Grade 11 → Functions and Graphs → Transformations of Functions ↓
Rotations
When studying transformations in mathematics, an important concept to understand is “rotation”. This involves rotating a graph around a fixed point. It is important to understand how rotation affects functions and their graphs. Let us discuss this topic in detail.
Basic concept of rotation
A rotation in geometry is a transformation that rotates a figure around a fixed point called the center of rotation. In terms of functions and graphs, you rotate the entire graph around a specific point.
Center of rotation
The center of rotation is usually a point on the coordinate plane, such as the origin (0, 0). It can also be any other point. When rotating a shape, each point in the shape rotates by a specified angle around the center.
Rotation angle
The rotation angle is the degree of rotation around a fixed point. It is usually measured in degrees or radians. A positive angle usually indicates counterclockwise rotation, while a negative angle indicates clockwise rotation.
Rules of rotation
When you rotate a graph 90 degrees, 180 degrees, or 270 degrees around the origin, you follow specific rules. Let's look at these rules with equations.
- 90-degree rotation: If you rotate a point ( (x, y) ) 90 degrees counterclockwise around the origin, it transforms into ( (-y, x) ).
- 180-degree rotation: For a point ( (x, y) ), a 180-degree rotation gives you ( (-x, -y) ).
- 270 degree rotation: 270 degree counterclockwise rotation results in ( (y, -x) ).
Visualization of rotation with examples
Let's see how we can apply these rules using a simple function graph. Consider a point on the graph ((3, 2)).
Example 1: 90 degree rotation
Origin: (3, 2) After 90 degree rotation: (-2, 3)Figure 1: 90 degree rotation of the point (3, 2).
In this figure, the point (3, 2) is represented by the red circle. Its position after a 90-degree rotation is the blue circle at (-2, 3).
Example 2: 180 degree rotation
Origin: (3, 2) After 180 degree rotation: (-3, -2)Figure 2: 180 degree rotation of the point (3, 2).
Here, the origin (3, 2) has been rotated to (-3, -2).
Example 3: 270 degree rotation
Origin: (3, 2) After rotation of 270°: (2, -3)Figure 3: 270 degree rotation of the point (3, 2).
In this case, our point moves from (3, 2) to (2, -3) after a 270 degree rotation.
Rotation of tasks
The idea is the same as when rotating an entire function, but now you apply the rotation to each point that defines the graph of the function.
Example: Rotating a simple function
Let's consider the linear function f(x) = x, which is a straight line passing through the origin, which makes the rotation more intuitive, since the origin is a common center of rotation.
Rotation up to 90 degrees
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Before rotation: f(x) = x. After a 90 degree rotation, the function is aligned with the Y-axis, which is equivalent to f(y) = -y for the rotated graph.
Rotation up to 180 degrees
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Before rotation: f(x) = x. After a 180 degree rotation, the function is in the opposite direction but maintains its alignment, f(x) = -x.
More advanced rotation
Although the basic examples we have discussed have focused primarily on rotation around the origin, rotations can also occur around various points, which may involve more complex mathematical manipulations.
Rotation around other points
Sometimes, you may need to rotate a function graph about a point that is not the origin. Suppose you want to rotate a function about a point (a, b) by an angle θ. To accomplish this, you must:
- Move the center of rotation to the origin by subtracting
afrom the x-coordinate andbfrom the y-coordinate of each point. - Apply the rotation rules discussed earlier.
- Move the points back by adding
ato the x-coordinate andbto the y-coordinate.
Thus, when proceeding beyond simple origin-centered rotation, the process is essentially about mathematically re-centering the graph before and after applying the rotation formulas.
Walking through mathematical expressions
To formally express rotations in the functional framework, you can write the following formula for a clockwise rotation by an angle θ for any point (x, y):
x' = cos(θ) * (x - a) - sin(θ) * (y - b) + a
y' = sin(θ) * (x - a) + cos(θ) * (y - b) + b
where (x', y') is the point to be rotated. Using these concepts, you can graphically move any curve along or around any arbitrary point by understanding and using the rotation matrix.
Conclusion
Understanding rotation in terms of functions and graphs involves recognizing how a shape is manipulated with respect to a fixed point. This is a visual and analytical process that involves not only graphical transformations, but also precise mathematical calculations for location translation.
Rotation is one of several transformations, including translation, reflection, and scaling, that help us understand and reshape various aspects of functions and graphs, and provide useful tools for exploring mathematical behavior in two- and three-dimensional spaces.
Through practice and exploration of these transformations, students can better visualize mathematical concepts and appreciate the depth and variety of function behavior. By mastering rotations, students enhance their geometric intuition and problem-solving skills, which provides a foundation for more advanced mathematical explorations.
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