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Question:
If $x$ is numerically so small so that $x^{2}$ and higher powers of $x$ can be neglected, then $\left(1+\frac{2 x}{3}\right)^{3 / 2} \cdot(32+5 x)^{-1 / 5}$ is approximately equal to
If $x$ is numerically so small so that $x^{2}$ and higher powers of $x$ can be neglected, then $\left(1+\frac{2 x}{3}\right)^{3 / 2} \cdot(32+5 x)^{-1 / 5}$ is approximately equal to
Updated On: May 22, 2024
- $\frac{32+31 x}{64}$
- $\frac{31+32 x}{64}$
- $\frac{31-32 x}{64}$
- $\frac{1-2 x}{64}$
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Solution and Explanation
$\left(1+\frac{2 x}{3}\right)^{3 / 2}(32+5 x)^{-1 / 5}$
$=\left[1+\frac{3}{2}\left(\frac{2 x}{3}\right)\right](32)^{-1 / 5}\left(1+\frac{5}{32} x\right)^{-1 / 5}$
(Neglect higher powers of x)
$=[1+x] 2^{-1}\left[1-\frac{1}{5}\left(\frac{5}{32}\right) x\right]$
(Neglect higher powers of x)
$=\frac{1}{2}(1+x)\left(1-\frac{x}{32}\right)$
$=\frac{(1+x)(32-x)}{64}=\frac{32+31 x}{64}$
(Neglect $x^{2}$ term)
$=\left[1+\frac{3}{2}\left(\frac{2 x}{3}\right)\right](32)^{-1 / 5}\left(1+\frac{5}{32} x\right)^{-1 / 5}$
(Neglect higher powers of x)
$=[1+x] 2^{-1}\left[1-\frac{1}{5}\left(\frac{5}{32}\right) x\right]$
(Neglect higher powers of x)
$=\frac{1}{2}(1+x)\left(1-\frac{x}{32}\right)$
$=\frac{(1+x)(32-x)}{64}=\frac{32+31 x}{64}$
(Neglect $x^{2}$ term)
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Concepts Used:
Binomial Expansion Formula
The binomial expansion formula involves binomial coefficients which are of the form
(n/k)(or) nCk and it is calculated using the formula, nCk =n! / [(n - k)! k!]. The binomial expansion formula is also known as the binomial theorem. Here are the binomial expansion formulas.
This binomial expansion formula gives the expansion of (x + y)n where 'n' is a natural number. The expansion of (x + y)n has (n + 1) terms. This formula says:
We have (x + y)n = nC0 xn + nC1 xn-1 . y + nC2 xn-2 . y2 + … + nCn yn
General Term = Tr+1 = nCr xn-r . yr
- General Term in (1 + x)n is nCr xr
- In the binomial expansion of (x + y)n , the rth term from end is (n – r + 2)th .
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