If x is small so that `x^2` and higher powers can be neglected, then the approximately value for `((1-2x)^(-1) (1-3x)^(-2))/((1-4x)^(-3))` is

If x is so small such that its square and digher powers may be neglected then find the appoximate value of (1-3)^(1//2)+(1-x)^(5//3))/(4+x)^(1//2)

If x is so small such that its square and higher powers may be neglected, the find the value of ((1-2x)^(1//3)+(1+5x)^(-3//2))/((9+x)^(1//2))

If x is so small such that its square and higher powers may be neglected, then find the value of ((1-2x)^(1//3) + (1+ 5x)^(-3//2))/((9+x)^(1//2))

If |x| is so small that all terms containing x^2 and higher powers of x can be neglected , then the approximate value of ((3 - 5x)^(1//2))/((5 - 3x)^2), where x = (1)/(sqrt363) , is

If |x| is so small that x^2 and higher powers of x many be neglected , prove that ((1 + 7x)^(2/3) . (1 - 4x)^(-2))/((4 + 7x)^(1/2)) = 1/2 (1 + 283/24 x)

If |x| is so small that x^2 and higher powers of x may be neglected show that (sqrt(4 -x )) (3 - x/2)^(-1) = 2/3 (1 +(x)/(24))

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

If |x| is so small that x^2 and higher powers of x may be neglected show that ((1 -2/3 x)^(3//2) . (32 + 5x)^(1//5))/((3 - x)^3) = 2/27 (1 + (x)/(32))

If |x| is so small that x^2 and higher powers of x many be neglected , prove that sqrt(9 - 2x) (3 + (4x)/(5))^(-1) = 1 - 17/45 x

If |x| is so small that x^2 and higher powers of x may be neglected show that ((4 - 7x )^(1//2))/((3 + 5x)^3) = 2/27 (1 - 47/8 x)