770 reputation
416
bio website physics.uwa.edu.au/~styler
location Melbourne, Australia
age 33
visits member for 4 years, 4 months
seen yesterday

Oct
27
revised What is the simplest proof of the pythagorean theorem you know?
added 381 characters in body
Dec
13
revised How to solve this integral of trigonometric f in Mathematica
probably more sensible numeric solution...
Dec
13
revised How to solve this integral of trigonometric f in Mathematica
The original question http://math.stackexchange.com/revisions/91100/1 looked different from the previous edit. Also, I assumed that the final y3 was meant to be y4
Dec
4
revised Transcendental Equations, Matrix (Eigenvalue problem?) (Mathematica)
Cleaned up a bit, and used image for matrix, because it scales better.
Nov
20
revised Finding all vectors of $\vec{y}$ such that $\operatorname{span} \left \{ \vec{v_1}, \vec{v_2}, \vec{y} \right \} = \mathbb{R^3}$
added 101 characters in body
Aug
2
revised Trace Determinant Plane Differential Eqns
added the vector Y back into RHS of the DE
May
30
revised Tables of Hypergeometric Functions
stupid and embarrassing typo
Mar
10
revised How does the method of Lagrange multipliers fail (in classical field theories with local constraints)?
Emphasized the field theory / functional case
Mar
6
revised Derivative of $(a\,x)^{b\,x}$
Added brackets...
Mar
6
revised Derivative of $(a\,x)^{b\,x}$
fixed image
Feb
28
revised Div, curl and linear algebra
added 18 characters in body
Feb
28
revised Div, curl and linear algebra
added 30 characters in body; added 12 characters in body
Jan
12
revised Find the positive real number(s) $c$ such that the graphs of $y=x^c$ and $x=y^c$ intersect (somewhere) at an angle $\frac{\pi}{4}$
added second solution and some comments
Jan
12
revised Find the positive real number(s) $c$ such that the graphs of $y=x^c$ and $x=y^c$ intersect (somewhere) at an angle $\frac{\pi}{4}$
added 48 characters in body