Let $f=\sum a(n)q^n\in S_k(N,\chi)$ be a cusp form of integral weight $k$ and level $N$ with Dirichlet character $\chi\pmod N$, let $\alpha_p,\beta_p$ the local parameter of $f$, ie., $$1-a(p)X+\chi(p)p^{k-1}X^2=(1-\alpha_pX)(1-\beta_pX)$$
It's known that if $\chi$ is the trivial character then $\beta_p=\bar{\alpha_p}.$

My question is the following :  If $\chi$ is not trivial, on what condition on $f$ we have $\beta_p=\bar{\alpha_p}$ ?