When f ‘(x) changes from positive to negative, f(x) has a
relative maximum
local maximum at x.
Explanation:
The derivative of a function f(x) represents the rate of change of the function f(x) with respect to x. If the value of the derivative f ‘(x) is positive at x, then the function f(x) is increasing at x, i.e., the slope of the tangent at x is positive. Similarly, if f ‘(x) is negative at x, then the function f(x) is decreasing at x, i.e., the slope of the tangent at x is negative.
Now, if f ‘(x) changes from positive to negative at x, it means that the function f(x) is changing from increasing to decreasing at x. This implies that the slope of the tangent at x changes from positive to negative, which means that the tangent line changes from an uphill slope to a downhill slope at x. At the point where the slope of the tangent changes sign, the function f(x) has either a local maximum or a local minimum, depending on whether the change is from positive to negative or negative to positive, respectively.
In this case, since the derivative f ‘(x) changes from positive to negative, it implies that the function f(x) changes from increasing to decreasing, and therefore, f(x) has a local maximum at x. This is because the maximum point represents a point where the function changes from increasing to decreasing, and at this point, the tangent slope changes from positive to negative.
More Answers:
The Relationship Between Parallelogram And Rhombus – Diagonals, Angles, And CongruenceThe Difference Between Rhombus And Parallelogram: Diagonal Properties Explained
Increasing F'(X) And Its Implications On Rate Of Change And Function Curvature