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In mathematics, the image of a linear transformation is its range: all possible values generated by the transformation. A matrix A, which is an expression of a function, has an image denoted by im(A).

If the rows (or columns, equivalently) of a matrix A are linearly independent, then the image of that transformation is the entire space it is applied to.

Examples[edit]

Example 1[edit]

Consider all the points (vectors) in the plane, i.e., (x,y) acting under the transformation

$\text{[math]}$ .

We can be sure that the image of this transformation is the entire plane, because for any point

$\text{[math]}$

in the plane, there is another vector in the plane

$\text{[math]}$

such that

$\text{[math]}$ .

Example 2[edit]

We continue to work in the plane, but now we examine the matrix

$\text{[math]}$ .

Now if we examine how this matrix acts on an arbitrary point (a,b), we find that point is carried to

$\text{[math]}$ ,

in other words, all points in the plane are carried to the line $\text{[math]}$ .

We write

$\text{[math]}$ .

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Image (mathematics)

Examples[edit]

Example 1[edit]

Example 2[edit]