How do you find the Maclaurin series for #tan x# centered at 0?

1 Answer
Shwetank Mauria
Apr 5, 2017

Maclaurin series for #tanx# centered at #0# is

#x+x^3/3+(2x^5)/15+(17x^5)/315+.....#

Explanation:

Maclaurin series for #f(x)# centered at #a# is

#f(x)=f(a)+(x-a)f'(a)+(x-a)^2/(2!)f''(a)+(x-a)^3/(3!)f'''(a)+(x-a)^4/(2!)f''''(a)+...#

Hence for #f(x)=tanx#, and as #f'(x)=sec^2x#, we have #f'(0)=sec^2 0=1#;
as #f''(x)=2secx xx secxtanx=2sec^2xtanx#, #f''(0)=2sec^2 0tan0=0#,
as #f'''(xx)=2sec^4x+2sec^2xtan^2x# and #f'''(0)=2#

Similarly we can find subsequent terms.

Hence Maclaurin series for #tanx# centered at #0# is

#x+x^3/3+(2x^5)/15+(17x^5)/315+.....#

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