What is the general solution of the DE with n linearly independent solutions u1(t), ., un(t) of a nth order linear homogeneous DE?

Question

What is the general solution of the DE with n linearly independent solutions u1(t),  ., un(t) of a nth order linear homogeneous DE?

TuteeHUB · Accepted Answer

(u(t)=c_0 u_0 (t)+ +c_n u_n (t)= _{k=0}^ c_k u_k (t)   )

TuteeHUB · Answer

(u(t)=u_1 (t)+ +c_{n+1} u_n (t)= _{k+1}^n=c_{k+1} u_k (t)  )

TuteeHUB · Answer

(u(t)=u_1 (t)+ +u_n (t)= _{k=1}^nu_k(t)   )

TuteeHUB · Answer

(u(t)=c_1 u_1 (t)+ +c_n u_n (t)= _{k=1}^n c_k u_k (t)   )

TuteeHUB · Answer

(u(t)=c_0 u_0 (t)+ +c_n u_n (t)= _{k=0}^ c_k u_k (t)   )

1.	What is the general solution of the DE with n linearly independent solutions u1(t), ., un(t) of a nth order linear homogeneous DE?
A.	(u(t)=u_1 (t)+ +c_{n+1} u_n (t)= _{k+1}^n=c_{k+1} u_k (t) )
B.	(u(t)=u_1 (t)+ +u_n (t)= _{k=1}^nu_k(t) )
C.	(u(t)=c_1 u_1 (t)+ +c_n u_n (t)= _{k=1}^n c_k u_k (t) )
D.	(u(t)=c_0 u_0 (t)+ +c_n u_n (t)= _{k=0}^ c_k u_k (t) )
Answer» D. (u(t)=c_0 u_0 (t)+ +c_n u_n (t)= _{k=0}^ c_k u_k (t) )

Discussion