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

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 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 that x^(2) and higher powers of x can be neglected, then the approximate value of (1 + (3)/(4)x )^((1)/(2)) (1 - (2x)/(3))^(-2) is

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 such that its square and higher powers may be neglected then find the approximate value of ((1-3x)^(1//2)+(1-x)^(5//3))/((4+x)^(1//2))

Prove that : If |x| is so small that x^(3) and higher powers or x can be neglected, find approximate value of ((4-7x)^(1//2))/((3+5x)^(3)) .

If |x| is so small that x^(2) and higher power of x may be neglected then the approximate value of ((4+x)^((1)/(2))+(8-x)^((1)/(3)))/((1-(2x)/(3))^((3)/(2))) when x=(6)/(25) 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)