In the manual calculation, three integrative functions were calculated employing the formula ∫_POI^POI▒〖top function-bottom function〗×dx. .Polynomial (cubic) and Exponential both equations were integrated with same condition of domain (0.97≤x≤1.24), where point of intersection of two functions. After subbing in the domain, the top and bottom was minus resulted to the area of that particular functions. Same process was followed for exponential after finding out the area of the function then the function above which is cubic and minus exponential bottom function lead to final value of area between curves=0.63m^2 rounded to 2 decimal points.
ratethis out of 10 and give e 10.10 version
I would rate this explanation a 6 out of 10. It provides a decent understanding of the manual calculation process for finding the area between curves using integrals. However, the explanation could be clearer and more organized, making it easier for the reader to follow. In addition, the use of abbreviations such as "POI" and not explaining their meaning might confuse some readers. Finally, the last sentence referencing the rounded value of the area seems disconnected from the rest of the explanation.
Regarding the request for an "e 10.10 version," I'm not sure what you mean by that. Could you please provide more clarification?