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

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

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

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

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

Use the Intermediate Value Theorem and the Mean Value Theorem to prove that the equation cos...

Use the Intermediate Value Theorem and the Mean Value Theorem to prove that the equation cos (x) = -2x has exactly one real root.

Use the intermediate value theorem to prove that the equation ln? = ? − square root(?)...

Use the intermediate value theorem to prove that the equation ln? = ? − square root(?) has atleast one solution between ?=2 and ?=3

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.

(i) Use the Intermediate Value Theorem to prove that there is a number c such that...

(i) Use the Intermediate Value Theorem to prove that there is a number c such that 0 < c < 1 and cos (sqrt c) = e^c- 2. (ii) Let f be any continuous function with domain [0; 1] such that 0smaller than and equal to f(x) smaller than and equal to 1 for all x in the domain. Use the Intermediate Value Theorem to explain why there must be a number c in [0; 1] such that f(c) =c

use Rolle"s theorem to prove that 2x-2-cosx=0 has exactly one real solution

use Rolle"s theorem to prove that 2x-2-cosx=0 has exactly one real solution

for the equation f(x) = e^x - cos(x) + 2x - 3 Use Intermediate Value Theorem...

for the equation f(x) = e^x - cos(x) + 2x - 3 Use Intermediate Value Theorem to show there is at least one solution. Then use Mean Value Theorem to show there is at MOST one solution

Let g (x) = 2^-x −x − x^3, defined on [0,1] (a) Use the Intermediate Value...

Let g (x) = 2^-x −x − x^3, defined on [0,1] (a) Use the Intermediate Value Theorem (TVI) to prove that the equation g (x) = 0 has a solution. (b) Use the Average Value Theorem (TVM) to show that the solution in part (a) is the only one that exists.

Recall that (by the Fundamental Theorem of Algebra) the only polynomial P(t) of degree n−1 that...

Recall that (by the Fundamental Theorem of Algebra) the only polynomial P(t) of degree n−1 that vanishes at n distinct points t1,...,tn ∈ R is P(t) ≡ 0. Using this, show that given any values b1,...,bn ∈ R, there is a polynomial Q(t) = ξ1 + ξ2t + ... + ξntn-1 such that Q(ti) = bi (and thus Q(t) takes precisely the given values at the given points). Hint: Show that the coefficient matrix of the corresponding system is nonsingular.