Often a differential equation with variable coefficients, y" + p(t)y' + q(t)y = 0 (i), can be transformed into an equation with constant coefficients by a change of the independent variable. Let x = u(t) = f(g(t)) ¹/2 dit, with q(t) > 0, be the new independent variable. If the function H q'(t) + 2p(t)q(t) 2(g(t))3/2 is a constant, then (i) can be transformed into an equation with constant coefficients by a change of the independent variable. Consider the differential equation y" + 4ty' + t²y = 0. Calculate H using the formula above, and then determine whether it is possible to transform the differential equation into one with constant

Transcribed Image Text:

Often a differential equation with variable coefficients, y" + p(t)y' + q(t)y = 0 (i), can be transformed into an equation with constant coefficients by a change of the independent variable. Let x = u(t) = f(g(t)) ¹/² dt, with q(t) > 0, be the new independent variable. If the function H q'(t) + 2p(t)q(t) 2(g(t))3/2 is a constant, then (i) can be transformed into an equation with constant coefficients by a change of the independent variable. Choose one Consider the differential equation y" + 4ty' + t²y = 0. Calculate H using the formula above, and then determine whether it is possible to transform the differential equation into one with constant coefficients using this method. H =