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State the maximum number of roots for the following polynomial: f(x)=x^(7)-4x^(5)+3x^(2)-9x^(12)+4x-2x^(3)
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State the maximum number of roots for the following polynomial: f(x)=x^(7)-4x^(5)+3x^(2)-9x^(12)+4x-2x^(3)

User Sajad Rastegar
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Final answer:

The maximum number of roots for the polynomial given is 12, determined by the highest power of x in the polynomial, which is x to the 12th power.

Step-by-step explanation:

When asked to state the maximum number of roots for the polynomial f(x)=x7-4x5+3x2-9x12+4x-2x3, the answer can be found using the Fundamental Theorem of Algebra. This theorem states that the number of roots of a polynomial is equal to its highest degree when counted with multiplicity. In this case, the highest degree of the polynomial is 12, corresponding to the term -9x12. Therefore, the polynomial can have at most 12 roots.

User Paulooze
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