How many distinct and real roots can an nth-degree polynomial have?

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carlydays3054 carlydays3054

02-03-2018
Mathematics

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How many distinct and real roots can an nth-degree polynomial have?

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having troubles with inequalities.. 3.8x + 14.5 < 32

which trinomial is equivalent to (3x-1)(x+4)

having troubles with inequalities.. 3.8x + 14.5 < 32

which trinomial is equivalent to (3x-1)(x+4)

having troubles with inequalities.. 3.8x + 14.5 < 32

which trinomial is equivalent to (3x-1)(x+4)

sqdancefan sqdancefan · Answer 1 · 2018-03-02T22:32:46+01:00

sqdancefan sqdancefan

02-03-2018

The fundamental theorem of algegra is often cited to say that an n-th degree polynomial has n roots. They may not always be distinct, and they may not always be real.

An n-th degree polynomial may have up to n distinct real roots.

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