there are a couple of steps involved with finding local min/max's:lp27 said:Homework Statement
y = 2x^2-14xHomework Equations
The Attempt at a Solution
y' = 4x - 14
4x - 14 = 0
x = 14/4
f(14/4) = 2(14/4)^2 - 14 (14/4) = -49/2
I don't know how to continue from there. ((14/4), (-49/2)) is my critical point?
To find the maximum and minimum values analytically, you need to take the derivative of the function and set it equal to zero. Then, solve for the variable and plug it back into the original function to find the corresponding y-value.
Finding max. and min. values analytically allows for a precise and accurate determination of the extreme points of a function. This information can be useful in optimization problems or in understanding the overall behavior of a function.
Yes, you can find max. and min. values analytically for any function that is differentiable on the given interval. However, the process may be more complex for some functions and may require advanced calculus techniques.
Yes, you can also use graphical methods such as finding the critical points and using the first or second derivative tests to determine if they are maximum or minimum points on the graph.
Yes, it is possible for a function to have a maximum and minimum value at the same point. This occurs when the function has a horizontal point of inflection at that point. It is important to consider the second derivative in these cases to determine the nature of the point.