The article discusses a study on the correlation between the position of Uranus and the timing of major earthquakes. It presents data showing that in 134 of the strongest earthquakes, Uranus was within ±1 hour of the meridian 39 times, significantly higher than the expected 22-3 times. This suggests a possible correlation between Uranus's position and the timing of major earthquakes. The study argues that the position of Uranus within ±15° of the meridian at the moment of a great earthquake can be considered significant, and that there are longer periods when this correlation is highly significant. The article also notes that the timing of earthquakes can be described by Uranus's position in a significant number of cases, possibly due to Uranus's unique axial orientation and potential magnetic field effects. The article references an earthquake in Agadir, where Uranus was only 4° from the meridian, and suggests that if people had been aware of this correlation and the preceding minor shocks, they might have avoided buildings. The author calls for an unbiased approach to these problems, emphasizing that the correlation of Uranus is just one part of a larger issue. In the second part, the article discusses probability and statistics, focusing on the renewal density theorem. It presents necessary and sufficient conditions for the theorem to hold, which are less restrictive than previous conditions. The conditions involve the behavior of the frequency function of a random variable as x approaches infinity and the properties of its Fourier transform. The study concludes that these conditions are necessary and sufficient for the renewal density theorem to hold, and that they are less restrictive than previously known conditions. The author plans to publish full details of the proof in the near future.The article discusses a study on the correlation between the position of Uranus and the timing of major earthquakes. It presents data showing that in 134 of the strongest earthquakes, Uranus was within ±1 hour of the meridian 39 times, significantly higher than the expected 22-3 times. This suggests a possible correlation between Uranus's position and the timing of major earthquakes. The study argues that the position of Uranus within ±15° of the meridian at the moment of a great earthquake can be considered significant, and that there are longer periods when this correlation is highly significant. The article also notes that the timing of earthquakes can be described by Uranus's position in a significant number of cases, possibly due to Uranus's unique axial orientation and potential magnetic field effects. The article references an earthquake in Agadir, where Uranus was only 4° from the meridian, and suggests that if people had been aware of this correlation and the preceding minor shocks, they might have avoided buildings. The author calls for an unbiased approach to these problems, emphasizing that the correlation of Uranus is just one part of a larger issue. In the second part, the article discusses probability and statistics, focusing on the renewal density theorem. It presents necessary and sufficient conditions for the theorem to hold, which are less restrictive than previous conditions. The conditions involve the behavior of the frequency function of a random variable as x approaches infinity and the properties of its Fourier transform. The study concludes that these conditions are necessary and sufficient for the renewal density theorem to hold, and that they are less restrictive than previously known conditions. The author plans to publish full details of the proof in the near future.