The polynomial of degree 5, P(x), has leading coefficient 1, has roots of multiplicity 2 at...

The polynomial of degree 4, P(x) has a root of multiplicity 2 at x=2 and roots...

The polynomial of degree 4, P(x) has a root of multiplicity 2 at x=2 and roots of multiplicity 1 at x=0 and x=-4 It goes through the point (5,324). Find a formula for P(x)

Find the exact solution(s) to the equation: 17x2=1720−x17x2=1720-x x=x= The polynomial P(x)P(x) of degree 4 has...

Find the exact solution(s) to the equation: 17x2=1720−x17x2=1720-x x=x= The polynomial P(x)P(x) of degree 4 has a root of multiplicity 2 at x = 4 a root of multiplicity 1 at x = 0 and at x = -3 It goes through the point (5, 12) Find a formula for P(x)P(x). Leave your answer in factored form. P(x)=P(x)=

Find a polynomial​ P(x) with real coefficients having a degree​ 4, leading coefficient 4​, and zeros...

Find a polynomial​ P(x) with real coefficients having a degree​ 4, leading coefficient 4​, and zeros 2-i and 3i.

Find a polynomial? P(x) with real coefficients having a degree? 4, leading coefficient 22?, and zeros...

Find a polynomial? P(x) with real coefficients having a degree? 4, leading coefficient 22?, and zeros 44minus?ii and 33ii. ?P(x)equals= nothing

Find a polynomial function with zeros x = 5 with multiplicity 1 and x = -1...

Find a polynomial function with zeros x = 5 with multiplicity 1 and x = -1 with multiplicity 2 and x = 8 with multiplicity 3. f(x) =  

write the polynomial equation f(x) in factored form with leading coefficient -2, and zeros -1(double root),...

write the polynomial equation f(x) in factored form with leading coefficient -2, and zeros -1(double root), 1 (single root), and 3 (single root). A) write f(x) in factored form B) What is its degree? C) what is its y-intercept D) sketch the graph showing the zeros and y-intercept

5a: f(x) is a 4th degree polynomial with 3 distinct roots: -1, 2, 2^(.5)i ; and...

5a: f(x) is a 4th degree polynomial with 3 distinct roots: -1, 2, 2^(.5)i ; and f(1) = 12.       f(x) = ? Provide the answer in factored form.   5b: Suppose you don’t know that f(1) = 12.       What is the most general formula for f(x)?       Leave the answer in un-factored form.

Find a polynomial in R[x] of minimum degree which has roots 3, i+1 and -3i.

Find a polynomial in R[x] of minimum degree which has roots 3, i+1 and -3i.

the linear transformation, L(p(x))=d/dx p(x)+p(0). maps a polynomial p(x) of degree<= 2 into a polynomial of...

the linear transformation, L(p(x))=d/dx p(x)+p(0). maps a polynomial p(x) of degree<= 2 into a polynomial of degree <=1, namely, L:p2 ~p1. find the marix representation of L with respect to the order bases{x^2,x,1}and {x,1}

Let p be an odd prime. Let f(x) ∈ Q(x) be an irreducible polynomial of degree...

Let p be an odd prime. Let f(x) ∈ Q(x) be an irreducible polynomial of degree p whose Galois group is the dihedral group D_2p of a regular p-gon. Prove that f (x) has either all real roots or precisely one real root.