Find f. f ''(θ) = sin(θ) + cos(θ),    f(0) = 4,    f '(0) = 3 f(θ) =

Find f. f ''(θ) = sin(θ) + cos(θ), f(0) = 5, f '(0) = 4

Find f. f ''(θ) = sin(θ) + cos(θ), f(0) = 5, f '(0) = 4

Find f. f ''(θ) = sin(θ) + cos(θ), f(0) = 3, f '(0) = 2

Find f. f ''(θ) = sin(θ) + cos(θ), f(0) = 3, f '(0) = 2

Identify the surface with parametrization x = 3 cos θ sin φ, y = 3 sin...

Identify the surface with parametrization x = 3 cos θ sin φ, y = 3 sin θ sin φ, z = cos φ where 0 ≤ θ ≤ 2π and 0 ≤ φ ≤ π. Hint: Find an equation of the form F(x, y, z) = 0 for this surface by eliminating θ and φ from the equations above. (b) Calculate a parametrization for the tangent plane to the surface at (θ, φ) = (π/3, π/4).

Find the dimension of the subspace U = span {1,sin^2(θ), cos 2θ} of F[0, 2π]

Find the dimension of the subspace U = span {1,sin^2(θ), cos 2θ} of F[0, 2π]

Prove the following (4 sin(θ) cos(θ))(1 − 2 sin2 (θ)) = sin(4θ) cos(2θ) /1 + sin(2θ)...

Prove the following (4 sin(θ) cos(θ))(1 − 2 sin2 (θ)) = sin(4θ) cos(2θ) /1 + sin(2θ) = cot(θ) − 1/ cot(θ) + 1 cos(u) /1 + sin(u) + 1 + sin(u) /cos(u) = 2 sec(u)

Find f. a. f '''(x) = cos x, f(0) = 1, f '(0) = 4, f...

Find f. a. f '''(x) = cos x, f(0) = 1, f '(0) = 4, f ''(0) = 3 b. f''(x) = sin(x) + cos (x), f(0) = 1, f'(0) = 3.

3. Let P = (a cos θ, b sin θ), where θ is not a multiple...

3. Let P = (a cos θ, b sin θ), where θ is not a multiple of π/2 be a point on the ellipse (x 2/ a2 )+ (y 2/ b 2) = 1, where a ≥ b > 0; and let P1 = (a cos θ, a sin θ) the corresponding on the circle x 2 /a2 + y 2/ a2 = 1. Prove that the tangent to the ellipse at P and the tangent to the circle at...

Find the series for cos(nθ) in powers of sin θ

Find the series for cos(nθ) in powers of sin θ

For r = f(θ) = sin(θ)−1 (A) Find the area contained within f(θ). (B) Find the...

For r = f(θ) = sin(θ)−1 (A) Find the area contained within f(θ). (B) Find the slope of the tangent line to f(θ) at θ = 0 ,π,3π/2 .

Let Θ ∼ Unif.([0, 2π]) and consider X = cos(Θ) and Y = sin(Θ). Can you...

Let Θ ∼ Unif.([0, 2π]) and consider X = cos(Θ) and Y = sin(Θ). Can you find E[X], E[Y], and E[XY]? clearly, x and y are not independent I think E[X] = E[Y] = 0 but how do you find E[XY]?