Some books use the notation ax, ay, and az instead of i, j, and k for the Cartesian basis vectors.jedishrfu said:could you elaborate more on the ax - 2ay + 2az expression. Is this supposed to a vector as in ai -2aj +2ak where i,j,k are unit vectors? or is it the description of a plane where all points (x,y,z) reside on this plane ax - 2ay + 2az = constant ?
It would be correct if you had units on there. As far as the reasoning, you are supposed to supply that. Why do you think that's the way to solve this problem?4real4sure said:3. The Attempt at a Solution
w(vector)=w(1,-2,2) / 3 = (1,-2,2)
I need confirmation if this is correct or not. In either case, reasoning would be much appreciated.
Was this just some random combination of symbols? Is the 3 in the denominator because the angular speed is 3 rad/sec?w(vector)=w(1,-2,2) / 3 = (1,-2,2)
Angular velocity is the rate at which an object rotates around a fixed axis. It is measured in radians per second (rad/s) and is typically represented by the Greek letter omega (ω).
Angular velocity can be calculated by dividing the change in angle (in radians) by the change in time. The formula is ω = Δθ/Δt. It is important to remember that angular velocity is a vector quantity, so it has both magnitude and direction.
A rigid body rotation is when an object rotates around a fixed axis without any deformation or change in shape. This is in contrast to non-rigid body rotations, where the object can bend or deform as it rotates.
3 rad/s means that the object is rotating at a rate of 3 radians per second. This tells us how quickly the object is rotating and in what direction (clockwise or counterclockwise).
Angular velocity is directly proportional to the speed of rotation of a rigid body. This means that the higher the angular velocity, the faster the object is rotating. Additionally, the direction of the angular velocity vector determines the direction of rotation.