0: 1. Solve the following differential equation using a power series centered at to y" -...
4. (a) Solve the differential equation (1-12)y"-2cy' + λ(A + 1)y 0 using power series centered at 0 , in which λ is a constant. Write your solution as a linear combination of two independent solutions whose coefficients are expressed in terms of λ . Compute the coefficients of each solution up to and including the 5 term. Without computing them, what is the smallest possible value of the radius of convergence of each solution and why? (b) When λ...
Use a power series centered about the ordinary point x0 = 0 to solve the differential equation (x − 4)y′′ − y′ + 12xy = 0 Find the recurrence relation and at least the first four nonzero terms of each of the two linearly inde- pendent solutions (unless the series terminates sooner). What is the guaranteed radius of convergence?
4. (a) Solve the differential equation (1 − x 2 )y ′′ − 2xy′ + λ(λ + 1)y = 0 using power series centered at 0 , in which λ is a constant. Write your solution as a linear combination of two independent solutions whose coefficients are expressed in terms of λ . Compute the coefficients of each solution up to and including the x 5 term. Without computing them, what is the smallest possible value of the radius of...
4. (a) Solve the differential equation (1 − x 2 )y ′′ − 2xy′ + λ(λ + 1)y = 0 using power series centered at 0 , in which λ is a constant. Write your solution as a linear combination of two independent solutions whose coefficients are expressed in terms of λ . Compute the coefficients of each solution up to and including the x 5 term. Without computing them, what is the smallest possible value of the radius of...
please help to solve this differential equation.
3. Use power series solutions to solve (x+1)y"+(x-2)y' +y = 0. Center the power se- ries about the ordinary point o = 0. Write the solution as y = col first four terms..]+ ciſfirst four terms...). 4. Find the minimum radius of convergence for a power series solution to the ODE (22+2x+5)/' +10y = 0 centered about the ordinary point Xo = -6
solve the differential equation using the power series
For the following differential equations, find 42, 43, 44, 45, 46, and a7 in terms of do and aj and write the answer y(x) = 20 ( sum of terms ) +a1( sum of terms) 2. y" – xy' - y = 0) expanding about xo = 0. 3 -0.
solve the differential equation using the power series
For the following differential equations, find 42, 43, 44, 45, 46, and an in terms of ao and ai and write the answer y(x) = 60 sum of terms :) + sum of terms + ai 3. (2+2?)y" – xy + 4y = 0) expanding about 10 = 0.
(4) (12 points)For the differential equation: Compute the recursion formula for the coefficients of the power series solution centered at o 0 and use it to compute the first three nonzero terms of the solution with y(0) 12, y'(0)0. (5) (12 points)For the equation y" - 5ty -7y 0 (t>0), (t)t is a solution (a) Use the method of Reduction of Order to obtain a second, independent solution. (b) Solve the equation directly, using that it is an Euler Equation....
2. Find power series solutions y z" Σ anr" of the following equation centered at 0 where-0 is a regular singular point. (a) Find the indicial equation for r, and solve for the two roots. Note that the indicial equation can be obtained from the coefficients of the term Pick the larger root and find the first seven terms of your power series solutions, i.e., (b)
differential equations
Consider the following differential equation to be solved using a power series. y" + xy = 0 On Using the substitution y = cryn, find an expression for Ck + 2 in terms of Ck - 1 for k = 1, 2, 3... n = 0 Ck +2= + 6 Find two power series solutions of the given differential equation about the ordinary point x = 0. x3 O Y1 = 1 - xo and y2 = x...