Questions: There is a horizontal shift square unit(s) -Select- square. There is a vertical shift square unit(s) square. Select all that apply. horizontal shrink vertical shrink vertical stretch reflection in the x-axis reflection in the y-axis

There is a horizontal shift square unit(s) -Select- square.

There is a vertical shift square unit(s) square.

Select all that apply. horizontal shrink vertical shrink vertical stretch reflection in the x-axis reflection in the y-axis

Transcript text: There is a horizontal shift $\square$ unit(s) -Select- $\square$ . There is a vertical shift $\square$ unit(s) $\square$ . Select all that apply. horizontal shrink vertical shrink vertical stretch reflection in the $x$-axis reflection in the $y$-axis

Solution

Solution Steps

Solution Approach

To solve this problem, we need to identify the horizontal and vertical shifts, and then determine the transformations applied to the function. We will use Python to parse the input and identify the transformations.

Step 1: Identify Horizontal and Vertical Shifts

From the output, we have:

Horizontal shift: $3$ units
Vertical shift: $2$ units

Step 2: Identify Transformations

The transformations applied to the function are:

Horizontal shrink
Vertical stretch
Reflection in the $x$-axis

Final Answer

Based on the given transformations and shifts, the function undergoes the following changes:

A horizontal shift of $3$ units.
A vertical shift of $2$ units.
A horizontal shrink.
A vertical stretch.
A reflection in the $x$-axis.

\[ \boxed{ \begin{array}{l} \text{Horizontal shift: } 3 \text{ units} \\ \text{Vertical shift: } 2 \text{ units} \\ \text{Horizontal shrink: True} \\ \text{Vertical shrink: False} \\ \text{Vertical stretch: True} \\ \text{Reflection in the } x\text{-axis: True} \\ \text{Reflection in the } y\text{-axis: False} \end{array} } \]

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