Consider the application f(x,y):R^2 rightarrow R^2:(x,y) rightarrow (2x+y ,x+3y), then what is the image of the square of summits (pm 1, pm 1)? And the image of the circle x^2+y^2=1?

mxty42ued

mxty42ued

Answered question

2022-11-19

Image of geometrical figures by linear application
When the application is a rotation, symetry, projection, it is easy to find without any calculus the image of figures such as squares, circles, and so on. But how do you find these images when the application is not 'geometrically obvious'?
For example consider the application f ( x , y ) : R 2 R 2 : ( x , y ) ( 2 x + y , x + 3 y ), then what is the image of the square of summits ( ± 1 , ± 1 )? And the image of the circle x 2 + y 2 = 1?

Answer & Explanation

Antwan Wiley

Antwan Wiley

Beginner2022-11-20Added 13 answers

Step 1
For the square: a linear map takes parallel lines to parallel lines, so the image of a square is a parallelogram. You can easily find the coordinates of its vertices.
For the unit circle: the circle can be written as x T x = 1   ,, where x = ( x y )   ..
Step 2
Its image will be ( A x ) T ( A x ) = 1   ,, where A = ( 2 1 1 3 )   .
If my calculations are correct (please check) this simplifies to x T ( 5 5 5 10 ) x = 1   ,, and the matrix has positive eigenvalues so this is an ellipse.

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