In this paper, we propose new deterministic and Monte Carlo interpolation algorithms for sparse multivariate polynomials represented by straight-line programs. Let f be an n-variate polynomial given by a straight-line program, which has a total degree bound D and a term bound T. Our deterministic algorithm is quadratic in n,T and cubic in logD in the Soft-Oh sense, which has better complexities than existing deterministic interpolation algorithms in most cases. Our Monte Carlo interpolation algorithms have better complexities than existing Monte Carlo interpolation algorithms and are the first algorithms whose complexities are linear in nT and polynomial in logD in the Soft-Oh sense.