6. Using Newton's method, Find the two roots (zeros) of the function In(x^3)-x^2+5.Using the initial starting solutions of 0.1 and 2.5 and compute three iterations of themethod for each starting solution. Provide the graph of the function using softwaresuch as Graphcalc® or DESMOS®.

Answered: Image /qna-images/answer/ad167e4c-e698-4fe1-8cbf-9761944f4f98.jpg

Answered: 6. Using Newton's method, Find the two…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Find the root of f(x)=x^3 -7x+3=0. You can use which method you want. Thestopping criteria is iteration number as 6
an athlete whose event is the shot put releases a shot. when the shot whose path is shown by the graph to the right is released at an angle of 65°, its height, f(x), in feet, can be modeled by f(x)=-0,04x^2+2.1x+5.2, where x is the shot's horizontal distance, in feet, from its point of release, use this model to solve parts (a) through (c) a. what is the maximum height of the shot and how far from its point of release does this occur? b. what is the shot's maxium horizontal distance, to the nearest tenth of a foot, or the distanxe of the throw? c. from what height was the shot released?
> Finals Schedule - Bb Collabo O x Lorg/webapps/assessment/take/launch.jsp?course_assessment_id%3D_43176 1&course_id%3_41581_1&contes cemaining Time: 1 hour, 10 minutes, 35 seconds. Question Completion Status: QUESTION 18 A football is kicked up into the air. The height of the football can be modeled as a function of time as shown by the equation, h(t) = -4t2 + 18t, where h is the height of the football in feet, and t is the time in seconds. How many seconds did it take for the football to réach the ground after it was kicked? O 20.25 seconds O 2.25 seconds O 9 seconds O 4.5 seconds QUESTION 19 Find the missing length Click Save and Submit to save and subinit, Click Saue All Anstuers to save all answers.
SOLVE STEP BY STEP IN DIGITAL FORMAT 9. For the function f(x) = x^3 - 3x^2 - 13x - 15. Calculate the roots of the function f(x), find the maximum and minimum points of the function f(x), determine the inflection point of the function f(x), find the intervals where the function is concave up and concave down, calculate the intervals of increase and decrease of the function and graph.

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6. Using Newton's method, Find the two roots (zeros) of the function In(x^3)-x^2+5. Using the initial starting solutions of 0.1 and 2.5 and compute three iterations of the method for each starting solution. Provide the graph of the function using software such as Graphcalc® or DESMOS®.