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## What is the importance of sequence of transformation?

In a composite transformation, the order of individual transformations is important. For example, if you first **rotate**, then scale, then translate, you get a different result than if you first translate, then rotate, then scale. In GDI+, composite transformations are built from left to right.

## What is the rule for the transformation?

The function translation / transformation rules: **f (x) + b shifts the function b units upward.** **f (x) – b shifts the function b units downward**. f (x + b) shifts the function b units to the left.

## Does the order of rotation and translation matter?

In a composite transformation, **the order of the individual transformations is important**. For example, if you first rotate, then scale, then translate, you get a different result than if you first translate, then rotate, then scale.

## What are sequences of transformations?

A sequence of transformations is **a set of translations, rotations, reflections, and dilations on a figure**. The transformations are performed in a given order. … Next, B is reflected across line to make C. transformation. A transformation is a translation, rotation, reflection, or dilation, or a combination of these.

## Does order matter in rigid transformations?

With a rigid transformation, figures like polygons have corresponding sides of the same length and corresponding angles of the same measure. … There are many ways to show that 2 figures are congruent since many sequences of transformations take a figure to the same image. However, **order matters in a set of instructions**.

## Which sequence of transformations will result in similar but not congruent figures?

The correct answer is: **dilation and rotation**.

## What are all the sequences of transformations that always maintain congruence?

What combination of transformations will always maintain congruence? Answer Expert Verified **A reflection followed by translation, a translation followed by rotation, and a rotation followed by reflection** all preserve congruence.

## How can the transformation be amended such that the translation can occur before the reflection and have the image remain in the same position?

How can the transformation be amended such that the translation can occur before the reflection and have the image remain in the same position? **Translate the pre-image down 4 and right 3 and then reflect the figure over the x-axis.**

## What are the rules for translations rotations and reflections?

Reflection is flipping an object across a line without changing its size or shape. Rotation is rotating an object about a fixed point without changing its size or shape. **Translation is sliding a** figure in any direction without changing its size, shape or orientation.

## Is a rule which transforms a function into same or different functions?

A **function transformation** takes whatever is the basic function f (x) and then “transforms” it (or “translates” it), which is a fancy way of saying that you change the formula a bit and thereby move the graph around. … Moving the function down works the same way; f (x) – b is f (x) moved down b units.