7.6 CHAPTER 7. DIFFERENTIAL CALCULUS
We have seen that the coordinates of the turningpoint can be calculatedby differentiating the function
and finding the x-coordinate (speed in the case of the example) for which the derivative is 0.
Differentiating (7.19), we get:
f�(v) =3
40
v− 6If we set f�(v) = 0 we can calculate the speed that corresponds tothe turning point.
f�(v) =3
40
v− 60 =3
40
v− 6v =6 × 40
3
= 80
This means that the most economical speed is 80 km/h.
See video: VMhgi at http://www.everythingmaths.co.zaExample 13: Optimisation Problems
QUESTIONThe sum of two positivenumbers is 10. One of the numbers ismultiplied by the squareof the
other. If each number isgreater than 0 , find the numbers that make this product a maximum.SOLUTIONStep 1 : Examine the problem and formulate the equations that are required
Let the two numbers be a and b. Then we have:a +b = 10 (7.20)
We are required to minimise the product of a and b. Call the product P.
Then:P = a.b (7.21)
We can solve for b from (7.20) to get:b = 10−a (7.22)
Substitute this into (7.21) to write P in terms of a only.P = a(10−a) = 10a−a^2 (7.23)Step 2 : Differentiate
The derivative of (7.23)is:P�(a) = 10− 2 aStep 3 : Find the stationary point
Set P�(a) = 0 to find the value of a which makes P a maximum.