How Patrick D’Souza Learned Unconventional Methods for Solving Quantitative Aptitude and Logical Reasoning Questions

Patrick D’Souza is renowned for his unconventional methods in solving quantitative aptitude and logical reasoning (LRDI) questions. His expertise in these areas has elevated his students to achieve top scores in various competitive exams. Let's delve into the strategies and techniques that have contributed to D’Souza's success, and how he encourages his students to reach their full potential.

Extensive Practice

One of the key factors that sets D’Souza apart is his extensive practice of problem-solving. This rigorous approach has allowed him to encounter a wide variety of question types. Through this, he has developed a keen eye for identifying patterns and devising efficient shortcuts.

Analytical Thinking

Patrick emphasizes the importance of analytical thinking in problem-solving. By breaking down complex problems into simpler components, students can identify unconventional solutions that might not be immediately apparent.

Conceptual Understanding

Beyond just memorization, D’Souza focuses on the underlying concepts. This deep understanding allows him to devise unique methods for tackling a wide range of problems. His approach fosters flexibility in applying techniques, enabling easy adaptation to different types of questions.

Teaching Experience

His extensive experience as an educator has been instrumental in developing and refining his methods. Engaging with students has allowed him to explore various teaching methods and strategies, ultimately fostering the development of unconventional methods that resonate well with his students.

Feedback and Iteration

Engaging with students and receiving feedback on their struggles has been crucial in his iterative process. This feedback loop has helped him refine his methods, ensuring they are not only effective but also user-friendly.

Use of Technology

The incorporation of technology and online resources has played a significant role in his learning process. By exploring different approaches, he has been able to adapt and enhance his methods over time.

The Source of Success

D’Souza’s success in developing these unconventional methods stems from a blend of practice, innovative thinking, and a strong foundation in mathematical principles. His students have benefited greatly from these techniques, achieving impressive results.

So, what can you expect from D’Souza’s training? A rigorous approach that combines traditional problem-solving with innovative thinking. He focuses on understanding concepts thoroughly, breaking down complex problems, and teaching students methods that are both effective and easy to apply.

“A lot of my learning has taken place from my students. When I teach, I ask students for better methods. Usually, some or the other student has an unconventional method. My work then is to understand the method, check if it is valid, and whether it can be applied to many other sums. If it can be, I incorporate it into my teaching schedule,” explains D’Souza.

D’Souza also encourages his students to strive for better methods for each problem they solve. “One of the ways to excel in Maths is to solve without pen and paper wherever possible. This not only enhances your thinking skills but also helps in saving time during exams,” he adds.

Have you ever tried unconventional methods? Share your experiences in the comments below! If you'd like to learn more about D’Souza’s methods, connect with him at WhAp to 9821314788.

Connect with D’Souza:
WhatsApp: 9821314788