A modified Newton-Raphson method

Electrical Impedance Tomography (EIT) is gaining imconvergence of the iteration process is very sensitive to any noise portance as a monitoring tool for process engineering. The main reaon the data. The authors found MNR to diverge when applied to sons for this are its nonintrusive measurement prope

Starting with p = 37 as an approximation to its highest root a = 36 we get successively x 1 -36 = 0.184×10 0 , 0.759×10 -2 , 0.137×10 -4 , 0.445×10 -10 , 0.0 x 2 -36 = -0.141×10 0 , -0.732×10 -2 , -0.137×10 -4 , -0.445×10 -10 , 0.0 (x 1 + x 2 )/2-36 = 0.212×10 -1 , 0.135×10 -3 , 0.934×10 -8 , 0.0 (1

## Abstract A new global secant relaxation (GSR)‐method‐based improvement procedure is used to improve the overall convergency performance of the modified Newton‐Raphson iteration in carrying out the solution of discrete systems resulting from the finite‐element discretization of a certain class of