Answer:
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Answer:
<h3>The given polynomial of degree 4 has atleast one imaginary root</h3>
Step-by-step explanation:
Given that " Polynomial of degree 4 has 1 positive real root that is bouncer and 1 negative real root that is a bouncer:
<h3>To find how many imaginary roots does the polynomial have :</h3>
- 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.
<h3>Hence the given polynomial of degree 4 has atleast one imaginary root</h3><h3> </h3>
Answer:
= 3.134 × 10^9
(scientific notation)
= 3.134e9
(scientific e notation)
= 3.134 × 10^9
(engineering notation)
(billion; prefix giga- (G))
= 3134000000
(real number)
Step-by-step explanation:
Answer:
12.5%
Step-by-step explanation:
8/64
(8*100)/64 = 12.5