Answer:
yes
Step-by-step explanation:
We are given that a Cauchy Euler's equation
[tex]t^2y''-ty'+y=0[/tex] where t is not equal to zero
We are given that two solutions of given Cauchy Euler's equation are t,t ln t
We have to find the solutions are independent or dependent.
To find the solutions are independent or dependent we use wronskain
[tex]w(x)=\begin{vmatrix}y_1&y_2\\y'_1&y'_2\end{vmatrix}[/tex]
If wrosnkian is not equal to zero then solutions are dependent and if wronskian is zero then the set of solution is independent.
Let [tex]y_1=t,y_2=t ln t[/tex]
[tex]y'_1=1,y'_2=lnt+1[/tex]
[tex]w(x)=\begin{vmatrix}t&t lnt\\1&lnt+1\end{vmatrix}[/tex]
[tex]w(x)=t(lnt+1)-tlnt=tlnt+t-tlnt=t [/tex] where t is not equal to zero.
Hence,the wronskian is not equal to zero .Therefore, the set of solutions is independent.
Hence, the set {t , tln t} form a fundamental set of solutions for given equation.
