If `x` is so small that `x^2` and higher powers of x may be neglected then `((1-3x)^(1//2) (1+x) ^(2//3))/((1-x)^(1//2))`

If x is so small that x^(3) and higher powers of x may be neglected, then ((1+x)^(3//2)-(1+(1)/(2)x)^(3))/((1-x)^(1//2)) may be approximated as:

If x is so small that x^(3) and higher powers of x may be neglected, then ((1+x)^(3//2)-(1+1/2 x)^3)/((1-x)^(1//2)) may be approximated as

If x is so small that x^3 and higher powers of x may be neglectd, then ((1+x)^(3//2)-(1+1/2x)^3)/((1-x)^(1//2)) may be approximated as a. 3x+3/8x^2 b. 1-3/8x^2 c. x/2-3/xx^2 d. -3/8x^2

If x is so small that x^3 and higher powers of x may be neglected, then ((1+x)^(3/2)-(1+1/(2x))^3)/((1-x)^(1/2)) may be approximated as A. 3x+3/8x^2 B. 1-3/8x^2 C. x/2-3/x^2 D. -3/8x^2

If x is so small that x^(3) and higher powers of x may be neglectd,then ((1+x)^(3/2)-(1+(1)/(2)x)^(3))/((1-x)^(1/2)) may be approximated as 3x+(3)/(8)x^(2) b.1-(3)/(8)x^(2) c.(x)/(2)-(3)/(x)x^(2) d.-(3)/(8)x^(2)

If x is so small that x^(3) and higher power of x may neglected, then ((1 + x)^(3/2) - (1 + 1/2x)^(3))/(1 - x)^(1/2) may be approximated as

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))