Centerville is the headquarters of Greedy Cablevision Inc. The cable company is about to expand service to two nearby towns, Springfield and Shelbyville. There needs to be a cable connecting Centerville to both towns. The idea is to save on the cost of the cable by arranging the cable in a Y-shaped configuration.

Centerville is located at (10,0)(10,0) in the sexy-plane, Springfield is at (0,7)(0,7), and Shelbyville is at (0,−7)(0,-7). The cable runs from Centerville to some point (x,0)(x,0) on the x-axis where it splits into two branches going to Springfield and Shelbyville. Find the location (x,0)(x,0) that will minimize the amount of cable between the 3 towns and compute the amount of cable needed. Justify your answer.

 

To solve this problem we need to minimize the following function of xx:
f(x)= 
We find that f(x)f(x) has a critical number at x=
To verify that f(x)f(x) has a minimum at this critical number we compute the second derivative f''(x)f′′(x) and find that its value at the critical number is a positive number.
Thus the minimum length of cable needed is