f(x) map onto itself means f(x) = x
the image is the same as the object
intersecting line
Any function or object that has symmetry about the y-axis can be mapped onto itself by a horizontal translation. This means that if the function or object is shifted horizontally by any distance, it will still look the same.
The excretory system is actually not a system onto itself, but is a shared function by several other systems, such as the urinary system, the integumentary system, the respiratory system, and the gastrointestinal system. It also does not have a cortex.
The body repairs itself while a person sleeps.
it is adapted to its function because it is thin enough to let the pointy headed sperm inside itself and with that it reproduces to create children
remove the toxins and wastes from the body that can interfere with normal body function
A function that maps an input onto itself is called an identity function. In other words, the output of the function is the same as the input. The identity function is represented by the equation f(x) = x.
Itself
Rotate 360 degrees
Any function or object that has symmetry about the y-axis can be mapped onto itself by a horizontal translation. This means that if the function or object is shifted horizontally by any distance, it will still look the same.
Linear transformation is a function between vector spaces that will always map a parallelogram onto itself. Some examples are rectangles and regular polygons.
For translation, the only transformation (not transfermation), is the null translation (0,0).
Any shape with a rotational symmetry of order 2 or more.
Once you disable Google maps, you will lose the maps function
i just got minecraft on ps3 and I am wondering how to get maps
reflect across the x-axis and then reflect again over the x-axis
A rotation of 360 degrees will map a parallelogram back onto itself.
This depends on how you define your domain and codomain. f(n)=n/3 is one to one and onto when f is from R to R, but if we define f: X --> Y, where X = [0,3] and Y = [0,3], then f maps [0,3] to [0,1], so f is not onto in this case.