We are given function f(x) = x^4 - x^2.
We need to find the equation of function g(x) according to shown graph.
We can apply rules of transformation to get the function g(x) by using given graph.
Function g(x) graph is being shift a half or 0.5 units up of the graph f(x).
When graph shift k units up, we add k to given function.
Where k is some constant.
In the graph f(x) is being shifted 0.5 units up.
So, we would add 0.5 in f(x) = x^4 - x^2 function.
On adding 0.5 we get
g(x) = f(x)+0.5 = = x^4 - x^2 +0.5.
To find the equation of g(x), we need to consider the changes that have been made to the graph. This can include vertical or horizontal stretches or compressions, as well as shifts in different directions. By analyzing the given graph and comparing it to the possible changes, we can determine the equation of g(x).
The graph of g(x) resembles the graph of f(x) = x^4 - x^2 but it has been changed. In order to find the equation of g(x), we can consider the changes that have been made to the graph. One possibility is that the graph has been stretched or compressed vertically or horizontally. Another possibility is that the graph has been shifted up, down, left, or right. By examining these possibilities and comparing them to the given graph, we can determine the equation of g(x).
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