It depends on the kind of transformation: it could be reflection or translation.
(x,y) --> (x,-y)
Should be (x,y) -> (-x,y) Apologies if it's wrong!
A single transformation does not provide enough information to determine a rule.
a function rule
It is the description of a rule which describes how the terms of a sequence are defined in terms of their position in the sequence.
(x,y) --> (x,-y)
Should be (x,y) -> (-x,y) Apologies if it's wrong!
Since the x coordinate will change, but not the y coordinate, take (x,y) and reflect across the y axis and you have (-x,y)
To reflect a point across the line ( y = x ), you swap the coordinates of the point. For example, if you have a point ( (a, b) ), its reflection across the line ( y = x ) will be ( (b, a) ). This transformation applies to all points in the Cartesian plane.
You have to add on the number that you want to transform the graph by. For example to move the graph 2 units along the x-axis the transformation would be f(x+2).
The transformation rule states that a transformation is an operation that moves, flips, or changes the size or shape of a figure to create a new figure that is congruent to the original. This rule is used in geometry to describe how geometric figures can be altered while maintaining their essential properties.
There is no such thing as "line rule" in HTML. There is, however, a horizontal rule, or <hr>, which will draw a horizontal line across the containing block, like this...
The rule for the transformation above is translation. Translation is a transformation that moves every point of a figure the same distance in the same direction.
To reflect a point across the origin, you simply change the sign of both the x- and y-coordinates of the point. This transformation involves multiplying the coordinates by -1.
To write a rule for transformation, first identify the type of transformation you want to apply, such as translation, rotation, reflection, or dilation. Then, define the mathematical operation that corresponds to your transformation—for example, for a translation by a vector ( (a, b) ), the rule would be ( (x, y) \rightarrow (x + a, y + b) ). Finally, clearly state the initial coordinates and the resulting coordinates to complete the transformation rule.
I'm happy to help, but it seems like your question was cut off. Can you please provide more details or clarify what rule or transformation you are referring to?
A single transformation does not provide enough information to determine a rule.