The numerical integral formulation of I = Sº f(x) dx using composite Simpson's 1/3rd rule is a. h/3 E?F(x2i-2) + 4f(x2i-1) + f(x2i)); h = (b – a)/n b. h/3 E?f(x2i-2) + 4f(x2i-1) + f (x2i)); h = (b – a)/(n + 1) c. h/3 ES(x2i-2) + 2f(x2i-1) + f(x2i)); h = (b – a)/n d. 2h/3 E/²F(x2i-2) + 4f (x2i-1) + f(x21)); h = (b – a)/n
The numerical integral formulation of I = Sº f(x) dx using composite Simpson's 1/3rd rule is a. h/3 E?F(x2i-2) + 4f(x2i-1) + f(x2i)); h = (b – a)/n b. h/3 E?f(x2i-2) + 4f(x2i-1) + f (x2i)); h = (b – a)/(n + 1) c. h/3 ES(x2i-2) + 2f(x2i-1) + f(x2i)); h = (b – a)/n d. 2h/3 E/²F(x2i-2) + 4f (x2i-1) + f(x21)); h = (b – a)/n
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:The numerical integral formulation of I = S" f(x) dx using composite
Simpson's 1/3rd rule is
a. h/3 E?F(x2i-2) + 4f(x2i-1) + f(x2i));h = (b – a)/n
b. h/3 E?F(x2i-2) + 4f(x2i-1) + f(x2i)); h = (b – a)/(n + 1)
c. h/3E²F(x2i-2) + 2f(x2i-1) + f (x2i)); h = (b – a)/n
d. 2h/3 EF(x2i-2) + 4f (x2i-1) + f (x21)); h = (b – a)/n
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