What are the bases for U and W in R^4?

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SUMMARY

The discussion focuses on finding bases for the subspaces U and W in R^4. The subspace U is defined by the equations a + 2b + 3c = 0 and a + b + c + d = 0, while W is defined by a + d = 0 and b + c = 0. To determine the bases, participants recommend constructing the corresponding matrix for these equations and reducing it to row-echelon form. The columns containing pivots in the reduced matrix correspond to the original columns that form the basis for each subspace.

PREREQUISITES
  • Understanding of linear algebra concepts, specifically subspaces in R^n.
  • Familiarity with matrix representation of linear equations.
  • Knowledge of row-echelon form and pivot columns.
  • Ability to perform Gaussian elimination.
NEXT STEPS
  • Study the process of finding the row-echelon form of a matrix.
  • Learn about pivot columns and their significance in linear algebra.
  • Explore the concept of bases and dimension in vector spaces.
  • Practice solving systems of linear equations using Gaussian elimination.
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Students of linear algebra, educators teaching vector spaces, and anyone involved in mathematical modeling or computational mathematics.

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let V = R^{4}. Consider the following subspaces:

U = { (a,b,c,d) in R^{4} : a + 2b + 3c = 0, a + b + c + d = 0 }
W = { (a,b,c,d) in R^{4} : a + d = 0, b + c = 0 }

find a basis for U and a basis for W.

i don't even know where to begin. Any help would be very much appreciated. Thanks.
 
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abcdefg said:
let V = R^{4}. Consider the following subspaces:

U = { (a,b,c,d) in R^{4} : a + 2b + 3c = 0, a + b + c + d = 0 }
W = { (a,b,c,d) in R^{4} : a + d = 0, b + c = 0 }

find a basis for U and a basis for W.

i don't even know where to begin. Any help would be very much appreciated. Thanks.

Look at the cooresponding matrix and reduce it to row-echelon form. The columns with pivots in them will be the same columns you use for your basis (remember, the same column... but from the ORIGINAL matrix).
 

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