We study both Malliavin regularity and numerical approximation schemes for a class of quadratic backward stochastic
differential equations (QBSDEs for short) in cases where the terminal data need not be a function of a forward diffusion. By using the connection between the QBSDE under study and some backward stochastic differential equations (BSDEs) with global Lipschitz coefficients, we firstly prove $L^{q}$, $(q\geq 2)$ existence and uniqueness results for QBSDE. Secondly, the $L^{p}%
$-H\"older continuity of the solutions is established for ($q>4$ and $2\leq p<\frac{q}{2}$). Then, we analyze some numerical schemes for our systems and establish their rates of convergence. Moreover, our results are illustrated with three examples.