Add to ORKGRecently, the authors completed a study of the Davenport angles, which are a generalization of the Euler angles for which the initial and final Euler axes need not be either mutually parallel or mutually perpendicular or even along the coordinate axes. During the conduct of that study, those authors discovered a relationship which can be used to compute straightforwardly the Euler angles characterizing a proper-orthogonal direction-cosine matrix for an arbitrary Euler-axis set satisfying n(sub 1) x n(sub 2) = 0 and n(sub 3) x n(sub 1) = 0, which is also satisfied by the more usual Euler angles we encounter commonly in the practice of Astronautics. Rather than leave that relationship hidden in an article with very different focus from the pr...
<p>These two IDL routines can be used to transform Euler angles to a rotation matrix, and vice-versa...
Euler's theorem states that any sequence of finite rotations of a rigid body can be described as a s...
The derivation of Euler\u27s equations of motion in using cylindrical vector components is beneficia...
The Euler (or Eulerian) angles, usually designated 'Phi','Teta', and 'Psi', uniquely determine the o...
International audienceCurrent methods of the conversion between a rotation quaternion and Euler angl...
Euler angles have been used to describe the orientation of objects in two-dimensional and three-dime...
Euler axis/angle is a useful representation in many attitude control problems, being related to the...
Any rotation of a 3-dimensional object can be performed by three consecutive rotations over Euler an...
This chapter deals with the different approaches for describing the rotational coordinates in spatia...
Abstract It is shown that the Euler angles can be generalized to axes other than members of an ortho...
Euler\u27s angles are used to describe rotation using independent coordinates. They are useful in ro...
This paper introduces and defines two principal rotational methods;the Euler angles and the quaterni...
This article compares three different algorithms used to compute Euler angles from data obtained by ...
This paper first explores the generalization of Euler angles to the case in which the rotation axes ...
This paper presents a comparative study about the attitude control methods based on four commonly us...
<p>These two IDL routines can be used to transform Euler angles to a rotation matrix, and vice-versa...
Euler's theorem states that any sequence of finite rotations of a rigid body can be described as a s...
The derivation of Euler\u27s equations of motion in using cylindrical vector components is beneficia...
The Euler (or Eulerian) angles, usually designated 'Phi','Teta', and 'Psi', uniquely determine the o...
International audienceCurrent methods of the conversion between a rotation quaternion and Euler angl...
Euler angles have been used to describe the orientation of objects in two-dimensional and three-dime...
Euler axis/angle is a useful representation in many attitude control problems, being related to the...
Any rotation of a 3-dimensional object can be performed by three consecutive rotations over Euler an...
This chapter deals with the different approaches for describing the rotational coordinates in spatia...
Abstract It is shown that the Euler angles can be generalized to axes other than members of an ortho...
Euler\u27s angles are used to describe rotation using independent coordinates. They are useful in ro...
This paper introduces and defines two principal rotational methods;the Euler angles and the quaterni...
This article compares three different algorithms used to compute Euler angles from data obtained by ...
This paper first explores the generalization of Euler angles to the case in which the rotation axes ...
This paper presents a comparative study about the attitude control methods based on four commonly us...
<p>These two IDL routines can be used to transform Euler angles to a rotation matrix, and vice-versa...
Euler's theorem states that any sequence of finite rotations of a rigid body can be described as a s...
The derivation of Euler\u27s equations of motion in using cylindrical vector components is beneficia...