Materi Kalkulus I
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EXAMLE 8 Find the Maclaurin series for f ( x )=( 1+ x ) k , where k is any real number. f ( x )= ∑ n=0 N f ( x) n! =1 k + k ( 1) k−1 1 ! + k ( k−1)( 1 ) k−2 2 ! + k ( k −1)( k−2)( 1) k−2 3 ! Deret Binomial ( x +a ) n = ∑ k=0 n ( n k ) x k a n−k EXAMPLE 13 Find the first three nonzero terms in the Maclaurin series for (a) sin x and (b) tan x a)
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Transcript of Materi Kalkulus I
EXAMLE 8Find the Maclaurin series for , where k is any real number.
Deret Binomial
EXAMPLE 13Find the first three nonzero terms in the Maclaurin series for (a) and (b) a)