What does it mean for a linear system to be linearly independent?

1 Answer
Trevor Ryan.
Oct 22, 2015

Consider a set S of finite dimensional vectors S= {v_1,v_2,....v_n}in RR^n

Let alpha_1,alpha_2,....,alpha_n in RR be scalars.

Now consider the vector equation

alpha_1v_1+alpha_2v_2+.....+alpha_nv_n=0

If the only solution to this equation is alpha_1=alpha_2=....=alpha_n=0, then the set Sof vectors is said to be linearly independent.

If however other solutions to this equation exist in addition to the trivial solution where all the scalars are zero, then the set S of vectors is said to be linearly dependant.

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