Chapter 8: Q16E (page 453)
In Problems 15-17,solve the given initial value problem x2y"+5xy'+4y=0.
y(1) =3 and y'(1) = 7
The solution of the given initial value problem is y=3x-2+13x-2ln x.
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In Problems 1-10, use a substitution y=xr to find the general solution to the given equation for x>0.
2x2y"(x)+13xy'(x)+15y(x)=0
In the study of the vacuum tube, the following equation is encountered:
Find the Taylor polynomial of degree 4 approximating the solution with the initial values,.
Question: To find the first few terms in the power series for the quotient q(x) in Problem 15, treat the power series in the numerator and denominator as "long polynomials" and carry out long division. That is, perform
16.
Find a minimum value for the radius of convergence of a power series solution about x0.
(x2-5x+6) y"-3xy'-y=0; x0=0
(a) Use (20) to show that the general solution of the differential equation \(xy'' + \lambda y = 0\) on the interval \((0,\infty )\) is\(y = {c_1}\sqrt x {J_1}\left( {2\sqrt {\lambda x} } \right) + {c_2}\sqrt x {Y_1}\left( {2\sqrt {\lambda x} } \right)\).
(b) Verify by direct substitution that \(y = \sqrt x {J_1}\left( {2\sqrt {\lambda x} } \right)\)is a particular solution of the DE in the case \(\lambda = 1\).
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