Consider V= span{cos(x),sin(x)} a subspace of the vector space of continuous functions and a linear transformation T:Vrightarrow V where T(f) =f(0)timescos(x)−f(π2)timessin(x).

York

York

Answered question

2020-11-30

Consider V=cos(x),sin(x) a subspace of the vector space of continuous functions and a linear transformation T:VV where T(f)=f(0)×cos(x)f(π2)×sin(x).

Find the matrix of T with respect to the basis cos(x)+sin(x),cos(x)sin(x) and determine if T is an isomorphism.

Answer & Explanation

Aamina Herring

Aamina Herring

Skilled2020-12-01Added 85 answers

The linear transformationT(f)=f(0)cosxf(π)sinx.
B=cosx+sinx,cosxsinx.
When f(x)=cosx+sinxf(x)=cosx+sinx,

T(cosx+sinx)=cosx+cosx=2cosx=(cosx+sinx)+(cosxsinx).
When f(x)=cosxsinxf(x)=cosxsinx,
T(cosxsinx)=cosx+cosx=2cosx=(cosx+sinx)+(cosxsinx).
The matrix representation of T [T]b=[1,1,1,1]
Since det([T]B))=0, thus T is not an isomorphism.

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