Physics Derivation Graph: review derivation: equations of motion in 2D (calculus)

review derivation: equations of motion in 2D (calculus)

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Physics Derivation Graph: Steps for equations of motion in 2D (calculus)
Index	Inference Rule	Input latex	Feeds latex	Output latex	step validity	dimension check	unit check	notes
28	substitute LHS of expr 1 into expr 2	6134836751; locally 8435615: \(v_{0, x} = v_x\) \(pdg_{2958} = pdg_{5505}\) 8460820419; locally 4895553: \(v_x = \frac{dx}{dt}\) \(pdg_{5505} = \frac{d}{d pdg_{1467}} pdg_{9199}\)		7455581657; locally 5123314: \(v_{0, x} = \frac{dx}{dt}\) \(pdg_{2958} = \frac{d}{d pdg_{1467}} pdg_{9199}\)	LHS diff is -pdg2958 + pdg5505 RHS diff is 0	6134836751: dimensions are consistent 8460820419: 7455581657:	6134836751: N/A 8460820419: 7455581657:
17	declare initial expr			7252338326; locally 3936380: \(v_y = \frac{dy}{dt}\) \(pdg_{9107} = \frac{d}{d pdg_{1467}} pdg_{5647}\)	no validation is available for declarations	7252338326:	7252338326:
23	multiply both sides by	8750379055; locally 8742281: \(0 = \frac{d}{dt} v_x\) \(0 = \frac{d}{d pdg_{1467}} pdg_{5505}\)	8717193282: \(dt\) \(pdg_{4711}\)	1166310428; locally 5239397: \(0 dt = d v_x\) \(0 = pdg_{5005}\)	LHS diff is 0 RHS diff is -pdg5005	8750379055: 1166310428:	8750379055: 1166310428:
10	assume N dimensions		8880467139: \(2\) \(2\)	5349866551; locally 5359560: \(\vec{v} = v_x \hat{x} + v_y \hat{y}\) \(pdg_{6373} = pdg_{1700} pdg_{9107} + pdg_{5505} pdg_{8339}\)	no validation is available for assumptions	5349866551:	5349866551:
29	multiply both sides by	7455581657; locally 5123314: \(v_{0, x} = \frac{dx}{dt}\) \(pdg_{2958} = \frac{d}{d pdg_{1467}} pdg_{9199}\)	8607458157: \(dt\) \(pdg_{4711}\)	1963253044; locally 8062944: \(v_{0, x} dt = dx\) \(pdg_{2958} pdg_{4711} = pdg_{9199}\)	LHS diff is 0 RHS diff is -pdg9199	7455581657: 1963253044:	7455581657: 1963253044:
16	add X to both sides	9973952056; locally 1321587: \(-g t = v_y - v_{0, y}\) \(- pdg_{1467} pdg_{1649} = - pdg_{5153} + pdg_{9431}\)	4167526462: \(v_{0, y}\) \(pdg_{9431}\)	6572039835; locally 2682139: \(-g t + v_{0, y} = v_y\) \(- pdg_{1467} pdg_{1649} + pdg_{9431} = pdg_{9107}\)	LHS diff is 0 RHS diff is -pdg5153 - pdg9107 + 2*pdg9431	9973952056: 6572039835:	9973952056: 6572039835:
11	substitute LHS of expr 1 into expr 2	9707028061; locally 2060958: \(a_x = 0\) \(pdg_{7159} = 0\) 1819663717; locally 5765841: \(a_x = \frac{d}{dt} v_x\) \(pdg_{7159} = \frac{d}{d pdg_{1467}} pdg_{5505}\)		8750379055; locally 8742281: \(0 = \frac{d}{dt} v_x\) \(0 = \frac{d}{d pdg_{1467}} pdg_{5505}\)	valid	9707028061: 1819663717: 8750379055:	9707028061: 1819663717: 8750379055:
30	indefinite integration	1963253044; locally 8062944: \(v_{0, x} dt = dx\) \(pdg_{2958} pdg_{4711} = pdg_{9199}\)		3676159007; locally 2732393: \(v_{0, x} \int dt = \int dx\) \(pdg_{2958} \int 1\, dpdg_{1467} = \int 1\, dpdg_{1464}\)	no check performed	1963253044: 3676159007:	1963253044: 3676159007:
39	multiply both sides by	7376526845; locally 2378061: \(\sin(\theta) = \frac{v_{0, y}}{v_0}\) \(\sin{\left(pdg_{1575} \right)} = \frac{pdg_{5153}}{pdg_{9431}}\)	5620558729: \(v_0\) \(pdg_{5153}\)	8949329361; locally 3041148: \(v_0 \sin(\theta) = v_{0, y}\) \(pdg_{5153} \sin{\left(pdg_{1575} \right)} = pdg_{9431}\)	LHS diff is 0 RHS diff is pdg5153**2/pdg9431 - pdg9431	7376526845: 8949329361:	7376526845: 8949329361:
33	swap LHS with RHS	8486706976; locally 6277762: \(v_{0, x} t + x_0 = x\) \(pdg_{1467} pdg_{2958} + pdg_{1572} = pdg_{4037}\)		1306360899; locally 3011802: \(x = v_{0, x} t + x_0\) \(pdg_{4037} = pdg_{1467} pdg_{2958} + pdg_{1572}\)	valid	8486706976: 1306360899:	8486706976: 1306360899:
12	substitute LHS of expr 1 into expr 2	2741489181; locally 1439312: \(a_y = -g\) \(pdg_{7055} = - pdg_{1649}\) 8228733125; locally 2080932: \(a_y = \frac{d}{dt} v_y\) \(pdg_{7055} = \frac{d}{d pdg_{1467}} pdg_{9107}\)		1977955751; locally 3939933: \(-g = \frac{d}{dt} v_y\) \(- pdg_{1649} = \frac{d}{d pdg_{1467}} pdg_{9107}\)	valid	2741489181: 8228733125: 1977955751:	2741489181: 8228733125: 1977955751:
6	separate two vector components	7729413831; locally 4904941: \(a_x \hat{x} + a_y \hat{y} = \frac{d}{dt} \left(v_x \hat{x} + v_y \hat{y} \right)\) \(pdg_{1700} pdg_{7055} + pdg_{7159} pdg_{8339} = \frac{\partial}{\partial pdg_{1467}} \left(pdg_{1700} pdg_{9107} + pdg_{5505} pdg_{8339}\right)\)		1819663717; locally 5765841: \(a_x = \frac{d}{dt} v_x\) \(pdg_{7159} = \frac{d}{d pdg_{1467}} pdg_{5505}\) 8228733125; locally 2080932: \(a_y = \frac{d}{dt} v_y\) \(pdg_{7055} = \frac{d}{d pdg_{1467}} pdg_{9107}\)	no check performed	7729413831: 1819663717: 8228733125:	7729413831: 1819663717: 8228733125:
13	multiply both sides by	1977955751; locally 3939933: \(-g = \frac{d}{dt} v_y\) \(- pdg_{1649} = \frac{d}{d pdg_{1467}} pdg_{9107}\)	6672141531: \(dt\) \(pdg_{4711}\)	1702349646; locally 4777195: \(-g dt = d v_y\) \(- dt pdg_{1649} = pdg_{5674}\)	LHS diff is pdg1649*(dt - pdg4711) RHS diff is -pdg5674	1977955751: 1702349646:	1977955751: 1702349646:
37	substitute LHS of expr 1 into expr 2	6083821265; locally 6010171: \(v_0 \cos(\theta) = v_{0, x}\) \(pdg_{5153} \cos{\left(pdg_{1575} \right)} = pdg_{2958}\) 1306360899; locally 3011802: \(x = v_{0, x} t + x_0\) \(pdg_{4037} = pdg_{1467} pdg_{2958} + pdg_{1572}\)		5438722682; locally 6795282: \(x = v_0 t \cos(\theta) + x_0\) \(pdg_{4037} = pdg_{1467} pdg_{5153} \cos{\left(pdg_{1575} \right)} + pdg_{1572}\)	LHS diff is 0 RHS diff is pdg1467(pdg2958 - pdg5153cos(pdg1575))	6083821265: 1306360899: 5438722682:	6083821265: 1306360899: 5438722682:
14	indefinite integration	1702349646; locally 4777195: \(-g dt = d v_y\) \(- dt pdg_{1649} = pdg_{5674}\)		8584698994; locally 3366698: \(-g \int dt = \int d v_y\) \(- dt g = pdg_{5674}\)	no check performed	1702349646: 8584698994:	1702349646: 8584698994:
40	swap LHS with RHS	2461349007; locally 7541692: \(- \frac{1}{2} g t^2 + v_{0, y} t + y_0 = y\) \(- \frac{pdg_{1467}^{2} pdg_{1649}}{2} + pdg_{1467} pdg_{9431} + pdg_{1469} = pdg_{5647}\)		1405465835; locally 1910429: \(y = - \frac{1}{2} g t^2 + v_{0, y} t + y_0\) \(pdg_{5647} = - \frac{pdg_{1467}^{2} pdg_{1649}}{2} + pdg_{1467} pdg_{9107} + pdg_{1469}\)	LHS diff is pdg1467(-pdg9107 + pdg9431) RHS diff is pdg1467(-pdg9107 + pdg9431)	2461349007: 1405465835:	2461349007: 1405465835:
22	add X to both sides	2858549874; locally 8638087: \(- \frac{1}{2} g t^2 + v_{0, y} t = y - y_0\) \(- \frac{pdg_{1467}^{2} pdg_{1649}}{2} + pdg_{1467} pdg_{9431} = - pdg_{1469} + pdg_{5647}\)	6098638221: \(y_0\) \(pdg_{1469}\)	2461349007; locally 7541692: \(- \frac{1}{2} g t^2 + v_{0, y} t + y_0 = y\) \(- \frac{pdg_{1467}^{2} pdg_{1649}}{2} + pdg_{1467} pdg_{9431} + pdg_{1469} = pdg_{5647}\)	valid	2858549874: 2461349007:	2858549874: 2461349007:
15	simplify	8584698994; locally 3366698: \(-g \int dt = \int d v_y\) \(- dt g = pdg_{5674}\)		9973952056; locally 1321587: \(-g t = v_y - v_{0, y}\) \(- pdg_{1467} pdg_{1649} = - pdg_{5153} + pdg_{9431}\)	LHS diff is -dtg + pdg1467pdg1649 RHS diff is pdg5153 + pdg5674 - pdg9431	8584698994: 9973952056:	8584698994: 9973952056:
7	declare assumption			9707028061; locally 2060958: \(a_x = 0\) \(pdg_{7159} = 0\)	no validation is available for declarations	9707028061:	9707028061:	define the orientation of the coordinate system with respect to the gravitational acceleration such that x axis is perpendicular to gravity
8	declare assumption			2741489181; locally 1439312: \(a_y = -g\) \(pdg_{7055} = - pdg_{1649}\)	no validation is available for declarations	2741489181:	2741489181:	define the orientation of the coordinate system with respect to the gravitational acceleration such that y axis is parallel to gravity
36	multiply both sides by	7391837535; locally 5523081: \(\cos(\theta) = \frac{v_{0, x}}{v_0}\) \(\cos{\left(pdg_{1575} \right)} = \frac{pdg_{5153}}{pdg_{2958}}\)	5868731041: \(v_0\) \(pdg_{5153}\)	6083821265; locally 6010171: \(v_0 \cos(\theta) = v_{0, x}\) \(pdg_{5153} \cos{\left(pdg_{1575} \right)} = pdg_{2958}\)	LHS diff is 0 RHS diff is -pdg2958 + pdg5153**2/pdg2958	7391837535: 6083821265:	7391837535: 6083821265:
32	add X to both sides	9882526611; locally 2740672: \(v_{0, x} t = x - x_0\) \(pdg_{1467} pdg_{2958} = - pdg_{1572} + pdg_{4037}\)	3182907803: \(x_0\) \(pdg_{1572}\)	8486706976; locally 6277762: \(v_{0, x} t + x_0 = x\) \(pdg_{1467} pdg_{2958} + pdg_{1572} = pdg_{4037}\)	valid	9882526611: 8486706976:	9882526611: 8486706976:
5	substitute LHS of expr 1 into expr 2	5349866551; locally 5359560: \(\vec{v} = v_x \hat{x} + v_y \hat{y}\) \(pdg_{6373} = pdg_{1700} pdg_{9107} + pdg_{5505} pdg_{8339}\) 4158986868; locally 4755350: \(a_x \hat{x} + a_y \hat{y} = \frac{d\vec{v}}{dt}\) \(pdg_{1467}\)		7729413831; locally 4904941: \(a_x \hat{x} + a_y \hat{y} = \frac{d}{dt} \left(v_x \hat{x} + v_y \hat{y} \right)\) \(pdg_{1700} pdg_{7055} + pdg_{7159} pdg_{8339} = \frac{\partial}{\partial pdg_{1467}} \left(pdg_{1700} pdg_{9107} + pdg_{5505} pdg_{8339}\right)\)	Nothing to split	5349866551: 4158986868: 7729413831:	5349866551: 4158986868: 7729413831:
24	indefinite integration	1166310428; locally 5239397: \(0 dt = d v_x\) \(0 = pdg_{5005}\)		2366691988; locally 3137944: \(\int 0 dt = \int d v_x\) \(\int 0\, dpdg_{1467} = \int 1\, dpdg_{5005}\)	no check performed	1166310428: 2366691988:	1166310428: 2366691988:
42	declare final expr	9862900242; locally 9780510: \(y = - \frac{1}{2} g t^2 + v_0 t \sin(\theta) + y_0\) \(pdg_{5647} = - \frac{pdg_{1467}^{2} pdg_{1649}}{2} + pdg_{1467} pdg_{5153} \sin{\left(pdg_{1575} \right)} + pdg_{1469}\)			no validation is available for declarations	9862900242:	9862900242:
38	declare final expr	5438722682; locally 6795282: \(x = v_0 t \cos(\theta) + x_0\) \(pdg_{4037} = pdg_{1467} pdg_{5153} \cos{\left(pdg_{1575} \right)} + pdg_{1572}\)			no validation is available for declarations	5438722682:	5438722682:
9	assume N dimensions		3270039798: \(2\) \(2\)	8602512487; locally 4862823: \(\vec{a} = a_x \hat{x} + a_y \hat{y}\) \(pdg_{2423} = pdg_{1700} pdg_{7055} + pdg_{7159} pdg_{8339}\)	no validation is available for assumptions	8602512487:	8602512487:
18	substitute LHS of expr 1 into expr 2	7252338326; locally 3936380: \(v_y = \frac{dy}{dt}\) \(pdg_{9107} = \frac{d}{d pdg_{1467}} pdg_{5647}\) 6572039835; locally 2682139: \(-g t + v_{0, y} = v_y\) \(- pdg_{1467} pdg_{1649} + pdg_{9431} = pdg_{9107}\)		6204539227; locally 5010170: \(-g t + v_{0, y} = \frac{dy}{dt}\) \(- pdg_{1467} pdg_{6277} + pdg_{9431} = \frac{d}{d pdg_{1467}} pdg_{5647}\)	LHS diff is pdg1467*(-pdg1649 + pdg6277) RHS diff is 0	7252338326: 6572039835: 6204539227:	7252338326: 6572039835: 6204539227:
27	declare initial expr			8460820419; locally 4895553: \(v_x = \frac{dx}{dt}\) \(pdg_{5505} = \frac{d}{d pdg_{1467}} pdg_{9199}\)	no validation is available for declarations	8460820419:	8460820419:
25	simplify	2366691988; locally 3137944: \(\int 0 dt = \int d v_x\) \(\int 0\, dpdg_{1467} = \int 1\, dpdg_{5005}\)		1676472948; locally 9737190: \(0 = v_x - v_{0, x}\) \(0 = - pdg_{2958} + pdg_{5505}\)	LHS diff is 0 RHS diff is pdg2958 + pdg5005 - pdg5505	2366691988: 1676472948: error for dim with 1676472948	2366691988: 1676472948: N/A
3	substitute LHS of expr 1 into expr 2	3169580383; locally 6758737: \(\vec{a} = \frac{d\vec{v}}{dt}\) \(pdg_{2423} = \frac{d}{d pdg_{1467}} pdg_{6373}\) 8602512487; locally 4862823: \(\vec{a} = a_x \hat{x} + a_y \hat{y}\) \(pdg_{2423} = pdg_{1700} pdg_{7055} + pdg_{7159} pdg_{8339}\)		4158986868; locally 4755350: \(a_x \hat{x} + a_y \hat{y} = \frac{d\vec{v}}{dt}\) \(pdg_{1467}\)	Nothing to split	3169580383: 8602512487: 4158986868:	3169580383: 8602512487: 4158986868:
20	indefinite integration	8145337879; locally 5577963: \(-g t dt + v_{0, y} dt = dy\) \(- pdg_{1467} pdg_{1649} pdg_{4711} + pdg_{4711} pdg_{9431} = pdg_{5842}\)		8808860551; locally 8020644: \(-g \int t dt + v_{0, y} \int dt = \int dy\) \(- pdg_{1649} \int pdg_{1467}\, dpdg_{1467} + pdg_{9431} \int 1\, dpdg_{1467} = \int 1\, dpdg_{5647}\)	no check performed	8145337879: 8808860551:	8145337879: 8808860551:
35	separate vector into two trigonometric ratios	9341391925; locally 1381925: \(\vec{v}_0 = v_{0, x} \hat{x} + v_{0, y} \hat{y}\) \(pdg_{6091} = pdg_{1700} pdg_{9431} + pdg_{2958} pdg_{8339}\)	6410818363: \(\theta\) \(pdg_{1575}\)	7391837535; locally 5523081: \(\cos(\theta) = \frac{v_{0, x}}{v_0}\) \(\cos{\left(pdg_{1575} \right)} = \frac{pdg_{5153}}{pdg_{2958}}\) 7376526845; locally 2378061: \(\sin(\theta) = \frac{v_{0, y}}{v_0}\) \(\sin{\left(pdg_{1575} \right)} = \frac{pdg_{5153}}{pdg_{9431}}\)	no check performed	9341391925: 7391837535: 7376526845:	9341391925: 7391837535: 7376526845:
41	substitute LHS of expr 1 into expr 2	8949329361; locally 3041148: \(v_0 \sin(\theta) = v_{0, y}\) \(pdg_{5153} \sin{\left(pdg_{1575} \right)} = pdg_{9431}\) 1405465835; locally 1910429: \(y = - \frac{1}{2} g t^2 + v_{0, y} t + y_0\) \(pdg_{5647} = - \frac{pdg_{1467}^{2} pdg_{1649}}{2} + pdg_{1467} pdg_{9107} + pdg_{1469}\)		9862900242; locally 9780510: \(y = - \frac{1}{2} g t^2 + v_0 t \sin(\theta) + y_0\) \(pdg_{5647} = - \frac{pdg_{1467}^{2} pdg_{1649}}{2} + pdg_{1467} pdg_{5153} \sin{\left(pdg_{1575} \right)} + pdg_{1469}\)	LHS diff is 0 RHS diff is pdg1467(-pdg5153sin(pdg1575) + pdg9107)	8949329361: 1405465835: 9862900242:	8949329361: 1405465835: 9862900242:
21	simplify	8808860551; locally 8020644: \(-g \int t dt + v_{0, y} \int dt = \int dy\) \(- pdg_{1649} \int pdg_{1467}\, dpdg_{1467} + pdg_{9431} \int 1\, dpdg_{1467} = \int 1\, dpdg_{5647}\)		2858549874; locally 8638087: \(- \frac{1}{2} g t^2 + v_{0, y} t = y - y_0\) \(- \frac{pdg_{1467}^{2} pdg_{1649}}{2} + pdg_{1467} pdg_{9431} = - pdg_{1469} + pdg_{5647}\)	LHS diff is 0 RHS diff is pdg1469	8808860551: 2858549874:	8808860551: 2858549874:
31	simplify	3676159007; locally 2732393: \(v_{0, x} \int dt = \int dx\) \(pdg_{2958} \int 1\, dpdg_{1467} = \int 1\, dpdg_{1464}\)		9882526611; locally 2740672: \(v_{0, x} t = x - x_0\) \(pdg_{1467} pdg_{2958} = - pdg_{1572} + pdg_{4037}\)	LHS diff is 0 RHS diff is pdg1464 + pdg1572 - pdg4037	3676159007: 9882526611:	3676159007: 9882526611:
34	assume N dimensions		7049769409: \(2\) \(2\)	9341391925; locally 1381925: \(\vec{v}_0 = v_{0, x} \hat{x} + v_{0, y} \hat{y}\) \(pdg_{6091} = pdg_{1700} pdg_{9431} + pdg_{2958} pdg_{8339}\)	no validation is available for assumptions	9341391925:	9341391925:
19	multiply both sides by	6204539227; locally 5010170: \(-g t + v_{0, y} = \frac{dy}{dt}\) \(- pdg_{1467} pdg_{6277} + pdg_{9431} = \frac{d}{d pdg_{1467}} pdg_{5647}\)	1614343171: \(dt\) \(pdg_{4711}\)	8145337879; locally 5577963: \(-g t dt + v_{0, y} dt = dy\) \(- pdg_{1467} pdg_{1649} pdg_{4711} + pdg_{4711} pdg_{9431} = pdg_{5842}\)	LHS diff is pdg1467pdg4711(pdg1649 - pdg6277) RHS diff is -pdg5842	6204539227: 8145337879:	6204539227: 8145337879:
1	declare initial expr			3169580383; locally 6758737: \(\vec{a} = \frac{d\vec{v}}{dt}\) \(pdg_{2423} = \frac{d}{d pdg_{1467}} pdg_{6373}\)	no validation is available for declarations	3169580383:	3169580383:
26	add X to both sides	1676472948; locally 9737190: \(0 = v_x - v_{0, x}\) \(0 = - pdg_{2958} + pdg_{5505}\)	1439089569: \(v_{0, x}\) \(pdg_{2958}\)	6134836751; locally 8435615: \(v_{0, x} = v_x\) \(pdg_{2958} = pdg_{5505}\)	valid	1676472948: error for dim with 1676472948 6134836751: dimensions are consistent	1676472948: N/A 6134836751: N/A

Symbols for this derivation

See also all 227 symbols

symbol ID	category	latex	scope	dimension	name	value	Used in derivations	references
5005	variable	d v_x \(d v_x\)	['real']	length: 1 time: -1	differential velocity along x axis		equations of motion in 2D (calculus)		2
1649	variable	g \(g\)	['real']	length: 1 time: -2	acceleration due to gravity		angle of maximum distance for projectile motion mass of the Earth projectile path in 2D is parabolic equations of motion in 2D (calculus)	Gravity	27
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
5153	variable	v_0 \(v_0\)	['real']	length: 1 time: -1	initial velocity		angle of maximum distance for projectile motion work and force and energy equations of motion in 1D with constant acceleration - SUVAT (algebra) equations of motion in 2D (calculus)		44
4711	variable	dt \(dt\)	['real']	time: 1	differential time		equations of motion in 2D (calculus)	str_note	7
6373	variable	\vec{v} \(\vec{v}\)	real	length: 1 time: -1	velocity		equations of motion in 2D (calculus)	str_note	2
7159	variable	a_x \(a_x\)	real	length: 1 time: -2	acceleration along x axis		equations of motion in 2D (calculus)	Acceleration	4
1469	variable	y_0 \(y_0\)	['real']	length: 1	initial position		angle of maximum distance for projectile motion projectile path in 2D is parabolic equations of motion in 2D (calculus)		9
1700	variable	\hat{y} \(\hat{y}\)	real	dimensionless	unit vector		equations of motion in 2D (calculus)	Unit_vector	4
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
6091	variable	\vec{v}_0 \(\vec{v}_0\)	['real']	length: 1 time: -1	initial velocity		equations of motion in 2D (calculus)	Velocity	1
5842	variable	dy \(dy\)	['real']	length: 1	differential displacement along y axis		Euler equation proof equations of motion in 2D (calculus)	str_note	2
2423	variable	\vec{a} \(\vec{a}\)	real	length: 1 time: -2	acceleration		equations of motion in 2D (calculus)	str_note	2
9107	variable	v_y \(v_y\)	real	length: 1 time: -1	velocity along y axis		projectile path in 2D is parabolic equations of motion in 2D (calculus)	str_note	7
6277	constant	G \(G\)	real	length: 3 mass: -1 time: -2	gravitational constant	6.6743010^{-11} m^3 kg^-1 * s^-2	escape velocity Newton's Law of Gravitation equations of motion in 2D (calculus) radius for satellite in geostationary orbit Kepler's Third Law: period squared propto distance cubed velocity at distance r of object dropped from infinity Schwarzschild radius for non-rotating black hole mass of the Earth	Gravitational_constant	60
1572	variable	x_0 \(x_0\)	['real']	length: 1	initial position		angle of maximum distance for projectile motion projectile path in 2D is parabolic equations of motion in 2D (calculus)		11
1575	variable	\theta \(\theta\)	['real']	dimensionless	angle		double intensity when phase is coherent (optics) angle of maximum distance for projectile motion equations of motion in 2D (calculus)	Angle	34
7055	variable	a_y \(a_y\)	real	length: 1 time: -2	acceleration along y axis		equations of motion in 2D (calculus)	Acceleration	4
5505	variable	v_x \(v_x\)	real	length: 1 time: -1	velocity along x axis		equations of motion in 2D (calculus)	str_note	7
9431	variable	v_{0, y} \(v_{0, y}\)	['real']	length: 1 time: -1	initial velocity along y axis		projectile path in 2D is parabolic equations of motion in 2D (calculus)	Velocity	12
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
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
5674	variable	d v_y \(d v_y\)	['real']	length: 1 time: -1	differential velocity along y axis		equations of motion in 2D (calculus)		2
9199	variable	dx \(dx\)	['real']	length: 1			escape velocity particle in a 1D box equations of motion in 2D (calculus) work and force and energy Euler equation proof		15
2958	variable	v_{0, x} \(v_{0, x}\)	['real']	length: 1 time: -1	initial velocity along x axis		projectile path in 2D is parabolic equations of motion in 2D (calculus)	Velocity	15
8339	variable	\hat{x} \(\hat{x}\)	real	dimensionless	unit vector		equations of motion in 2D (calculus)	Unit_vector	4

MESSAGE:

local variable 'all_df' referenced before assignment