I am currently trying to prove that, for a standard Brownian motion $W_t$ and a twice-differentiable and bounded function $f(x)$, $$ dg(W_t) = g'(W_t) dW_t + \frac{1}{2} g''(W_t) dt $$
To do this I have expressed $dg(W_t)$, using the Taylor series expansion, as $$ dg(W_t) = g'(W_t) dW_t + \frac{1}{2} g''(W_t) (dW_t)^2 + \frac{1}{3!} g'''(W_t) (dW_t)^3 + \dots $$
From here, I have shown that $(dW_t)^2 = dt$ and I am now trying to complete this proof by showing that $$ (dW_t)^k = 0 $$ for all integers $k \geq 3$.
Can anyone help me to do this?
