Let s be a subset of Rn which is linearly independent Then S

Let s be a subset of Rn which is linearly independent. Then S
can have any real number of vectors ( Except Zero)
must consist of at least n Vectors
must have at most n Vectors
Must span Rn.
What is the right answer?

Let s be a subset of Rn which is linearly independent. Then S
can have any real number of vectors ( Except Zero)
must consist of at least n Vectors
must have at most n Vectors
Must span Rn.
What is the right answer?

can have any real number of vectors ( Except Zero)
must consist of at least n Vectors
must have at most n Vectors
Must span Rn.
What is the right answer?

Solution

Right answer : must have at most n Vectors.

If there are more than n vectors then they will be dependent.

Let s be a subset of Rn which is linearly independent. Then S can have any real number of vectors ( Except Zero) must consist of at least n Vectors must have at

Get Help Now

Submit a Take Down Notice

Tutor
Tutor: Dr Jack
Most rated tutor on our site