Physics Derivation Graph: review derivation: hyperbolic trigonometric identities

review derivation: hyperbolic trigonometric identities

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:
http://www.physics.miami.edu/~nearing/mathmethods/mathematical_methods-one.pdf

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Physics Derivation Graph: Steps for hyperbolic trigonometric identities
Index	Inference Rule	Input latex	Feeds latex	Output latex	step validity	dimension check	unit check
11	declare initial expr			2103023049; locally 3077940: \(\sin(x) = \frac{1}{2i}\left(\exp(i x)-\exp(-i x) \right)\) \(\sin{\left(pdg_{1464} \right)} = \frac{e^{pdg_{1464} pdg_{4621}} - e^{- pdg_{1464} pdg_{4621}}}{2 pdg_{4621}}\)	no validation is available for declarations	2103023049:	2103023049:
26	simplify	1128605625; locally 6426652: \({\rm sech}^2\ x + \tanh^2(x) = \frac{4}{\left(\exp(x)+\exp(-x)\right)^2} + \frac{\left(\exp(x)-\exp(-x)\right)^2}{\left(\exp(x)+\exp(-x)\right)^2}\) \(\tanh^{2}{\left(pdg_{1464} \right)} + \operatorname{sech}^{2}{\left(pdg_{1464} \right)} = \frac{\left(e^{pdg_{1464}} - e^{- pdg_{1464}}\right)^{2}}{\left(e^{pdg_{1464}} + e^{- pdg_{1464}}\right)^{2}} + \frac{4}{\left(e^{pdg_{1464}} + e^{- pdg_{1464}}\right)^{2}}\)		4830221561; locally 6070484: \({\rm sech}^2\ x + \tanh^2(x) = \frac{4+\left(\exp(2x)-1-1+\exp(-2x)\right)}{\left(\exp(x)+\exp(-x)\right)^2}\) \(\tanh^{2}{\left(pdg_{1464} \right)} + \operatorname{sech}^{2}{\left(pdg_{1464} \right)} = \frac{e^{2 pdg_{1464}} + 2 + e^{- 2 pdg_{1464}}}{\left(e^{pdg_{1464}} + e^{- pdg_{1464}}\right)^{2}}\)	valid	1128605625: 4830221561:	1128605625: 4830221561:
25	add expr 1 to expr 2	3868998312; locally 5395954: \({\rm sech}^2\ x = \frac{4}{\left(\exp(x)+\exp(-x)\right)^2}\) \(\operatorname{sech}^{2}{\left(pdg_{1464} \right)} = \frac{4}{\left(e^{pdg_{1464}} + e^{- pdg_{1464}}\right)^{2}}\) 2121790783; locally 9317216: \(\tanh^2(x) = \frac{ \left(\exp(x)-\exp(-x)\right)^2}{\left(\exp(x)+\exp(-x)\right)^2}\) \(\tanh^{2}{\left(pdg_{1464} \right)} = \frac{\left(e^{pdg_{1464}} - e^{- pdg_{1464}}\right)^{2}}{\left(e^{pdg_{1464}} + e^{- pdg_{1464}}\right)^{2}}\)		1128605625; locally 6426652: \({\rm sech}^2\ x + \tanh^2(x) = \frac{4}{\left(\exp(x)+\exp(-x)\right)^2} + \frac{\left(\exp(x)-\exp(-x)\right)^2}{\left(\exp(x)+\exp(-x)\right)^2}\) \(\tanh^{2}{\left(pdg_{1464} \right)} + \operatorname{sech}^{2}{\left(pdg_{1464} \right)} = \frac{\left(e^{pdg_{1464}} - e^{- pdg_{1464}}\right)^{2}}{\left(e^{pdg_{1464}} + e^{- pdg_{1464}}\right)^{2}} + \frac{4}{\left(e^{pdg_{1464}} + e^{- pdg_{1464}}\right)^{2}}\)	valid	3868998312: 2121790783: 1128605625:	3868998312: 2121790783: 1128605625:
15	declare initial expr			4585932229; locally 4731536: \(\cos(x) = \frac{1}{2}\left(\exp(i x)+\exp(-i x) \right)\) \(\cos{\left(pdg_{1464} \right)} = \frac{e^{pdg_{1464} pdg_{4621}}}{2} + \frac{e^{- pdg_{1464} pdg_{4621}}}{2}\)	no validation is available for declarations	4585932229:	4585932229:
19	substitute LHS of expr 1 into expr 2	6404535647; locally 4319733: \(\cosh x = \frac{\exp(x) + \exp(-x)}{2}\) \(\cosh{\left(pdg_{1464} \right)} = \frac{e^{pdg_{1464}}}{2} + \frac{e^{- pdg_{1464}}}{2}\) 7731226616; locally 3909583: \({\rm sech}\ x = \frac{1}{\cosh x}\) \(\operatorname{sech}{\left(pdg_{1464} \right)} = \frac{1}{\cosh{\left(pdg_{1464} \right)}}\)		4166155526; locally 7222556: \({\rm sech}\ x = \frac{2}{\exp(x)+\exp(-x)}\) \(\operatorname{sech}{\left(pdg_{1464} \right)} = \frac{2}{e^{pdg_{1464}} + e^{- pdg_{1464}}}\)	valid	6404535647: error for dim with 6404535647 7731226616: 4166155526:	6404535647: N/A 7731226616: 4166155526:
21	substitute LHS of expr 1 into expr 2	1038566242; locally 3145608: \(\sinh x = \frac{\exp(x) - \exp(-x)}{2}\) \(\sinh{\left(pdg_{1464} \right)} = \frac{e^{pdg_{1464}}}{2} - \frac{e^{- pdg_{1464}}}{2}\) 4872163189; locally 3867418: \(\tanh(x) = \frac{\sinh(x)}{\cosh(x)}\) \(\tanh{\left(pdg_{1464} \right)} = \frac{\sinh{\left(pdg_{1464} \right)}}{\cosh{\left(pdg_{1464} \right)}}\)		2902772962; locally 6831354: \(\tanh(x) = \frac{\frac{1}{2}\left( \exp(x)-\exp(-x) \right)}{\cosh(x)}\) \(\tanh{\left(pdg_{1464} \right)} = \frac{\frac{e^{pdg_{1464}}}{2} - \frac{e^{- pdg_{1464}}}{2}}{\cosh{\left(pdg_{1464} \right)}}\)	valid	1038566242: 4872163189: 2902772962:	1038566242: 4872163189: 2902772962:
27	simplify	4830221561; locally 6070484: \({\rm sech}^2\ x + \tanh^2(x) = \frac{4+\left(\exp(2x)-1-1+\exp(-2x)\right)}{\left(\exp(x)+\exp(-x)\right)^2}\) \(\tanh^{2}{\left(pdg_{1464} \right)} + \operatorname{sech}^{2}{\left(pdg_{1464} \right)} = \frac{e^{2 pdg_{1464}} + 2 + e^{- 2 pdg_{1464}}}{\left(e^{pdg_{1464}} + e^{- pdg_{1464}}\right)^{2}}\)		5866629429; locally 8702257: \({\rm sech}^2\ x + \tanh^2(x) = 1\) \(\tanh^{2}{\left(pdg_{1464} \right)} + \operatorname{sech}^{2}{\left(pdg_{1464} \right)} = 1\)	valid	4830221561: 5866629429:	4830221561: 5866629429:
2	declare initial expr			1038566242; locally 3145608: \(\sinh x = \frac{\exp(x) - \exp(-x)}{2}\) \(\sinh{\left(pdg_{1464} \right)} = \frac{e^{pdg_{1464}}}{2} - \frac{e^{- pdg_{1464}}}{2}\)	no validation is available for declarations	1038566242:	1038566242:
12	change variable X to Y	2103023049; locally 3077940: \(\sin(x) = \frac{1}{2i}\left(\exp(i x)-\exp(-i x) \right)\) \(\sin{\left(pdg_{1464} \right)} = \frac{e^{pdg_{1464} pdg_{4621}} - e^{- pdg_{1464} pdg_{4621}}}{2 pdg_{4621}}\)	6976493023: \(x\) \(pdg_{1464}\) 7159989263: \(i x\) \(pdg_{1464} pdg_{4621}\)	4878728014; locally 5823930: \(\sin(i x) = \frac{1}{2i}\left(\exp(-x) - \exp(x) \right)\) \(\sin{\left(pdg_{1464} pdg_{4621} \right)} = \frac{- e^{pdg_{1464}} + e^{- pdg_{1464}}}{2 pdg_{4621}}\)	LHS diff is 0 RHS diff is exp(pdg1464)/(2pdg4621) + exp(pdg1464pdg4621*2)/(2pdg4621) - exp(-pdg1464pdg46212)/(2pdg4621) - exp(-pdg1464)/(2*pdg4621)	2103023049: 4878728014:	2103023049: 4878728014:
24	multiply expr 1 by expr 2	4166155526; locally 7222556: \({\rm sech}\ x = \frac{2}{\exp(x)+\exp(-x)}\) \(\operatorname{sech}{\left(pdg_{1464} \right)} = \frac{2}{e^{pdg_{1464}} + e^{- pdg_{1464}}}\) 4166155526; locally 7222556: \({\rm sech}\ x = \frac{2}{\exp(x)+\exp(-x)}\) \(\operatorname{sech}{\left(pdg_{1464} \right)} = \frac{2}{e^{pdg_{1464}} + e^{- pdg_{1464}}}\)		3868998312; locally 5395954: \({\rm sech}^2\ x = \frac{4}{\left(\exp(x)+\exp(-x)\right)^2}\) \(\operatorname{sech}^{2}{\left(pdg_{1464} \right)} = \frac{4}{\left(e^{pdg_{1464}} + e^{- pdg_{1464}}\right)^{2}}\)	valid	4166155526: 4166155526: 3868998312:	4166155526: 4166155526: 3868998312:
28	declare final expr	5866629429; locally 8702257: \({\rm sech}^2\ x + \tanh^2(x) = 1\) \(\tanh^{2}{\left(pdg_{1464} \right)} + \operatorname{sech}^{2}{\left(pdg_{1464} \right)} = 1\)			no validation is available for declarations	5866629429:	5866629429:
14	multiply both sides by	5323719091; locally 2016533: \(i \sinh x = \frac{1}{2i} \left( \exp(-x) - \exp(x) \right)\) \(pdg_{4621} \sinh{\left(pdg_{1464} \right)} = \frac{- e^{pdg_{1464}} + e^{- pdg_{1464}}}{2 pdg_{4621}}\)	9885190237: \(i\) \(pdg_{4621}\)	1038566242; locally 3145608: \(\sinh x = \frac{\exp(x) - \exp(-x)}{2}\) \(\sinh{\left(pdg_{1464} \right)} = \frac{e^{pdg_{1464}}}{2} - \frac{e^{- pdg_{1464}}}{2}\)	LHS diff is (pdg4621*2 - 1)sinh(pdg1464) RHS diff is -2*sinh(pdg1464)	5323719091: 1038566242:	5323719091: 1038566242:
7	simplify	2762326680; locally 4009221: \(\cosh^2 x - \sinh^2 x = \frac{1}{4}\left( \exp(2x)+1+1+\exp(-2x) - \left(\exp(2x)-1-1+\exp(-2x)\right) \right)\) \(- \sinh^{2}{\left(pdg_{1464} \right)} + \cosh^{2}{\left(pdg_{1464} \right)} = 1\)		9413609246; locally 6300507: \(\cosh^2 x - \sinh^2 x = 1\) \(- \sinh^{2}{\left(pdg_{1464} \right)} + \cosh^{2}{\left(pdg_{1464} \right)} = 1\)	valid	2762326680: 9413609246:	2762326680: 9413609246:
3	multiply expr 1 by expr 2	1038566242; locally 3145608: \(\sinh x = \frac{\exp(x) - \exp(-x)}{2}\) \(\sinh{\left(pdg_{1464} \right)} = \frac{e^{pdg_{1464}}}{2} - \frac{e^{- pdg_{1464}}}{2}\) 1038566242; locally 3145608: \(\sinh x = \frac{\exp(x) - \exp(-x)}{2}\) \(\sinh{\left(pdg_{1464} \right)} = \frac{e^{pdg_{1464}}}{2} - \frac{e^{- pdg_{1464}}}{2}\)		6031385191; locally 7844176: \(\sinh^2 x = \left(\frac{\exp(x) - \exp(-x)}{2}\right)\left(\frac{\exp(x) - \exp(-x)}{2}\right)\) \(\sinh^{2}{\left(pdg_{1464} \right)} = \left(\frac{e^{pdg_{1464}}}{2} - \frac{e^{- pdg_{1464}}}{2}\right)^{2}\)	valid	1038566242: 1038566242: 6031385191:	1038566242: 1038566242: 6031385191:
16	change variable X to Y	4585932229; locally 4731536: \(\cos(x) = \frac{1}{2}\left(\exp(i x)+\exp(-i x) \right)\) \(\cos{\left(pdg_{1464} \right)} = \frac{e^{pdg_{1464} pdg_{4621}}}{2} + \frac{e^{- pdg_{1464} pdg_{4621}}}{2}\)	7453225570: \(x\) \(pdg_{1464}\) 1716984328: \(i x\) \(pdg_{1464} pdg_{4621}\)	8651044341; locally 6479977: \(\cos(i x) = \frac{1}{2} \left( \exp(-x) + \exp(x) \right)\) \(\cos{\left(pdg_{1464} pdg_{4621} \right)} = \frac{e^{pdg_{1464}}}{2} + \frac{e^{- pdg_{1464}}}{2}\)	LHS diff is 0 RHS diff is -cosh(pdg1464) + cosh(pdg1464pdg4621*2)	4585932229: 8651044341:	4585932229: 8651044341:
8	declare final expr	9413609246; locally 6300507: \(\cosh^2 x - \sinh^2 x = 1\) \(- \sinh^{2}{\left(pdg_{1464} \right)} + \cosh^{2}{\left(pdg_{1464} \right)} = 1\)			no validation is available for declarations	9413609246:	9413609246:
10	declare initial expr			8418527415; locally 5377003: \(\sin(i x) = i \sinh(x)\) \(\sin{\left(pdg_{1464} pdg_{4621} \right)} = pdg_{4621} \sinh{\left(pdg_{1464} \right)}\)	no validation is available for declarations	8418527415:	8418527415:
22	substitute LHS of expr 1 into expr 2	6404535647; locally 4319733: \(\cosh x = \frac{\exp(x) + \exp(-x)}{2}\) \(\cosh{\left(pdg_{1464} \right)} = \frac{e^{pdg_{1464}}}{2} + \frac{e^{- pdg_{1464}}}{2}\) 2902772962; locally 6831354: \(\tanh(x) = \frac{\frac{1}{2}\left( \exp(x)-\exp(-x) \right)}{\cosh(x)}\) \(\tanh{\left(pdg_{1464} \right)} = \frac{\frac{e^{pdg_{1464}}}{2} - \frac{e^{- pdg_{1464}}}{2}}{\cosh{\left(pdg_{1464} \right)}}\)		5349669879; locally 5313211: \(\tanh(x) = \frac{ \exp(x)-\exp(-x)}{\exp(x)+\exp(-x)}\) \(\tanh{\left(pdg_{1464} \right)} = \frac{e^{pdg_{1464}} - e^{- pdg_{1464}}}{e^{pdg_{1464}} + e^{- pdg_{1464}}}\)	valid	6404535647: error for dim with 6404535647 2902772962: 5349669879:	6404535647: N/A 2902772962: 5349669879:
13	LHS of expr 1 equals LHS of expr 2	4878728014; locally 5823930: \(\sin(i x) = \frac{1}{2i}\left(\exp(-x) - \exp(x) \right)\) \(\sin{\left(pdg_{1464} pdg_{4621} \right)} = \frac{- e^{pdg_{1464}} + e^{- pdg_{1464}}}{2 pdg_{4621}}\) 8418527415; locally 5377003: \(\sin(i x) = i \sinh(x)\) \(\sin{\left(pdg_{1464} pdg_{4621} \right)} = pdg_{4621} \sinh{\left(pdg_{1464} \right)}\)		5323719091; locally 2016533: \(i \sinh x = \frac{1}{2i} \left( \exp(-x) - \exp(x) \right)\) \(pdg_{4621} \sinh{\left(pdg_{1464} \right)} = \frac{- e^{pdg_{1464}} + e^{- pdg_{1464}}}{2 pdg_{4621}}\)	input diff is 0 diff is pdg4621sinh(pdg1464) + exp(pdg1464)/(2pdg4621) - exp(-pdg1464)/(2pdg4621) diff is -pdg4621sinh(pdg1464) - exp(pdg1464)/(2pdg4621) + exp(-pdg1464)/(2pdg4621)	4878728014: 8418527415: 5323719091:	4878728014: 8418527415: 5323719091:
20	declare initial expr			4872163189; locally 3867418: \(\tanh(x) = \frac{\sinh(x)}{\cosh(x)}\) \(\tanh{\left(pdg_{1464} \right)} = \frac{\sinh{\left(pdg_{1464} \right)}}{\cosh{\left(pdg_{1464} \right)}}\)	no validation is available for declarations	4872163189:	4872163189:
17	LHS of expr 1 equals LHS of expr 2	8747785338; locally 7404421: \(\cos(i x) = \cosh(x)\) \(\cos{\left(pdg_{1464} pdg_{4621} \right)} = \cosh{\left(pdg_{1464} \right)}\) 8651044341; locally 6479977: \(\cos(i x) = \frac{1}{2} \left( \exp(-x) + \exp(x) \right)\) \(\cos{\left(pdg_{1464} pdg_{4621} \right)} = \frac{e^{pdg_{1464}}}{2} + \frac{e^{- pdg_{1464}}}{2}\)		6404535647; locally 4319733: \(\cosh x = \frac{\exp(x) + \exp(-x)}{2}\) \(\cosh{\left(pdg_{1464} \right)} = \frac{e^{pdg_{1464}}}{2} + \frac{e^{- pdg_{1464}}}{2}\)	valid	8747785338: 8651044341: 6404535647: error for dim with 6404535647	8747785338: 8651044341: 6404535647: N/A
18	declare initial expr			7731226616; locally 3909583: \({\rm sech}\ x = \frac{1}{\cosh x}\) \(\operatorname{sech}{\left(pdg_{1464} \right)} = \frac{1}{\cosh{\left(pdg_{1464} \right)}}\)	no validation is available for declarations	7731226616:	7731226616:
23	multiply expr 1 by expr 2	5349669879; locally 5313211: \(\tanh(x) = \frac{ \exp(x)-\exp(-x)}{\exp(x)+\exp(-x)}\) \(\tanh{\left(pdg_{1464} \right)} = \frac{e^{pdg_{1464}} - e^{- pdg_{1464}}}{e^{pdg_{1464}} + e^{- pdg_{1464}}}\) 5349669879; locally 5313211: \(\tanh(x) = \frac{ \exp(x)-\exp(-x)}{\exp(x)+\exp(-x)}\) \(\tanh{\left(pdg_{1464} \right)} = \frac{e^{pdg_{1464}} - e^{- pdg_{1464}}}{e^{pdg_{1464}} + e^{- pdg_{1464}}}\)		2121790783; locally 9317216: \(\tanh^2(x) = \frac{ \left(\exp(x)-\exp(-x)\right)^2}{\left(\exp(x)+\exp(-x)\right)^2}\) \(\tanh^{2}{\left(pdg_{1464} \right)} = \frac{\left(e^{pdg_{1464}} - e^{- pdg_{1464}}\right)^{2}}{\left(e^{pdg_{1464}} + e^{- pdg_{1464}}\right)^{2}}\)	valid	5349669879: 5349669879: 2121790783:	5349669879: 5349669879: 2121790783:
6	simplify	8563535636; locally 4001109: \(\cosh^2 x - \sinh^2 x = \left(\frac{\exp(x) + \exp(-x)}{2}\right)\left(\frac{\exp(x) + \exp(-x)}{2}\right) - \left(\frac{\exp(x) - \exp(-x)}{2}\right)\left(\frac{\exp(x) - \exp(-x)}{2}\right)\) \(- \sinh^{2}{\left(pdg_{1464} \right)} + \cosh^{2}{\left(pdg_{1464} \right)} = \left(\frac{e^{pdg_{1464}}}{2} + \frac{e^{- pdg_{1464}}}{2}\right)^{2} - \frac{\left(e^{pdg_{1464}} - e^{- pdg_{1464}}\right)^{2}}{4}\)		2762326680; locally 4009221: \(\cosh^2 x - \sinh^2 x = \frac{1}{4}\left( \exp(2x)+1+1+\exp(-2x) - \left(\exp(2x)-1-1+\exp(-2x)\right) \right)\) \(- \sinh^{2}{\left(pdg_{1464} \right)} + \cosh^{2}{\left(pdg_{1464} \right)} = 1\)	valid	8563535636: 2762326680:	8563535636: 2762326680:
9	declare initial expr			8747785338; locally 7404421: \(\cos(i x) = \cosh(x)\) \(\cos{\left(pdg_{1464} pdg_{4621} \right)} = \cosh{\left(pdg_{1464} \right)}\)	no validation is available for declarations	8747785338:	8747785338:
5	subtract expr 1 from expr 2	6031385191; locally 7844176: \(\sinh^2 x = \left(\frac{\exp(x) - \exp(-x)}{2}\right)\left(\frac{\exp(x) - \exp(-x)}{2}\right)\) \(\sinh^{2}{\left(pdg_{1464} \right)} = \left(\frac{e^{pdg_{1464}}}{2} - \frac{e^{- pdg_{1464}}}{2}\right)^{2}\) 8532702080; locally 9245668: \(\cosh^2 x = \left(\frac{\exp(x) + \exp(-x)}{2}\right)\left(\frac{\exp(x) + \exp(-x)}{2}\right)\) \(\cosh^{2}{\left(pdg_{1464} \right)} = \left(\frac{e^{pdg_{1464}}}{2} + \frac{e^{- pdg_{1464}}}{2}\right)^{2}\)		8563535636; locally 4001109: \(\cosh^2 x - \sinh^2 x = \left(\frac{\exp(x) + \exp(-x)}{2}\right)\left(\frac{\exp(x) + \exp(-x)}{2}\right) - \left(\frac{\exp(x) - \exp(-x)}{2}\right)\left(\frac{\exp(x) - \exp(-x)}{2}\right)\) \(- \sinh^{2}{\left(pdg_{1464} \right)} + \cosh^{2}{\left(pdg_{1464} \right)} = \left(\frac{e^{pdg_{1464}}}{2} + \frac{e^{- pdg_{1464}}}{2}\right)^{2} - \frac{\left(e^{pdg_{1464}} - e^{- pdg_{1464}}\right)^{2}}{4}\)	valid	6031385191: 8532702080: 8563535636:	6031385191: 8532702080: 8563535636:
4	multiply expr 1 by expr 2	6404535647; locally 4319733: \(\cosh x = \frac{\exp(x) + \exp(-x)}{2}\) \(\cosh{\left(pdg_{1464} \right)} = \frac{e^{pdg_{1464}}}{2} + \frac{e^{- pdg_{1464}}}{2}\) 6404535647; locally 4319733: \(\cosh x = \frac{\exp(x) + \exp(-x)}{2}\) \(\cosh{\left(pdg_{1464} \right)} = \frac{e^{pdg_{1464}}}{2} + \frac{e^{- pdg_{1464}}}{2}\)		8532702080; locally 9245668: \(\cosh^2 x = \left(\frac{\exp(x) + \exp(-x)}{2}\right)\left(\frac{\exp(x) + \exp(-x)}{2}\right)\) \(\cosh^{2}{\left(pdg_{1464} \right)} = \left(\frac{e^{pdg_{1464}}}{2} + \frac{e^{- pdg_{1464}}}{2}\right)^{2}\)	valid	6404535647: error for dim with 6404535647 6404535647: error for dim with 6404535647 8532702080:	6404535647: N/A 6404535647: N/A 8532702080:
1	declare initial expr			6404535647; locally 4319733: \(\cosh x = \frac{\exp(x) + \exp(-x)}{2}\) \(\cosh{\left(pdg_{1464} \right)} = \frac{e^{pdg_{1464}}}{2} + \frac{e^{- pdg_{1464}}}{2}\)	no validation is available for declarations	6404535647: error for dim with 6404535647	6404535647: N/A

symbol ID	category	latex	scope	dimension	name	value	Used in derivations	references
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
4621	variable	i \(i\)	['imaginary']	dimensionless	imaginary unit		identity sin(2 x) = 2 sin(x) cos(x) using Euler's equation Euler equation: trig square root derivation of Schrodinger Equation Euler equation: trigonometric relations Euler equation proof electric field wave equation: from time dependent to time independent double intensity when phase is coherent (optics) Euler equation to e^(i pi) + 1 = 0 hyperbolic trigonometric identities	Imaginary_unit	74

review derivation: hyperbolic trigonometric identities

Symbols for this derivation