Quantization is commonly used to compress and accelerate deep neural networks. Quantization assigning the same bit-width to all layers leads to large accuracy degradation at low precision and is wasteful at high precision settings. Mixed-precision quantization (MPQ) assigns varied bit-widths to layers to optimize the accuracy-efficiency trade-off. Existing methods simplify the MPQ problem by assuming that quantization errors at different layers act independently. We show that this assumption does not reflect the true behavior of quantized deep neural networks. We propose the first MPQ algorithm that captures the cross-layer dependency of quantization error. Our algorithm (CLADO) enables a fast approximation of pairwise cross-layer error terms by solving linear equations that require only forward evaluations of the network on a small amount of data. Decisions on layerwise bit-width assignments are then determined by optimizing a new MPQ formulation dependent on these cross-layer quantization errors via the Integer Quadratic Program (IQP), which can be solved within seconds. We conduct experiments on multiple networks on the Imagenet dataset and demonstrate an improvement, in top-1 classification accuracy, of up to 27% over uniform precision quantization, and up to 15% over existing MPQ methods.