However, some Greek mathematicians found a better way to find pi. Interesting meta-meta-mathematical theorems? Other outstanding mathematicians have been impressed by his works. The equations and graphs displayed above may seem abstract, but they are essential for quantum physics and image processing calculations and are dependent on Euler’s identity. Greek mathematicians used letters for numbers.

The Normal Distribution, Confidence Intervals, and Their Deceptive Simplicity, Doing Kindergarten Math with the World’s Most High-Tech Computer, Concentration of Measure: The Glorious Chernoff Bound. In class 10 Maths, a lot of important theorems are introduced which forms the base of mathematical concepts. Thus continuous compound interest makes us rich! It states that the sequence of relative frequencies of an event (A) converge , where the the terms of the sequence do not have an explicit formula or defined recursively, and the limit of this sequence is the true probability measure of (A). They used a pictorial head for each number, and a symbol for zero, 0. The Penguin Book of Curious and Interesting Mathematics. And, if so, do we need a meta.meta.mathoverflow? Today, we represent each complex number a + bi as a point with coordinates (a,b). Each such answer is a meta-theorem but not a meta-meta-theorem because of the formalization process which involves a mathematical interpretation of the statements. And this is what is called the Malthusian catastrophe. I was aware of more general statement with arbitrary T and T', but I phrased my statement so that the correlation "meta" between T and T' helps resolve the difficulties you discribed. Class 10 students are required to learn thoroughly all the theorems with statements and proofs, not only to score well in board exam but also to have a stronger foundation in this subject. Even though I work in optimization, in particular linear programming, I've never heard of that result referred to as the fundamental theorem of linear programming. Possibly Carl Mummert's answer gives an example of such of a study which cannot meaningfully be reduced to simply metamathematics, but I'm afraid without knowing the details it is difficult for me to comment definitively. Nash’s Theorem. In our routine life, you can check the best route to your school, you can check where more discounted products are available in the market, and you can check which bank can … so to For me the fundemental theorem of linear programming would be the strong duality theorem. Amongst the various subject books one buys in the beginning of each year, the one titled mathematics is always the one that though is highly fascinating initially, is the first to lose its charm.

Or maybe. … My favorite is the fundamental theorem of stochastic calculus: