Physics Derivation Graph: review derivation: Lorentz transformation

review derivation: Lorentz transformation

This page contains three views of the steps in the derivation: d3js, graphviz PNG, and a table.

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Notes for this derivation:
source: \cite{1999_Tipler_Llewellyn}, page 21; see also https://en.wikipedia.org/wiki/Lorentz_transformation and https://en.wikipedia.org/wiki/Derivations_of_the_Lorentz_transformations

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Physics Derivation Graph: Steps for Lorentz transformation
Index	Inference Rule	Input latex	Feeds latex	Output latex	step validity	dimension check	unit check	notes
20	expr 1 is equivalent to expr 2 under the condition	4287102261; locally 6319661: \(x^2 + y^2 + z^2 = c^2 t^2\) \(pdg_{4037}^{2} + pdg_{5647}^{2} + pdg_{6728}^{2} = pdg_{1467}^{2} pdg_{4567}^{2}\) 1586866563; locally 4202425: \(\left( \gamma^2 - c^2 \gamma^2 \left( \frac{1-\gamma^2}{\gamma^2} \right)^2 \frac{1}{v^2} \right) x^2 + y^2 + z^2 + \left( -\gamma^2 2 x v t - c^2 \gamma^2 2 t \left( \frac{1-\gamma^2}{\gamma^2} \right) \frac{x}{v} \right) = t^2 \left( c^2 \gamma^2 - \gamma^2 v^2 \right)\) \(- 2 pdg_{1357} pdg_{1467} pdg_{1790}^{2} pdg_{4037} + pdg_{4037}^{2} \left(pdg_{1790}^{2} - \frac{pdg_{4567}^{2} \left(1 - pdg_{1790}^{2}\right)^{2}}{pdg_{1357}^{2} pdg_{1790}^{2}}\right) + pdg_{5647}^{2} + pdg_{6728}^{2} - \frac{2 pdg_{1467} pdg_{4037} pdg_{4567}^{2} \left(1 - pdg_{1790}^{2}\right)}{pdg_{1357}} = pdg_{1467}^{2} \left(- pdg_{1357}^{2} pdg_{1790}^{2} + pdg_{1790}^{2} pdg_{4567}^{2}\right)\)		1916173354; locally 3640931: \(-\gamma^2 v^2 + c^2 \gamma^2 = c^2\) \(- pdg_{1357}^{2} pdg_{1790}^{2} + pdg_{1790}^{2} pdg_{4567}^{2} = pdg_{4567}^{2}\)	no check performed	4287102261: 1586866563: 1916173354:	4287102261: 1586866563: 1916173354:	based on the comparison of the t^2 terms
1	declare initial expr			4662369843; locally 5427510: \(x' = \gamma (x - v t)\) \(pdg_{5456} = pdg_{1790} \left(- pdg_{1357} pdg_{1467} + pdg_{1464}\right)\)	no validation is available for declarations	4662369843:	4662369843:	equation 1-13 on page 21 in \cite{1999_Tipler_Llewellyn}
15	declare assumption			8515803375; locally 7666907: \(z' = z\) \(pdg_{4306} = pdg_{6728}\)	no validation is available for declarations	8515803375:	8515803375:
11	swap LHS with RHS	8730201316; locally 7546640: \(\frac{\gamma x (1 - \gamma^2 )}{\gamma^2 v} + \gamma t = t'\) \(pdg_{1790}\)		5148266645; locally 1693888: \(t' = \frac{\gamma x (1 - \gamma^2 )}{\gamma^2 v} + \gamma t\) \(pdg_{1790}\)	Nothing to split	8730201316: 5148266645:	8730201316: 5148266645:
12	declare initial expr			4287102261; locally 6319661: \(x^2 + y^2 + z^2 = c^2 t^2\) \(pdg_{4037}^{2} + pdg_{5647}^{2} + pdg_{6728}^{2} = pdg_{1467}^{2} pdg_{4567}^{2}\)	no validation is available for declarations	4287102261:	4287102261:
25	add X to both sides	5763749235; locally 8195408: \(-c^2 + c^2 \gamma^2 = v^2 \gamma^2\) \(pdg_{1790}^{2} pdg_{4567}^{2} - pdg_{4567}^{2} = pdg_{1357}^{2} pdg_{1790}^{2}\)	6408214498: \(c^2\) \(pdg_{4567}^{2}\)	2999795755; locally 6913493: \(c^2 \gamma^2 = v^2 \gamma^2 + c^2\) \(pdg_{1790}^{2} pdg_{4567}^{2} = pdg_{1357}^{2} pdg_{1790}^{2} + pdg_{4567}^{2}\)	valid	5763749235: 2999795755:	5763749235: 2999795755:
6	subtract X from both sides	7741202861; locally 6463955: \(x = \gamma^2 x - \gamma^2 v t + \gamma v t'\) \(pdg_{4037} = - pdg_{1357} pdg_{1467} pdg_{1790}^{2} + pdg_{1357} pdg_{1790} pdg_{4989} + pdg_{1790}^{2} pdg_{4037}\)	7337056406: \(\gamma^2 x\) \(pdg_{1790}^{2} pdg_{4037}\)	4139999399; locally 8494407: \(x - \gamma^2 x = - \gamma^2 v t + \gamma v t'\) \(- pdg_{1790}^{2} pdg_{4037} + pdg_{4037} = - pdg_{1357} pdg_{1467} pdg_{1790}^{2} + pdg_{1357} pdg_{1790} pdg_{4989}\)	valid	7741202861: 4139999399:	7741202861: 4139999399:
23	divide both sides by	2417941373; locally 7403799: \(- c^2 \gamma^2 \frac{(1-\gamma^2)^2}{v^2 \gamma^4} = 1 - \gamma^2\) \(- \frac{pdg_{4567}^{2} \left(1 - pdg_{1790}^{2}\right)^{2}}{pdg_{1357}^{2} pdg_{1790}^{2}} = 1 - pdg_{1790}^{2}\)	5787469164: \(1 - \gamma^2\) \(1 - pdg_{1790}^{2}\)	1639827492; locally 4052253: \(- c^2 \frac{(1-\gamma^2)}{v^2 \gamma^2} = 1\) \(- \frac{pdg_{4567}^{2} \left(1 - pdg_{1790}^{2}\right)}{pdg_{1357}^{2} pdg_{1790}^{2}} = 1\)	valid	2417941373: 1639827492:	2417941373: 1639827492:
24	multiply both sides by	1639827492; locally 4052253: \(- c^2 \frac{(1-\gamma^2)}{v^2 \gamma^2} = 1\) \(- \frac{pdg_{4567}^{2} \left(1 - pdg_{1790}^{2}\right)}{pdg_{1357}^{2} pdg_{1790}^{2}} = 1\)	5669500954: \(v^2 \gamma^2\) \(pdg_{1357}^{2} pdg_{1790}^{2}\)	5763749235; locally 8195408: \(-c^2 + c^2 \gamma^2 = v^2 \gamma^2\) \(pdg_{1790}^{2} pdg_{4567}^{2} - pdg_{4567}^{2} = pdg_{1357}^{2} pdg_{1790}^{2}\)	valid	1639827492: 5763749235:	1639827492: 5763749235:
10	simplify	1974334644; locally 5995189: \(\frac{x (1 - \gamma^2 )}{\gamma v} + \frac{\gamma^2 v t}{\gamma v} = t'\) \(pdg_{1467} pdg_{1790} + \frac{\operatorname{pdg_{4037}}{\left(1 - pdg_{1790}^{2} \right)}}{pdg_{1357} pdg_{1790}} = pdg_{4989}\)		8730201316; locally 7546640: \(\frac{\gamma x (1 - \gamma^2 )}{\gamma^2 v} + \gamma t = t'\) \(pdg_{1790}\)	Nothing to split	1974334644: 8730201316:	1974334644: 8730201316:
4	simplify	3426941928; locally 4471422: \(x = \gamma ( \gamma (x - v t) + v t' )\) \(pdg_{4037} = pdg_{1790} \left(pdg_{1357} pdg_{4989} + pdg_{1790} \left(- pdg_{1357} pdg_{1467} + pdg_{4037}\right)\right)\)		2096918413; locally 7169020: \(x = \gamma ( \gamma x - \gamma v t + v t' )\) \(pdg_{4037} = \operatorname{pdg_{1790}}{\left(- pdg_{1357} pdg_{1467} pdg_{1790} + pdg_{1357} pdg_{4989} + pdg_{1790} pdg_{4037} \right)}\)	LHS diff is 0 RHS diff is pdg1790(pdg1357pdg4989 - pdg1790(pdg1357pdg1467 - pdg4037)) - pdg1790(-pdg1357pdg1467pdg1790 + pdg1357pdg4989 + pdg1790pdg4037)	3426941928: 2096918413:	3426941928: 2096918413:
19	expr 1 is equivalent to expr 2 under the condition	4287102261; locally 6319661: \(x^2 + y^2 + z^2 = c^2 t^2\) \(pdg_{4037}^{2} + pdg_{5647}^{2} + pdg_{6728}^{2} = pdg_{1467}^{2} pdg_{4567}^{2}\) 1586866563; locally 4202425: \(\left( \gamma^2 - c^2 \gamma^2 \left( \frac{1-\gamma^2}{\gamma^2} \right)^2 \frac{1}{v^2} \right) x^2 + y^2 + z^2 + \left( -\gamma^2 2 x v t - c^2 \gamma^2 2 t \left( \frac{1-\gamma^2}{\gamma^2} \right) \frac{x}{v} \right) = t^2 \left( c^2 \gamma^2 - \gamma^2 v^2 \right)\) \(- 2 pdg_{1357} pdg_{1467} pdg_{1790}^{2} pdg_{4037} + pdg_{4037}^{2} \left(pdg_{1790}^{2} - \frac{pdg_{4567}^{2} \left(1 - pdg_{1790}^{2}\right)^{2}}{pdg_{1357}^{2} pdg_{1790}^{2}}\right) + pdg_{5647}^{2} + pdg_{6728}^{2} - \frac{2 pdg_{1467} pdg_{4037} pdg_{4567}^{2} \left(1 - pdg_{1790}^{2}\right)}{pdg_{1357}} = pdg_{1467}^{2} \left(- pdg_{1357}^{2} pdg_{1790}^{2} + pdg_{1790}^{2} pdg_{4567}^{2}\right)\)		3182633789; locally 2562123: \(\gamma^2 - c^2 \gamma^2 \frac{(1-\gamma^2)^2}{v^2 \gamma^4} = 1\) \(pdg_{1790}^{2} - \frac{pdg_{4567}^{2} \left(1 - pdg_{1790}^{2}\right)^{2}}{pdg_{1357}^{2} pdg_{1790}^{2}} = 1\)	no check performed	4287102261: 1586866563: 3182633789:	4287102261: 1586866563: 3182633789:	based on the comparison of the x^2 terms
22	subtract X from both sides	3182633789; locally 2562123: \(\gamma^2 - c^2 \gamma^2 \frac{(1-\gamma^2)^2}{v^2 \gamma^4} = 1\) \(pdg_{1790}^{2} - \frac{pdg_{4567}^{2} \left(1 - pdg_{1790}^{2}\right)^{2}}{pdg_{1357}^{2} pdg_{1790}^{2}} = 1\)	5284610349: \(\gamma^2\) \(pdg_{1790}^{2}\)	2417941373; locally 7403799: \(- c^2 \gamma^2 \frac{(1-\gamma^2)^2}{v^2 \gamma^4} = 1 - \gamma^2\) \(- \frac{pdg_{4567}^{2} \left(1 - pdg_{1790}^{2}\right)^{2}}{pdg_{1357}^{2} pdg_{1790}^{2}} = 1 - pdg_{1790}^{2}\)	valid	3182633789: 2417941373:	3182633789: 2417941373:	solve for \gamma
29	square root both sides	7906112355; locally 7595841: \(\gamma^2 = \frac{c^2}{c^2 - \gamma^2}\) \(pdg_{1790}^{2} = \frac{pdg_{4567}^{2}}{- pdg_{1790}^{2} + pdg_{4567}^{2}}\)		1528310784; locally 3040283: \(\gamma = \frac{1}{\sqrt{1-\frac{v^2}{c^2}}}\) \(pdg_{1790} = \frac{1}{\sqrt{- \frac{pdg_{1357}^{2}}{pdg_{4567}^{2}} + 1}}\) 8360117126; locally 6010461: \(\gamma = \frac{-1}{\sqrt{1-\frac{v^2}{c^2}}}\) \(pdg_{1790} = - \frac{1}{\sqrt{- \frac{pdg_{1357}^{2}}{pdg_{4567}^{2}} + 1}}\)	no check performed	7906112355: 1528310784: 8360117126:	7906112355: 1528310784: 8360117126:
17	simplify	9805063945; locally 4326342: \(\gamma^2 (x - v t)^2 + y^2 + z^2 = c^2 \gamma^2 \left( t + \frac{ 1 - \gamma^2 }{ \gamma^2 } \frac{x}{v} \right)^2\) \(pdg_{1790}^{2} \left(- pdg_{1357} pdg_{1467} + pdg_{4037}\right)^{2} + pdg_{5647}^{2} + pdg_{6728}^{2} = pdg_{1790}^{2} pdg_{4567}^{2} \left(pdg_{1467} + \frac{pdg_{4037} \left(1 - pdg_{1790}^{2}\right)}{pdg_{1357} pdg_{1790}^{2}}\right)^{2}\)		1935543849; locally 6066191: \(\gamma^2 x^2 - \gamma^2 2 x v t + \gamma^2 v^2 t^2 + y^2 + z^2 = c^2 \gamma^2 \left(\frac{1-\gamma^2}{\gamma^2}\right)\frac{x^2}{\gamma^2} + c^2 \gamma^2 2 t \left(\frac{1-\gamma^2}{\gamma^2}\right)\frac{x}{\gamma} + c^2 \gamma^2 t^2\) \(pdg_{1357}^{2} pdg_{1467}^{2} pdg_{1790}^{2} - 2 pdg_{1357} pdg_{1467} pdg_{1790}^{2} pdg_{4037} + pdg_{1790}^{2} pdg_{4037}^{2} + pdg_{5647}^{2} + pdg_{6728}^{2} = pdg_{1467}^{2} pdg_{1790}^{2} pdg_{4567}^{2} + \frac{2 pdg_{1467} pdg_{4037} pdg_{4567}^{2} \left(1 - pdg_{1790}^{2}\right)}{pdg_{1790}} + \frac{pdg_{4037}^{2} pdg_{4567}^{2} \left(1 - pdg_{1790}^{2}\right)}{pdg_{1790}^{2}}\)	LHS diff is 0 RHS diff is pdg4567*2(-pdg1357*2pdg1467*2pdg1790*4 + 2pdg1357*2pdg1467pdg1790pdg4037(pdg17902 - 1) + pdg13572pdg4037*2(pdg1790*2 - 1) + (pdg1357pdg1467pdg17902 - pdg4037(pdg17902 - 1))2)/(pdg1357*2pdg1790**2)	9805063945: 1935543849:	9805063945: 1935543849:	expanded the squared terms
30	declare final expr	1528310784; locally 3040283: \(\gamma = \frac{1}{\sqrt{1-\frac{v^2}{c^2}}}\) \(pdg_{1790} = \frac{1}{\sqrt{- \frac{pdg_{1357}^{2}}{pdg_{4567}^{2}} + 1}}\)			no validation is available for declarations	1528310784:	1528310784:	Lorentz factor definition
13	declare initial expr			1201689765; locally 5649086: \(x'^2 + y'^2 + z'^2 = c^2 t'^2\) \(pdg_{1888}^{2} + pdg_{4306}^{2} + pdg_{5456}^{2} = pdg_{4567}^{2} pdg_{4989}^{2}\)	no validation is available for declarations	1201689765:	1201689765:
5	simplify	2096918413; locally 7169020: \(x = \gamma ( \gamma x - \gamma v t + v t' )\) \(pdg_{4037} = \operatorname{pdg_{1790}}{\left(- pdg_{1357} pdg_{1467} pdg_{1790} + pdg_{1357} pdg_{4989} + pdg_{1790} pdg_{4037} \right)}\)		7741202861; locally 6463955: \(x = \gamma^2 x - \gamma^2 v t + \gamma v t'\) \(pdg_{4037} = - pdg_{1357} pdg_{1467} pdg_{1790}^{2} + pdg_{1357} pdg_{1790} pdg_{4989} + pdg_{1790}^{2} pdg_{4037}\)	LHS diff is 0 RHS diff is pdg1357pdg1467pdg1790*2 - pdg1357pdg1790pdg4989 - pdg17902pdg4037 + pdg1790(-pdg1357pdg1467pdg1790 + pdg1357pdg4989 + pdg1790pdg4037)	2096918413: 7741202861:	2096918413: 7741202861:
14	declare assumption			7057864873; locally 6316097: \(y' = y\) \(pdg_{1888} = pdg_{5647}\)	no validation is available for declarations	7057864873:	7057864873:
3	substitute LHS of expr 1 into expr 2	4662369843; locally 5427510: \(x' = \gamma (x - v t)\) \(pdg_{5456} = pdg_{1790} \left(- pdg_{1357} pdg_{1467} + pdg_{1464}\right)\) 2983053062; locally 2283140: \(x = \gamma (x' + v t')\) \(pdg_{4037} = pdg_{1790} \left(pdg_{1357} pdg_{4989} + pdg_{5456}\right)\)		3426941928; locally 4471422: \(x = \gamma ( \gamma (x - v t) + v t' )\) \(pdg_{4037} = pdg_{1790} \left(pdg_{1357} pdg_{4989} + pdg_{1790} \left(- pdg_{1357} pdg_{1467} + pdg_{4037}\right)\right)\)	LHS diff is 0 RHS diff is pdg1790*2(pdg1464 - pdg4037)	4662369843: 2983053062: dimensions are consistent 3426941928:	4662369843: 2983053062: N/A 3426941928:	solve output expr for t'
9	divide both sides by	9409776983; locally 6047713: \(x (1 - \gamma^2 ) + \gamma^2 v t = \gamma v t'\) \(pdg_{1790}\)	2226340358: \(\gamma v\) \(pdg_{1357} pdg_{1790}\)	1974334644; locally 5995189: \(\frac{x (1 - \gamma^2 )}{\gamma v} + \frac{\gamma^2 v t}{\gamma v} = t'\) \(pdg_{1467} pdg_{1790} + \frac{\operatorname{pdg_{4037}}{\left(1 - pdg_{1790}^{2} \right)}}{pdg_{1357} pdg_{1790}} = pdg_{4989}\)	Nothing to split	9409776983: 1974334644:	9409776983: 1974334644:
18	simplify	1935543849; locally 6066191: \(\gamma^2 x^2 - \gamma^2 2 x v t + \gamma^2 v^2 t^2 + y^2 + z^2 = c^2 \gamma^2 \left(\frac{1-\gamma^2}{\gamma^2}\right)\frac{x^2}{\gamma^2} + c^2 \gamma^2 2 t \left(\frac{1-\gamma^2}{\gamma^2}\right)\frac{x}{\gamma} + c^2 \gamma^2 t^2\) \(pdg_{1357}^{2} pdg_{1467}^{2} pdg_{1790}^{2} - 2 pdg_{1357} pdg_{1467} pdg_{1790}^{2} pdg_{4037} + pdg_{1790}^{2} pdg_{4037}^{2} + pdg_{5647}^{2} + pdg_{6728}^{2} = pdg_{1467}^{2} pdg_{1790}^{2} pdg_{4567}^{2} + \frac{2 pdg_{1467} pdg_{4037} pdg_{4567}^{2} \left(1 - pdg_{1790}^{2}\right)}{pdg_{1790}} + \frac{pdg_{4037}^{2} pdg_{4567}^{2} \left(1 - pdg_{1790}^{2}\right)}{pdg_{1790}^{2}}\)		1586866563; locally 4202425: \(\left( \gamma^2 - c^2 \gamma^2 \left( \frac{1-\gamma^2}{\gamma^2} \right)^2 \frac{1}{v^2} \right) x^2 + y^2 + z^2 + \left( -\gamma^2 2 x v t - c^2 \gamma^2 2 t \left( \frac{1-\gamma^2}{\gamma^2} \right) \frac{x}{v} \right) = t^2 \left( c^2 \gamma^2 - \gamma^2 v^2 \right)\) \(- 2 pdg_{1357} pdg_{1467} pdg_{1790}^{2} pdg_{4037} + pdg_{4037}^{2} \left(pdg_{1790}^{2} - \frac{pdg_{4567}^{2} \left(1 - pdg_{1790}^{2}\right)^{2}}{pdg_{1357}^{2} pdg_{1790}^{2}}\right) + pdg_{5647}^{2} + pdg_{6728}^{2} - \frac{2 pdg_{1467} pdg_{4037} pdg_{4567}^{2} \left(1 - pdg_{1790}^{2}\right)}{pdg_{1357}} = pdg_{1467}^{2} \left(- pdg_{1357}^{2} pdg_{1790}^{2} + pdg_{1790}^{2} pdg_{4567}^{2}\right)\)	LHS diff is pdg1357*2pdg1467*2pdg1790*2 - 2pdg1467pdg17902pdg4037pdg45672/pdg1357 + 2pdg1467pdg4037pdg45672/pdg1357 + pdg40372pdg45672(pdg17902 - 1)2/(pdg1357*2pdg17902) RHS diff is (pdg13572pdg14672pdg1790*4 - 2pdg1467pdg1790pdg4037pdg45672(pdg17902 - 1) - pdg40372pdg45672(pdg17902 - 1))/pdg17902	1935543849: 1586866563:	1935543849: 1586866563:	grouped by terms for x^2, xt, and t^2
27	factor out X from LHS	2542420160; locally 5207615: \(c^2 \gamma^2 - v^2 \gamma^2 = c^2\) \(- pdg_{1357}^{2} pdg_{1790}^{2} + pdg_{1790}^{2} pdg_{4567}^{2} = pdg_{4567}^{2}\)	7743841045: \(\gamma^2\) \(pdg_{1790}^{2}\)	7513513483; locally 8842089: \(\gamma^2 (c^2 - v^2) = c^2\) \(pdg_{1790}^{2} \left(- pdg_{1357}^{2} + pdg_{4567}^{2}\right) = pdg_{4567}^{2}\)	valid	2542420160: 7513513483:	2542420160: 7513513483:
21	expr 1 is equivalent to expr 2 under the condition	4287102261; locally 6319661: \(x^2 + y^2 + z^2 = c^2 t^2\) \(pdg_{4037}^{2} + pdg_{5647}^{2} + pdg_{6728}^{2} = pdg_{1467}^{2} pdg_{4567}^{2}\) 1586866563; locally 4202425: \(\left( \gamma^2 - c^2 \gamma^2 \left( \frac{1-\gamma^2}{\gamma^2} \right)^2 \frac{1}{v^2} \right) x^2 + y^2 + z^2 + \left( -\gamma^2 2 x v t - c^2 \gamma^2 2 t \left( \frac{1-\gamma^2}{\gamma^2} \right) \frac{x}{v} \right) = t^2 \left( c^2 \gamma^2 - \gamma^2 v^2 \right)\) \(- 2 pdg_{1357} pdg_{1467} pdg_{1790}^{2} pdg_{4037} + pdg_{4037}^{2} \left(pdg_{1790}^{2} - \frac{pdg_{4567}^{2} \left(1 - pdg_{1790}^{2}\right)^{2}}{pdg_{1357}^{2} pdg_{1790}^{2}}\right) + pdg_{5647}^{2} + pdg_{6728}^{2} - \frac{2 pdg_{1467} pdg_{4037} pdg_{4567}^{2} \left(1 - pdg_{1790}^{2}\right)}{pdg_{1357}} = pdg_{1467}^{2} \left(- pdg_{1357}^{2} pdg_{1790}^{2} + pdg_{1790}^{2} pdg_{4567}^{2}\right)\)		2076171250; locally 6685577: \(-\gamma^2 2 x v t - c^2 \gamma^2 2 t \left( \frac{1-\gamma^2}{\gamma^2} \right) \frac{x}{v} = 0\) \(pdg_{1790}\)	Nothing to split	4287102261: 1586866563: 2076171250:	4287102261: 1586866563: 2076171250:	based on the comparison of the (x t) terms
16	substitute LHS of four expressions into expr	8515803375; locally 7666907: \(z' = z\) \(pdg_{4306} = pdg_{6728}\) 7057864873; locally 6316097: \(y' = y\) \(pdg_{1888} = pdg_{5647}\) 5148266645; locally 1693888: \(t' = \frac{\gamma x (1 - \gamma^2 )}{\gamma^2 v} + \gamma t\) \(pdg_{1790}\) 4662369843; locally 5427510: \(x' = \gamma (x - v t)\) \(pdg_{5456} = pdg_{1790} \left(- pdg_{1357} pdg_{1467} + pdg_{1464}\right)\) 1201689765; locally 5649086: \(x'^2 + y'^2 + z'^2 = c^2 t'^2\) \(pdg_{1888}^{2} + pdg_{4306}^{2} + pdg_{5456}^{2} = pdg_{4567}^{2} pdg_{4989}^{2}\)		9805063945; locally 4326342: \(\gamma^2 (x - v t)^2 + y^2 + z^2 = c^2 \gamma^2 \left( t + \frac{ 1 - \gamma^2 }{ \gamma^2 } \frac{x}{v} \right)^2\) \(pdg_{1790}^{2} \left(- pdg_{1357} pdg_{1467} + pdg_{4037}\right)^{2} + pdg_{5647}^{2} + pdg_{6728}^{2} = pdg_{1790}^{2} pdg_{4567}^{2} \left(pdg_{1467} + \frac{pdg_{4037} \left(1 - pdg_{1790}^{2}\right)}{pdg_{1357} pdg_{1790}^{2}}\right)^{2}\)	Nothing to split	8515803375: 7057864873: 5148266645: 4662369843: 1201689765: 9805063945:	8515803375: 7057864873: 5148266645: 4662369843: 1201689765: 9805063945:
8	add X to both sides	9031609275; locally 3992172: \(x (1 - \gamma^2 ) = - \gamma^2 v t + \gamma v t'\) \(pdg_{1790}\)	8014566709: \(\gamma^2 v t\) \(pdg_{1357} pdg_{1467} pdg_{1790}^{2}\)	9409776983; locally 6047713: \(x (1 - \gamma^2 ) + \gamma^2 v t = \gamma v t'\) \(pdg_{1790}\)	Nothing to split	9031609275: 9409776983:	9031609275: 9409776983:
26	subtract X from both sides	2999795755; locally 6913493: \(c^2 \gamma^2 = v^2 \gamma^2 + c^2\) \(pdg_{1790}^{2} pdg_{4567}^{2} = pdg_{1357}^{2} pdg_{1790}^{2} + pdg_{4567}^{2}\)	3412946408: \(v^2 \gamma^2\) \(pdg_{1357}^{2} pdg_{1790}^{2}\)	2542420160; locally 5207615: \(c^2 \gamma^2 - v^2 \gamma^2 = c^2\) \(- pdg_{1357}^{2} pdg_{1790}^{2} + pdg_{1790}^{2} pdg_{4567}^{2} = pdg_{4567}^{2}\)	valid	2999795755: 2542420160:	2999795755: 2542420160:
28	divide both sides by	7513513483; locally 8842089: \(\gamma^2 (c^2 - v^2) = c^2\) \(pdg_{1790}^{2} \left(- pdg_{1357}^{2} + pdg_{4567}^{2}\right) = pdg_{4567}^{2}\)	8571466509: \(c^2 - \gamma^2\) \(- pdg_{1790}^{2} + pdg_{4567}^{2}\)	7906112355; locally 7595841: \(\gamma^2 = \frac{c^2}{c^2 - \gamma^2}\) \(pdg_{1790}^{2} = \frac{pdg_{4567}^{2}}{- pdg_{1790}^{2} + pdg_{4567}^{2}}\)	LHS diff is pdg1790*2(pdg13572 - pdg17902)/(pdg17902 - pdg45672) RHS diff is 0	7513513483: 7906112355:	7513513483: 7906112355:
7	factor out X from LHS	4139999399; locally 8494407: \(x - \gamma^2 x = - \gamma^2 v t + \gamma v t'\) \(- pdg_{1790}^{2} pdg_{4037} + pdg_{4037} = - pdg_{1357} pdg_{1467} pdg_{1790}^{2} + pdg_{1357} pdg_{1790} pdg_{4989}\)	3495403335: \(x\) \(pdg_{1464}\)	9031609275; locally 3992172: \(x (1 - \gamma^2 ) = - \gamma^2 v t + \gamma v t'\) \(pdg_{1790}\)	Nothing to split	4139999399: 9031609275:	4139999399: 9031609275:
2	declare initial expr			2983053062; locally 2283140: \(x = \gamma (x' + v t')\) \(pdg_{4037} = pdg_{1790} \left(pdg_{1357} pdg_{4989} + pdg_{5456}\right)\)	no validation is available for declarations	2983053062: dimensions are consistent	2983053062: N/A	equation 1-14 on page 21 in \cite{1999_Tipler_Llewellyn}

symbol ID	category	latex	scope	dimension	name	value	Used in derivations	references
1357	variable	v \(v\)	['real']	length: 1 time: -1	velocity		Newton's Law of Gravitation frequency relations escape velocity radius for satellite in geostationary orbit equations of motion in 1D with constant acceleration - SUVAT (algebra) work and force and energy time invariant force conserves energy derivation of Schrodinger Equation speed of Earth around Sun velocity at distance r of object dropped from infinity Lorentz transformation	Velocity	83
6728	variable	z \(z\)	['real']	length: 1	position		Lorentz transformation	Position_(geometry)	5
1467	variable	t \(t\)	['real']	time: 1	time		Newton's Law of Gravitation angle of maximum distance for projectile motion equations of motion in 2D (calculus) Maxwell equations to electric field wave equation equation of motion for a spring equations of motion in 1D with constant acceleration - SUVAT (algebra) projectile path in 2D is parabolic time invariant force conserves energy derivation of Schrodinger Equation radius for satellite in geostationary orbit speed of Earth around Sun electric field wave equation: from time dependent to time independent Lorentz transformation	Time_in_physics	121
4567	constant	c \(c\)	['real']	length: 1 time: -1	speed of light in vacuum	299792458 meters/second	Schwarzschild radius for non-rotating black hole upper limit on velocity in condensed matter electric field wave equation: from time dependent to time independent Lorentz transformation	Speed_of_light Q2111 sh85076878.html	32
4306	variable	z' \(z'\)	['real']	length: 1	position in moving reference frame		Lorentz transformation	Frame_of_reference	2
1464	variable	x \(x\)	['real']	dimensionless			particle in a 1D box angle of maximum distance for projectile motion quadratic equation derivation Euler equation: trig square root identity sin(2 x) = 2 sin(x) cos(x) using Euler's equation equations of motion in 2D (calculus) variance relation Lorentz transformation optics: Law of refraction to Brewster's angle time invariant force conserves energy Euler equation: trigonometric relations Euler equation proof quantum basics orthogonality double intensity when phase is coherent (optics) Euler equation to e^(i pi) + 1 = 0 hyperbolic trigonometric identities		140
5647	variable	y \(y\)	['real']	length: 1	position		Lorentz transformation angle of maximum distance for projectile motion projectile path in 2D is parabolic equations of motion in 2D (calculus)	Position_(geometry)	14
4037	variable	x \(x\)	['real']	length: 1	position		escape velocity particle in a 1D box angle of maximum distance for projectile motion Euler equation: trig square root equations of motion in 2D (calculus) mass of the Earth equation of motion for a spring work and force and energy projectile path in 2D is parabolic time invariant force conserves energy radius for satellite in geostationary orbit velocity at distance r of object dropped from infinity double intensity when phase is coherent (optics) Lorentz transformation	Position_(geometry)	53
1790	variable	\gamma \(\gamma\)	['real']	dimensionless	Lorentz factor		Lorentz transformation	Lorentz_factor	35
5456	variable	x' \(x'\)	['real']	length: 1	position in moving reference frame		Lorentz transformation	Frame_of_reference	3
1888	variable	y' \(y'\)	['real']	length: 1	position in moving reference frame		Lorentz transformation	Frame_of_reference	2
4989	variable	t' \(t'\)	real	time: 1	time in moving reference frame		Lorentz transformation	str_note	7

review derivation: Lorentz transformation

Symbols for this derivation