Sr Examen
Factorizar el polinomio z^3+3*z^2+4*z+12
Solución
Ha introducido
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3 2 z + 3*z + 4*z + 12
$$\left(4 z + \left(z^{3} + 3 z^{2}\right)\right) + 12$$
z^3 + 3*z^2 + 4*z + 12
Simplificación general
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3 2 12 + z + 3*z + 4*z
$$z^{3} + 3 z^{2} + 4 z + 12$$
12 + z^3 + 3*z^2 + 4*z
Factorización
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(x + 3)*(x + 2*I)*(x - 2*I)
$$\left(x + 3\right) \left(x + 2 i\right) \left(x - 2 i\right)$$
((x + 3)*(x + 2*i))*(x - 2*i)
Compilar la expresión
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3 2 12 + z + 3*z + 4*z
$$z^{3} + 3 z^{2} + 4 z + 12$$
12 + z^3 + 3*z^2 + 4*z
Denominador racional
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3 2 12 + z + 3*z + 4*z
$$z^{3} + 3 z^{2} + 4 z + 12$$
12 + z^3 + 3*z^2 + 4*z
Combinatoria
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/ 2\ (3 + z)*\4 + z /
$$\left(z + 3\right) \left(z^{2} + 4\right)$$
(3 + z)*(4 + z^2)
Unión de expresiones racionales
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12 + z*(4 + z*(3 + z))
$$z \left(z \left(z + 3\right) + 4\right) + 12$$
12 + z*(4 + z*(3 + z))
Denominador común
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3 2 12 + z + 3*z + 4*z
$$z^{3} + 3 z^{2} + 4 z + 12$$
12 + z^3 + 3*z^2 + 4*z
Parte trigonométrica
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3 2 12 + z + 3*z + 4*z
$$z^{3} + 3 z^{2} + 4 z + 12$$
12 + z^3 + 3*z^2 + 4*z