Page:Calculus Made Easy.pdf/113



of the principal uses of the process of differentiating is to find out under what conditions the value of the thing differentiated becomes a maximum, or a minimum. This is often exceedingly important in engineering questions, where it is most desirable to know what conditions will make the cost of working a minimum, or will make the efficiency a maximum.

Now, to begin with a concrete case, let us take the equation $y=x^2-4x+7$.



By assigning a number of successive values to $$x$$, and finding the corresponding values of $$y$$, we can