If |x| is so small that `x^4` and higher powers of x many be neglected , then find an approximate value of `root(4)(x^2 + 81) - root(4)(x^2 + 16)`

Prove that : If |x| is so small that x^(4) and higher powers of x may be neglected, then find the approximate value of root(4)(x^(2).+81)-root(4)(x^(2)+16).

Prove that : If |x| is so small that x^(2) and higher powers of x may be neglected, then find an approximate value of (sqrt(1+x)(1+4x)^(1/3))/((1+x^2)((1-3x)^2)^(1/3))

If |x| is so small that x^(2) and higher powers of x may be neglected then find the approx-imate values of the following (sqrt(4+x)+root(3)(8+x))/((1+2x)+(1-2x)^(-1//3))

If |x| is so small that x^(2) and higher powers of x may be neglected then find the approx-imate values of the following sqrt(4-x)(3-(x)/(2))^(-1)

If |x| is so small that x^2 and higher powers of x may be neglected, then an approximately value of ((1+(2)/(3)x)^(-3) (1-15x)^(-1//5))/((2-3x)^4) is

If |x| is so small that x^(2) and higher powers of x may be neglected then find the approx-imate values of the following ((8+3x)^(2//3))/((2+3x)sqrt(4-5x))