Instructions: For the function given, determine the direction and amount of vertical shift from the function y=(2)x𝑦=(2)𝑥.y=6(2)x−3−5
Question
Instructions: For the function given, determine the direction and amount of vertical shift from the function y=(2)x𝑦=(2)𝑥.y=6(2)x−3−5
Solution
The given function is y=6(2)x−3−5.
To determine the vertical shift, we need to look at the constant term in the function. In this case, it is -5.
A negative constant term indicates a downward shift, while a positive constant term indicates an upward shift.
Therefore, the function y=6(2)x−3−5 has a vertical shift of 5 units downwards from the function y=(2)x.
Similar Questions
Instructions: For the function given, determine the direction and amount of vertical shift from the function y=(2)x𝑦=(2)𝑥.y=6(2)x+1−3𝑦=6(2)𝑥+1−3Vertical shift Answer 1 Question 3 Answer 2 Question 3 units.
Instructions: For the function given, determine the direction and amount of horizontal shift from the original function y=(3)x𝑦=(3)𝑥.y=3x−5−3
Instructions: For the function given, determine the direction and amount of vertical shift from the function y=(2)x𝑦=(2)𝑥.y=4(2)x−1−5𝑦=4(2)𝑥−1−5Vertical shift Answer 1 Question 5 Answer 2 Question 5 units.CheckQuestion 5
Instructions: For the function given, determine the direction and amount of horizontal shift from the original function y=(3)x𝑦=(3)𝑥.y=3x−2+3𝑦=3𝑥−2+3Horizontal shift Answer 1 Question 4 Answer 2 Question 4 unit(s).
Instructions: For the given function, state the type of shift you would expect to see in its graph and the direction and number of units.y=(x−1)2𝑦=(𝑥−1)2The graph of this function would show a Answer 1 Question 10 shift Answer 2 Question 10 Answer 3 Question 10 units from the parent function y=x2𝑦=𝑥2.
Upgrade your grade with Knowee
Get personalized homework help. Review tough concepts in more detail, or go deeper into your topic by exploring other relevant questions.