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30.12.39 problem 46 second IC

Internal problem ID [7631]
Book : Fundamentals of Differential Equations. By Nagle, Saff and Snider. 9th edition. Boston. Pearson 2018.
Section : Chapter 4, Linear Second-Order Equations. EXERCISES 4.2 at page 164
Problem number : 46 second IC
Date solved : Tuesday, September 30, 2025 at 04:55:08 PM
CAS classification : [[_2nd_order, _missing_x]]

\begin{align*} y^{\prime \prime }-y&=0 \end{align*}

With initial conditions

\begin{align*} y \left (0\right )&=0 \\ y^{\prime }\left (0\right )&=1 \\ \end{align*}
Maple. Time used: 0.012 (sec). Leaf size: 6
ode:=diff(diff(y(t),t),t)-y(t) = 0; 
ic:=[y(0) = 0, D(y)(0) = 1]; 
dsolve([ode,op(ic)],y(t), singsol=all);
\[ y = \sinh \left (t \right ) \]
Mathematica. Time used: 0.006 (sec). Leaf size: 21
ode=D[y[t],{t,2}]-y[t]==0; 
ic={y[0]==0,Derivative[1][y][0] ==1}; 
DSolve[{ode,ic},y[t],t,IncludeSingularSolutions->True]
\begin{align*} y(t)&\to \frac {1}{2} e^{-t} \left (e^{2 t}-1\right ) \end{align*}
Sympy. Time used: 0.046 (sec). Leaf size: 14
from sympy import * 
t = symbols("t") 
y = Function("y") 
ode = Eq(-y(t) + Derivative(y(t), (t, 2)),0) 
ics = {y(0): 0, Subs(Derivative(y(t), t), t, 0): 1} 
dsolve(ode,func=y(t),ics=ics)
\[ y{\left (t \right )} = \frac {e^{t}}{2} - \frac {e^{- t}}{2} \]

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