We consider recovering d-level quantization of a signal from k-level quantization of linear measurements. This problem has great potential in practical systems, but has not been fully addressed in compressed sensing (CS). We tackle it by proposing k-bit Hamming compressed sensing (HCS). It reduces the decoding to a series of hypothesis tests of the bin where the signal lies in. Each test equals to an independent nearest neighbor search for a histogram estimated from quantized measurements. This method is based on that the distribution of the ratio between two random projections is defined by their intersection angle. Compared to CS and 1-bit CS, k-bit HCS leads to lower cost in both hardware and computation. It admits a trade-off between recovery/measurement resolution and measurement amount and thus is more flexible than 1-bit HCS. A rigorous analysis shows its error bound. Extensive empirical study further justifies its appealing accuracy, robustness and efficiency.