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Polynomial of degree 4 has 1 positive real root that is bouncer and 1 negative real root that is a bouncer. How many imaginary roots does the polynomial have?
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Polynomial of degree 4 has 1 positive real root that is bouncer and 1 negative real root that is a bouncer. How many imaginary roots does the polynomial have?

User Liath
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Answer:

The given polynomial of degree 4 has atleast one imaginary root

Explanation:

Given that " Polynomial of degree 4 has 1 positive real root that is bouncer and 1 negative real root that is a bouncer:

To find how many imaginary roots does the polynomial have :

  • Since the degree of given polynomial is 4
  • Therefore it must have four roots.
  • Already given that the given polynomial has 1 positive real root and 1 negative real root .
  • Every polynomial with degree greater than 1 has atleast one imaginary root.

Hence the given polynomial of degree 4 has atleast one imaginary root

User Philar
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