@article{article_1328961, title={Higher Order Real Derivatives Using Parabolic Analytic Functions}, journal={Konuralp Journal of Mathematics}, volume={11}, pages={141–147}, year={2023}, author={Dutta, Sandipan and Gupta, Sneha}, keywords={Parabolic, Analytic functions, Dual number, Higher order derivative, automatic differentiation, Hypercomplex numbers.}, abstract={Amid the bidimensional hypercomplex numbers, parabolic numbers are defined as $\{z=x+\imath y:\; x,y\in \mathbb{R}, \imath^2=0, \imath\neq 0\}$. The analytic functions of a parabolic variable have been introduced as an analytic continuation of the real function of a real variable. Also, their algebraic property has already been discussed. This paper will show the $n$-th derivative of the real functions using parabolic numbers to further generalize the automatic differentiation. Also, we shall show some of the applications of it.}, number={2}, publisher={Mehmet Zeki SARIKAYA}