Homework SourseLet v1 v2 be a basis for R Let A be an invertible n times
Let {v_1, v_2, ..., } be a basis for R\". Let A be an invertible n times n matrix. Show that {Av_1, Av_2, ..., Av_n} is a basis for R^n.![Let {v_1, v_2, ..., } be a basis for R\](/WebImages/3/let-v1-v2-be-a-basis-for-r-let-a-be-an-invertible-n-times-975056-1761500094-0.webp "Let {v_1, v_2, ..., } be a basis for R\")
Solution
Rn has dimension n so, v1,v2,...,vn form a linearly independent set since they span Rn
Now A is invertible hence kernel A={0}
Let, a1,...,an be real numbers so that
a1Av1+....+anAvn=0
A(a1v1+....+anvn)=0
But kernel ={0}
Hence,
a1v1+....+anvn=0
Now, v1,...,vn are linearly independent
Hence, a1=.....=an=0
Hence, Av1,...,Avn are linearly independent and hence span Rn and hence form basi for Rn
