Instructions: For the function given, determine the direction and amount of horizontal shift from the original function y=(3)x𝑦=(3)𝑥.y=3x+3−2𝑦=3𝑥+3−2Horizontal shift Answer 1 Question 7 Answer 2 Question 7 unit(s).
Question
Instructions: For the function given, determine the direction and amount of horizontal shift from the original function y=(3)x𝑦=(3)𝑥.y=3x+3−2𝑦=3𝑥+3−2Horizontal shift Answer 1 Question 7 Answer 2 Question 7 unit(s).
Solution
The function given is y = 3x + 3 - 2. To determine the horizontal shift, we need to look at the 'x' term in the equation.
In the standard form of a linear equation y = mx + b, there is no horizontal shift. However, if the equation is in the form y = m(x - h) + k, then 'h' represents the horizontal shift.
In the given equation, there is no 'h' value, which means there is no horizontal shift. Therefore, the direction and amount of horizontal shift from the original function y = 3x is zero.
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