a) Show that √2 ∈ Q(√2 + √7) b) Find the degree of the extension Q...

Are all field extension of degree 3 or higher normal extension or not? Explain.

Are all field extension of degree 3 or higher normal extension or not? Explain.

7. Increasing Extension and Decreasing Extension Terms can be arranged in order of increasing extension or...

7. Increasing Extension and Decreasing Extension Terms can be arranged in order of increasing extension or decreasing extension. In a sequence of terms with increasing extension, each term in the sequence denotes or refers to a larger set of objects. By contrast, in a sequence of terms with decreasing extension, each term in the sequence denotes or refers to a set with fewer members. 1. Arrange the following terms in order of decreasing extension. book, textbook, philosophy book, logic book...

If p(x) and q(x) are arbitrary polynomials of degree at most 2, then the mapping =p(−1)q(−1)+p(0)q(0)+p(2)q(2)...

If p(x) and q(x) are arbitrary polynomials of degree at most 2, then the mapping =p(−1)q(−1)+p(0)q(0)+p(2)q(2) defines an inner product in P3. Use this inner product to find , ||p||, ||q||, and the angle θ between p(x) and q(x) for p(x)=2x^2+3 and q(x)=2x^2−6x.

10. Find the angle between the vectors, to the nearest degree. 1. a =< 6, −7...

10. Find the angle between the vectors, to the nearest degree. 1. a =< 6, −7 > and b =< −4, −2 > 2. a = 6i+ 2j and b = −4i + 8j

Show Intro/Instructions Skip Navigation Questions Q 1 [2/2] Q 2 (0/2) Q 3 (0/2) Q 4...

Show Intro/Instructions Skip Navigation Questions Q 1 [2/2] Q 2 (0/2) Q 3 (0/2) Q 4 (0/2) Q 5 (0/2) Q 6 (0/2) Q 7 (0/2) Q 8 (0/2) Q 9 (0/2) Q 10 (0/2) Grade: 2/20 Print Version Start of Questions A population of values has a normal distribution with μ=58.6μ=58.6 and σ=59.9σ=59.9. You intend to draw a random sample of size n=11n=11. Find the probability that a single randomly selected value is greater than 26.1. P(X > 26.1)...

A) Prove the mathematical relationship between Elastic PE and extension. Give example B)Find a relationship between...

A) Prove the mathematical relationship between Elastic PE and extension. Give example B)Find a relationship between the Elastic PE and the extension. What happens to the PE as the extension doubles? You should find a single spring system with a k value (force/spring constant) of 100N/m Click on ‘Energy plot’ and ‘Values’. Enter data into the Displacement box to apply forces. Record the force applied and Energy below Displacement/Extension (m) Force Applied (N) Elastic PE (J) 0.1 0.2 0.3 0.4...

XE is the Cauchy-extension of X that can be identified with the set of limits of...

XE is the Cauchy-extension of X that can be identified with the set of limits of Cauchy sequences composed of elements of X, these limits need not be in X. Find (with proof) the Cauchy-extension of the metric space (Q, d) where d(x, y) = |x − y|. (You may wish to use the fact that any real number x has a decimal expansion. It may also be helpful to show that 10n > n for all n ∈ N.)

True or False, explain: 1. Any polynomial f in Q[x] with deg(f)=3 and no roots in...

True or False, explain: 1. Any polynomial f in Q[x] with deg(f)=3 and no roots in Q is irreducible. 2. Any polynomial f in Q[x] with deg(f)-4 and no roots in Q is irreducible. 3. Zx40 is isomorphic to Zx5 x Zx8 4. If G is a finite group and H<G, then [G:H] = |G||H| 5. If [G:H]=2, then H is normal in G. 6. If G is a finite group and G<S28, then there is a subgroup of G...

a. Find a polynomial of the specified degree that has the given zeros. Degree 3;    zeros −5,...

a. Find a polynomial of the specified degree that has the given zeros. Degree 3;    zeros −5, 5, 7 b. Find a polynomial of the specified degree that satisfies the given conditions. Degree 4;    zeros −4, 0, 1, 5;    coefficient of x3 is 4

Suppose y^2 = x^3+ax+b with a, b ∈ Q defines an elliptic curve. Show that there...

Suppose y^2 = x^3+ax+b with a, b ∈ Q defines an elliptic curve. Show that there is another equation Y^2 = X^3 + AX + B with A, B ∈ Z whose solutions are in bijection with the solutions to y^2 = x^3+ax+b.