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Can points of inflection and extrema be at the same point? - Answers
Yes, points of inflection and extrema can occur at the same point on a function. A point of inflection is where the concavity of the function changes, while an extremum is a point where the function reaches a local maximum or minimum. In certain cases, such as the function (y = x^4) at (x = 0), the point can be both an inflection point and a local extremum, as the concavity changes while still being a minimum. However, this is not common and often requires specific conditions.
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Can points of inflection and extrema be at the same point? - Answers
Yes, points of inflection and extrema can occur at the same point on a function. A point of inflection is where the concavity of the function changes, while an extremum is a point where the function reaches a local maximum or minimum. In certain cases, such as the function (y = x^4) at (x = 0), the point can be both an inflection point and a local extremum, as the concavity changes while still being a minimum. However, this is not common and often requires specific conditions.
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Can points of inflection and extrema be at the same point? - Answers
Yes, points of inflection and extrema can occur at the same point on a function. A point of inflection is where the concavity of the function changes, while an extremum is a point where the function reaches a local maximum or minimum. In certain cases, such as the function (y = x^4) at (x = 0), the point can be both an inflection point and a local extremum, as the concavity changes while still being a minimum. However, this is not common and often requires specific conditions.
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