(Numerical analysis) Here’s a challenging problem for those who know a little calculus. The Newton-Raphson method can be used to find the roots of any equation y(x)=0. In this method, the (i+1)stapproximation,xi+1,toarootofy(x)=0 is given in terms of the ith approximation, xi, by the following formula, where y’ denotes the derivative of y(x) with respect to x: xi+1=xiy(xi)/y(xi) For example, if y(x)=3x2+2x2,theny(x)=6x+2 , and the roots are found by making a reasonable guess for a first approximation x1 and iterating by using this equation: xi+1=xi(3xi2+2xi2)/(6xi+2) a. Using the Newton-Raphson method, find the two roots of the equation 3x2+2x2=0. (Hint: There’s one positive root and one negative root.) b. Extend the program written for Exercise 6a so that it finds the roots of any function y(x)=0, when the function for y(x) and the derivative of y(x) are placed in the code.

We are given that the incubation time is normally distributed with a mean of 35 days and standard deviation of 2 days. Therefore, ? =   and ? =   .We wish to determine how many of the 10,000 eggs can be expected to hatch in 31 to 39 days. Since  35 − 31 = 4,  31 days is located   standard deviations to the left of the mean. Similarly, 39 days is located   standard deviations to the right of the mean.

Numerical Methods Lecture: The system of nonlinear equations given below x0 =y0=1  Obtain 4 iteration Newton-Raphson solutions starting with the estimated initial values.Discuss the digit precision in the accuracy of the final solutions. x = y+x2-0.5 y = x2-5xy