Question

Exercise 17.10 Let x = V2 and for n > 1 let In+1 = 2 + In Use Banach's fixed point theorem to show that (en) converges to a root of the equation r' - 4x2 - + 4 = 0 lying between 3 and 2.

Answer 1

2472 : 22 = 12+1T2 > 15 so, xn > 5 & ns2 and let y = √2+12+12+... So 2 ya √2+) y 2 2 2 ty y2y-20 so In 2 As actin 2 a so an <a & n.. so di Ç [13, 2] 4 m2 Now, Drono let anti 2 flan) so, f(x) = √2+ 5x So I f(x) = f(y) | = 1 Jarra - 12+55 ) < 1 2 1 x-rol - 2 al pavel <a e vanta 12-31 and [53, 2] is complete space. uradoria < 1 and 13, 27 is metric

So, by Bomach fixed point theorem, f has a fixed point in 1/3, 2]. r.e. an converges in 113,2]. red and Ç [13, 2] Then n. 2 √2+82 & x² 2 2050 (²-2) ² - 2 & x2x² + 4 22 & 2"-2² - x + 420 0 4 x is a root of 6. se, an converges to a root of the equation n un? _ x +420 lying between 3 and 2.