show that any polynomial of odd degree has at least one real root

Prove any polynomial of an odd degree must have a real root.

Prove any polynomial of an odd degree must have a real root.

Use the intermediate value theorem (only) to prove that any real polynomial of odd degree has...

Use the intermediate value theorem (only) to prove that any real polynomial of odd degree has at least one real solution. Is the same conclusion true if the degree is even?

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.

in exercises 47-50, find the polynomial function f with real coefficients that has the given degree,...

in exercises 47-50, find the polynomial function f with real coefficients that has the given degree, zeros, and solution point. degree 3. zeros -3, 1+ square root 3i. solution point f(-2)=12

Find a polynomial function with real coefficients and least degree having zeros 2 – i, 3...

Find a polynomial function with real coefficients and least degree having zeros 2 – i, 3 and -1.

a)Give an example of a polynomial with integer coefficients of degree at least 3 that has...

a)Give an example of a polynomial with integer coefficients of degree at least 3 that has at least 3 terms that satisfies the hypotheses of Eisenstein's Criterion, and is therefore irreducible. b)Give an example of a polynomial with degree 3 that has at least 3 terms that does not satisfy the hypotheses of Eisenstein's Criterion.

Find a polynomial of degree 5 with integer coefficients that has zeros 1, i, square root...

Find a polynomial of degree 5 with integer coefficients that has zeros 1, i, square root of 2i, and y-intercept of ?4.

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)

Let f(x) be a cubic polynomial of the form x^3 +ax^2 +bx+c with real coefficients. 1....

Let f(x) be a cubic polynomial of the form x^3 +ax^2 +bx+c with real coefficients. 1. Deduce that either f(x) factors in R[x] as the product of three degree-one polynomials, or f(x) factors in R[x] as the product of a degree-one polynomial and an irreducible degree-two polynomial. 2.Deduce that either f(x) has three real roots (counting multiplicities) or f(x) has one real root and two non-real (complex) roots that are complex conjugates of each other.

Form a polynomial f(x) with real coefficients having the given degree and zeros. Degree​ 4; ​...

Form a polynomial f(x) with real coefficients having the given degree and zeros. Degree​ 4; ​ zeros:-5+3i, -4 multiplicity 2 please show all steps and explain