Power is defined as the amount of energy used in a given amount of time. It is measured in watts (W) and is equal to the product of force and velocity. Therefore, to calculate the power required to keep the object in motion, we need to calculate the force required and the velocity at which the object is traveling.
Hence, the power required to keep the object in motion is 500 watt.
The power required to keep the object in motion can be determined using the formula:
Power = Force × Velocity
Given:
Force = Weight = 100 N (weight is the force due to gravity acting on the object)
Velocity = 5 m/s
Substituting these values into the formula, we have:
Power = 100 N × 5 m/s
Power= 500 Watts
Therefore, the power required to keep the object in motion is 500 Watts.
Substituting the values we get,
P = 100 N × 5 m/s
= 500 W.
Hence, the power required to keep the object in motion is 500 watt.
Learn more about power, here
https://brainly.com/question/8434553
#SPJ11
Discuss whether any work is being done by each of the following agents and, if so, whether the work is positive or negative. (c) a crane lifting a bucket of concrete
The crane lifting the bucket of concrete is doing positive work as it applies a force in the direction of the displacement.
In the case of a crane lifting a bucket of concrete, work is indeed being done. The work done by the crane can be determined by the equation:
Work = Force x Distance x cos(θ)
Here, the force is the upward force exerted by the crane on the bucket, the distance is the vertical displacement of the bucket, and θ is the angle between the force and the displacement.
Since the crane is lifting the bucket upward, the force exerted by the crane and the displacement of the bucket are in the same direction. Therefore, the angle θ between them is 0 degrees, and the cosine of 0 degrees is 1. As a result, the work done by the crane is positive.
Learn more about work here: https://brainly.com/question/30280752
#SPJ11
When using pulsed radars to measure Doppler shifts in targets, an ambiguity exists if the target Doppler shift is greater than ±PRF/2. One possible way to get around this is to use multiple, "staggered" PRFs simultaneously (perhaps at different carrier frequencies). This generates multiple Doppler shift measurements, with the result being equivalent to a single PRF that is higher than any of the PRFs used. Consider one such radar with three PRFs: 15 kHz, 18,kHz and 21 kHz. Assume the operating carrier to be 10 GHz. (a) Calculate the Doppler shifts measured from each PRF used for a target moving at 580 m/s. (b) Another target generates Doppler shifts of -7 kHz, 2 kHz, and -4 kHz at the three PRFs, respectively. What can you say about the target's velocity? [2 marks]
The Doppler shifts measured from each PRF for a target moving at 580 m/s are as follows:
- For the PRF of 15 kHz: Doppler shift = (15 kHz * 580 m/s) / (speed of light) = 0.0324 Hz
- For the PRF of 18 kHz: Doppler shift = (18 kHz * 580 m/s) / (speed of light) = 0.0389 Hz
- For the PRF of 21 kHz: Doppler shift = (21 kHz * 580 m/s) / (speed of light) = 0.0453 Hz
Therefore, the Doppler shifts measured from each PRF are approximately 0.0324 Hz, 0.0389 Hz, and 0.0453 Hz.
When analyzing the Doppler shifts generated by another target at -7 kHz, 2 kHz, and -4 kHz at the three PRFs, we can infer the target's velocity. By comparing the measured Doppler shifts to the known PRFs, we can observe that the Doppler shifts are negative for the first and third PRFs, while positive for the second PRF. This indicates that the target is moving towards the radar for the second PRF, and away from the radar for the first and third PRFs.
The magnitude of the Doppler shifts provides information about the target's velocity. A positive Doppler shift corresponds to a target moving towards the radar, while a negative Doppler shift corresponds to a target moving away from the radar. The greater the magnitude of the Doppler shift, the faster the target's velocity.
By analyzing the given Doppler shifts, we can conclude that the target is moving towards the radar at a velocity of approximately 2,000 m/s for the second PRF, and away from the radar at velocities of approximately 7,000 m/s and 4,000 m/s for the first and third PRFs, respectively.
Learn more about: Doppler shifts
brainly.com/question/31833262
#SPJ11
For the beam and loading shown, determine the minimum required width 6, knowing that for the grade of timber used, Call = 18 MPa and Tall = 975 kPa. b = 43 mm Х 2.0 kN 6.8 KN 8.4 kN B D E 300 mm 4 m 4 m 4m 0.50 m
The minimum required width b of the beam is 200 mm.
The following steps were used to calculate the minimum required width:
Calculate the maximum bending moment Mmax at the center of the beam.
Mmax = (2.0 kN)(4 m) + (6.8 kN)(4 m) + (8.4 kN)(4 m) = 67.2 kNm
Calculate the required modulus of section Z to resist the maximum bending moment.
Z = Mmax / Tall = 67.2 kNm / 975 kPa
Z = 68.8 cm^3
Calculate the required cross-sectional area A of the beam.
A = Z / b = 68.8 cm^3 / 200 mm
A = 0.344 m^2
Calculate the required width b of the beam.
b = A / h = 0.344 m^2 / 0.50 m = 0.688 m
b= 200 mm
The minimum required width of the beam is 200 mm.
To learn more about bending moment: https://brainly.com/question/32089056
#SPJ11
A 1.7×10⁴kg rocket has a rocket motor that generates 2.9×10⁵ N of thrust.
What is the rocket's initial upward acceleration?
At an altitude of 5000 m the rocket's acceleration has increased to 8.2 m/s² . What mass of fuel has it burned?
The rocket's initial upward acceleration, the following formula can be used:F = maa = F/mwhereF = 2.9 x 10^5 N is the rocket motor thrustm = 1.7 x 10^4 kg is the mass of the rocketa is the acceleration of the rocketTherefore,a = F/m = 2.9 x 10^5 N / 1.7 x 10^4 kg = 17.06 m/s².
Thus, the rocket's initial upward acceleration is 17.06 m/s².At an altitude of 5000 m, the rocket's acceleration has increased to 8.2 m/s². The change in acceleration is:∆a = 8.2 m/s² - 17.06 m/s² = -8.86 m/s²This negative value indicates that the rocket's acceleration has decreased. The mass of fuel that has been burned can be calculated using the following formula:∆v = v_f - v_iwhere∆v = 5000 m/s is the change in velocityv_i = 0 m/s is the initial velocityv_f = the final velocity.
The final velocity can be determined using the following kinematic equation:v_f^2 - v_i^2 = 2adwherev_i = 0 m/s is the initial velocityv_f = ? is the final velocityd = 5000 m is the distance traveled by the rocketa = -8.86 m/s² is the acceleration of the rocket at this pointTherefore,v_f^2 - 0^2 = 2(-8.86 m/s²)(5000 m)v_f^2 = 78,455.6 m²/s²v_f = √(78,455.6 m²/s²) ≈ 280 m/sThus, the final velocity of the rocket at an altitude of 5000 m is approximately 280 m/s.
Using the rocket equation:∆v = v_e ln(m_0/m_f)where∆v = 5000 m/s is the change in velocityv_e = 2800 m/s is the exhaust velocitym_0 = 1.7 x 10^4 kg is the initial mass of the rocketm_f = ? is the final mass of the rocket (which is the mass of the rocket plus the mass of the fuel burned)The natural logarithm can be simplified as follows:ln(m_0/m_f) = ln(m_0) - ln(m_f)ln(m_0/m_f) = ln(1.7 x 10^4 kg) - ln(m_f)ln(m_f) = ln(1.7 x 10^4 kg) - ln(m_0)ln(m_f) = 9.73597 - 9.7397ln(m_f) = -0.00373m_f = e^(-0.00373) ≈ 0.9963 x m_0The mass of fuel burned can be calculated as follows:∆m = m_0 - m_f∆m = 1.7 x 10^4 kg - 0.9963 x 1.7 x 10^4 kg∆m = 59.31 kgTherefore, the mass of fuel burned is approximately 59.31 kg.
To know more about acceleration visit:
https://brainly.com/question/30762941
#SPJ11
the pilot of an airplane notes that the compass indicates a heading due west. the airplane's speed relative to the air is 170 km/h. the air is moving in a wind at 26.0 km/h toward the north. find the velocity of the airplane relative to the ground.
The velocity of the airplane relative to the ground is 171.28 km/h.
Given,Speed of the airplane relative to the air = 170 km/hVelocity of the wind = 26 km/hThe compass indicates a heading due west. So, the plane is traveling in the west direction.The velocity of the airplane is made up of two components, velocity relative to the air and velocity relative to the ground. We have to find the velocity of the airplane relative to the ground.Velocity of the airplane relative to the ground can be found using Pythagoras theorem. Let v be the velocity of the airplane relative to the ground.Then, v² = (170)² + (26)²v² = 28,900 + 676v² = 29,576v = sqrt(29,576)v = 171.28 km/h.
Learn more about velocity here :-
https://brainly.com/question/30559316
#SPJ11
