numerical method

D) Wirite the ex expansion 2) find the real root of the follourily equations Correct to thresedecimal Place using Meuston-Raphton method x22x5=0 3) Find ue root of the evaluathn of f(x)=x34x9 using bisection melhod to S deermal places. 4) use ltematrue melkadi correct to two decimat placer to find yle mots ot ville eruation for Hhis equation f(x)=12x3+4x215x=0 Gwen an intial guess x=0 6) using neuston Raphson method of theration, find the root of the equation to three decimal Places f(x)=x32x5=0 7) Using newton's method of lteration find the square root of 2 if f(x)=x22 8) by using the newton Raphson lteration Scheme, find the desk computation correct to 2 decimal places, He foots of the equation. f(x)=12x3+4x215x4=0 x0=1 10) Use an therative method to find a real root of the equation to three places of deamal 1+x2=x3 11) Ostain a root for f(x)=x32x5=0 using te Method of false postion (2) Find one roal root of the equation f(x)=x3x4= using the method of false position