In this video, I explain how to "derive" the Schrödinger equation, although a derivation from first principles is impossible. For that purpose, I derive and make use of two important operators in quantum mechanics, namely the momentum and energy operators that are derivatives of the wave function with respect to the position and time. – – –Related Videos– – – ▶️ Infinite Potential Well: https://www.youtube.com/watch?v=oZjmRyMXBss – – –Physics Tutorials– – – This series covers many examples and concepts related to physics and mathematics for school and undergraduate students. – – –YouTube Channel– – – 🔔 Subscribe for more content: null – – –More Tutorials– – – ▶️ Playlist:    • Physics & Math Tutorials   – – – Social Media – – – 👉 Twitter: https://twitter.com/MattersPhysics 👉 Discord: https://discord.gg/YYBzEuYeFe 👉 Telegram: https://t.me/physics_matters 👉 Facebook: https://www.facebook.com/Physics-Matters-109196860645967 Linkedin: https://www.linkedin.com/in/mustafa-schmidt-54ab3a19b – – –Content – – – 0:00 Introduction 2:17 Energy conservation 3:19 Momentum and energy operator 11:49 Energy operator 15:30 Conclusion