14-240/Tutorial-November4: Difference between revisions

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====Question 26 on Page 57 in Homework 5====
====Question 26 on Page 57 in Homework 5====


Let <math>a \in R</math> and <math>W = {f \in P_n(R): f(a) = 0}</math> be a subspace of <math>P_n(R)</math>. Find <math>dim(W)</math>.
Let <math>a \in R</math> and <math>W = \{f \in P_n(R): f(a) = 0\}</math> be a subspace of <math>P_n(R)</math>. Find <math>dim(W)</math>.



There are several approaches to this problem.
There are several approaches to this problem.

Revision as of 10:56, 29 November 2014

Boris

Question 26 on Page 57 in Homework 5

Let and be a subspace of . Find .


There are several approaches to this problem.

Approach 1: Use Isomorphisms

Approach 2: Use the Rank-Nullity Theorem

Approach 3: Find a Basis by Decomposing the Polynomial

Approach 4: Find a Basis of without Decomposing the Polynomial