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Let's go through a units example problem for Newton's law of universal gravitation from [1] with some updated modern values.
Show that  has the value
 . If the unit for mass is the pound, the unit for length is the foot, the unit for time is the seconds and the unit for force is the poundal. One foot contains  [2] and one pound is
 [2] and the Gravitational constant is
![$6.67430 \times 10^{-8} \,\, [dyn] [cm^2] [g^{-2}]$](https://images.physicslibrary.org/cache/objects/988/l2h/img5.png "$6.67430 \times 10^{-8} \,\, [dyn] [cm^2] [g^{-2}]$") [2].
For this problem Kellogg is referencing  as a constant of proportionality in Newton's law of universal gravitation whose value depends solely on the units chosen.
The answer to this problem is a straight forward unit conversion. We start with the value of the Gravitaitonal constant in CGS units and convert to FPS units
Let's convert out the dyn first to fundamental units, 1 dyn has units
so for CGS units
Given the unit conversions in the problem statement, we can then easily convert to FPS units
Multiplying out and cancelling terms yeilds
Noting that a poundal is
![$[ft][lb][s^{-2}]$](https://images.physicslibrary.org/cache/objects/988/l2h/img13.png "$[ft][lb][s^{-2}]$")
- 1
- Kellogg, Oliver Dimon. Foundations of potential theory. 1929. Berlin [u.a.]: Springer.
- 2
- The NIST Reference on Constants, Units, and Uncertainty
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![[parent]](https://images.physicslibrary.org/images/uparrow.png)
![$\displaystyle 6.67430 \times 10^-8 \,\,\frac{ [dyn] [cm^2]}{ [g^{2}]}. $](https://images.physicslibrary.org/cache/objects/988/l2h/img8.png "$\displaystyle 6.67430 \times 10^-8 \,\,\frac{ [dyn] [cm^2]}{ [g^{2}]}. $")
![$\displaystyle [dyn] = \frac{ [g][cm]}{[s^2]},$](https://images.physicslibrary.org/cache/objects/988/l2h/img9.png "$\displaystyle [dyn] = \frac{ [g][cm]}{[s^2]},$")
![$\displaystyle 6.67430 \times 10^{-8} \,\, \frac{ [g][cm]}{[s^2]} \frac{ [cm^2]}{ [g^{2}]} = 6.67430 \times 10^{-8} \,\, \frac{ [cm^3]}{ [g][s^2]}.$](https://images.physicslibrary.org/cache/objects/988/l2h/img10.png "$\displaystyle 6.67430 \times 10^{-8} \,\, \frac{ [g][cm]}{[s^2]} \frac{ [cm^2]}{ [g^{2}]} = 6.67430 \times 10^{-8} \,\, \frac{ [cm^3]}{ [g][s^2]}.$")
![$\displaystyle 6.67430 \times 10^{-8} \,\, \frac{ [cm^3]}{ [g][s^2]} = 6.67430 \... ...c{ [cm^3]}{ [g][s^2]} \frac{[ft^3]}{30.48^3 [cm^3]} \frac{453.592 [g]}{[lb]} . $](https://images.physicslibrary.org/cache/objects/988/l2h/img11.png "$\displaystyle 6.67430 \times 10^{-8} \,\, \frac{ [cm^3]}{ [g][s^2]} = 6.67430 \... ...c{ [cm^3]}{ [g][s^2]} \frac{[ft^3]}{30.48^3 [cm^3]} \frac{453.592 [g]}{[lb]} . $")
![$\displaystyle 1.0691 \times 10^{-9} \,\, \frac{[ft^3]}{[lb][s^2]}.$](https://images.physicslibrary.org/cache/objects/988/l2h/img12.png "$\displaystyle 1.0691 \times 10^{-9} \,\, \frac{[ft^3]}{[lb][s^2]}.$")
![$\displaystyle 1.0691 \times 10^{-9} \,\, \frac{[ft^3]}{[lb][s^2]} =1.0691 \time... ...]} \frac{[ft^2]}{[lb]} = 1.0691 \times 10^{-9} \,\, \frac{[pdl][ft^2]}{[lb^2]}.$](https://images.physicslibrary.org/cache/objects/988/l2h/img14.png "$\displaystyle 1.0691 \times 10^{-9} \,\, \frac{[ft^3]}{[lb][s^2]} =1.0691 \time... ...]} \frac{[ft^2]}{[lb]} = 1.0691 \times 10^{-9} \,\, \frac{[pdl][ft^2]}{[lb^2]}.$")