Homework SourseLet B v1vn be a basis of a vector space V and let T V V b
Let B = {v_1,...,v_n} be a basis of a vector space V and let T : V -> V be a linear transformation with the matrix [T]_B. Prove that T is one-to-one and onto if and only if det[T]_B != 0
Solution
T : V V is a linear transform with standard matrix [T]B. Then,
1 T is onto if and only if the columns of [T]B span V .
2 T is one-to-one if and only if the columns of [T]B are linearly independent.
The following conditions are equivalent for a n × n matrix A
If det [T]B = 0, then [T]B is not invertible and the columns of [T]B are linearly dependent. And do not form a basis for V. Then T is not one-to-one or onto. Conversely, if T is not one-to-one and onto, then the columns of [T]B are linearly dependent, then det [T]B = 0
![Let B = {v_1,...,v_n} be a basis of a vector space V and let T : V -> V be a linear transformation with the matrix [T]_B. Prove that T is one-to-one and onto](/WebImages/23/let-b-v1vn-be-a-basis-of-a-vector-space-v-and-let-t-v-v-b-1057768-1761552111-0.webp "Let B = {v_1,...,v_n} be a basis of a vector space V and let T : V -> V be a linear transformation with the matrix [T]_B. Prove that T is one-to-one and onto")
