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transformation equation वाक्य

"transformation equation" हिंदी मेंtransformation equation in a sentence
उदाहरण वाक्यमोबाइल
  • Modulating signals are represented as a complex vector using a transformation equation.
  • Thus, the Lorentz transformation equations take the form
  • For example, the basic transformation equations become
  • He also derived the transformation equations which formed the basis of the special relativity theory of Albert Einstein.
  • We then simply use the Lorentz transformation equations to see when and where the observer in S sees these two events as occurring:
  • The vectors in the above transformation equation are known as four-vectors, in this case they are specifically the position four-vectors.
  • How would the Lorentz transformation equations change if the two reference frames were moving relative to each other at an angle with respect to the set of axes.
  • Note that in both these projections ( which are based on various ellipsoids ) the transformation equations for x and y and the expression for the scale factor are complicated functions of both latitude and longitude.
  • When you look at the transformation equations, you will notice that this can be only be valid for two events satisfying ?t = ?t = ?x'= ?x = 0, in other words for equations of the form 0 = 0.
  • In terms of dual quaternions and the homogeneous coordinates of a point \ textbf { P } : ( P _ 1, P _ 2, P _ 3, P _ 4 ) of the object, the transformation equation in terms of quaternions is given by ( see for details)
  • When the transformation equations are required to satisfy the light signal equations in the form " x " = " ct " and " x " 2 = " ct " 2, by substituting the x and x'- values, the same technique produces the same expression for the Lorentz factor.
  • By plugging these transformation rules into the full Maxwell's equations, it can be seen that if Maxwell's equations are true in one frame, then they are " almost " true in the other, but contain incorrect terms pro by the Lorentz transformation, and the field transformation equations also must be changed, according to the expressions given below.
  • If the transformation equations defining the generalized coordinates are independent of " t ", and the Lagrangian is a sum of products of functions ( in the generalized coordinates ) which are homogeneous of order 0, 1 or 2, then it can be shown that " H " is equal to the total energy " E " = " T " + " V ".
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