If T :mathbb{R}^2 rightarrow mathbb{R}^2 is a linear transformation such that Tleft(begin{bmatrix}3 6 end{bmatrix}right)=begin{bmatrix}39 33 end{bmatrix} text{ and } Tleft(begin{bmatrix}6 -5 end{bmatrix}right)=begin{bmatrix}27 -53 end{bmatrix} then the standard matrix of T is A

Jaya Legge

Jaya Legge

Answered question

2021-02-25

If T :R2R2 is a linear transformation such that
T([36])=[3933] and T([65])=[2753]
then the standard matrix of T is A

Answer & Explanation

Malena

Malena

Skilled2021-02-26Added 83 answers

Step 1
Given:
T([36])=[3933] and T([65])=[2753]
The standard matrix of T will be the product of two matrices.
Step 2
T=(339633)(627553)
=(18195812067361651621749)
=(17719861291587)
Therefore the standard matrix of T is T=(17719861291587)
Jeffrey Jordon

Jeffrey Jordon

Expert2022-01-27Added 2605 answers

Answer is given below (on video)

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