Check the true statements below: A. A single vector by itself is linearly dependent. B. If H = span{b1,., bp} , then (b1, ., bp} is a basis for H. C. A basis is a spanning set that is as large as...

Extracted text: Check the true statements below: A. A single vector by itself is linearly dependent. B. If H = span{b1,., bp} , then (b1, ., bp} is a basis for H. C. A basis is a spanning set that is as large as possible. D. In some cases, the linear dependence relations amoung the columns of a matrix can be affected by certain elementary row operations on the matrix. E. The columns of an invertible nx n matrix form a basis for R".