Two new time-dependent versions of div-curl results in a bounded domain \domain⊂\RR3 are presented. We study a limit of the product \vectorvk\vectorwk, where the sequences \vectorvk and \vectorwk belong to \Lp2. In Theorem ??? we assume that \rotor\vectorvk is bounded in the Lp-norm and \diver\vectorwk is controlled in the Lr-norm. In Theorem ??? we suppose that \rotor\vectorwk is bounded in the Lp-norm and \diver\vectorwk is controlled in the Lr-norm. The time derivative of \vectorwk is bounded in both cases in the norm of \Hk−1. The convergence (in the sense of distributions) of \vectorvk\vectorwk to the product \vectorv\vectorw of weak limits of \vectorvk and \vectorwk is shown.