Answer:
- x = ∛10
- x = -∛10/2 +(∛10√3)/2i
- x = -∛10/2 -(∛10√3)/2i
- x = -1
- x = 1/2 -(√3)/2i
- x = 1/2 +(√3)/2i
Explanation:
You want to solve the 6th-degree equation x^6 -9x^3 +10 = 0.
Quadratic
The equation is basically quadratic in x^3. Substituting z = x^3, we have ...
z^2 -9z +10 = 0
(z -10)(z +1) = 0 . . . . . factored form
z = 10, z = -1 . . . . . . . values of z that make the factors zero
Cubics
Now, we have two cubic equations to solve:
- x^3 = 10 ⇒ x = ∛10
- x^3 = -1 ⇒ x = ∛(-1) = -1
The real root is given by the cube root function. The imaginary roots are that value multiplied by 1∠±120° = (-1/2 ±(√3)/2i). Then the six roots are ...
- x = ∛10
- x = -∛10/2 +(∛10√3)/2i
- x = -∛10/2 -(∛10√3)/2i
- x = -1
- x = 1/2 -(√3)/2i
- x = 1/2 +(√3)/2i
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Additional comment
The product ∛10√3 can be simplified to ...