[CLO3] When using general method to derive second-order forward-difference formula for f'(x) using Newton polynomials we will have the equation: P'(to) = a1 + a2(to - t;) (Enter your answer carefully in the textboxes, use ^ for power and * for multiplication and do not use spaces within your answer) a) The values of to, t1, and t2 in terms of x and h will equal: to = %3D t2 = b) This equation P'(to) = a1 + a2(to - t;) will be equivalent to: P'(X) =

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
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[CLO3] When using general method to derive second-order forward-difference
formula for f'(x) using Newton polynomials we will have the equation: P'(to) = a1
+ a2(to - t;)
(Enter your answer carefully in the textboxes, use ^ for power and * for
multiplication and do not use spaces within your answer)
a)
The values of to, t1, and t2 in terms of x and h will equal:
to
t2 =
b)
This equation P'(to) = a¡ + a2(to - t1) will be equivalent to:
P'(x) =
||
||
||
Transcribed Image Text:[CLO3] When using general method to derive second-order forward-difference formula for f'(x) using Newton polynomials we will have the equation: P'(to) = a1 + a2(to - t;) (Enter your answer carefully in the textboxes, use ^ for power and * for multiplication and do not use spaces within your answer) a) The values of to, t1, and t2 in terms of x and h will equal: to t2 = b) This equation P'(to) = a¡ + a2(to - t1) will be equivalent to: P'(x) = || || ||
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