Determine whether S= ((7, 6, 3), (0, 6, 3), (0, 0, 3)) is a basis for R³. If it is, write (28, 18, 21) as a linear combination

Question

Determine whether S= ((7, 6, 3), (0, 6, 3), (0, 0, 3)) is a basis for R³. If it is, write (28, 18, 21) as a linear combination of the vectors in
u=
a. S is a basis for R³ and
b. S is a basis for R³ and
c. S is a basis for R³ and
d. S is a basis for R³ and u=4(7,6, 3)-(0, 6, 3)-4(0, 0, 3)=(28, 18, 21).
e. S is not a basis for R³.
=-4(7, 6, 3) + (0, 6, 3)+4(0, 0, 3)=(28, 18, 21).
= 4(7, 6, 3)-(0, 6, 3) +4(0, 0, 3)=(28, 18, 21).
=-4(7,6, 3) + (0, 6, 3)-4(0, 0, 3)=(28, 18, 21).

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