1) Calculate the transformation matrix 2) Calculate the dimension of the

Seamus Kent

Seamus Kent

Answered question

2022-01-31

1) Calculate the transformation matrix
2) Calculate the dimension of the kernel of the transformation, justify.
T:R3ā†’R3 is a linear transformation such that:
T(eā†’1)=eā†’1āˆ’eā†’2+2eā†’3
T(eā†’1+eā†’2)=2eā†’3
T(eā†’1+eā†’2+eā†’3)=āˆ’eā†’2+eā†’3

Answer & Explanation

Micheal Hensley

Micheal Hensley

Beginner2022-02-01Added 10 answers

Step 1
For the first question, you almost solve it the only thing remaining its
kumewekwah0

kumewekwah0

Beginner2022-02-02Added 14 answers

Step 1
Here is an answer to a part of your question:
"Is there any reason why this uses eā†’ instead of x? If so, what does eā†’ mean exactly?"
T is a map which has its domain vectors in BR3, not real numbers. Usually x, y, z are used for unknown or variable real numbers.
eā†’1,eā†’2,eā†’3,, are the standard basis vectors in BR3 and are defined as:
eā†’1=[100],eā†’2=[010],eā†’3=[001],

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