what are real life application of linear Independent vector?
Answers
Answer:
There are many if you consider abstract subjects as vectors.
Intuitively, 3-dimensional space is a great example to be easily understood. Height, width and length are a group of linearly independent vectors. Also orthogonal.
More generally, considering the probability, any event can be expressed as a chain of sub-probability such as P = P1 + P2 + P3 + … + Pn, since P1……Pn are all disjoint or mutually exclusive with each other . Then P1……Pn is a list of linearly independent vectors if you have 1 means something happens and 0 means something does not happen. You can define n-tuples on this case.
It is called linearly independent, not linear independent.
Answer:
There are if you consider abstract subjects as vectors.
Step-by-step explanation:
Intuitively, 3-dimensional space is a great example to be easily understood. Height, width and length are a group of linearly independent vectors. Also orthogonal.
More generally, considering the probability, any event can be expressed as a chain of sub probability such as aP= P1+P2+P3+..........+Pn, since P1......Pn are all disjoint or mutually exclusive with each other. Then P1.......Pn is a list of linearly independent vectors of you have I means something happens and 0 means something does not happen. You can define ntuples on this case...
It's called linearly independent,not linear independent.
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