Use forward, backward and centered difference approximations to estimate the first derivative of: S(x)=x' -x at x = 3 using step size h = 1 Select one: а. Forward difference =8 , Backward difference =6, Centered Difference = 7 %3D b. Forward difference =6 , Backward difference =4, Centered Difference = 5 С. Forward difference =14 , Backward difference =6, Centered Difference = 7 d. Forward difference =3 , Backward difference =3, Centered Difference = 7
Use forward, backward and centered difference approximations to estimate the first derivative of: S(x)=x' -x at x = 3 using step size h = 1 Select one: а. Forward difference =8 , Backward difference =6, Centered Difference = 7 %3D b. Forward difference =6 , Backward difference =4, Centered Difference = 5 С. Forward difference =14 , Backward difference =6, Centered Difference = 7 d. Forward difference =3 , Backward difference =3, Centered Difference = 7
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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Transcribed Image Text:Use forward, backward and centered difference approximations to estimate the first
derivative of:
f(x)=x -x
at x = 3 using step size h = 1
%3D
Select one:
а.
Forward difference =8 , Backward difference =6, Centered Difference = 7
b.
Forward difference =6 , Backward difference =4, Centered Difference = 5
%3D
С.
Forward difference =14 , Backward difference =6, Centered Difference = 7
d.
Forward difference =3 , Backward difference =3, Centered Difference = 7
%3D
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