Solve f(n) as a function of n using the homogeneous equation and given the conditions below:...

Give a recursive algorithm to solve the following recursive function.    f(0) = 0;    f(1)...

Give a recursive algorithm to solve the following recursive function.    f(0) = 0;    f(1) = 1; f(2) = 4; f(n) = 2 f(n-1) - f(n-2) + 2; n > 2 Solve f(n) as a function of n using the methodology used in class for Homogenous Equations. Must solve for the constants as well as the initial conditions are given.

Solve the following differential equation by Laplace transforms. The function is subject to the given conditions....

Solve the following differential equation by Laplace transforms. The function is subject to the given conditions. y''-y=5sin2t, y(0)=0, y'(0)=6

4. Solve the homogeneous equation xdy = (y + 2)dx given y(3) = 10.

4. Solve the homogeneous equation xdy = (y + 2)dx given y(3) = 10.

For 1 and 2, give a function f that satisfies the given conditions. 1. f '...

For 1 and 2, give a function f that satisfies the given conditions. 1. f ' (x) = x^5 + 1 + 2 sec x tan x with f(0) = 4 2. f '' (x) = 12x + sin x with f(0) = 3 and f ' (0) = 7

How to solve this equation to find f(n), where f(n)=1+p*f(n+1)+q*f(n-1). p,q are constant and p+q=1. We...

How to solve this equation to find f(n), where f(n)=1+p*f(n+1)+q*f(n-1). p,q are constant and p+q=1. We already know two point f(0)=f(d)=0, d is a constant number. what is f(n) as a function with p,q,d,n?

Recurrence Relations Solve the following recurrence equation: f(n, k) = 0, if k > n f(n,k)...

Recurrence Relations Solve the following recurrence equation: f(n, k) = 0, if k > n f(n,k) = 1, if k = 0 f(n,k) = f(n-1, k) + f(n-1,k-1), if n >= k > 0

B. a non-homogeneous differential equation, a complementary solution, and a particular solution are given. Find a...

B. a non-homogeneous differential equation, a complementary solution, and a particular solution are given. Find a solution satisfying the given initial conditions. y''-2y'-3y=6 y(0)=3 y'(0) = 11 yc= C1e-x+C2e3x yp = -2 C. a third-order homogeneous linear equation and three linearly independent solutions are given. Find a particular solution satisfying the given initial conditions y'''+2y''-y'-2y=0, y(0) =1, y'(0) = 2, y''(0) = 0 y1=ex, y2=e-x,, y3= e-2x

Using separation of variables to solve the heat equation, ut = kuxx on the interval 0...

Using separation of variables to solve the heat equation, ut = kuxx on the interval 0 < x < 1 with boundary conditions ux (0, t ) = 0 and ux (1, t ) = 0, yields the general solution, ∞ u(x,t) = A0 + ?Ane−kλnt cos?nπx? (with λn = n2π2) n=1DeterminethecoefficientsAn(n=0,1,2,...)whenu(x,0)=f(x)= 0, 1/2≤x<1 .

Sketch the graph of a function f(x) that satisfies all of the conditions listed below. Be...

Sketch the graph of a function f(x) that satisfies all of the conditions listed below. Be sure to clearly label the axes. f(x) is continuous and differentiable on its entire domain, which is (−5,∞) limx→-5^+ f(x)=∞ limx→∞f(x)=0limx→∞f(x)=0 f(−2)=−4,f′(−2)=0f(−2)=−4,f′(−2)=0 f′′(x)>0f″(x)>0 for −5<x<1−5<x<1 f′′(x)<0f″(x)<0 for x>1x>1

given the conditions for a function (f(x)) f '(x) > 0 on (0,3) • f '(x)...

given the conditions for a function (f(x)) f '(x) > 0 on (0,3) • f '(x) < 0 on (3,∞) • f ''(x) > 0 on (0,2) • f ''(x) < 0 on (−∞,0) ∪ (2,∞) how would the graph f(x) look like?