If we are given that a variable is on a balanced growth path (for sake of argument we shall assume consumption), how do we show that another variable related to consumption (like capital or wealth) should grow at the same constant rate as consumption? I tried giving the verbal explanation below, but I was marked off for not being rigorous enough.
My verbal explanation was the following (in the problem there were only two variables, consumption and wealth and we were given that consumption was on a balanced growth path):
If consumption grows at a constant rate, wealth must also grow at the same constant rate. If the growth rate for wealth is greater than that of consumption, we will have positive wealth during the last time period, so we could not have been maximizing utility (because the agent gets no utility from holding wealth). If the growth rate for wealth is less than that of consumption, then a constant growth rate of consumption would not be sustainable over an infinite time horizon because the agent would eventually have less wealth than is necessary for the level of consumption prescribed by optimality.
My professor said that I could use FOC's to show that they must grow at the same rate, but I'm not sure how I would do so. Can anyone help me understand?
$\textbf{Edit:}$ The specific model for which I used this argument is the one laid out in the following question: Solution Method for Infinite-Horizon Maximization Problem. We end up getting steady state consumption (which is a form of a balanced growth path with the growth rate being 1). He said it was correct in this model that steady state consumption implied steady state wealth, but that my explanation was not rigorous enough.
