A diesel lorry is driven from Birmingham to Bury at a steady speed of $v$ kilometres per hour - Edexcel - A-Level Maths Pure - Question 10 - 2007 - Paper 2

Next, we need to find the second derivative $\frac{d^2C}{dv^2}$.

Starting from the first derivative:
$\frac{dC}{dv} = -\frac{1400}{v^2} + \frac{2}{7}.$

Differentiating again:
$\frac{d^2C}{dv^2} = \frac{2800}{v^3}.$

Now, substituting $v = 70$ into the second derivative:
$\frac{d^2C}{dv^2} = \frac{2800}{70^3} = \frac{2800}{343000} \approx 0.0081 > 0.$

Since $\frac{d^2C}{dv^2} > 0$, this confirms that $C$ is indeed a minimum at $v = 70$.

Finally, we find the minimum total cost $C$ by substituting $v = 70$ back into the cost function:

$C = \frac{1400}{70} + \frac{2(70)}{7}.$

Calculating each term:
$C = 20 + 20 = 40.$

Thus, the minimum total cost of the journey is $C = 40$.