A particle located in one dimensional potential field has potential energy function U(x) = $\frac{a}{x^{2}} - \frac{b}{x^{3}}$ $a/x^2 - b/x^3$ where a and b are positive constants. The position of equilibrium corresponds to x =?

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A particle located in one dimensional potential field has potential energy function U(x) = $\frac{a}{x^{2}} - \frac{b}{x^{3}}$ $a/x^2 - b/x^3$ where a and b are positive constants. The position of equilibrium corresponds to x =?

(1) $\frac{3 a}{b}$ $(3a)/b$

(2) $\frac{2 b}{3 a}$ $(2b)/(3a)$

(3) $\frac{2 a}{3 b}$ $(2a)/(3b)$

(4) $\frac{3 b}{2 a}$ $(3b)/(2a)$

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Answer 1 · 2017-09-07T18:04:04

(4) $x = \frac{3 b}{2 a}$ $x = (3b)/(2a)$

Explanation:

You are looking for a point where the force on the system goes to zero.

$F (x) = - \frac{d}{d x} U (x)$ $F(x) = -d/dxU(x)$

$- \frac{d}{d x} (\frac{a}{x^{2}} - \frac{b}{x^{3}}) = \frac{- 3 b + 2 a x}{x^{4}}$ $-(d)/(dx)(a/x^2 - b/x^3) = (-3 b + 2 a x)/x^4$

By inspection notice that the numerator will be zero when both of those terms are equal. One of the terms includes an $x$ $x$ . Determine when:

$3 b = 2 a x$ $3b = 2ax$

$\frac{3 b}{2 a} = x$ $(3b)/(2a) = x$

The functional form of $F (x)$ $F(x)$ will look like this:
graph{(-3 + 2 x)/x^4 [-1, 5, -0.1, 0.2]}
However the particular magnitudes will change depending on the constants $a$ $a$ and $b$ $b$ . Here I've set them both to $1$ $1$ . The equation crosses zero at a point where $x = \frac{3}{2}$ $x = 3/2$ .

The graph of $U (x)$ $U(x)$ looks like this:
graph{1/x^2 - 1/x^3 [-1, 5, -0.1, 0.2]}

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A particle located in one dimensional potential field has potential energy function U(x) = $\frac{a}{x^{2}} - \frac{b}{x^{3}}$ $a/x^2 - b/x^3$ where a and b are positive constants. The position of equilibrium corresponds to x =?

(1) $\frac{3 a}{b}$ $(3a)/b$

(2) $\frac{2 b}{3 a}$ $(2b)/(3a)$

(3) $\frac{2 a}{3 b}$ $(2a)/(3b)$

(4) $\frac{3 b}{2 a}$ $(3b)/(2a)$

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A particle located in one dimensional potential field has potential energy function U(x) = ax2−bx3a/x^2 - b/x^3 where a and b are positive constants. The position of equilibrium corresponds to x =?

(1) 3ab(3a)/b (2) 2b3a(2b)/(3a) (3) 2a3b(2a)/(3b) (4) 3b2a(3b)/(2a)

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A particle located in one dimensional potential field has potential energy function U(x) = $\frac{a}{x^{2}} - \frac{b}{x^{3}}$ $a/x^2 - b/x^3$ where a and b are positive constants. The position of equilibrium corresponds to x =?

(1) $\frac{3 a}{b}$ $(3a)/b$

(2) $\frac{2 b}{3 a}$ $(2b)/(3a)$

(3) $\frac{2 a}{3 b}$ $(2a)/(3b)$

(4) $\frac{3 b}{2 a}$ $(3b)/(2a)$