Show that the set {sin x,sin 2x,sin 3x} is linearly independent over R.

Show whether the following vectors/functions form linearly independent sets: (a) 2 – 3x, x + 2x^2...

Show whether the following vectors/functions form linearly independent sets: (a) 2 – 3x, x + 2x^2 , – x^2 + x^3 (b) cos x, e^(–ix), 3 sin x (c) (i, 1, 2), (3, i, –2), (–7+i, 1–i, 6+2i)

Show if the set {sinx, sin2x, sin3x} is linearly independent or dependent over R.

Show if the set {sinx, sin2x, sin3x} is linearly independent or dependent over R.

Consider the linearly independent set of vectors B= (-1+2x+3x^2+4x^3+5x^4, 1-2x+3x^2+4x^3+5x^4, 1+2x-3x^2+4x^3+5x^4, 1+2x+3x^2-4x^3+5x^4, 1+2x+3x^3+4x^3-5x^4) in P4(R), does...

Consider the linearly independent set of vectors B= (-1+2x+3x^2+4x^3+5x^4, 1-2x+3x^2+4x^3+5x^4, 1+2x-3x^2+4x^3+5x^4, 1+2x+3x^2-4x^3+5x^4, 1+2x+3x^3+4x^3-5x^4) in P4(R), does B form a basis for P4(R) and why?

(a) show that {x, e^x, e^2x} is a linearly independed set. (b) Let A be a...

(a) show that {x, e^x, e^2x} is a linearly independed set. (b) Let A be a 7x7 matrix if r(A)=4. find det(A), explain if det(A)=4, find r(A), explain

1.Show that cos 2t, sin 2t, and e^5t are linearly independent and form a fundamental set...

1.Show that cos 2t, sin 2t, and e^5t are linearly independent and form a fundamental set of solutions for the equation: y ′′′ − 5y ′′ + 4y ′ − 20y = 0 2.Find the general solution to the equation: y ′′′ − y ′′ − 4y ′ + 4y = 0

Show that the functions sin t, cost, and e^t are linearly independent on [−∞, +∞].

Show that the functions sin t, cost, and e^t are linearly independent on [−∞, +∞].

Enlarge the following set to linearly independent vectors to orthonormal bases of R^3 and R^4 {(1,1,1)^t,...

Enlarge the following set to linearly independent vectors to orthonormal bases of R^3 and R^4 {(1,1,1)^t, (1,1,2)^t} could you show me the process, please

f(x) = sin(3x), f(x) = cos(3x), f(x) = xe-x Determine linear dependent or independent

f(x) = sin(3x), f(x) = cos(3x), f(x) = xe-x Determine linear dependent or independent

Let a ∈ R. Show that {e^ax, xe^ax} is a linearly independent subset of the vector...

Let a ∈ R. Show that {e^ax, xe^ax} is a linearly independent subset of the vector space C[0, 1]. Let a, b ∈ R be such that a≠b. Show that {e^ax, e^bx} is a linearly independent subset of the vector space C[0, 1].

Show that every orthonormal set in a Hilbert Space H is always linearly independent.

Show that every orthonormal set in a Hilbert Space H is always linearly independent.