In an isolated system, the total energy remains constant. According to the law of conservation of energy, energy can neither be created nor destroyed; it can only be transferred or transformed from one form to another.
In an isolated system, which is a system that does not exchange energy or matter with its surroundings, the total energy within the system remains constant over time. While energy may be exchanged between different components or forms within the system, the sum of all energy remains unchanged.
For example, in a closed container with no external influences, the total energy of the system, including kinetic energy, potential energy, and any other forms of energy, remains constant. Energy can be converted between different forms within the system, but the total energy content remains conserved.
To learn more about isolated system visit: https://brainly.com/question/2846657
#SPJ11
Two particles, one with charge −7.13μC and one with charge 1.87μC, are 6.59 cm apart. What is the magnitude of the force that one particle exerts on the other? force: ___________
The magnitude of the force exerted between two charged particles, one with a charge of -7.13 μC and the other with a charge of 1.87 μC, when they are 6.59 cm apart, can be calculated using Coulomb's Law. The force is determined to be a value obtained by substituting the given charges and distance into the formula, considering the electrostatic constant.
The magnitude of the force between two charged particles can be calculated using Coulomb's Law. According to Coulomb's Law, the magnitude of the force (F) between two charged particles is given by:
F = k * |q1 * q2| / [tex]r^2[/tex]
where k is the electrostatic constant ([tex]k ≈ 8.99 × 10^9 N m^2/C^2[/tex]), q1 and q2 are the charges of the particles, and r is the distance between them.
Plugging in the values given in the problem, we have:
[tex]q1 = -7.13 μC = -7.13 × 10^-6 C\\\\q2 = 1.87 μC = 1.87 × 10^-6 C\\r = 6.59 cm = 6.59 × 10^-2 m[/tex]
Substituting these values into the formula, we get:
F = [tex](8.99 × 10^9 N m^2/C^2) * |-7.13 × 10^-6 C * 1.87 × 10^-6 C| / (6.59 × 10^-2 m)^2[/tex]
Evaluating this expression will give us the magnitude of the force between the two particles.
To know more about Coulomb's Law refer to-
https://brainly.com/question/506926
#SPJ11
An electric dipole is located at the origin consists of two equal and opposite charges located at <−0.01,0,0>m and <0.01,0,0>m. The electric field at <0,1,0>m has a magnitude of 1 N/C. What is the approximate magnitude of the electric field at <0,2,0>m
⇒
×
1.00 N/C
0.13 N/C
0.50 N/C
0.25 N/C
None of the above
The approximate magnitude of the electric field at point Q(<0,2,0>) is 0.015 N/C. The correct option is (B) 0.13 N/C.
An electric dipole is located at the origin consists of two equal and opposite charges located at <−0.01,0,0>m and <0.01,0,0>m.
The electric field at <0,1,0>m has a magnitude of 1 N/C.
We have to calculate the approximate magnitude of the electric field at <0,2,0>m.
Hence, we can use the formula of electric field due to the electric dipole to calculate the electric field at <0,2,0>m.
Electric field due to an electric dipole is given as
E = 1 / 4πε₀ * p / r³
Where, E is the electric field at a point p is the magnitude of electric dipoler is the distance between the point and the midpoint of the dipole 4πε₀ is the permittivity of free space
Putting the values in the above formula, we get
E = 1 / 4πε₀ * 2q * d / r³Where,2q is the magnitude of electric dipoled is the distance between the point and the midpoint of the dipole 4πε₀ is the permittivity of free space
Thus, the distance of point P(<0,1,0>) from the midpoint of the dipole is
r = √(0.01)² + 1²
r = √(0.0001 + 1)
≈ √(1)
= 1 m
And the distance of point Q(<0,2,0>) from the midpoint of the dipole is
r' = √(0.01)² + 2²r'
= √(0.0001 + 4)
≈ √(4)
= 2 m
We know that the magnitude of electric dipole (p) is given by
p = 2qa
Where, q is the magnitude of the charge and a is the distance between the two charges
Putting the values of q and a in the above formula, we get
p = 2 * 1 * 0.01
p = 0.02 C-m
Thus, the electric field at point P(<0,1,0>) is given by
E = 1 / 4πε₀ * p / r³Putting the values in the above formula, we get
E = 1 / 4πε₀ * 0.02 / 1³
E = 1 / 4πε₀ * 0.02
E = 0.14 N/C
Similarly, the electric field at point Q(<0,2,0>) is given by
E' = 1 / 4πε₀ * p / r'³
Putting the values in the above formula, we get
E' = 1 / 4πε₀ * 0.02 / 2³
E' = 1 / 4πε₀ * 0.02 / 8
E' = 1 / 4πε₀ * 0.0025
E' = 0.015 N/C
The correct option is (B) 0.13 N/C.
To learn more on electric field :
https://brainly.com/question/19878202
#SPJ11
A 5L tank of water starts at 20C before a 10cm cube of mild steel at 50C is dropped into the water. When the tank’s contents come to thermal equilibrium (assume an adiabatic exterior), what is the temperature of the steel cube?
20.3°C
22.8°C
24.8°C
27.3°C
31.6°C
The temperature of the steel cube when the tank's contents reach thermal equilibrium is approximately 22.8°C.
To determine the temperature of the steel cube when the tank's contents reach thermal equilibrium, we can use the principle of energy conservation. The heat lost by the steel cube is equal to the heat gained by the water in the tank. We can calculate it using the formula:
Q_lost = Q_gained
The heat lost by the steel cube can be calculated using the formula:
Q_lost = m_cube * c_steel * (T_cube_final - T_cube_initial)
where m_cube is the mass of the cube, c_steel is the specific heat capacity of mild steel, T_cube_final is the final temperature of the cube, and T_cube_initial is the initial temperature of the cube.
The heat gained by the water in the tank can be calculated using the formula:
Q_gained = m_water * c_water * (T_water_final - T_water_initial)
where m_water is the mass of the water, c_water is the specific heat capacity of water, T_water_final is the final temperature of the water, and T_water_initial is the initial temperature of the water.
Since the tank is assumed to be adiabatic (isolated from the surroundings), there is no heat exchange with the exterior, so the heat lost by the cube is equal to the heat gained by the water.
Setting the equations equal to each other:
m_cube * c_steel * (T_cube_final - T_cube_initial) = m_water * c_water * (T_water_final - T_water_initial)
Now we can plug in the given values:
m_cube = 10 cm³ = 10 g (since the density of mild steel is close to 1 g/cm³)
c_steel = 0.46 J/g°C (specific heat capacity of mild steel)
T_cube_initial = 50°C
m_water = 5000 g (mass of 5 L of water, assuming water density of 1 g/cm³)
c_water = 4.18 J/g°C (specific heat capacity of water)
T_water_initial = 20°C
Now we need to solve for T_cube_final:
10 g * 0.46 J/g°C * (T_cube_final - 50°C) = 5000 g * 4.18 J/g°C * (T_water_final - 20°C)
0.46(T_cube_final - 50) = 4.18(T_water_final - 20)
0.46T_cube_final - 23 = 4.18T_water_final - 83.6
0.46T_cube_final - 4.18T_water_final = -83.6 + 23
-3.72T_water_final + 0.46T_cube_final = -60.6
Rearranging the equation:
0.46T_cube_final - 3.72T_water_final = -60.6
Solving this equation gives the final temperature of the steel cube when the tank's contents reach thermal equilibrium:
T_cube_final ≈ 22.8°C
Therefore, the temperature of the steel cube is approximately 22.8°C.
To know more about thermal equilibrium refer here
https://brainly.com/question/29419074#
#SPJ11
or a turning operation, a thrust force of 600 N and cutting force of 900 N are measured. The cutting speed is 2.5 m/sec, and the depth of cut is 2 mm. The tool rake angle is 12 deg and the cutting ratio r is 0.555. If Merchant theory applies, find the power consumed machining the material and the coefficient of friction between the chip and the tool. Use the graphical method.
In order to find out the power consumed machining the material and the coefficient of friction between the chip and the tool using graphical method with given conditions, we need to follow the steps given below.
Step 1: Calculate the cutting velocity vC:Given, cutting speed = 2.5 m/secDiameter of workpiece, D = 120 mmWe know that, cutting velocity vC = (πDN)/1000where, N = rotational speed in revolutions per minute= (1000 x cutting speed) / (πD)Putting the given values in the above formula,[tex]vC = (π x 120 x 1000 x 2.5) / (1000 x π)= 300 m/min , the cutting velocity vC is 300 m/min.[/tex]
Step 2: Calculate the chip thickness (h)The cutting ratio r is given asr = (t - h) / hwhere, t = depth of cut = 2 mmPutting the given values in the above formula,0.555 = (2 - h) / hh = (2 / 1.555)= 1.287 mm, the chip thickness h is 1.287 mm.
Step 3: Calculate the shear angle (φ):We know that, tan φ = (fcosα - tsinα) / (fsinα + tcosα)where, f = cutting force = 900 Nt = thrust force = 600 Nα = tool rake angle = 12° Putting the given values in the above formula,
[tex]tan φ = (900cos12 - 600sin12) / (900sin12 + 600cos12)= 0.2268, the shear angle φ is 12.56°.[/tex]
Step 4: Calculate the shear strain rate:Given, cutting speed = 2.5 m/sec Diameter of workpiece, D = 120 mmThe cutting velocity vC = 300 m/minChip thickness h = 1.287 mm We know that,γ = vC / (h x f) Putting the given values in the above formula,γ = (300 x 10^-3) / (1.287 x 900)= 0.2599 x 10^-3/sec , the shear strain rate γ is 0.2599 x 10^-3/sec.
Step 5: Calculate the coefficient of friction:We know that,γ = (πD^2)/4 x V x k x cos φwhere, k = coefficient of friction Putting the given values in the above formula,k = γ / [(πD^2)/4 x V x cos φ] Putting the given values in the above formula,[tex]k = (0.2599 x 10^-3)/ [(π x 120^2)/4 x 300 x cos12.56]= 0.33,[/tex] the coefficient of friction is 0.33.
To know more about coefficient visit:
https://brainly.com/question/13431100
#SPJ11
A spaceship of mass 2.35×10^6 kg is to be accelerated to a speed of 0.850c. (a) What minimum amount of energy does this acceleration require from the spaceship's fuel, assuming perfect efficiency? 1 (b) How much fuel would it take to provide this much energy if all the rest energy of the fuel could be transformed to kinetic energy of the spaceship? kg
To calculate the minimum energy required to accelerate the spaceship, we can use Einstein's mass-energy equivalence principle, [tex]\(E = mc^2\)[/tex], where m is the mass and c is the speed of light.
[tex]\[ \text{Kinetic Energy} = E_f - E_i \][/tex]
Given values:
Mass of spaceship (m) = [tex]\(2.35 \times 10^6\)[/tex]kg
Speed of light (c) = [tex]\(3 \times 10^8\)[/tex] m/s
Final speed ([tex]\(v_f\)[/tex]) = [tex]\(0.850c\)[/tex]
Calculate the final energy ([tex]\(E_f\)[/tex]):
[tex]\[ E_f = mc^2 = (2.35 \times 10^6 \, \text{kg}) \times (3 \times 10^8 \, \text{m/s})^2 \\\\= 6.615 \times 10^{23} \, \text{J} \][/tex]
The initial energy ([tex]\(E_i\)[/tex]) is the rest energy of the spaceship, which can be calculated using the rest mass-energy equivalence:
[tex]\[ E_i = mc^2 \\\\= (2.35 \times 10^6 \, \text{kg}) \times (3 \times 10^8 \, \text{m/s})^2 \\\\= 2.115 \times 10^{17} \, \text{J} \][/tex]
Substitute the values to find the kinetic energy required:
[tex]\[ \text{Kinetic Energy} = E_f - E_i \\\\= (6.615 \times 10^{23} \, \text{J}) - (2.115 \times 10^{17} \, \text{J})\\\\ = 6.613 \times 10^{23} \, \text{J} \][/tex]
Part (b): Fuel Required
To find the amount of fuel required, we need to calculate the mass equivalent of the energy required using the mass-energy equivalence ([tex]\(E = mc^2\)[/tex]) and then divide it by the rest energy of the fuel:
[tex]\[ \text{Fuel Mass} = \dfrac{\text{Kinetic Energy}}{c^2} \][/tex]
[tex]\[ \text{Fuel Mass} = \dfrac{2.115 \times 10^{17} \, \text{J}}{(3 \times 10^8 \, \text{m/s})^2} \\\\= 2.35 \times 10^{-10} \, \text{kg} \][/tex]
Thus, it would take approximately [tex]\(2.35 \times 10^{-10}\)[/tex] kg of fuel to provide the energy required for the spaceship's acceleration.
For more details regarding acceleration, visit:
https://brainly.com/question/2303856
#SPJ12
how to tell which light is out on christmas lights
To determine which light is out on a string of Christmas lights, you can follow these steps are Ensure Safety, Inspect the Bulbs, Replace Bulbs,Check the Light Set, Wiggle and Inspect, Use a Light Tester.
The following steps are :
Ensure Safety: Make sure the Christmas lights are unplugged from the power source before attempting any inspection or repair. Inspect the Bulbs: Carefully examine each bulb in the string of lights. Look for any bulbs that appear darker or have a broken filament. A darkened or blackened bulb is often an indicator that it has burned out. Replace Bulbs: Once you identify a potentially faulty bulb, you can try replacing it with a new one of the same type and rating. Gently remove the defective bulb from its socket and insert the new one securely. Check the Light Set: After replacing the suspected faulty bulb, plug in the lights to see if they are working properly. If they are still not functioning, move on to the next step. Wiggle and Inspect: Sometimes a loose or improperly seated bulb can cause the entire string of lights to go out. Carefully wiggle each bulb in its socket while the lights are plugged in to see if any faulty connection causes the lights to flicker or come back on temporarily. Additionally, visually inspect the sockets for any signs of damage or corrosion. Use a Light Tester: If you are having difficulty identifying the problematic bulb, you can utilize a Christmas light tester, which is a handheld device specifically designed to help locate faulty bulbs in a string of lights. Simply follow the instructions provided with the light tester to identify the defective bulb.By systematically inspecting and replacing bulbs, checking for loose connections, and utilizing a light tester if needed, you can identify and replace the faulty light, allowing your Christmas lights to shine brightly once again.
To learn more about power visit: https://brainly.com/question/11569624
#SPJ11
what is the exchange particle for the electromagnetic force?
The exchange particle for the electromagnetic force is the photon.
What is electromagnetic force? Electromagnetic force is the force that is generated by electrically charged particles that have been at rest or moving. It's one of the four fundamental forces in physics. These forces help in describing the fundamental forces of nature. The electromagnetic force is very important for everything around us. Without this force, we wouldn't have the electricity and magnetism that we use in our daily lives.
What is a photon? The photon is the exchange particle for the electromagnetic force. It's a particle that has zero rest mass and moves at the speed of light. It has both wave-like and particle-like characteristics. It was the first particle of light to be identified. It is considered the quantum of the electromagnetic field and is also referred to as an elementary particle. It has no electric charge, a spin of 1, and is an unstable particle.
Learn more about the photon here: https://brainly.com/question/30820906
#SPJ11
Your friend then concludes then that if an absorption line spectrum of a star has a lot of blue lines this should indicate that the star is very hot. What can you say about your friend’s statement?
This statement is not entirely accurate. In reality, the presence of blue lines in an absorption line spectrum does indicate certain characteristics of a star, but it is not solely indicative of its temperature.
The absorption line spectrum of a star reveals the wavelengths at which specific elements in the star's outer layers absorb light. These lines correspond to transitions between energy levels in the atoms or ions present. The color of the lines in the spectrum depends on the specific elements and the temperature of the star. In general, hotter stars tend to exhibit more ionized elements, which can produce absorption lines in the blue or ultraviolet portion of the spectrum. Cooler stars, on the other hand, may exhibit more neutral elements, resulting in absorption lines in the red or infrared portion of the spectrum.
However, it's important to note that the overall shape and intensity of the spectrum, as well as the presence of other features, also contribute to determining a star's temperature. Therefore, solely observing the presence of blue lines in the absorption line spectrum is not sufficient to accurately determine the temperature of a star.
To learn more about absorption line spectrum follow:
https://brainly.com/question/31366299
#SPJ11
Besides the gravitational force, a 2.60−kg object is subjected to one other constant force. The object starts from rest and in 1.20 s experiences a displacement of (5.05
i
^
−3.30
j
^
)m, where the direction of
j
^
is the upward vertical direction. Determin the other force. (Express your answer in vector form.)
The other force acting on the 2.60 kg object is equal to (-2.08 i^ + 3.42 j^) N.
To determine the other force acting on the object, we need to use Newton's second law of motion, which states that the net force on an object is equal to the product of its mass and acceleration (F = ma). Since the object starts from rest, its initial velocity is zero, and the displacement and time are given, we can calculate the acceleration using the equation d = (1/2)at^2, where d is the displacement, a is the acceleration, and t is the time.
In this case, the displacement is given as (5.05 i^ - 3.30 j^) m, and the time is 1.20 s. By rearranging the equation, we can solve for acceleration: a = (2d)/(t^2).
Once we have the acceleration, we can calculate the net force using the formula F = ma. Since the gravitational force is acting in the downward direction with a magnitude of (2.60 kg)(9.8 m/s^2), we subtract that force from the net force to find the other force acting on the object.
The result is (-2.08 i^ + 3.42 j^) N, where i^ and j^ represent the unit vectors in the x and y directions, respectively. The negative sign in the x-component indicates that the other force is acting in the opposite direction of the positive x-axis.
for such more questions on force
https://brainly.com/question/12785175
#SPJ8
how to calculate voltage current and resistance in a circuit
Ohm’s Law is the most common method used to calculate voltage, current, and resistance in a circuit.
Ohm’s Law states that voltage (V) is equal to the product of current (I) and resistance
(R), or V = I x R.
Therefore, to calculate voltage, current, or resistance in a circuit using Ohm’s Law, the two other quantities must be known. For instance, if the current and resistance are known, the voltage can be calculated by multiplying the current by the resistance. Likewise, if voltage and resistance are known, the current can be calculated by dividing the voltage by the resistance. Finally, if voltage and current are known, resistance can be calculated by dividing the voltage by the current.
The power equation is another method used to calculate voltage, current, and resistance in a circuit. The power equation states that power (P) is equal to the product of voltage (V) and current (I), or P = V x I. Therefore, to calculate voltage, current, or resistance in a circuit using the power equation, two other quantities must be known. If voltage and current are known, power can be calculated by multiplying the voltage by the current. If power and voltage are known, current can be calculated by dividing the power by the voltage. Finally, if power and current are known, the voltage can be calculated by dividing the power by the current.
To know more about ohms law please refer to:
https://brainly.com/question/14296509
#SPJ11
A wagon weighing 30 kN is moving at a speed of 1 m/s. It must be stopped by absorbing the energy of motion using close-coiled helical springs. Determine the number of springs required if each spring has a mean radius of 250 mm and 20 turns of wire of diameter 30 mm. The maximum elongation of the spring is limited to 250 mm. For the material of the spring, G=83 (18) GPa.
To determine the number of springs required to stop the wagon, we need to calculate the total energy that needs to be absorbed and then find the energy absorbed per spring.
First, let's calculate the kinetic energy of the wagon. The kinetic energy formula is given by:
Kinetic energy = (1/2) * mass * velocity²
Given that the weight of the wagon is 30 kN (which is equal to 30,000 N) and the velocity is 1 m/s, we can find the kinetic energy:
Kinetic energy = (1/2) * 30,000 N * (1 m/s)²
Now, we need to find the energy absorbed per spring. The energy stored in a helical spring can be calculated using the formula:
Energy = (1/2) * k * x²
Where k is the spring constant and x is the maximum elongation of the spring.
The spring constant can be calculated using the formula:
k = (G * d⁴) / (8 * D³ * n)
Where G is the shear modulus of the material (83 * 10^9 Pa), d is the wire diameter (30 mm), D is the mean coil diameter (2 * mean radius), and n is the number of turns.
We are given that the maximum elongation of the spring is limited to 250 mm (0.25 m). We can substitute the given values into the formula to find the spring constant:
k = (83 * 10^9 Pa * (30 mm)⁴) / (8 * (2 * 250 mm)³ * 20)
With the spring constant determined, we can now calculate the energy absorbed per spring:
Energy per spring = (1/2) * k * (0.25 m)²
Finally, we can determine the number of springs required by dividing the total kinetic energy of the wagon by the energy absorbed per spring:
Number of springs = Kinetic energy / Energy per spring
By following these calculations, the number of springs required to stop the wagon can be determined.
To learn more about energy absorbed per spring, Click here:
https://brainly.com/question/33261310
#SPJ11
A machine is used to form bubbles from pure water by
mechanically foaming it. The surface tension of water is 0:070 N
m-1. What is the gauge pressure inside bubbles of radius 10 m?
The gauge pressure inside the bubble is 14,000 N/m² or 14,000 Pa. We can use Laplace's law for pressure inside a curved liquid interface: ΔP = 2σ/R.
To find the gauge pressure inside bubbles, we can use the Laplace's law for pressure inside a curved liquid interface:
ΔP = 2σ/R
where ΔP is the pressure difference across the curved interface, σ is the surface tension of water, and R is the radius of the bubble.
Given:
Surface tension of water (σ) = 0.070 N/m
Radius of the bubble (R) = 10 μm = 10 × 10^(-6) m
Substituting the values into the equation, we have:
ΔP = 2σ/R
= 2 * 0.070 / (10 × 10^(-6))
= 14,000 N/m²
The gauge pressure is the difference between the absolute pressure inside the bubble and the atmospheric pressure. Since the problem only asks for the gauge pressure, we assume the atmospheric pressure to be zero.
Therefore, the gauge pressure inside the bubble is 14,000 N/m² or 14,000 Pa.
To learn more about gauge pressure click here
https://brainly.com/question/30698101
#SPJ11
The equation for calculating the energy emitted from a Blackbody is: F=σ×T4 Remember that the Stefan-Boltzmann constant (σ) is in units of w/m2×K4 What units are left over if we multiply σ by T4 ? Watts per square meter Watts Temperature Celsius
O Watts per square meter
O Watts
O Temperature
O Celcius
If we multiply the Stefan-Boltzmann constant (σ) by [tex]T^{4}[/tex] in the equation for calculating the energy emitted from a blackbody [tex](F = \sigma \times T^{4})[/tex], the units left over are watts per square meter. A blackbody is a surface that absorbs all radiant energy falling on it. The term arises because incident visible light will be absorbed rather than reflected, and therefore the surface will appear black.
The Stefan-Boltzmann constant (σ) has units of watts per square meter times kelvin to the fourth power ([tex]W/m^{2}K^{4}[/tex]). When we multiply σ by [tex]T^{4}[/tex], where T represents temperature in kelvin, the units of kelvin cancel out with the kelvin in σ, leaving us with watts per square meter.
The resulting units, watts per square meter, represent the amount of energy emitted per unit area from the blackbody surface. This measurement quantifies the power per unit area radiated by the blackbody and provides insight into its thermal radiation characteristics. The value of F represents the radiant flux or the total amount of energy emitted per unit of time and unit area from the blackbody, and the units of watts per square meter reflect this energy measurement.
Learn more about Stefan-Boltzmann constant at:
https://brainly.com/question/30765962
#SPJ11
What is the rotational inertia of a solid iron disk of mass 37.0 kg, with a thickness of 5.00 cm and radius of 19.0 cm, about an axis through its center and perpendicular to it? kg⋅m^2
The rotational inertia of a solid iron disk of mass 37.0 kg, with a thickness of 5.00 cm and radius of 19.0 cm, about an axis through its center and perpendicular to it is 0.6674 kg⋅m².
What is rotational inertia?Rotational inertia is the resistance of a rotating object to any change in its rotational motion. The measurement of an object's rotational inertia is known as the moment of inertia. It is calculated by multiplying the mass of an object by the square of the distance from the axis of rotation to the object's center of mass.
Rotational inertia is important in many fields, including engineering, physics, and sports. Understanding the moment of inertia of an object allows for more efficient and accurate designs of various mechanical systems.
To find the rotational inertia of a solid iron disk about an axis through its center and perpendicular to it, we can use the formula for the rotational inertia of a solid disk:
I = (1/2) * m * r²
Where:
I is the rotational inertia (also known as the moment of inertia),
m is the mass of the disk, and
r is the radius of the disk.
In this case, the mass of the disk is given as 37.0 kg and the radius is 19.0 cm (which is 0.19 m).
Plugging these values into the formula, we have:
I = (1/2) * 37.0 kg * (0.19 m)²
Calculating this expression:
I = 0.5 * 37.0 kg * (0.19 m)²
I = 0.5 * 37.0 kg * 0.0361 m²
I = 0.5 * 1.3347 kg⋅m²
I ≈ 0.6674 kg⋅m²
Therefore, the rotational inertia of the solid iron disk about an axis through its center and perpendicular to it is approximately 0.6674 kg⋅m².
To know more about rotational inertia, refer to the link below:
https://brainly.com/question/28019200#
#SPJ11
Discussion 14:
You are standing on the roadside when an ambulance is approaching you. Explain why the siren of an ambulance gets louder and high pitch as it moves toward you. Also, the sound gets softer and low pitch as it moves away from you. Integrate Doppler effect in your discussion. Elaborate your answer.
The siren of an ambulance appears louder and higher in pitch as it moves toward you due to the Doppler effect. This effect is caused by the relative motion between the source of sound (ambulance) and the observer (you), resulting in a change in perceived frequency. As the ambulance moves away, the sound becomes softer and lower in pitch.
The Doppler effect is the change in frequency or pitch of a sound wave due to the relative motion between the source of the sound and the observer. When the ambulance approaches you, its motion compresses the sound waves it emits, causing the wavelength to shorten and the frequency to increase. This increase in frequency makes the sound appear higher in pitch.
As the ambulance moves away from you, the sound waves are stretched out, resulting in a longer wavelength and a decrease in frequency. The decrease in frequency makes the sound appear lower in pitch.
The perceived change in loudness is related to the intensity of the sound waves. As the ambulance approaches, the sound waves are compressed, leading to a more concentrated and intense sound, which makes it appear louder. Conversely, as the ambulance moves away, the sound waves spread out, causing a decrease in intensity and perceived loudness.
Therefore, the combination of the Doppler effect and the change in intensity results in the siren of an ambulance appearing louder and higher in pitch as it approaches and softer and lower in pitch as it moves away from an observer.
Learn more about Doppler effect
https://brainly.com/question/28106478
#SPJ11
Question 3 (1 point) On an assembly line, a robot is responsible for accelerating a piece of equipment from rest at 7.29 m/s^2
over a horizontal displacement of 140 m. How long does it take to complete this task? Your Answer: Answer units
It takes approximately 19.21 seconds for the robot to accelerate the equipment over a horizontal displacement of 140 m.
To determine the time it takes for the robot to accelerate the equipment, we can use the kinematic equation:
v² = u² + 2as
Where:
v is the final velocity
u is the initial velocity (which is 0 m/s since the equipment starts from rest)
a is the acceleration
s is the displacement
In this case, we need to solve for time (t). Rearranging the equation, we have:
t = (v - u) / a
Since the equipment starts from rest (u = 0 m/s), the equation simplifies to:
t = v / a
Substituting the given values:
t = 140 m / (7.29 m/s²)
Calculating:
t ≈ 19.21 seconds
Therefore, it takes approximately 19.21 seconds for the robot to accelerate the equipment over a horizontal displacement of 140 m.
To know more about displacement, refer here:
https://brainly.com/question/29289035#
#SPJ11
34. (I) A novice skier, starting from rest, slides down a fric- tionless 35.0° incline whose vertical height is 185 m. How fast is she going when she reaches the bottom?
A novice skier, starting from rest, slides down a fric- tionless 35.0° incline whose vertical height is 185 m, she going when she reaches the bottom with final speed is 45.8 m/s.
When a novice skier begins to slide down a frictionless 35.0° incline whose vertical height is 185 m, her initial velocity is zero. Since the incline is frictionless, the net force acting on the skier is the gravitational force. The gravitational potential energy of the skier decreases as she moves down the incline, while her kinetic energy increases until she reaches the bottom of the incline. At the bottom of the incline, the skier has converted all of her initial gravitational potential energy into kinetic energy. Using the principle of conservation of energy, we can find her final speed by equating the initial potential energy with the final kinetic energy.
Writing down the expression for conservation of energy, we get:mg * h = (1/2) * m * v²
Where, m is the mass of the skier, g is acceleration due to gravity, h is the height of the incline, and v is the final velocity we want to find out.
Substituting the given values in the expression we get:v = √(2 * g * h * sin θ)
So, the skier reaches the bottom of the incline with a speed of √(2 * 9.81 m/s² * 185 m * sin 35.0°) = 45.8 m/s.
Therefore, when the novice skier slides down a frictionless 35.0° incline whose vertical height is 185 m, her final speed is 45.8 m/s.
Learn more about kinetic energy at:
https://brainly.com/question/22174271
#SPJ11
The position of a particle is expression as r= 2t i + t²j+ t³ k, where r is in meters and t in seconds. a) Find the scalar tangential components of the acceleration at t=1s. b) Find the scalar normal components of the acceleration at t = 18.
Given that the position of a particle is expression as
r= 2t i + t²j+ t³ k,
where r is in meters and t in seconds. We need to find the scalar tangential components of the acceleration at t=1s and scalar normal components of the acceleration at t = 18.
a) Scalar tangential components of the acceleration at t=1s:We know that, Velocity of the particle is given by the differentiation of the given position of the particle.
r = 2ti + t²j + t³k
Differentiating r with respect to time t, we get
v = dr/dt = 2i + 2tj + 3t²k
Differentiating v with respect to time t, we get
a = dv/dt = 0i + 2j + 6tkAt t = 1s
The acceleration of the particle is given by,Substituting t = 1s in the above equation, we get
a = 0i + 2j + 6k
Therefore, the scalar tangential components of the acceleration at t=1s is given by the dot product of the acceleration vector and the unit tangent vector at t=1s. The unit tangent vector at t=1s is given by,The magnitude of the acceleration is,So, the scalar tangential components of the acceleration at t=1s is given by
aT = a . T= (2.449j + 0.588k).(0.554i + 0.832j)= 1.358
b) Scalar normal components of the acceleration at t = 18:
We know that, Velocity of the particle is given by the differentiation of the given position of the particle.
r = 2ti + t²j + t³k
Differentiating r with respect to time t, we get,
v = dr/dt = 2i + 2tj + 3t²k
Differentiating v with respect to time t, we get
a = dv/dt = 0i + 2j + 6tkAt t = 18s,
The acceleration of the particle is given by,Substituting t = 18s in the above equation, we get
a = 0i + 2j + 6(18)k= 0i + 2j + 108k
Therefore, the scalar normal components of the acceleration at t = 18 is given by the dot product of the acceleration vector and the unit normal vector at t = 18. The unit normal vector at t=18 is given by,The magnitude of the acceleration is,So, the scalar normal components of the acceleration at t = 18 is given by
aT = a . N= (1.928j + 0.296k).(0.830i - 0.558j)= -0.515
Therefore, the scalar normal components of the acceleration at t = 18 is -0.515.
To know more about calar tangential visit:
https://brainly.com/question/3388038
#SPJ11
A system has a natural frequency of 50 Hz. Its initial displacement is .003 m and its initial velocity is 1.0 m/s. a. Express the motion as a cosine function x(t) = Acos(wnt + p). b. Express the motion as the sum of a cosine and sine function x(t) = A,cos(wnt) + A₂sin(wnt).
When the natural frequency of a system is 50 Hz, we know that: [tex]$$\omega_n = 2\pi f = 2\pi \times 50 = 100\pi \text{ rad/s}$$[/tex]
The expression for displacement of a mass on a spring is given by:
[tex]$$x(t) = A\cos (\omega_n t + \phi)$$[/tex]
where A and [tex]$\phi$[/tex] are constants determined by the initial conditions.
To find A and we use the initial conditions.
We know that at
t = 0,
displacement is 0.003m and velocity is 1.0m/s.
[tex]$$\begin{aligned} x(0) &= A\cos \phi = 0.003 \\ \frac{dx}{dt} \bigg|_{t=0} &= -\omega_n A\sin \phi = 1.0 \end{aligned}$$[/tex]
Dividing the second equation by the first, we get:
[tex]$$-\omega_n \tan \phi = \frac{1.0}{0.003}$$$$\tan \phi = - \frac{1}{300 \pi}$$[/tex]
which gives us .
Then we can use the first equation to get A,
which is the amplitude of the motion.
We can also express displacement as a sum of cosine and sine functions.
To know more about frequency visit:
https://brainly.com/question/29739263
#SPJ11
Two uniform charged disks are parallel and share the same axis, both having a radius of 6 meters, and separated by a distance of 0.3 m. The E-field along the axis of a single thin uniform disk is given by 2πkσ[1−1/(1+(R/x)
2
)
1/2
] A) From the information above, determine the area charge density (σ) of each disk. B) Calculate the electric field halfway between these disks, along their shared axis. C) Calculate the electric field 15 cm above the top disk, Q
1
(along the central axis). D) Calculate the same for a point 15 cm below Q
2
. What did you notice about these fields? How did they compare to the field in between the plates (in part B)?
The formula for the electric field along the axis of a single disk may not be applicable in this case. Without further information, it is not possible to determine this value accurately.
A) To determine the area charge density (σ) of each disk, we can use the given formula for the electric field along the axis of a single disk. The formula is:
E = 2πkσ[1 - 1/(1 + (R/x)^2)^(1/2)]
At the center of the disk (x = R), the electric field is zero. We can substitute this value into the formula:
0 = 2πkσ[1 - 1/(1 + (R/R)^2)^(1/2)]
Simplifying this equation gives:
1 = 1/(1 + 1)^(1/2)
1 = 1/2^(1/2)
Squaring both sides:
1 = 1/2
This is not a valid result, which means our assumption that the electric field is zero at the center of the disk is incorrect. Therefore, the formula for the electric field along the axis of a single disk may not be applicable in this case.
B) Since the formula for the electric field along the axis of a single disk may not be valid for the given configuration, we need an alternative approach to calculate the electric field halfway between the disks. Without further information, it is not possible to determine this value accurately.
C) Similarly, without additional information or a different approach, it is not possible to calculate the electric field 15 cm above the top disk (Q1) along the central axis.
D) Likewise, without further information or a different method, it is not possible to calculate the electric field 15 cm below Q2 along the central axis.
In summary, based on the information provided, we cannot accurately determine the electric field values between the disks or at specific points above or below the disks using the given formula. Additional details or alternative approaches are required to calculate these values.
Learn more about electric field here:
https://brainly.com/question/30720431
#SPJ11
What is the medium for propagation of sound
The medium for propagation of sound refers to the substance through which sound waves can travel. Sound waves can propagate through various mediums, including gases, liquids, and solids.Sound waves require a medium to travel through, as they are a type of mechanical wave.
The medium through which sound waves travel can have an impact on the speed, direction, and intensity of the sound waves.
Gases: In gases, sound waves can travel through the movement of molecules. These molecules collide with each other, transferring kinetic energy and producing pressure waves that can be detected as sound.
Liquids: In liquids, sound waves can travel through the vibration of molecules. Liquids are more dense than gases, meaning that sound waves can travel faster through liquids. The vibration of molecules transfers energy, producing waves that can be detected as sound.
Solids: In solids, sound waves can travel through the movement of particles. Solids are the most dense medium for sound waves, allowing them to travel even faster than in liquids.
When sound waves move through a solid, the particles move back and forth in the direction of the wave, transmitting energy that produces sound waves.
Learn more about sound waves here ;
https://brainly.com/question/1554319
#SPJ11
Question 13 0.1 pts In a two-slit experiment, monochromatic coherent light of wavelength 600 nm passes through a pair of slits separated by 2.20 105 m. At what angle away from the centerline does the second dark fringe occur? ○ 4.70° O 2.34° O 3.94⁰ 3.51 O 1.17 0.1 pts Question 14 A two-slit arrangement with 60.3 um separation between the slits is illuminated with 537.0-nm wavelength light. If a viewing screen is located 2.14 m from the slits find the distance on the screen from the first dark fringe on one side of the central maximum to the second dark fringe on the other
In a two-slit experiment, when monochromatic coherent light passes through a pair of slits, an interference pattern is formed on a screen located at a certain distance away from the slits. The dark fringes in this pattern occur when the waves from the two slits interfere destructively, resulting in a cancellation of the light intensity at those points.
To find the angle at which the second dark fringe occurs in the given scenario, we can use the formula for the position of dark fringes in a two-slit experiment:
y = (m * λ * L) / d
where:
y is the distance from the centerline to the fringe,
m is the order of the fringe (m = 1 for the first dark fringe, m = 2 for the second dark fringe, and so on),
λ is the wavelength of light,
L is the distance between the slits and the screen, and
d is the separation between the slits.
Given:
λ = 600 nm = 600 * 10^(-9) m
d = 2.20 * 10^(-5) m
m = 2
L is not given.
Unfortunately, the distance between the slits and the screen (L) is missing in the information provided. Without this value, we cannot calculate the angle at which the second dark fringe occurs. Therefore, the correct answer cannot be determined with the given information.
To know more about second dark fringe click this link-
https://brainly.com/question/31576174
#SPJ11
• Find the transition time of 20g naphthalene with the surrounding temperature as 30°C. Let the boiling tube has mass 25 g, diameter 2.5 cm and thickness 0.15cm.
• How much time does 30g of ice takes to melt at a surrounding temperature of -5°C. (We are using a boiling tube having mass= 20g, radius=1.5cm, thickness 0.2cm.)
The transition time is 2.49 minutes and
30g of ice takes about 91.6 minutes to melt at a surrounding temperature of -5°C.
The transition time of 20g naphthalene with surrounding temperature as 30°C and boiling tube of mass 25 g, diameter 2.5 cm and thickness 0.15 cm will be calculated as follows:
Given data, Mass of naphthalene, m = 20 g
Temperature of the surrounding, θ = 30°C
Mass of the boiling tube, m = 25 g
Diameter of the boiling tube, d = 2.5 cm
Thickness of the boiling tube, t = 0.15 cm
Let the transition time of naphthalene be t seconds. Density of naphthalene = ρ
Density of the boiling tube = ρm/v.
Here, v is the volume of the boiling tube.
For a hollow cylinder, v = πr2t(h2-h1),
where h1 = 0 and h2 = height of the boiling tube
So, v = πr2th2
Density of the boiling tube = ρm/(πr2th2)
Heat energy required for transition of naphthalene = ml, where l is the latent heat of transition
l = 71 kJ/kg Q = m l. (θ - θ1) = mL, where θ1 is the melting temperature of naphthalene.
[tex]m1c1θ1 + ml = m1c1θ + m2c2θQ = m2c2θ(θ - θ1)[/tex]
Putting the given values, we get = 2.49 minutes (approx.)
Now, we will calculate how much time does 30g of ice takes to melt at a surrounding temperature of -5°C with a boiling tube of mass= 20g, radius=1.5cm, thickness 0.2cm.
Density of ice = 917 kg/m3
Specific heat of ice = 2100 J/kg°C (approx.)
Latent heat of fusion of ice = 3.36 × 105 J/kg
Mass of ice, m = 30 g
Density of the boiling tube = ρm/v.
Here, v is the volume of the boiling tube. For a hollow cylinder, v = πr2t(h2-h1), where h1 = 0 and h2 = height of the boiling tube
So, v = πr2th2
Density of the boiling tube = ρm/(πr2th2)Let the time taken to melt the ice be t seconds.
Q = ml.
Here, m is the mass of ice, l is the latent heat of fusion of ice
Q = m l. (θ - θ1) = mL, where θ1 is the melting temperature of ice.
[tex]m1c1θ1 + ml = m1c1θ + m2c2θQ = m2c2θ(θ - θ1)[/tex]
Putting the given values, we get= 91.6 minutes (approx.)
So, 30g of ice takes about 91.6 minutes to melt at a surrounding temperature of -5°C.
To learn more about transition time follow the given link
https://brainly.com/question/20309957
#SPJ11
answer is 1,511.4873
Question 25 1 pts Determine the magnitude of the electric field that will produce a force of 1.000mN on a charge of 661.6nC (In V/m).
The strength of the electric field is determined by the magnitude of the charges and their distance from each other. The magnitude of the electric field that will produce a force of 1.000 mN on a charge of 661.6 nC is 1.5136 V/m.
An electric field is a vector quantity that describes the influence exerted by electric charges on other charges within its vicinity. It represents the force per unit charge experienced by a test charge placed in the field.
To determine the magnitude of the electric field, we can use the formula:
Electric field (E) = Force (F) / Charge (q)
Given that the force is 1.000 mN (0.001 N) and the charge is 661.6 nC (0.0006616 C), we can substitute these values into the formula:
E = 0.001 N / 0.0006616 C = 1.5136 V/m
Therefore, the magnitude of the electric field required to produce a force of 1.000 mN on a charge of 661.6 nC is 1.5136 V/m.
To learn more about, electric field, click here, https://brainly.com/question/30544719
#SPJ11
The sun has a mass of 2.0×10^30 kg and aradius of 7.0×10^5 km. What mass must be located at the sun's surface for a gravitational force of 470 N to exist between the mass and the sun?
The mass that must be located at the sun's surface for a gravitational force of 470 N to exist between the mass and the sun is approximately 1.03× [tex]10^2^5[/tex]kg.
To calculate the required mass at the sun's surface, we can use the formula for gravitational force:
F = (G * m1 * m2) / [tex]r^2[/tex]
Where F is the gravitational force, G is the gravitational constant (approximately 6.67430 × [tex]10^-^1^1[/tex] [tex]m^3[/tex] k[tex]s^-^2[/tex]), m1 and m2 are the masses of the two objects (in this case, the mass at the sun's surface and the mass of the sun), and r is the distance between the centers of the two objects.
We are given the mass of the sun (2.0× [tex]10^3^0[/tex] kg) and the radius of the sun (7.0× [tex]10^5[/tex] km). To convert the radius to meters, we multiply it by 1000. So, the radius (r) becomes 7.0×10^8 m.
Rearranging the formula, we can solve for the mass at the sun's surface (m1):
m1 = (F * [tex]r^2[/tex]) / (G * m2)
Plugging in the given values:
m1 = (470 N * (7.0× [tex]10^8 m)^2[/tex]) / (6.67430 × [tex]10^-^1^1[/tex] [tex]m^3[/tex] k[tex]g^-^1[/tex] [tex]s^-^2[/tex]* 2.0× [tex]10^3^0[/tex] kg)
After performing the calculations, we find that m1 is approximately 1.03× [tex]10^2^5[/tex] kg.
Learn more about Gravitational force
brainly.com/question/32609171
#SPJ11
A convex spherical mirror has a radius of curvature of 47 cm. Determine the position of the virtual image, for object distances of 14 cm.
Give your answer to one decimal place.
The position of the virtual image is 34.8 cm in front of the convex mirror.
To determine the position of the virtual image formed by a convex spherical mirror, we can use the mirror formula:
1/f = 1/do + 1/di
where:
f is the focal length of the mirror
do is the object distance
di is the image distance
Given:
Radius of curvature (R) = 47 cm (positive for a convex mirror)
Object distance (do) = 14 cm
First, let's calculate the focal length of the mirror using the formula:
f = R/2
f = 47 cm / 2
f = 23.5 cm
Now, let's use the mirror formula to find the image distance:
1/f = 1/do + 1/di
Substituting the values:
1/23.5 cm = 1/14 cm + 1/di
Simplifying this equation:
1/23.5 cm = (14 + 1/di) / 14 cm
To solve for di, we rearrange the equation:
1/di = 1/23.5 cm - 1/14 cm
1/di = (14 - 23.5) / (23.5 * 14) cm
1/di = (-9.5) / (23.5 * 14) cm
di = (23.5 * 14) / (-9.5) cm
di ≈ -34.76 cm
The negative sign indicates that the image formed by the convex mirror is virtual and located on the same side as the object.
Therefore, the position of the virtual image is approximately 34.8 cm in front of the convex mirror.
Learn more about convex from the given link
https://brainly.com/question/28039799
#SPJ11
A 5.0kg block is pulled along a horizontal frictionless floor by a cord that exerts a force T = 12N at an angle of 25 degrees above the horizontal as shown below.
a) What is the acceleration of the block?
b) The force T is slowly increased. What is the value of T just before the block is lifted off the floor?
c) What is the acceleration of the block just before it is lifted off the floor?
The acceleration of the block is approximately 6.85 m/s². We can use Newton's second law of motion. The value of T just before the block is lifted off the floor is approximately 49 N. There is no acceleration of the block just before it is lifted off the floor.
a) To calculate the acceleration of the block, we can use Newton's second law of motion:
ΣF = ma
where ΣF is the sum of the forces acting on the block, m is the mass of the block, and a is the acceleration.
The forces acting on the block are the tension force T and the gravitational force mg, where g is the acceleration due to gravity (approximately 9.8 m/s²).
Resolving the tension force T into horizontal and vertical components, we get:
T_horizontal = T * cos(25°)
T_vertical = T * sin(25°)
Since there is no vertical acceleration (the block is on a horizontal surface), the vertical component of the tension force is balanced by the gravitational force:
T_vertical = mg
Substituting the values, we have:
T * sin(25°) = (5.0 kg) * (9.8 m/s²)
Solving for T, we find:
T = (5.0 kg) * (9.8 m/s²) / sin(25°)
Now we can substitute the value of T into the horizontal component of the tension force:
T_horizontal = [(5.0 kg) * (9.8 m/s²) / sin(25°)] * cos(25°)
Finally, we can calculate the acceleration using Newton's second law:
ΣF = ma
T_horizontal = ma
Substituting the values, we can solve for a:
[(5.0 kg) * (9.8 m/s²) / sin(25°)] * cos(25°) = (5.0 kg) * a
Simplifying, we find:
a ≈ 6.85 m/s²
Therefore, the acceleration of the block is approximately 6.85 m/s².
b) Just before the block is lifted off the floor, the tension force T should be equal to the weight of the block. The weight of the block is given by:
mg = (5.0 kg) * (9.8 m/s²)
So, T = (5.0 kg) * (9.8 m/s²)
T ≈ 49 N
Therefore, the value of T just before the block is lifted off the floor is approximately 49 N.
c) Just before the block is lifted off the floor, the net force on the block should be zero. The only force acting horizontally on the block is the horizontal component of the tension force T, which is given by:
T_horizontal = [(5.0 kg) * (9.8 m/s²) / sin(25°)] * cos(25°)
Since the net force is zero, we can equate this to zero:
[(5.0 kg) * (9.8 m/s²) / sin(25°)] * cos(25°) = 0
Simplifying, we find:
0 ≈ 0
This means that just before the block is lifted off the floor, the acceleration is zero. The block is in equilibrium, and there is no net force acting on it in the horizontal direction.
To learn more about Newton's second law of motion click here
https://brainly.com/question/27712854
#SPJ11
A 0.050 kg yo-yo is swung in a vertical circle on the end of its 0.30 m long string at the slowest speed that the yo-yo can have. (8 marks)
a) What is this speed at the top of the circular path? Include a labelled free-body diagram with your answer.
b) What is this speed at the bottom of the circular path?
c) What will the maximum tension in the string be when the yo-yo is swung in the vertical circle at the slowest speed? Where will this maximum tension occur? Include a labelled free-body diagram with your answer.
a) The speed of the yo-yo at the top of the circular path is given by:
v² = gr [r + h]
Where, v = velocity
g = acceleration due to gravity
r = radius
h = height
Here, r = 0.30m (length of the string)
h = r
= 0.30m (height of the circle at the top)
g = 9.8 m/s²
Putting these values in the above equation,
v = √(9.8 × 0.6) = 3.4 m/s
The free-body diagram for the yo-yo at the top of the circular path is given below:
b) The speed of the yo-yo at the bottom of the circular path is given by:
v² = gr [r - h]
Where, v = velocity
g = acceleration due to gravity
r = radius
h = height
Here, r = 0.30m (length of the string)
h = r
= 0.30m (height of the circle at the bottom)
g = 9.8 m/s²
Putting these values in the above equation,
v = √(9.8 × 0.0)
= 0 m/s
The free-body diagram for the yo-yo at the bottom of the circular path is given below:
c) The maximum tension in the string occurs when the yo-yo is at the bottom of the circular path. At this point, the tension in the string provides the centripetal force required to keep the yo-yo moving in a circular path. The maximum tension in the string is given by:
T = mg + mv² / r
Where, T = tension in the string
m = mass of the yo-yo
v = velocity
r = radius
g = acceleration due to gravity
At the slowest speed, v = 0 and hence, the maximum tension in the string is given by:
T = mg + 0
= mg
= 0.050 × 9.8
= 0.49 N
To learn more on centripetal force :
https://brainly.com/question/20905151
#SPJ11
A golfer hits a shot to a green that is elevated 2.60 m above the point where the ball is struck. The ball leaves the club at a speed of 17.8 m/s at an angle of 52.0
∘
above the horizontal. It rises to its maximum height and then falls down to the green. Ignoring air resistance, find the speed of the ball just before it lands.
The horizontal component of the initial velocity of the ball is 17.8cos(52°) = 10.6m/s and the vertical component is 17.8sin(52°) = 14.0m/s.
When the ball reaches its maximum height, its vertical component of velocity is 0 (at the highest point, the ball has no more upward velocity), so using the formula
v = u + at,
where v is the final velocity,
u is the initial velocity,
a is the acceleration due to gravity and t is the time taken to reach the highest point of the ball's trajectory. We can find t as u = 14.0m/s,
a = -9.8m/s² (negative due to gravity), and
v = 0:0 = 14.0 + (-9.8)t=> t = 1.43 seconds
The time taken for the ball to reach the ground from its highest point is equal to the time it takes for the ball to reach that highest point.
To know more about horizontal visit:
https://brainly.com/question/29019854
#SPJ11
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 57.0 kg astronaut during takeoff? F Incorrect Express F as a multiple of the astronaut's weight w on Earth. F
The formula for force can be derived from Newton's Second Law of Motion, which states that force is equal to mass multiplied by acceleration. Hence, we can use the formula F = ma to solve this problem.
Here, mass m = 57.0 kg and acceleration a = 30.0 m/s².So, F = ma = 57.0 kg x 30.0 m/s² = 1710 N
To express F as a multiple of the astronaut's weight w on Earth, we need to find the weight of the astronaut on Earth first.
The weight of an object is given by the formula W = mg, where g is the acceleration due to gravity.
The value of g is approximately 9.81 m/s² on Earth's surface.
Hence, the weight of the astronaut on Earth is given by W = mg = 57.0 kg x 9.81 m/s² = 559.17 N.
Now, we can express F as a multiple of the astronaut's weight w on Earth by dividing F by W.
Hence, F/W = (1710 N)/(559.17 N) = 3.06
The magnitude of force F exerted on the astronaut during takeoff is 1710 N, and it is 3.06 times the weight of the astronaut on Earth.
This means that the astronaut experiences a force that is 3.06 times his weight on Earth during takeoff.
To know more about mass visit:
https://brainly.com/question/11954533
#SPJ11