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equations of motion, study of light, laws of motion, invention of calculus method, specially differentiation and integration
1 equation: as u know that a=(v-u)/t so, v-u=a*t therefore, v=u+at which is the first equation of motion
The Runge-Kutta method is one of several numerical methods of solving differential equations. Some systems motion or process may be governed by differential equations which are difficult to impossible to solve with emperical methods. This is where numerical methods allow us to predict the motion, without having to solve the actual equation.
means motion of equation
V. S. Riabenkii has written: 'Long-time numerical integration of the three-dimensional wave equation in the vicinity of a moving source' -- subject(s): Cauchy problem, Algorithms, Boundary conditions, Numerical integration, Three dimensional motion, Wave equations 'An application of the difference potentials method to solving external problems in CFD' -- subject(s): Computational fluid dynamics, Viscous flow, Boundary value problems, Compressible flow, Difference equations, Navier-Stokes equation
One can solve equations of motion by graph by taking readings of the point of interception.
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The "equations of motion" are statements that describe motion. They would not be of much use if the very thing they're used to describe caused them to change. I'll say they don't.
Equations of kinematics or equations of motion can not be used when the body is not accelerating or is moving with a constant velocity.
lagrangian equation of motion by de alembert principal
Constant acceleration motion can be characterized by motion equations and by motion graphs. The graphs of distance, velocity and acceleration as functions.
That was Isaac Newton. He was able to derive Kepler's laws of planetary motion from his own equations regarding gravity, showing that the same rules apply to the motion of objects on Earth and to the motion of celestial bodies.