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Posted: **Thu Jul 14, 2022 2:44 pm**

: A Clamped Cubic Spline S For A Function F Is Defined By S X X 1 X 1 2 X 1 3a B X 2 C X 2 2 D X 2 3 1 X 22 X 3 Gi 1 (25.13 KiB) Viewed 35 times

A clamped cubic spline S for a function f is defined by S(x)={(x−1)+(x−1)2−(x−1)3a+b(x−2)+c(x−2)2−d(x−2)31≤x≤22≤x≤3 Given that f′(1)=f′(3) then a=1;b=0;c=−2;d=−5/3a=9;b=24;c=−22;d=67/3a=2;b=0;c=−2;d=5/3a=2;b=0;c=−2;d=−5/3

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A clamped cubic spline S for a function f is defined by S(x)={(x−1)+(x−1)2−(x−1)3a+b(x−2)+c(x−2)2−d(x−2)3​1≤x≤22≤x≤3​ Gi

A clamped cubic spline S for a function f is defined by S(x)={(x−1)+(x−1)2−(x−1)3a+b(x−2)+c(x−2)2−d(x−2)3​1≤x≤22≤x≤3​ Gi

A clamped cubic spline S for a function f is defined by S(x)={(x−1)+(x−1)2−(x−1)3a+b(x−2)+c(x−2)2−d(x−2)31≤x≤22≤x≤3 Gi

A clamped cubic spline S for a function f is defined by S(x)={(x−1)+(x−1)2−(x−1)3a+b(x−2)+c(x−2)2−d(x−2)31≤x≤22≤x≤3 Gi