I just need help with the question highlighted in red.

Editing Voice For full credit on this portfolio, please fill in parts 1, 2 and 3. Make sure that the following are included in your response: Example What type of transformation would this be? What would the new equation Transformations be? The original equation is 1) All tables are complete, and mathematical calculations are accurate. Examples 2) The answers to each question are filled in completely. Vertical shift - up or down f (x) = X3 Horizontal shift - right or left . Vertical compression or stretch To help you complete part 1 of the portfolio and better understand transformations and how they change the graph Horizontal compression or stretch go through the following transformation examples in Desmos. Reflection - x axis or y axis . Vertical Shift f(x) =x2, f(x) -2 and f(x) + 4 (Click for -> Example) Grow twice as tall |Vertical - stretch by a factor of 2 f(x) = 2x3 Horizontal Shift f(x) = Vx, f(x-3), f(x+2), f(x+5), f(x-1) (Click for -> Example) . Reflection of x-axis h(x) = (x - 2) + 1 and -h(x) (Click for -> Example) Jump straight up 5 Vertical Shift - Upward 2 Units f(x) = x13+2 Reflection of y-axis g(x) -/x 2/ +1 and g(-x) (Click for -> Example) units. Horizontal Stretch/Compression f(x) 2x) and f(2x) (Click for -> Example) Vertical Stretch/Compression h(x) -x 2, 2h(x) and 3 (Click for Example) Move to the right 3|Horizontal Shift - Right 3 Units f(x) =(x+3)43 When you open up the Example links units. n Desmos, you can click on the "curvy" avatar to remove that particular graph. Flip his arms Reflection - Over X or Y axis f(x)=-x43 (move his right 2h(x) arm up and his left arm down). N , - 2 (x2 -2) ~ }( 12 - 2) Step 3: Answer the question, including an explanation with your answer. No credit is given for just answering Spread his arms yes or no. three times as wide. f (x) *that would take the Focus 1076 words English (United States) Text Predictions: On Accessibility: Investigate 6