Point of Inflection of a Function
Point of Inflection of a Function
Point of Inflection of a Function What is point of inflection of a function? Point of inflection of a function is defined as the point where the function changes the concavity, concave up corresponds to a positive second derivative and concave downward corresponds to a negative second derivative therefore at this point when the function changes from concave up to concave downward then the second derivative must be equal to zero at that point, so that it can be an inflection point.
Point of Inflection of a Function
Point of Inflection of a Function What is point of inflection of a function? Point of inflection of a function is defined as the point where the function changes the concavity, concave up corresponds to a positive second derivative and concave downward corresponds to a negative second derivative therefore at this point when the function changes from concave up to concave downward then the second derivative must be equal to zero at that point, so that it can be an inflection point.