamma_{max}[/tex]=maximum shear strain
[tex]\theta[/tex]=angle of twist
[tex]d_{2}[/tex]= diameter
Put the value into the formula
[tex]\theta=\dfrac{2\times0.005}{3}[/tex]
[tex]\theta=0.00333\ rad[/tex]
[tex]\theta=3.33\times10^{-3}\ rad[/tex]
Now, Using formula of minimum shear strain
[tex]\gamma_{min}=\dfrac{d_{1}}{2}\times\theta[/tex]
Put the value into the formula
[tex]\gamma_{min}=\dfrac{2.5}{2}\times3.33\times10^{-3}[/tex]
[tex]\gamma_{min}=0.0041625[/tex]
[tex]\gamma_{min}=4.162\times10^{-3}[/tex]
We need to calculate the shear strain at the median line of the tube section
Using formula of shear strain at the median line
[tex]\gamma=\dfrac{d_{1}+d_{2}}{2}\times\theta[/tex]
Put the value into the formula
[tex]\gamma=\dfrac{2.5+3}{2}\times3.33\times10^{-3}[/tex]
[tex]\gamma=0.0091575[/tex]
[tex]\gamma=9.15\times10^{-3}[/tex]
Hence, The minimum shear strain in the tube is [tex]4.162\times10^{-3}[/tex]
The shear strain at the median line of the tube section is [tex]9.15\times10^{-3}[/tex]
Explanation of how to calculate the minimum shear strain and the shear strain at the median line in a circular tube subjected to torque.
Shear Strain Calculations:
Minimum shear strain can be calculated using the formula: minimum shear strain = maximum shear strain / 2Shear strain at the median line of the tube section is calculated when shear strain is maximum/2, therefore it is 0.005 / 2 = 0.0025
A steam catapult launches a jet aircraft from the aircraft carrier john C. Stennis, giving it a peed of 175 mi/h in 2.50 . (a) Find the average acceleration of the plane. (b) Assuming the acceleralion is conslant, find lhe dislance the plane moves.
Answer
given,
Speed of the Aircraft,v = 175 mi/h
1 mi/h = 0.44704 m/s
175 mi/h = 78.232 m/s
time, t = 2.5 s
a) average acceleration = ?
[tex]a= \dfrac{v - u}{t}[/tex]
[tex]a= \dfrac{78.232 - 0}{2.5}[/tex]
a = 31.29 m/s²
b) Distance traveled by the Pane
using equation of motion
v² = u² + 2 a s
78.232² = 0² + 2 x 31.29 x s
s = 97.79 m
Distance moved by the plane is equal to 97.79 m
A river flows due east with a speed of 3.00 m/s relative to earth. The river is 80.0 m wide. A woman starts at the southern bank and steers a motorboat across the river; her velocity relative to the water is 5.00 m/s due north. How far east of her starting point will she reach the opposite bank?
Answer:
48 m
Explanation:
As she travels at the rate of 5m/s due north, the amount of time it would take for her to cross the 80m wide river would be
t = 80 / 5 = 16 seconds
This is also the time it takes for the river to push her to the east side at the rate of 3m/s. So after 16 seconds, she would reach the opposite point at a horizontal distance from her starting of
s = 16*3 = 48 m