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  • Future Knowledge. Peter Chew Correction For Sine Rule [3rd edition]

Future Knowledge. Peter Chew Correction For Sine Rule [3rd edition]

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In order to have high-quality future education, future Education need to integrate with technology. But if a knowledge has flaws and not corrected , if we program the uncorrected flaws knowledge to technology such as online calculator, it will cause the online calculator giving some wrong answer. This will not giving a high quality of education. We have to make sure that our online calculator programming knowledge is free from flaws or programming `corrected knowledge` in online calculators. Therefore, future knowledge must free from flaws or `corrected knowledge` such as Laplace Correction for Newton's Formula and Peter Chew Correction for Sine Rule . As Albert Einstein's famous quote : We cannot solve our problems with the same thinking we used when we created them. Using the sine rule to solve some triangle problems will give the wrong answer, which is also the wrong answer given by online calculators using the sine rule. Therefore, corrections need to be created to prevent wrong answers . Peter Chew Correction For Sine Rule gives conditions for preventing wrong answers using the sine rule. The condition is that for an isosceles triangle, if an equilateral opposite angle is given, the given angle must be less than 90° The Education 4.0 calculator design includes future knowledge such as Peter Chew Rule, Peter Chew Method, Peter Chew Triangle diagram, and Peter Chew Correction For Sine Rule. Hence, Education 4.0 Calculator provides correct answers to question mentions. 3rd Edition is updated with the latest information, especially the recent Peter Chew Correction For Sine Rule which was found to overcome error in Chat GPT . Google loses £100BILLION as AI chatbot Bard answers question wrong1 , shows how important it is for AI chatbots to give the correct answer. Chat GPT also face the problem of giving wrong answers. Therefore, in order to prevent users from being misled by some wrong answers, we must program corrected flawed knowledge into Chat GPT. By incorporating future knowledge, Peter Chew Correction for Sine Rule and leveraging advanced mathematical tools, AI systems can expand their capabilities and Overcoming errors in the domain of Solution of Triangle.
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