<p>The complex precipitation microphysics associated with super typhoon Lekima (2019) and its potential impacts on the consistency of multi-source datasets and radar quantitative precipitation estimation has been disentangled using a suite of <em>in situ</em> and remote sensing observations around the disastrous waterlogging area near the groove windward slope (GWS) of Yan Dang Mountain and Kuo Cang Mountain, China. The dynamic microphysical processes, in which breakup overwhelms over coalescence as the main outcome of the collision of precipitation particles, noticeably changes the self-consistency between radar reflectivity (<em>Z</em><sub>H</sub>), differential reflectivity (<em>Z</em><sub>DR</sub>) and the specific differential phase (<em>K</em><sub>DP</sub>), and their consistency with theoretical counterparts simulated with surface disdrometer measurements, which are quality-controlled in terms of fall velocity characteristics of different hydrometeors to remove wind effects, hailstones and graupels. The overwhelming breakup accounts for phenomenon that high concentration rather than size contributes more to large <em>Z</em><sub>H</sub> of the storm and the large deviation of attenuation-corrected <em>Z</em><sub>DR</sub> from its expected values (<em>Ẑ</em><sub>DR</sub>). As a result, although a comparable performance of<em> Z</em><sub>H</sub>-based rainfall estimates <em>R</em>(<img src="data:image/png;base64,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" alt="" width="15" height="17" />) and <em>K</em><sub>DP</sub>-based rainfall estimates <em>R</em>(<em>K</em><sub>DP</sub>) can be achieved, <em>R</em>(<em>Z</em><sub>H</sub>, <em>Z</em><sub>DR</sub>) tends to overestimate precipitation. <em>R</em>(<em>Z</em><sub>H</sub>, <em>Ẑ</em><sub>DR</sub>) performs the best among all rainfall estimators and it is less sensitive to the potential microphysical processes, owning to the improved self-consistency between radar-measured <em>Z</em><sub>H</sub>, <em>Z</em><sub>DR</sub> and <em>K</em><sub>DP</sub> and their consistency with surface counterparts.</p>