( V'^i = \frac\partial x'^i\partial x^j V^j ) ( V'^1 = 1\cdot 1 = 1 ) ( V'^2 = 0\cdot 1 + 1\cdot 0 + 1\cdot 0 = 0 ) → Wait careful: ( V'^2 = \frac\partial x'^2\partial x^1V^1 + \frac\partial x'^2\partial x^2V^2 + \frac\partial x'^2\partial x^3V^3 = 0\cdot 1 + 1\cdot 0 + 1\cdot 0 = 0 ) ( V'^3 = 0 ) So ( V'^i = (1,0,0) ) unchanged.
Understanding how components transform differently under a change of basis.
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