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This book discusses the limitation of Chat GPT specifically in terms of their restricted knowledge and their inability to Construct Quadratic Equation With Asymmetric Quadratic Roots. ChatGPT's knowledge is confined to data up until 2021 . However, these limitation can be addressed by incorporating future knowledge, Peter Chew Method for Quadratic Equation to Construct Quadratic Equation including Asymmetric Quadratic Roots This can be effective in let student interest in using Peter Chew Method for Quadratic Equationto Construct Quadratic Equation while learning mathematics especially when analogous covid- 19 issues arise in the future. At present, the method of constructing a new quadratic equation is to first use the Veda's theorem to obtain the values of a+ßand aßof the original equation, and then convert the sum and product of the roots of the new quadratic equation into the form of a+ßand aßby using algebra formula, such as a-β2 = a+β2-2 aß. Then construct a new quadratic equation. But for sum and product of an asymmetric quadratic root for a new quadratic equation, it is difficult or impossible to transform into a+ßand aßforms. It is difficult or impossible to construct new quadratic equations. So, it is limited to use Veda's theorem to construct new quadratic equations with asymmetric quadratic root. Therefore, if we program the Veda's theorem method into an AI system like Chat GPT, Chat GPT will also have limitations. Peter Chew Method for Quadratic Equation method is to find the roots (a and β) of the original quadratic equation first, and then substitute the values of a and ßinto the sum and product of the new quadratic equation without transforming into a+ßand aßforms, and then construct new quadratic equation. This allows the Peter Chew quadratic equation method to overcome the limitations of the Veda theorem method to construct new quadratic equations with asymmetric quadratic root. In addition, Peter Chew Method for Quadratic Equation allows us for Construct New Quadratic Equation With Asymmetric Quadratic Roots without request remember any Algebra formula. Peter Chew Method for Quadratic Equation provides a promising simple and easy solution to the existing Limitation in AI system like Chat GPT. By programming the AI system like Chat GPT with Peter Chew Method , these AI systems can Construct Quadratic Equation with any type of roots including Asymmetric Quadratic Roots. This approach demonstrates the potential of leveraging advanced mathematical concepts to overcome the Limitation posed by restricted knowledge in AI systems like Chat GPT.