Homework SourseDetermine whether the columns of the following matrices are
Determine whether the columns of the following matrices are linearly independent or linearly dependent. Justify your answers. [1 5 9 0 0 0 3 7 1] [1 3 2 -4 -6 -18 -12 24] [1 1 2 5 3 -2 12 8 0]![Determine whether the columns of the following matrices are linearly independent or linearly dependent. Justify your answers. [1 5 9 0 0 0 3 7 1] [1 3 2 -4 -6](/WebImages/15/determine-whether-the-columns-of-the-following-matrices-are-1024860-1761530479-0.webp "Determine whether the columns of the following matrices are linearly independent or linearly dependent. Justify your answers. [1 5 9 0 0 0 3 7 1] [1 3 2 -4 -6")
Solution
a.Determinant of this matrix is 0 so it is linearly dependent.
way if calculating determinant
(1(0*1-0*7))-(0(5*1-9*7))+(3(5*0-0*9))
this equals to zero.so it is linearly dependent.
b.
for this multiply column C1 by 6
we get
6. -6
18. -18
12 -12
24 -24
on adding C1 and C2 we get
0 determinant
so this is linearly dependent.
c.
we have to find determinant for this matrix
(1(0+16))-(5(0-16))+(12(-2-6))
on solving this,we get
16+80-96=0
so this is also linearly dependent.
