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Any idea of how I can develop logic; One things for sure.to solve any mathematical problem one should . Topic: Any idea of how I can develop logic; One things for sure.to solve any mathematical problem one should .
June 16, 2019 / By Alix
Question: have a very good reasoning / logic power ; BUT THE MILLION DOLLAR QUESTION IS HOW SHOULD WE BE ABLE TO IMPROVE OUR LOGICAL SKILLS / REASONING SKILLS / THINKING SKILLS ; WE SHOULD BE ABLE TO THINK IN THE PROPER DIRECTION TO SOLVE ANY COMPLEX PROBLEM ; ESPECIALLY IN PROBLEMS WHERE SOMETHING IS TO BE PROVED; ******SO ANY IDEA HOW TO DEVELOP THINKING / REASONING SKILLS ?????********* Best Answers: Any idea of how I can develop logic; One things for sure.to solve any mathematical problem one should . Uriah | 4 days ago
If you are not married, get married. After a few years you will understand what is illogical! Hence you understand what is logical. Simple isn't it!
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Did you like the answer? Any idea of how I can develop logic; One things for sure.to solve any mathematical problem one should . Share with your friends Originally Answered: What are some applications of Mathematical Logic?
Model theory doesn't have too many applications (finite model theory has caught on a bit in CS, and probably some other small areas that caught on to a selective audience). Set theory, even very advanced set theory, does have applications in other areas of math, including things considered applied math, like analysisy stuff, eg. measure theory. Recursion theory is applied in a concrete sense in the realm of computer science. Proof theory is also applied, in a more philosophical sense. Generally when you hear the term "applied logic" it refers to type theory/recursion theory/proof theory type stuff, which is more on the philosophy/computer science end of the logic spectrum. Set Theory/Model Theory are the more hardcore math areas. Originally Answered: What are some applications of Mathematical Logic?
One form is named "diagnosis". the regulations are extremely strict. as quickly as discovered, they could be utilized to different fields the place you may arrive at logical conclusions. it somewhat is utilized to sparkling up very difficult problems. One (extremely common) occasion: you're able to be able to desire to appreciate if the equation has a actual root (i.e., is there a value of x in actual numbers which will make f(x)=0 ). f(x) = x^2 - 4x + 8 you're able to rewrite as: f(x) = x^2 -4x + 4 + 4 f(x) = (x^2 -4x +4) + 4 f(x) = (x-2)^2 + 4 the 1st term is a sq.; in actual numbers, a sq. can never be adverse. the backside fee a sq. could have is 0. the 2nd term is +4. this suggests that the backside fee f(x) could have is +4. as a result, we end, f(x)=0 is impossible, meaning f(x) has no roots. Rod
start solving sudoku,playing chess,minesweeper-the microsoft game or anyother game based on logic but i feel sudoku will be the best
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You need to use the quadratic formula, so you need to get a quadratic function out of what you're given. 4 = 3z^2/(z-3) 4(z-3) = 3z^2 4z-12=3z^2 Then rearrange by subtracting 4z and adding 12, which leaves you: 3z^2-4z+12=0 Then plug into the quadratic formula, with 3=a, -4=b, and 12=c. I included a link for the quadratic formula in case you don't know it. Best of luck! :D Originally Answered: How would you solve this mathematical problem?
If {4/z = 3z/z-3} is equal to {4/z = (3z/z)-3} = 3-3 = 0 then no solution. If {4/z = 3z/z-3} is equal to {4/z = 3z/(z-3) then z = 0.66 +/-j1.89 where j^2 = -1 I believe you mean by: 4/z = 3z/(z-3) instead of 4/z = 3z/z-3 If so, then work; 4/z = 3z/(z-3) or 3z^2 -4z+12 = 0 comparing to the eq. ax^2+bx+c or x = {-b+/-sqrt(b^2-4ac} / 2a. we get: z = {4 +/-sqrt(16-144)} / 6 = {4 +/-sqrt(-128)}/6 = 4/6 +/-(j11.31)/6....:where j^2 = -1 z = 0.66 +/-j1.89

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