Q. 25

Question

For the graph of f in the given figure, approximate all the values x ∈ (0, 4) for which the derivative of f is zero or does not exist. Indicate whether f has a local maximum, minimum, or neither at each of these critical points.

Step-by-Step Solution

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Answer

The f has local maximum at point $(3 \cdot 5, 4)$ and local minimum at point $(0 \cdot 5, 2)$ .

1Step 1. Given information .

Consider the given graph .

2Step 2. Classifying the local maximum and minimum value .

To classify the maximum and minimum value in the graph of a function if the graph is smooth and unbroken, then somewhere between each root of f the function must turn around, and at that turning point it must have a local extremum with a horizontal tangent line .

In the given graph the turning point is at point $(3 \cdot 5, 4)$ that is local maximum point and point $(0 \cdot 5, 2)$ is the local minimum point .

Q. 24

Q. 26

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Q. 23

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Q. 24

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Q. 26

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Q. 27

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