Start with no spinning mass and think of a tilting plane as a seesaw, not mounted to the ground, but when you tilt it, it has a tilt axis running through the center that is the fulcrum for the seesaw. A tilting plane is an absolute condition, and it has only one absolute axis defining this tilting condition. Tilting has a direction, and the tilt axis follows any new tilt direction like an axle of a cart. The axle is always perpendicular to the direction of the cart. Now add mass spinning within this tilting plane. The plane does not spin, and the seesaw tilting ends and tilt axis are the same as they were with no mass spinning inside.
The thing about a seesaw is that one end goes up while the other goes down -opposing end velocities. NOW, given that mass is spinning inside this tilting spin plane, it means that the mass must TOTALLY reverse tilting end velocities each time it passes between tilting seesaw ends. That is a massive amount of acceleration focused at the tilt axis running through the spin plane, AND it's perfectly perpendicular to the spin plane and spin velocity (will not affect spin). This acceleration normal to the spin plane begins pushing the spinning disk to precess, but in order to precess, this is a change in tilt direction which takes the axle of the cart with it producing perpendicular acceleration the whole time, so the axle ends up aligning itself with the force that caused all of this in the first place. If you stop precession, the acceleration production just disappears, because there is no tilting end velocity going through the tilt axis.
This paper describes the acceleration produced by a tilt axis, but not the directional aspect:
Paul Rood, "'Action Equals Reaction'—Even in Gyroscopes," Am. J. Phys. 13, 175-177 (1945).
My video is an engineering simulator gyro showing the causal components. My math technique is based on the path that an atom in a gyro follows in space. Take the second derivative of this path and isolate the normal components of force. This is actually a force field shaped like a cylindrical hoof. Most people cannot see this, because "cause" is not intuitive.
Proof! Angular Momentum Is Not Causal
Start with no spinning mass and think of a tilting plane as a seesaw, not mounted to the ground, but when you tilt it, it has a tilt axis running through the center that is the fulcrum for the seesaw. A tilting plane is an absolute condition, and it has only one absolute axis defining this tilting condition. Tilting has a direction, and the tilt axis follows any new tilt direction like an axle of a cart. The axle is always perpendicular to the direction of the cart. Now add mass spinning within this tilting plane. The plane does not spin, and the seesaw tilting ends and tilt axis are the same as they were with no mass spinning inside.
The thing about a seesaw is that one end goes up while the other goes down -opposing end velocities. NOW, given that mass is spinning inside this tilting spin plane, it means that the mass must TOTALLY reverse tilting end velocities each time it passes between tilting seesaw ends. That is a massive amount of acceleration focused at the tilt axis running through the spin plane, AND it's perfectly perpendicular to the spin plane and spin velocity (will not affect spin). This acceleration normal to the spin plane begins pushing the spinning disk to precess, but in order to precess, this is a change in tilt direction which takes the axle of the cart with it producing perpendicular acceleration the whole time, so the axle ends up aligning itself with the force that caused all of this in the first place. If you stop precession, the acceleration production just disappears, because there is no tilting end velocity going through the tilt axis.
This paper describes the acceleration produced by a tilt axis, but not the directional aspect:
Paul Rood, "'Action Equals Reaction'—Even in Gyroscopes," Am. J. Phys. 13, 175-177 (1945).
My video is an engineering simulator gyro showing the causal components. My math technique is based on the path that an atom in a gyro follows in space. Take the second derivative of this path and isolate the normal components of force. This is actually a force field shaped like a cylindrical hoof. Most people cannot see this.
Proof! Angular Momentum Is Not Causal
Start with no spinning mass and think of a tilting plane as a seesaw, not mounted to the ground, but when you tilt it, it has a tilt axis running through the center that is the fulcrum for the seesaw. A tilting plane is an absolute condition, and it has only one absolute axis defining this tilting condition. Tilting has a direction, and the tilt axis follows any new tilt direction like an axle of a cart. The axle is always perpendicular to the direction of the cart. Now add mass spinning within this tilting plane. The plane does not spin, and the seesaw tilting ends and tilt axis are the same as they were with no mass spinning inside.
The thing about a seesaw is that one end goes up while the other goes down -opposing end velocities. NOW, given that mass is spinning inside this tilting spin plane, it means that the mass must TOTALLY reverse tilting end velocities each time it passes between tilting seesaw ends. That is a massive amount of acceleration focused at the tilt axis running through the spin plane, AND it's perfectly perpendicular to the spin plane and spin velocity (will not affect spin). This acceleration normal to the spin plane begins pushing the spinning disk to precess, but in order to precess, this is a change in tilt direction which takes the axle of the cart with it producing perpendicular acceleration the whole time, so the axle ends up aligning itself with the force that caused all of this in the first place. If you stop precession, the acceleration production just disappears, because there is no tilting end velocity going through the tilt axis.
This paper describes the acceleration produced by a tilt axis, but not the directional aspect:
Paul Rood, "'Action Equals Reaction'—Even in Gyroscopes," Am. J. Phys. 13, 175-177 (1945).
My video is an engineering simulator gyro showing the causal components. My math technique is based on the path that an atom in a gyro follows in space. Take the second derivative of this path and isolate the normal components of force. This is actually a force field shaped like a cylindrical hoof. Most people cannot see this, because "cause" is not intuitive.
Proof! Angular Momentum Is Not Causal
Start with no spinning mass and think of a tilting plane as a seesaw, not mounted to the ground, but when you tilt it, it has a tilt axis running through the center that is the fulcrum for the seesaw. A tilting plane is an absolute condition, and it has only one absolute axis defining this tilting condition. Tilting has a direction, and the tilt axis follows any new tilt direction like an axle of a cart. The axle is always perpendicular to the direction of the cart. Now add mass spinning within this tilting plane. The plane does not spin, and the seesaw tilting ends and tilt axis are the same as they were with no mass spinning inside.
The thing about a seesaw is that one end goes up while the other goes down -opposing end velocities. NOW, given that mass is spinning inside this tilting spin plane, it means that the mass must TOTALLY reverse tilting end velocities each time it passes between tilting seesaw ends. That is a massive amount of acceleration focused at the tilt axis running through the spin plane, AND it's perfectly perpendicular to to the spin plane and spin velocity (will not affect itspin). This acceleration normal to the spin plane begins pushing the spinning disk to precess, but in order to precess, this is a change in tilt direction which takes the axle of the cart with it producing perpendicular acceleration the whole time, so the axle ends up aligning itself with the force that caused all of this in the first place. If you stop precession, the acceleration production just disappears, because there is no tilting end velocity going through the tilt axis.
This paper describes the acceleration produced by a tilt axis, but not the directional aspect:
Paul Rood, "'Action Equals Reaction'—Even in Gyroscopes," Am. J. Phys. 13, 175-177 (1945).
My video is an engineering simulator gyro showing the causal components. My math technique is based on the path that an atom in a gyro follows in space. Take the second derivative of this path and isolate the normal components of force. This is actually a force field shaped like a cylindrical hoof. Most people cannot see this.
Proof! Angular Momentum Is Not Causal
Start with no spinning mass and think of a tilting plane as a seesaw, not mounted to the ground, but when you tilt it, it has a tilt axis running through the center that is the fulcrum for the seesaw. A tilting plane is an absolute condition, and it has only one absolute axis defining this tilting condition. Tilting has a direction, and the tilt axis follows any new tilt direction like an axle of a cart. The axle is always perpendicular to the direction of the cart. Now add mass spinning within this tilting plane. The plane does not spin, and the seesaw tilting ends and tilt axis are the same as they were with no mass spinning inside.
The thing about a seesaw is that one end goes up while the other goes down -opposing end velocities. NOW, given that mass is spinning inside this tilting spin plane, it means that the mass must TOTALLY reverse tilting end velocities each time it passes between tilting seesaw ends. That is a massive amount of acceleration focused at the tilt axis running through the spin plane, AND it's perfectly perpendicular to to the spin plane and spin velocity (will not affect it). This acceleration normal to the spin plane begins pushing the spinning disk to precess, but in order to precess, this is a change in tilt direction which takes the axle of the cart with it producing perpendicular acceleration the whole time, so the axle ends up aligning itself with the force that caused all of this in the first place. If you stop precession, the acceleration production just disappears, because there is no tilting end velocity going through the tilt axis.
This paper describes the acceleration produced by a tilt axis, but not the directional aspect:
Paul Rood, "'Action Equals Reaction'—Even in Gyroscopes," Am. J. Phys. 13, 175-177 (1945).
My video is an engineering simulator gyro showing the causal components. My math technique is based on the path that an atom in a gyro follows in space. Take the second derivative of this path and isolate the normal components of force. This is actually a force field shaped like a cylindrical hoof. Most people cannot see this.
Proof! Angular Momentum Is Not Causal
Start with no spinning mass and think of a tilting plane as a seesaw, not mounted to the ground, but when you tilt it, it has a tilt axis running through the center that is the fulcrum for the seesaw. A tilting plane is an absolute condition, and it has only one absolute axis defining this tilting condition. Tilting has a direction, and the tilt axis follows any new tilt direction like an axle of a cart. The axle is always perpendicular to the direction of the cart. Now add mass spinning within this tilting plane. The plane does not spin, and the seesaw tilting ends and tilt axis are the same as they were with no mass spinning inside.
The thing about a seesaw is that one end goes up while the other goes down -opposing end velocities. NOW, given that mass is spinning inside this tilting spin plane, it means that the mass must TOTALLY reverse tilting end velocities each time it passes between tilting seesaw ends. That is a massive amount of acceleration focused at the tilt axis running through the spin plane, AND it's perfectly perpendicular to the spin plane and spin velocity (will not affect spin). This acceleration normal to the spin plane begins pushing the spinning disk to precess, but in order to precess, this is a change in tilt direction which takes the axle of the cart with it producing perpendicular acceleration the whole time, so the axle ends up aligning itself with the force that caused all of this in the first place. If you stop precession, the acceleration production just disappears, because there is no tilting end velocity going through the tilt axis.
This paper describes the acceleration produced by a tilt axis, but not the directional aspect:
Paul Rood, "'Action Equals Reaction'—Even in Gyroscopes," Am. J. Phys. 13, 175-177 (1945).
My video is an engineering simulator gyro showing the causal components. My math technique is based on the path that an atom in a gyro follows in space. Take the second derivative of this path and isolate the normal components of force. This is actually a force field shaped like a cylindrical hoof. Most people cannot see this.
Proof! Angular Momentum Is Not Causal
Start with no spinning mass and think of a tilting plane as a seesaw, not mounted to the ground, but when you tilt it, it has a tilt axis running through the center that is the fulcrum for the seesaw. A tilting plane is an absolute condition, and it has only one absolute axis defining this tilting condition. Tilting has a direction, and the tilt axis follows any new tilt direction like an axle of a cart. The axle is always perpendicular to the direction of the cart. Now add mass spinning within this tilting plane. The plane does not spin, and the seesaw tilting ends and tilt axis are the same as they were with no mass spinning inside.
The thing about a seesaw is that one end goes up while the other goes down -opposing end velocities. NOW, given that mass is spinning inside this tilting spin plane, it means that the mass must TOTALLY reverse tilting end velocities each time it passes between tilting seesaw ends. That is a massive amount of acceleration focused at the tilt axis running through the spin plane, AND it's perfectly perpendicular to to the spin plane and spin velocity (will not affect it). This acceleration normal to the spin plane begins pushing the spinning disk to precess, but in order to precess, this is a change in tilt direction which takes the axle of the cart with it producing perpendicular acceleration the whole time, so the axle ends up aligning itself with the force that caused all of this in the first place. If you stop precession, the acceleration production just disappears, because there is no tilting end velocity going through the tilt axis.
This paper describes the acceleration produced by a tilt axis, but not the directional aspect:
Paul Rood, "'Action Equals Reaction'—Even in Gyroscopes," Am. J. Phys. 13, 175-177 (1945).
My video is an engineering simulator gyro showing the causal components. My math technique is based on the path that an atom in a gyro follows in space. Take the second derivative of this path and isolate the normal components of force. This is actually a force field shaped like a cylindrical hoof. Most people cannot see this.
Proof! Angular Momentum Is Not Causal