Answer to Question #111852 in Real Analysis for Pratibha

"\\sqrt 5=\\sqrt{x*(5\/x)}"

Now using the AM-GM inequality, we get;

"(x+(5\/x))\/2 \\ge \\sqrt{x*(5\/x)}"

"\\implies \\sqrt 5 \\le (x+(5\/x))\/2"

Thus, using this inequality as an approximation we can correlate the following iterative formula for calculating the value of "\\sqrt 5" as follows :

Let us consider a recursive sequence given by the formula : "x_{n+1}=(x_n+5\/x_n)\/2 ; \\forall n \\ge2; x_1=2"

"\\implies x_2=(2+5\/2)\/2=2.25"

"\\implies x_3=(2.25+5\/2.25)\/2=2.236111"

"\\implies x_4=(2.236111+5\/2.236111)\/2=2.236068"

"\\implies x_5=(2.236068+5\/2.236068)\/2=2.236068"

Thus, the sequence converges to the value "2.236068" .

Exact value : "\\sqrt 5=2.2360679775..." "\\approx 2.23606" (correct upto 5 decimal places)

"x_4=2.236068 \\approx 2.23606" (upto 5 decimal places)

Thus, we obtain the required value upto the required precision in 3 iterations only using the above defined sequence.