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Question
Write the Maclaurin series expansion of the following functions:
cos x
Solution
Let f(x) = cos x
f(x) = cos x, f(0) = 1
f'(x) = – sin x, f'(0) = 0
f”(x) = – cos x, f”(0) = –1
f”'(x) = sin x, f”'(0) = 0
fIV(x) = cos x, fIV(0) = 1
fV(x) = – sin x, fV(0) = 0
fVI(x) = – cos x, fVI(0) = –1
Maclaurin ‘s expansion is
f(x) = `sum_("n" = 0)^x ("f"^((x))(0) x^"n")/("n"!)`
= `"f"(0) + ("f'"(0))/(1!) x + ("f''"(0)x^2)/(2!) + ... + "f" ("f"^(("n"))(0)x^"n")/("n"!) + ...`
∴ cos x = `1 + 0 - 1/(2!) x^2 + 0 + 1/(4!) x^4 + 0 - 1/(6!) x^6 + ...`
cos x = `1 = x^2/(2!) + x^4/(4!) - x^6/(6!) + ...`
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