f’ is negative
When it is stated that f’ (pronounced as “f prime”) is negative, it means the derivative of the function f(x) is negative
When it is stated that f’ (pronounced as “f prime”) is negative, it means the derivative of the function f(x) is negative. In other words, the slope of the tangent line to the graph of the function f(x) is negative at every point. Here are a few points to help understand why this is significant:
1. Increasing vs. decreasing: When the derivative of a function is negative, it indicates that the function is “decreasing” over its domain. This means that as you move along the x-axis from left to right, the corresponding y-values of the function are getting smaller.
2. Turning points: Negative derivatives are often associated with turning points on the graph of a function. A turning point occurs where the derivative changes from negative to positive (indicating increasing) or positive to negative (indicating decreasing). At these points, the slope of the tangent line changes sign, meaning the graph changes from sloping downward to sloping upward, or vice versa.
3. Concavity: The second derivative of a function can provide information about the concavity of the graph. If the second derivative is negative, it indicates that the graph is concave downward, meaning it is curving downwards like a frown. This is often seen when the first derivative is negative for an extended interval.
4. Rate of change: The derivative of a function represents the rate of change of the function with respect to x. When the derivative is negative, it means the function is decreasing at a certain rate. The magnitude of the negative derivative (i.e., how large the negative value is) can indicate the steepness of the decrease.
Understanding that f’ is negative helps us to analyze the behavior of the function, identify intervals of decreasing values, locate turning points on the graph, determine concavity, and assess the rate of change.
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