The image shows a graph of the absolute value function, f(x)=∣x∣, with a shift of two units to the right and five units up. This can be represented by the function g(x)=∣x−2∣+5.
The graph of the absolute value function, f(x)=∣x∣, is a V-shaped graph that is symmetrical about the y-axis. The vertex of the graph is at the origin, and the graph has two branches, one that extends to the left and one that extends to the right.
The graph of the function g(x)=∣x−2∣+5 is a transformation of the graph of f(x)=∣x∣. The graph of g(x) is shifted two units to the right and five units up. This means that the vertex of the graph of g(x) is at the point (2,5).
To see how the graph of g(x) is related to the graph of f(x), we can consider the following:
If x<2, then ∣x−2∣=−(x−2), so g(x)=−(x−2)+5=−x+7. This means that the graph of g(x) is reflected across the line x=2.
If x≥2, then ∣x−2∣=x−2, so g(x)=x−2+5=x+3. This means that the graph of g(x) is shifted two units to the right.
The following graph shows the graphs of f(x)=∣x∣ and g(x)=∣x−2∣+5:
Image of graphs of f(x) = x and g(x) = x2 + 5 is attached wsith the answer.
The graph of the function g(x)=∣x−2∣+5 is a transformation of the graph of the absolute value function, f(x)=∣x∣. The graph of g(x) is shifted two units to the right and five units up.