To determine the correct transformation indicated by "TRpracmath1," we need to analyze what this notation typically implies in terms of function transformations.
- If the function is transformed as \( f(x) \to f(x - 3) \), this indicates a horizontal shift 3 units to the right.
- If the function is transformed as \( f(x) \to f(x + 3) \), this indicates a horizontal shift 3 units to the left.
- If the function is transformed as \( f(x) \to f(x) - 3 \), it indicates a vertical shift 3 units down.
- If the function is transformed as \( f(x) \to f(x) + 3 \), it indicates a vertical shift 3 units up.
Based on standard transformations:
- If TRpracmath1 shows an addition or subtraction of 3 inside the function's argument, it determines the horizontal shift.
- If TRpracmath1 shows an addition or subtraction of 3 outside of the function, it indicates a vertical shift.
Since the provided options only refer to a horizontal left/right shift or a vertical up/down shift, you must identify what "TRpracmath1" specifically represents. Without that specific transformation context, I cannot definitively tell which statement is correct.
However, you should be able to analyze the transformation notation provided (if available) to determine if it's shifting left, right, down, or up based on how the 3 is applied to the function. Please provide further details if you can.
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