1. The problem is to find the best way to become proficient in differentiation and integration. 2. Differentiation and integration are fundamental concepts in calculus. Differentiation finds the rate of change of a function, while integration finds the area under a curve. 3. Important rules for differentiation include the power rule, product rule, quotient rule, and chain rule. 4. Important rules for integration include basic antiderivatives, substitution, and integration by parts. 5. To become a genius in these topics, practice is key: solve many problems, understand the underlying concepts, and memorize key formulas. 6. Use visual aids like graphs to understand how functions behave when differentiated or integrated. 7. Study step-by-step solutions and try to explain them in your own words to reinforce understanding. 8. Regularly review and challenge yourself with more complex problems to deepen your skills. 9. Remember, mastery comes with consistent effort and curiosity.