If x is very small and neglecting x^(3) ...

If x is very small and neglecting `x^(3)` and higher powers of x then the expansion of `log(1+x^(2))-log(1+x)-log(1-x)` as ascending powers of x is

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The expansion of log.(1+x+x^(2))/(1-x+x^(2)) as ascending powers of x is

If higher powers of x^(2) are neglected, then the value of log(1+x^(2))-log(1+x)-log(1-x)=

If higher powers of x^(2) are neglected, then the value of log(1+x^(2))-log(1+x)-log(1-x)=

If |x|lt1 then the coefficient of x^(3) in the expansion of log(1+x+x^(2)) is ascending power of x is

If |x|lt1 , the coefficient of x^(3) in the expansion of log(1+x+x^(2)) in ascending power of x, is

If |x|lt1 then the coefficient of x^(3) in the expansion of log(1+x+x^(2)) is ascending power of x is

The coefficient of x^(6) in the expansion of log{(1+x)^(1+x)(1-x)^(1-x) } is

The coefficient of x^(6) in the expansion of log{(1+x)^(1+x)(1-x)^(1-x) } is

2log x-log(x+1)-log(x-1) is equals to

2log x-log(x+1)-log(x-1) is equals to

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