Differential Equations: An Introduction to Modern Methods and Applications
3rd Edition
ISBN: 9781118531778
Author: James R. Brannan, William E. Boyce
Publisher: WILEY
expand_more
expand_more
format_list_bulleted
Concept explainers
Videos
Textbook Question
Chapter 8.3, Problem 21P
In each of Problems 21 through 24, carry out one step of theEuler method and of the improved Euler method, using the step size
greater than
Expert Solution & Answer
Want to see the full answer?
Check out a sample textbook solution
Students have asked these similar questions
Use the Improved Euler method with step size 0.25 to
y(x)
estimate (1)
, where
is the solution of the problem
y = 1-y-y²³ with initial values y(0) = 0
Make the iterations steps and create the entire table
6. Approximate the solution to the following set of equations using iterative procedure and
using three iterations:
3X₁ + 2X₂ = -1
2X₁ - 5X₂ = -7
a. Using the Jacobi Method
b. Using the Gauss-Seidel Method
(12.1)
SOLVE
30 KULTURT
2
x²y" + xy² + (1x² - 2) y = 0 BY BECIELS METHOD.
Chapter 8 Solutions
Differential Equations: An Introduction to Modern Methods and Applications
Ch. 8.1 - In each of Problems 1 through 4 :
Find approximate...Ch. 8.1 - In each of Problems 1 through 4 :
Find approximate...Ch. 8.1 - In each of Problems 1 through 4: a) Find...Ch. 8.1 - In each of Problems 1 through 4 :
Find approximate...Ch. 8.1 - In each of Problems 5 through 10 , draw a...Ch. 8.1 - In each of Problems 5 through 10, draw a direction...Ch. 8.1 - In each of Problems 5 through 10, draw a direction...Ch. 8.1 - In each of Problems 5 through 10, draw a direction...Ch. 8.1 - In each of Problems 5 through 10 , draw a...Ch. 8.1 - In each of Problems 5 through 10, draw a direction...
Ch. 8.1 - In each of Problems 11 through 14 , use Eular’s...Ch. 8.1 - In each of Problems 11 through 14 , use Eular’s...Ch. 8.1 - In each of Problems 11 through 14 , use Eular’s...Ch. 8.1 - In each of Problems 11 through 14 , use Eular’s...Ch. 8.1 - Consider the initial value problem...Ch. 8.1 - Consider the initial value problem
Use Euler’s...Ch. 8.1 - Consider the initial value problem...Ch. 8.1 - Consider the initial value problem
Where is a...Ch. 8.1 - Consider the initial value problem y=y2t2,y(0)=,...Ch. 8.2 - In each of Problem 1 through 6, find approximate...Ch. 8.2 - In each of Problem 1 through 6, find approximate...Ch. 8.2 - In each of Problem 1 through 6, find approximate...Ch. 8.2 - In each of Problem 1 through 6, find approximate...Ch. 8.2 - In each of Problem 1 through 6, find approximate...Ch. 8.2 - In each of Problem 1 through 6, find approximate...Ch. 8.2 - In each of Problem 7 through 12, find approximate...Ch. 8.2 - In each of Problem 7 through 12, find approximate...Ch. 8.2 - In each of Problem 7 through 12, find approximate...Ch. 8.2 - In each of Problem 7 through 12, find approximate...Ch. 8.2 - In each of Problem 7 through 12, find approximate...Ch. 8.2 - In each of Problem 7 through 12, find approximate...Ch. 8.2 - Complete the calculations leading to the entries...Ch. 8.2 - Using three terms in the Taylor series given in...Ch. 8.2 - In each of Problems 15 and 16, estimate the local...Ch. 8.2 - In each of Problems 15 and 16, estimate the local...Ch. 8.2 - In each of Problems 17 and 20, obtain a formula...Ch. 8.2 - In each of Problems 17 and 20, obtain a formula...Ch. 8.2 - In each of Problems 17 and 20, obtain a formula...Ch. 8.2 - In each of Problems 17 and 20, obtain a formula...Ch. 8.2 - Consider the initial value problem y=cos5t,y(0)=1....Ch. 8.2 - Using a step size h=0.05 and the Euler method,...Ch. 8.2 - The following problem illustrates a danger that...Ch. 8.2 - The distributive law a(bc)=abac does not hold, in...Ch. 8.2 - In this section we stated that the global...Ch. 8.3 - In each of Problem 1 through 6, find approximate...Ch. 8.3 - In each of Problem 1 through 6, find approximate...Ch. 8.3 - In each of Problem 1 through 6, find approximate...Ch. 8.3 - In each of Problem 1 through 6, find approximate...Ch. 8.3 - In each of Problem 1 through 6, find approximate...Ch. 8.3 - In each of Problem 1 through 6, find approximate...Ch. 8.3 - In each of Problem 7 through 12, find approximate...Ch. 8.3 - In each of Problem 7 through 12, find approximate...Ch. 8.3 - In each of Problem 7 through 12, find approximate...Ch. 8.3 - In each of Problem 7 through 12, find approximate...Ch. 8.3 - In each of Problem 7 through 12, find approximate...Ch. 8.3 - In each of Problem 7 through 12, find approximate...Ch. 8.3 - Complete the calculation leading to the entries in...Ch. 8.3 - Confirm the results in Table 8.3.2 by executing...Ch. 8.3 - Consider the initial value problem y=t2+y2,y(0)=1....Ch. 8.3 - Consider the initial value problem
Draw a...Ch. 8.3 - In this problem, we establish that the local...Ch. 8.3 - Consider the improved Euler method for solving the...Ch. 8.3 - In each of Problems 19 and 20, use the actual...Ch. 8.3 - In each of Problems 19 and 20, use the actual...Ch. 8.3 - In each of Problems 21 through 24, carry out one...Ch. 8.3 - In each of Problems 21 through 24, carry out one...Ch. 8.3 - In each of Problems 21 through 24, carry out one...Ch. 8.3 - In each of Problems 21 through 24, carry out one...Ch. 8.4 - In each of Problems 1 through 6, determine...Ch. 8.4 - In each of Problems 1 through 6, determine...Ch. 8.4 - In each of Problems 1 through 6, determine...Ch. 8.4 - In each of Problems 1 through 6, determine...Ch. 8.4 - In each of Problems 1 through 6, determine...Ch. 8.4 - In each of Problems 1 through 6, determine...Ch. 8.4 - Consider the example problemwith the initial...Ch. 8.4 - Consider the initial value problem...Ch. 8.P1 - Assume that the shape of the dispensers are...Ch. 8.P1 - After viewing the results of her computer...Ch. 8.P2 - Show that Euler’s method applied to the...Ch. 8.P2 - Simulate five sample trajectories of Eq. (1) for...Ch. 8.P2 - Use the differential equation (4) to generate an...Ch. 8.P2 - Variance Reduction by Antithetic Variates. A...
Additional Math Textbook Solutions
Find more solutions based on key concepts
Trigonometric limits Use Theorem 3.11 to evaluate the following limits. 11. limx0tan5xx
Calculus: Early Transcendentals (2nd Edition)
Find how many SDs above the mean price would be predicted to cost.
Intro Stats, Books a la Carte Edition (5th Edition)
Of a group of patients having injuries, 28% visit both a physical therapist and a chiropractor while 8% visit n...
Probability And Statistical Inference (10th Edition)
A child has 12 blocks, of which 6 are black, 4 are red, 1 is white, and 1 is blue. If the child puts the blocks...
A First Course in Probability (10th Edition)
CHECK POINT I Let p and q represent the following statements: p : 3 + 5 = 8 q : 2 × 7 = 20. Determine the truth...
Thinking Mathematically (6th Edition)
Knowledge Booster
Learn more about
Need a deep-dive on the concept behind this application? Look no further. Learn more about this topic, subject and related others by exploring similar questions and additional content below.Similar questions
- a. Given: x=360 inches and y=5.10 inches. Compute Dia A to 2 decimal places. b. Given: Dia A=8.76 inches and x=10.52 inches. Compute t to 2 decimal places.arrow_forward1.Find the roots of the equation f(x) = x³ – x – 1 using xo = 1 %3D For 4 iteration by fixed points methodarrow_forward2. You work for an aerospace company which is due to start testing a design in a supersonic wind tunnel. It is a two-dimensional, blow down wind tunnel with rectangular cross-section. The width of the wind tunnel is 100mm and the height at key points is provided in Figure Q2a. At x = 0 mm, the stagnation pressure is always 175 kPa and the stagnation temperature is 300 K. Prior to your test entry, you are given calibration data measured using a Pitot probe mounted in the centre of the test section during wind tunnel start up when the wind tunnel is empty. Your task is to evaluate whether the readings provided by the Pitot probe are sensible to check whether it is working correctly. You can neglect boundary-layer effects throughout this question.arrow_forward
- Use Gauss-Seidel method to solve for x, X2, X3 until the relative error falls below 5% Repeat with overrelaxation 2=1.2 y [I- ={-34 2 -6 -1 -38 -3 -1 7 X2 -8 1 -2 X3 -20arrow_forward#1 Solve the following non-linear equations manually using: a) Bisection Method (5 iterations)arrow_forwardA hand-held calculator will suffice for Problems 1 through 10, where an initial value problem and its exact solution are given. Apply the improved Euler method to approximate this solution on the interval [0, 0.5] with step size h = 0.1. Construct a table showing four-decimal-place values of the approximate solution and actual solution at the points a = 0.1, 0.2, 0.3, 0.4, 0.5. y' = -3x²y, y(0) = 3; y(x) = 3e-² Answer Note: In Problems 2 through 10, we give the value of x, the corresponding improved Euler value of y, and the true value of y. 0.5, 2.6405, 2.6475arrow_forward
- If you are asked to apply Euler's method with (xo, Yo) = (1, 7) and step size h=0.5, how many steps does it take to find an approximation for the value of the solution at x = 3?arrow_forwardI need a complete solution for 2 problems mentioned in the pictures below, these are from the Numerical-Analysis subject. In case it has to be solved through programming (eg Matlab), just provide me the correct theory & algorithm that can be used for the corresponding excercise. Thank you.arrow_forwardUse Euler's method with step size 0.1 to estimate y(0.4), where y() is the solution of the problem y = x + y²₁ initial values y(0) = 0 with Make the iterations and create the entire table in excelarrow_forward
- In the initial value problem, use Euler's method with step sizes h=0.1,0.02, 0.004, and 0.0008 to approximate to four decimal places the values of the solution at ten equaly spaced points of the given interval. Make a table showing the approximate values. y =x+3y, y(0)= 1, 05x52 (Do not round unti the final answer. Then round to four decimal places as needed.) 0.2 0.4 0.6 0.8 1 1.2 14 1.6 1.8 Euler Approximation, h=0.1 Euler Approximation, h=0.02 Euler Approximation, h=0.004 Euler Approximation, h=0.0008 O Oarrow_forwardPls ans problem Number 1arrow_forwardApply Optimal Runge-Kutta method and obtain 9₁, I₂ and y for the problem 3 y = = + 2y y(a)=1 , h = 0.1arrow_forward
arrow_back_ios
SEE MORE QUESTIONS
arrow_forward_ios
Recommended textbooks for you
Mathematics For Machine TechnologyAdvanced MathISBN:9781337798310Author:Peterson, John.Publisher:Cengage Learning,
Mathematics For Machine Technology
Advanced Math
ISBN:9781337798310
Author:Peterson, John.
Publisher:Cengage Learning,
01 - What Is A Differential Equation in Calculus? Learn to Solve Ordinary Differential Equations.; Author: Math and Science;https://www.youtube.com/watch?v=K80YEHQpx9g;License: Standard YouTube License, CC-BY
Higher Order Differential Equation with constant coefficient (GATE) (Part 1) l GATE 2018; Author: GATE Lectures by Dishank;https://www.youtube.com/watch?v=ODxP7BbqAjA;License: Standard YouTube License, CC-BY
Solution of Differential Equations and Initial Value Problems; Author: Jefril Amboy;https://www.youtube.com/watch?v=Q68sk7XS-dc;License: Standard YouTube License, CC-BY