User:ErNa/sandbox


 * $$ x^n + y^n = z^n \qquad ( 2 < n \in \mathbb{N} ) $$
 * $$ (k*x)^n + (k*y)^n = (k*z)^n \qquad ( 2 < n \in \mathbb{N} ) $$
 * $$  c^\left(n-1\right) * a,    c^\left(n-1\right) * b,    c^n  $$


 * $$  (c^\left(n-1\right) * a)^n +  (c^\left(n-1\right) * b)^n =  (c^n)^n  $$


 * $$  c^\left((n-1)*n\right) * (a^n + b^n) =  c^\left(n*n\right)  $$


 * $$ a^n + b^n = c^n $$


 * $$  (c^\left(n-1\right) * a)^2 +  (c^\left(n-1\right) * b)^2 =  (c^n)^2  $$


 * $$  c^\left(2n-2\right) * a^2 +  c^\left(2n-2\right) * b^2 =  c^\left( 2n\right)  $$


 * $$  (c^\left(n-1\right) * a)^2 +  (c^\left(n-1\right) * b)^2 =  (c^n)^2  $$


 * $$n>2$$

$$e$$

$$d$$

$$n=de$$

$$a^n + b^n = c^n$$

$$n$$

$$e$$

$$\left(a^d\right)^e+\left(b^d\right)^e=\left(c^d\right)^e$$.