We have $$\frac{\mathbb du}{\mathbb dt}=Au(t),\,t>0 \,\,and \,u(0)=(1,1)$$
Here $A$ is a symmetric square matrix of order $2$ and trace$(A)<0 \,\,and\,\,det(A)>0$. $u(t)=(u_1(t),u_2(t))$ is the unique solution then how can we evaluate $\displaystyle\lim_{t\to\infty}u_1(t)?$
MY TRY:Actually i know how to solve system of differential equation by matrix eigen value method but here $A$ is not given so i am clueless.Thank you.
I do not have enough rep to comment, but think about what you actually know about the eigenvalues. Does that tell you something regarding the limit? That is the clue.