Question

Every polynomial equation of degree n has
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Answer 1

Answer:

Every polynomial equation of degree n has   roots.

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Step-by-step explanation:

It may have zero roots as well. A polynomial will have as many roots as the number of times its plot intersects with the x-axis. A second degree polynomial with two real roots.

Answer 2

Every polynomial equation of degree n has complex roots.

Step-by-step explanation:

• Each polynomial equation has  complex roots, or more precisely, each polynomial equation of degree n has exactly n complex roots.
• maximum number of zeros of a polynomial = degree of the polynomials.This is called the fundamental theorem of algebra.
• A polynomial of degree n has at most n roots,Root can also be zero.
• A polynomial has  roots as  many times as the graph intersects  the x-axis. Quadratic polynomial with two real roots.
• A polynomial of degree n can have only  even numbers less than n real roots.
• Therefore, when calculating multiplicity, a cubic polynomial can have  three roots or only one root. A quadratic polynomial can have only two roots or zero roots