Question

A hoop of radius R = 1.0 m and mass m = 1.00 kg is pivoted...

A hoop of radius R = 1.0 m and mass m = 1.00 kg is pivoted at a point on the rim and allowed to swing as a physical pendulum. What is the period of the hoop? g = 9.8 m/s2.

0 0
Add a comment Improve this question Transcribed image text
Know the answer?
Add Answer to:
A hoop of radius R = 1.0 m and mass m = 1.00 kg is pivoted...
Your Answer:

Post as a guest

Your Name:

What's your source?

Earn Coins

Coins can be redeemed for fabulous gifts.

Not the answer you're looking for? Ask your own homework help question. Our experts will answer your question WITHIN MINUTES for Free.
Similar Homework Help Questions
  • A hoop of radius R = 1.5 m and mass m = 0.5 kg is pivoted...

    A hoop of radius R = 1.5 m and mass m = 0.5 kg is pivoted at a point on the rim and allowed to swing as a physical pendulum. What is the period of the hoop? g = 9.8 m/s2 4.0 s 3.85 3.5 s 5.0 s

  • A string is attached to the rim of a small hoop of radius r= 8.00×10−2 m...

    A string is attached to the rim of a small hoop of radius r= 8.00×10−2 m and mass m = 0.180 kg and then wrapped several times around the rim. If the free end of the string is held in place and the hoop is released from rest and allowed to drop, as shown in the figure (Figure 1) , calculate the angular speed and the translational speed of the rotating hoop after it has descended h = 0.750 m...

  • A hoop of mass M = 3 kg and radius R = 0.4 m rolls without...

    A hoop of mass M = 3 kg and radius R = 0.4 m rolls without slipping down a hill, as shown in the figure. The lack of slipping means that when the center of mass of the hoop has speed v, the tangential speed of the hoop relative to the center of mass is also equal to vCM, since in that case the instantaneous speed is zero for the part of the hoop that is in contact with the...

  • A hoop of mass M = 2 kg and radius R = 0.4 m rolls without slipping down a hill, as shown in the figure.

    A hoop of mass M = 2 kg and radius R = 0.4 m rolls without slipping down a hill, as shown in the figure. The lack of slipping means that when the center of mass of the hoop has speed v, the tangential speed of the hoop relative to the center of mass is also equal to VCM, since in that case the instantaneous speed is zero for the part of the hoop that is in contact with the...

  • A uniform disk with mass 38.8 kg and radius 0.200 m is pivoted at its center...

    A uniform disk with mass 38.8 kg and radius 0.200 m is pivoted at its center about a horizontal, frictionless axle that is stationary. The disk is initially at rest, and then a constant force 25.0 N is applied tangent to the rim of the disk. a)What is the magnitude v of the tangential velocity of a point on the rim of the disk after the disk has turned through 0.170 revolution? b)What is the magnitude a of the resultant...

  • A thin hoop of radius r = 0.82 m and mass M = 7.3 kg rolls...

    A thin hoop of radius r = 0.82 m and mass M = 7.3 kg rolls without slipping across a horizontal floor with a velocity v = 1.1 m/s. It then rolls up an incline with an angle of inclination theta = 44 degrees. a) What is the maximum height h reached by the hoop before rolling back down the incline? b) Now, suppose a uniform solid sphere is used instead of a hoop. Use the same values of r,...

  • A thin hoop of mass 3.7 kg and radius 0.5 m rolls down a ramp inclined...

    A thin hoop of mass 3.7 kg and radius 0.5 m rolls down a ramp inclined at an angle 0.26 radians to the horizontal. What is the acceleration of the rolling hoop in m/s2 ?

  • A cylindrical hoop of mass m = 500 g and radius r = 10 cm starts...

    A cylindrical hoop of mass m = 500 g and radius r = 10 cm starts from rest at the top of a ramp of length L = 1.0 m that makes an angle θ = 300 with the horizontal. Calculate the speed of the hoop at the bottom of the ramp, in m/s. . Do not type in units.

  • A cylindrical hoop of mass m = 500 g and radius r = 10 cm starts...

    A cylindrical hoop of mass m = 500 g and radius r = 10 cm starts from rest at the top of a ramp of length L = 1.0 m that makes an angle 8 = 300 with the horizontal. Calculate the speed of the hoop at the bottom of the ramp, in m/s. Inoop = mr?. Do not type in units.

  • A cylindrical hoop of mass m = 500 g and radius r = 10 cm starts...

    A cylindrical hoop of mass m = 500 g and radius r = 10 cm starts from rest at the top of a ramp of length L = 1.0 m that makes an angle 8 = 30° with the horizontal. Calculate the speed of the hoop at the bottom of the ramp, in m/s. Inoop = mr?. Do not type in units. o

ADVERTISEMENT
Free Homework Help App
Download From Google Play
Scan Your Homework
to Get Instant Free Answers
Need Online Homework Help?
Ask a Question
Get Answers For Free
Most questions answered within 3 hours.
ADVERTISEMENT
ADVERTISEMENT