The time derivative of vectors depends on the coordinate frame in which the vector is expresses and the coordinate frame in which the derivative is taken. By redefining and expanding the Euler's derivative transformation formula, we introduce the general theory of derivative and coordinate frames using a proper notation method. Introducing three coordinate frames, we show that the Coriolis acceleration is the addition of two different accelerations. Furthermore, a new acceleration term appears that we call it Razi acceleration
EnAn axiomatic approach to classical kinematics is developed. An affine four dimensional space $E$ (...
Differentiating equation (23) with respect to time yields a di-rectly. Having computed a and a, fa a...
AbstractBy the traditional representation accepted in mathematics, mechanics and theoretical physics...
The time derivative of vectors depends on the coordinate frame in which the vector is expresses and ...
This paper outlines the procedure of calculating inertial acceleration in a kinematic system involvi...
Abstract We present a unified derivation of covariant time derivatives, which transform as tensors u...
This paper explains the relationship between two existing representations of rigid-body acceleration...
In the general theory of relativity the Rindler coordinate theory has been extended to the Rindler c...
We propose a definition of uniform accelerated frames in de Sitter spacetimes applying the Nachtmann...
The notions of centrifugal (centripetal) and Coriols' velocities and accelerations are introduced an...
The notions of centrifugal (centripetal) and Coriolis velocities and accelerations are introduced an...
This chapter describes the how the vector of coordinates are defined in the formulation of spatial m...
EnHere we study the absolute kinematics of a continum,wich,viewed as a frame of reference,determines...
The transformation of coordinates and time from an inertial frame to another inertial frame is obta...
.This is an extended discussion of the introduction and role played by the so-called co-rotational d...
EnAn axiomatic approach to classical kinematics is developed. An affine four dimensional space $E$ (...
Differentiating equation (23) with respect to time yields a di-rectly. Having computed a and a, fa a...
AbstractBy the traditional representation accepted in mathematics, mechanics and theoretical physics...
The time derivative of vectors depends on the coordinate frame in which the vector is expresses and ...
This paper outlines the procedure of calculating inertial acceleration in a kinematic system involvi...
Abstract We present a unified derivation of covariant time derivatives, which transform as tensors u...
This paper explains the relationship between two existing representations of rigid-body acceleration...
In the general theory of relativity the Rindler coordinate theory has been extended to the Rindler c...
We propose a definition of uniform accelerated frames in de Sitter spacetimes applying the Nachtmann...
The notions of centrifugal (centripetal) and Coriols' velocities and accelerations are introduced an...
The notions of centrifugal (centripetal) and Coriolis velocities and accelerations are introduced an...
This chapter describes the how the vector of coordinates are defined in the formulation of spatial m...
EnHere we study the absolute kinematics of a continum,wich,viewed as a frame of reference,determines...
The transformation of coordinates and time from an inertial frame to another inertial frame is obta...
.This is an extended discussion of the introduction and role played by the so-called co-rotational d...
EnAn axiomatic approach to classical kinematics is developed. An affine four dimensional space $E$ (...
Differentiating equation (23) with respect to time yields a di-rectly. Having computed a and a, fa a...
AbstractBy the traditional representation accepted in mathematics, mechanics and theoretical physics...