lorentz transformation发音

意思翻译

洛伦兹变换

相似词语短语

transformation───n.[遗]转化；转换；改革；变形

allotropy transformation───同素异形变换

congruence transformation───同余变换；[数]全等变换

gauge transformation───量规变换；[电磁]规范变换；量规[度规]变换

affine transformation───[数]仿射变换

monotonic transformation───[数]单调变换

alchemical transformation───炼金术转化

galilean transformation───伽利略变换；伽里略变换

transformation matrix───[数]变换矩阵，转换矩阵

双语使用场景

general formula of relativistic Doppler shift is obtained from Lorentz transformation, and the supersonic motion is discussed as well.───利用洛伦兹变换导出了相对论性的多普勒颇移的普遍公式，并且讨论了波源的超音速运动情况。

relativity in two mutually rotating coordinates are discussed by using the rotating Lorentz transformation.───利用旋转洛仑兹变换讨论相对匀速转动参考系中的相对论效应。

derivation methods of Lorentz transformation according to invariance of light speed and principle of relativity are commented.───评论了仅仅依据光速不变假设和相对性原理推导洛伦兹变换公式的方法。

Conservative law of mechanical energy ; two principles of special relativity and Lorentz transformation .───机械能守恒定律；狭义相对论的两个原理和洛伦兹变换。

Two principles of special relativity and Lorentz transformation. The space-time idea of the special relativity.───狭义相对论的两个原理和洛伦兹变换；狭义相对论的时空观。

The derivation methods of Lorentz transformation according to invariance of light speed and principle of relativity are commented.───评论了仅仅依据光速不变假设和相对性原理推导洛伦兹变换公式的方法。

The use of Lorentz transformation, derived point charge excitation electromagnetic field.───利用洛伦兹变换，导出点电荷激发的电磁场。

Smart Transformation of Mechanical Quantities about Special Lorentz Transformation───特殊洛伦兹变换中力学量的巧妙变换

Further Discussion about Lorentz Transformation───变换的进一步讨论

英语使用场景

We shall discuss several of them below with the help of the Lorentz transformation.

Based of energy conservation and momentum conservation, the mass - speed equation is derived through Lorentz transformation.

The Lorentz transformation of orthogonal bases is derived by means of matrix Euclidean four dimension space.

The derivation methods of Lorentz transformation according to invariance of light speed and principle of relativity are commented.

The phenomena of relativity in two mutually rotating coordinates are discussed using the rotating Lorentz transformation.