Linear Algebra Worksheet
WORKSHEET 8 (SECTIONS 4.4 AND 4.5)
Let B = { [ −1 8
] ,
[ 1 −7
] } and C = {
[ 1 2
] ,
[ 1 1
] } be two basis for R2.
(1) Suppose [x]B =
[ 2 3
] and [y]C =
[ 2 3
] . Find x, y, are these vectors equal? What does this mean
geometrically? i.e. draw x and y in a plane as a linear combination of vectors in B and C.
(2) Let u =
[ 0 1
] . Find the corresponding coordinate vectors [u]B and [u]C. What does this mean
geometrically?
(3) Find the change of coordinate matrix PB and use PB to compute [u]B from part (2).
WORKSHEET 8 (SECTIONS 4.4 AND 4.5)
Let B = {1 + t2, t − 3t2, 1 + t − 3t2}. Note that any question/property that we can ask about these polynomials in P2 translates into the same question/property about their corresponding coordinate vectors in R3.
(1) Use coordinate vectors to show that B is basis for P2.
(2) Find q(t) in P2 such that [q(t)]B =
−11
2
.
Determine whether each of the following statements is True or False. Briefly justify your answer.
(a) If B is the standard basis for R3 then the coordinate vector is itself, that is [x]B = x for all x in R3.
(b) If there exists a set of 3 vectors that spans a vector space V then dim V = 3.
(c) If there exists a linearly independent set of 3 vectors in V then dim V ≥ 3.
(d) If dim V = 3 then every set of 2 nonzero vectors in V is linearly independent.
(e) If dim V = 3 then any set of 4 vectors spans V .