Find a third-degree polynomial equation with rational coefficients that has roots -4 and 2 + i.
Find a third-degree polynomial equation with rational coefficients that has roots -4 and 2 + i.
Find a polynomial function of lowest degree with rational coefficients that has the given numbers as some of its zeros. 1-3,1+i
The other zero is Suppose that a polynomial function of degree 4 with rational coefficients has the given numbers as zeros. Find the other zero. 61, 0, -1
Suppose that a polynomial function of degree 4 with rational coefficients has 4 1. - 3-1/6 as zeros. Find the other zeros. OA. -41, -3+ V6 O B. -4i, 3+ 46 O C. 4- i. -3 + 6 OD. 4-1, 3+ V6
Can someone please help me out State the degree of the following polynomial equation. Find all of the real and imaginary roots of the equation, stating multiplicity when it is greater than one The degree of the polynomial is Zero is a root of multiplicity is a root of multiplicity 2. Find a polynomial equation with real coefficients that has the given roots -1, 3,-4 The polynomial equation is x3--o Find a polynomial equation with real coefficients that has the...
Suppose that a polynomial function of degree 5 with rational coefficients has 0 (with multiplicity 2), 3, and 1 ?2i as zeros. Find the remaining zero.A. ?2B. ?1 ? 2iC. 0D. 1 + 2i
State the degree of the following polynomial equation. Find all of the real and imaginary roots of the equation, stating multiplicity when it is greater than one. X6 10x5 25x4-0 The degree of the polynomial is Zero is a root of multiplicity is a root of multiplicity 2.
5. Prove the Rational Roots Theorem: Let p(x)=ataiェ+ +anz" be a polynomial with integer coefficients (that is, each aj is an integer). If t rls (oherer and s are nonzero integers and t is written in lowest terms, that is, gcd(Irl'ls!) = 1) is a non-zero Tational root orp(r), that is, if tメ0 and p(t) 0, then rao and slan. (Hint: Plug in t a t in the polynomial equation p(t) - o. Clear the fractions, then use a combination...
The polynomial of degree 4 The polynomial of degree 4, P(x) has a root of multiplicity 2 at x = 4 and roots of multiplicity 1 at x = 0 and x = – 2. It goes through the point (5, 7). Find a formula for P(x). P(x) =
Find a polynomial with integer coefficients that satisfies the given conditions. R has degree 4 and zeros 4 - 2i and 2, with 2 a zero of multiplicity 2. R(x) = Show My Work (Optional) Submit Answer
Find a polynomial f (x) of degree 3 with real coefficients and the following zeros. -4, -2+i X ?