Yes. The "direction" of the vector is along the axis of rotation.
Yes. The "direction" of the vector is along the axis of rotation.
Yes. The "direction" of the vector is along the axis of rotation.
Yes. The "direction" of the vector is along the axis of rotation.
Yes. The "direction" of the vector is along the axis of rotation.
yes it definitely is....
Since torque is a force, and as such has a direction, it is a vector.
A vector quantity measures the movement of a particular object in a given direction. An example of a vector quantity is velocity.
A vector quantity is any quantity in which a direction is relevant. Some examples include position, velocity, acceleration, force, momentum, rotational momentum (the vector is defined to point in the direction of the axis in this case), torque, etc.
Torque is got by the cross product of two vectors namely force vector and perpendicular radius vector Tau (torque) = r X F But work is got by the scalar product of force vector and displacement vector Hence W = F . S
Any vector quantity does. Examples of vector quantities include but are not limited to . . . - Displacement - Velocity - Acceleration - Torque - Force - Electric field - Momentum - Poynting vector
Power can be scalar or vector, e.g d/dt torque = vector power; d/dt mcV = mcA a vector power.
Yes, It is in fact vector energy E=RxF also called Torque T=RxF.
Which of the following is a vector quantity
Examples of vector quantity are displacement, velocity, acceleration, momentum, force, E-filed, B-field, torque, energy, etc.
Examples of vector quantity are displacement, velocity, acceleration, momentum, force, E-filed, B-field, torque, energy, etc.
True, a vector quantity has direction, and a scalar quantity does not.
Momentum is a vector quantity. We know that momentum is the product of mass and velocity, and velocity has direction. That makes velocity a vector quantity. And the product of a scalar quantity and a vector quantity is a vector quantity.