Find the acceleration centers of two identical disks moving down презентация

Август 3, 2022

Главная
Физика
Find the acceleration centers of two identical disks moving down

Содержание

2. Find the accelerations of the centers of two identical disks moving downward, if one is suspended
3. Find the accelerations of the centers of two identical disks moving downward, if one is suspended
4. Find the accelerations of the centers of two identical disks moving downward, if one is suspended
5. The thin hoop rolls down without slipping on the surfaces of the inclined plane and then
6. The thin hoop rolls down without slipping on the surfaces of the inclined plane and then
7. The thin hoop rolls down without slipping on the surfaces of the inclined plane and then
8. The thin hoop rolls down without slipping on the surfaces of the inclined plane and then
9. The lower end B of the rod AB is fixed on a pivot. The rope AC
10. The lower end B of the rod AB is fixed on a pivot. The rope AC
11. The lower end B of the rod AB is fixed on a pivot. The rope AC
12. The lower end B of the rod AB is fixed on a pivot. The rope AC
13. 4. A uniform solid cylinder A of mass m1 can freely rotate about a horizontal axis
14. Translational motion: Rotational motion: Acceleration of the point K: 4. A uniform solid cylinder A of
15. Translational motion: Rotational motion: Acceleration of the point K: Answer: 4. A uniform solid cylinder A
17. Скачать презентацию

Слайд 2

Find the accelerations of the centers of two identical disks moving downward, if

one is suspended to the other as shown in the figure. The moment of inertia of the disc and the roller relative to the axis of the disc is I, the mass of the disc and the roller is m, the radius of the roller with thread is r.

Object 1

Object 2

(1)

(2)

Слайд 3

Find the accelerations of the centers of two identical disks moving downward, if

Object 1

Object 2

Answer

(1)

(2)

Слайд 4

Find the accelerations of the centers of two identical disks moving downward, if

Object 1

Object 2

Answer

Points

(1)

(2)

Слайд 5

The thin hoop rolls down without slipping on the surfaces of the inclined

plane and then the horizontal plane. What is the height the hoop will jump if its initial height is h? The hoop and the plane are assumed to be perfectly elastic. The inclination angle of the plane with respect to the horizon is α.

Vcm = Vr = V

Слайд 6

The thin hoop rolls down without slipping on the surfaces of the inclined

Just before the jump

Just after the jump

Vcm = Vr = V

Слайд 7

The thin hoop rolls down without slipping on the surfaces of the inclined

Just before the jump

Just after the jump

Answer

Vcm = Vr = V

Слайд 8

The thin hoop rolls down without slipping on the surfaces of the inclined

Vcm = Vr = V

Just before the jump

Just after the jump

Answer

Points

Слайд 9

The lower end B of the rod AB is fixed on a pivot.

The rope AC is attached to the upper end A and holds the rod in balance. Find the tension of the rope, if the weight of the rod is P, the angles ABC = BCA are equal to α. Points B and C are located on the same vertical line.

Слайд 10

The lower end B of the rod AB is fixed on a pivot.

Слайд 11

The lower end B of the rod AB is fixed on a pivot.

Answer

Слайд 12

The lower end B of the rod AB is fixed on a pivot.

Answer

Points

Слайд 13

4.
A uniform solid cylinder A of mass m1 can freely rotate about a

horizontal axis fixed to a mount B of mass m2. A constant horizontal force F is applied to the end K of a light thread tightly wound on the cylinder. The friction between the mount and the supporting horizontal plane is assumed to be absent. Find the acceleration of the point K.

Слайд 14

Translational motion:
Rotational motion:
Acceleration of the point K:
4.
A uniform solid cylinder A of mass

m1 can freely rotate about a horizontal axis fixed to a mount B of mass m2. A constant horizontal force F is applied to the end K of a light thread tightly wound on the cylinder. The friction between the mount and the supporting horizontal plane is assumed to be absent. Find the acceleration of the point K.