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How does the graph of g(x)=⌊xβŒ‹βˆ’3 differ from the graph of f(x)=⌊xβŒ‹? The graph of g(x)=⌊xβŒ‹βˆ’3 is the graph of f(x)=⌊xβŒ‹ shifted right 3 units. The graph of g(x)=⌊xβŒ‹βˆ’3 is the graph of f(x)=⌊xβŒ‹ shifted up 3 units. The graph of g(x)=⌊xβŒ‹βˆ’3 is the graph of f(x)=⌊xβŒ‹ shifted down 3 units. The graph of g(x)=⌊xβŒ‹βˆ’3 is the graph of f(x)=⌊xβŒ‹ shifted left 3 units.

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Answer:

The graph of g(x)=⌊xβŒ‹βˆ’3 is the graph of f(x)=⌊xβŒ‹ shifted down 3 units.

Step-by-step explanation:

g(x) = ⌊xβŒ‹βˆ’3 = f(x) -3

When we add or subtract from the function, this is a shift up or down

Since we are subtracting this is a shift down of 3

Answer:

The graph of g(x)=⌊xβŒ‹βˆ’3 is the graph of f(x)=⌊xβŒ‹ shifted down 3 units

Step-by-step explanation:

f(x)=⌊xβŒ‹ is the parent function

g(x)=⌊xβŒ‹ - 3 = f(x) - 3, that is, the parent function subtracted by 3

This subtraction shifted down (3 units in this case) the parent function.

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