Download Interval Notation Graph Increasing Decreasing
Pics. The graph was a simple quadratic $x^2$. The teacher stated that the because for $f(x)$ to be decreasing $f'(x)<0$ and for increasing $f'(x)>0$ but at $x=0$, $f'(x)=0$ hence it's neither decreasing nor increasing at $x=0$.
Solved Use The Graph Of F To Determine Each Of Th from cdn.numerade.com
Use the parentheses write the lower value in the left where it starts to. Remember that this is a graph of f ' (the 'slope' of f) and not of f itself. The behavior of the graph of f(x) as x approaches positive infinity or negative infinity.
We use interval notation to represent subsets of real numbers.
Suppose that a and b are real numbers such that a < b. This is the currently selected item. At turning points, it is neither increasing nor decreasing. (enter your answer using interval notation.) (b) at what value(s) of x does f have a local maximum?
