Transformations are important subjects in geometry. In this exercise, these are the correct transformation rules:
Consider the point [tex](x,y)[/tex], if you reflect this point across the x-axis you should multiply the y-coordinate by -1, so you get:
[tex]\boxed{(x,y)\rightarrow(x,-y)}[/tex]
Consider the point [tex](x,y)[/tex], if you reflect this point across the y-axis you should multiply the x-coordinate by -1, so you get:
[tex]\boxed{(x,y)\rightarrow(-x,y)}[/tex]
Consider the point [tex](x,y)[/tex]. To rotate this point by 90° around the origin in counterclockwise direction, you can always swap the x- and y-coordinates and then multiply the new x-coordinate by -1. In a mathematical language this is as follows:
[tex]\boxed{(x,y)\rightarrow(-y,x)}[/tex]
Consider the point [tex](x,y)[/tex]. To rotate this point by 180° around the origin, you can flip the sign of both the x- and y-coordinates. In a mathematical language this is as follows:
[tex]\boxed{(x,y)\rightarrow(-x,-y)}[/tex]
Rotate a point 270° counter-clockwise about origin is the same as rotating the point 90° in clock-wise direction. So the rule is:
[tex]\boxed{(x,y)\rightarrow(y,-x)}[/tex]
Answer:Transformations are important subjects in geometry. In this exercise, these are the correct transformation rules:
Step-by-step explanation:
