fzero said:f'(x) = 0 is the condition that the tangent be horizontal. The solutions are values of x. To find the (x,y) values of the points you must compute y=f(x), not f'(x).
A horizontal tangent problem is a mathematical concept that involves finding the point at which a function's slope (or derivative) is equal to zero. This results in a horizontal line on the graph of the function and can be used to determine maximum or minimum values of the function.
To solve a horizontal tangent problem, you must first find the derivative of the function. Then, set the derivative equal to zero and solve for the variable. The resulting value will be the x-coordinate of the point where the function has a horizontal tangent.
A horizontal tangent indicates that the slope of the function at that point is equal to zero. This means the function is neither increasing nor decreasing at that point, and can be used to find maximum or minimum values of the function.
Yes, a function can have more than one horizontal tangent. This typically occurs when the function has multiple local maximum or minimum points. In these cases, the derivative will be equal to zero at each of the points where the function has a horizontal tangent.
Horizontal tangent problems are commonly used in physics and engineering to analyze the behavior of objects in motion. For example, finding the maximum height of a projectile or the minimum amount of time it takes for a car to come to a stop. They are also used in economics and finance to determine optimal values and points of equilibrium.