Factorizar el polinomio z^3+z-10

Ha introducido [src]

 3         
z  + z - 10

$$\left(z^{3} + z\right) - 10$$

z^3 + z - 10

Factorización [src]

(x - 2)*(x + 1 + 2*I)*(x + 1 - 2*I)

$$\left(x - 2\right) \left(x + \left(1 + 2 i\right)\right) \left(x + \left(1 - 2 i\right)\right)$$

((x - 2)*(x + 1 + 2*i))*(x + 1 - 2*i)

Simplificación general [src]

           3
-10 + z + z

$$z^{3} + z - 10$$

-10 + z + z^3

Potencias [src]

           3
-10 + z + z

$$z^{3} + z - 10$$

-10 + z + z^3

Compilar la expresión [src]

           3
-10 + z + z

$$z^{3} + z - 10$$

-10 + z + z^3

Denominador racional [src]

           3
-10 + z + z

$$z^{3} + z - 10$$

-10 + z + z^3

Denominador común [src]

           3
-10 + z + z

$$z^{3} + z - 10$$

-10 + z + z^3

Parte trigonométrica [src]

           3
-10 + z + z

$$z^{3} + z - 10$$

-10 + z + z^3

Respuesta numérica [src]

-10.0 + z + z^3

-10.0 + z + z^3

Combinatoria [src]

         /     2      \
(-2 + z)*\5 + z  + 2*z/

$$\left(z - 2\right) \left(z^{2} + 2 z + 5\right)$$

(-2 + z)*(5 + z^2 + 2*z)

Unión de expresiones racionales [src]

        /     2\
-10 + z*\1 + z /

$$z \left(z^{2} + 1\right) - 10$$

-10 + z*(1 + z^2)