User talk:Primadog

BarCraft North America
Not pictured: #13 Edmonton, #14 Honolulu.

Math

 * $$F\left(n\right) = {{\varphi^(n+1)-(1-\varphi)^(n+1)} \over {\sqrt 5}}={{\varphi^(n+1)-(-1/\varphi)^{n+1}} \over {\sqrt 5}}\, ,$$


 * $$F\left(x\right) = {{4x+\sqrt {4x^2-1}} \over {\sqrt {2x+1} + \sqrt{2x-1}}} $$


 * $$ {M(t)= {

\alpha e^{-(D+B)t} + {C \over D+B} }}$$


 * $$ {M(t)= { {C \over {D+B}} \left ( 1- e^ {-(D+B)t} \right) }}$$


 * $$ {W(t)=

{ C { B-K \over D+B } } \left ({1 \over D+B+F} e^{-(D+B)t} + \beta e^{Ft} - {1 \over F} \right ) }$$


 * $$ {W(t)=

{ C { B-K \over D+B } } \left ({1 \over D+B+F} e^{-(D+B)t} - ({1 \over D+B+F} - {1 \over F}) e^{Ft} - {1 \over F} \right ) }$$


 * $$ { \delta M(t)= C - (D + B) \cdot M(t) } $$
 * $$ { \delta W(t)= F \cdot W(t) + (B - K) \cdot M(t) } $$


 * $$ { C \left ( { B-K \over D+B } \right ) } $$
 * $$ { C \over D+B  } $$