We prove some new modular identities for the Rogers\textendash Ramanujan continued fraction. For example, if $R(q)$ denotes the Rogers\textendash Ramanujan continued fraction, then $$R(q)R(q^4)&=\dfrac{R(q^5)+R(q^{20})-R(q^5)R(q^{20})}{1+R(q^{5})+R(q^{20})}\\\intertext{and}\dfrac{1}{R(q^{2})R(q^{3})}&+R(q^{2})R(q^{3})= 1+\dfrac{R(q)}{R(q^{6})}+\dfrac{R(q^{6})}{R(q)}.$$ In the process, we also find two new relations for the Rogers-Ramanujan functions.
MSC Classification: 11F27 , 11P84 , 11A55 , 33D90