1. Find a basis for the solution space of the linear
system
2. State the condition for the basis vectors to be linearly
independent.
3. Show that the basis vectors are linearly independent
4. Given a vector w, state the condition for the vector
w to be a solution of the system.
Show whether w is a solution to the system or not.
6. If w were a solution, can you express it as a different
linear combination of the basis vectors? Why?
