Assume that T is a linear transformation. Find the standard

Michael Maggard

Michael Maggard

Answered question

2021-12-08

Assume that T is a linear transformation. Find the standard matrix of T. T:R2R2 rotates points (about the origin) through - π4 radians (clockwiese).[H:T(e1)=(12,12).]

Answer & Explanation

chumants6g

chumants6g

Beginner2021-12-09Added 33 answers

Given: points are rotated about the origin through π4 radians. General rotation matrix for rotation about the origin through θ rafians: T=[cosθsinθsinθcosθ] Replace θbykπ{4} and evaluate: T=[cos=π4sinπ4sinπ4cosπ4]=[12121212] The finally answer is [12121212]
servidopolisxv

servidopolisxv

Beginner2021-12-10Added 27 answers

Given:
Linear Trannsformation T:R2R2
Fuction of T
Rotates points (about the origin) through π2 radians(counterclockwise).
Goal: Determine the standard matrix of T
Concepts: Standard Matrix
Matrix A is the standard matrix.
A=[T(e1)T(en)]
Rotation Transformation
A rotation transformation is a map of a coordinate space in which an object is rotated about a fixed point either cllockwise or counterclockwise.
Rotate e1byπ2radianscounterclockwiseabouttheorigfdT(e1)
Rotate e2byπ2radianscounterclockwiseabouttheorigfdT(e2)
Express the resultant standard matrix.
Solve T(e1)=T([10])
=[10]
=e2
T(e2)=T([10])
=[10]
=e2
A=[0110]
Conclusion
The standard matrix of A is [0110]

Do you have a similar question?

Recalculate according to your conditions!

New Questions in Linear algebra

Ask your question.
Get an expert answer.

Let our experts help you. Answer in as fast as 15 minutes.

Didn't find what you were looking for?