Before we move on, let us understand what the Fundamental Theorems are. A Fundamental Theorema is a set of axiom or an idea that has no bearing on nature. For example, light is a kind of particle. So, light cannot be seen by us. It does not have any mass or it does not have any shape.
In mathematics, a set of axioms is a set of rules governing an activity in which a proof is made from theorems whose validity is unimportant if the truth of the corresponding conclusion is not ensured. For example, theorems concerning prime numbers, properties of numbers, sets, and relations are all examples of axioms. Therefore, if you want to solve a math problem you should focus on the underlying problem, not the set of theorems.
In addition, theorems are only important in the context of a specific problem. They are important to understand the concept of sets, for example, but they will not necessarily hold true in all situations. Thus, while it is possible to learn about all the theorems in college and get an adequate understanding of set theory, it is also possible to find yourself unable to solve some of your problems. Understanding the concepts of sets and their properties, for instance, but being unable to solve a specific problem involving prime numbers is a waste of time.
One more drawback of learning these fundamental theorems is that they tend to become quite boring because almost all students can easily see theorems everywhere. Once you learn them in college, you rarely remember them. As a result, when faced with a real-life problem, you might not be able to apply your fundamental knowledge. Thus, a good course of action is to continue your studies of more advanced topics.
It also helps to do some preparation work before you tackle a real-life problem. You should certainly spend some time familiarizing yourself with standard procedures so that you know how to solve problems in a logical and acceptable manner. It also helps to develop a systematic approach to problem solving. This will give you an advantage over the majority of students.
In many courses, problems are taught in lectures and practice problems. These help you to get comfortable working with real-life problems and learn to formulate solutions for your problems. They also build your understanding of algebra and calculus. By working through problems, you will see just how simple theorems are and how they fit into your mathematics curriculum. In addition, by seeing how other people solve problems, you will gain a better understanding of the concepts of algebra and calculus. Furthermore, doing problems will also expose you to more advanced courses in higher mathematics.
Finally, once you have worked through problems on a fundamental theorem’s paper, you should continue to work on more difficult problems. In this way, you will see just how well your fundamental understanding is fit to solve problems of real life. Thus, while it is possible to learn to do all of this in classroom courses, when you want to truly understand the concepts and key ideas of mathematics, then the best method is to study more advanced material and also use more practical examples.