What is meant by a linearly independent set of vectors in RR^n? Explain?

2 Answers
A. S. Adikesavan · Yonas Yohannes
Jun 5, 2016

A vector set {a_1, a_2, ..., a_n} is linearly independent, if there exists the set of scalars {l_1, l_2,...,l_n} for expressing any arbitrary vector V as the linear sum sum l_i a_i, i=1,2,..n.

Explanation:

Examples of linear independent set of vectors are unit vectors in the directions of the axes of the frame of reference, as given below.

2-D: {i, j}. Any arbitrary vector a=a_1 i+a_2 j
3-D: {i, j, k}. Any arbitrary vector a=a_1 i+ a_2 j+a_3 k.

Yonas Yohannes
Jun 5, 2016

A set of vectors v_1,v_2,…,v_p in a vector space V is said to be linearly independent iff the vector equation
c_1v_1 + c_2v_2 + cdots+ c_pv_p = 0
has only the trivial solution for c_1 = c_2 = cdots =c_p = 0.

Also, The set of vectors {v_1, . . . , v_n} ⊂ V is linearly independent iff (stands for iff) every vector v ∈ "span"{v_1, . . . , v_n} can be written uniquely as a linear combination
v = a_1v_1 + · · · + a_nv_n

Hope that helps...

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