4. Let B = {V1, V2, Vn} be a basis of a vector space, V. ... a) Prove just ONE of the following: • If S = Um} spans V then m > n. Um} is linearly independent then m < n. {u1, u2, ..., • If S = {u1, u2, b) Use (a) to show that the definition of dimension of V is well defined: That is, if B1 = {v1 , v2 , ..., Vn} and B2 = {u1, u2, ..., Um} are bases of V then m = n. %3D %3D
4. Let B = {V1, V2, Vn} be a basis of a vector space, V. ... a) Prove just ONE of the following: • If S = Um} spans V then m > n. Um} is linearly independent then m < n. {u1, u2, ..., • If S = {u1, u2, b) Use (a) to show that the definition of dimension of V is well defined: That is, if B1 = {v1 , v2 , ..., Vn} and B2 = {u1, u2, ..., Um} are bases of V then m = n. %3D %3D
Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
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Transcribed Image Text:4. Let B = {v1, V2 ,
Vn} be a basis of a vector space, V.
...
a) Prove just ONE of the following:
• If S = {u1 , u2 , ……,
• If S = {ui , u2 , ... ,
Um} spans V then m > n.
Um} is linearly independent then m < n.
b) Use (a) to show that the definition of dimension of V is well defined:
That is, if B1 = {v1, v2 , ..,
Vn} and B2 = {u1, u2 , .,
Um} are bases of V then m = n.
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