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The Bully Mnemonic Extension is a technique for remembering the exact number of meters that light travels in one second, and the approximate range of gravitational accelerations that occur on the surface of the Earth due to Newtonian gravity. The Bully Mnemonic Extension, when used in conjunction with the Bully Mnemonic, allows one to calculate a few physical quantities, including the number of meters in a light year.

The following relationships are encoded in the Bully Mnemonic Extension:

$${\displaystyle Speedoflightinvacuum=299,792,458\frac{m}{s}}$$

$${\displaystyle HighendofgravityonEart{h}^{\prime }ssurface\approx 9.86\frac{m}{s^2}}$$

$${\displaystyle MidrangegravityonEart{h}^{\prime }ssurface\approx 9.81\frac{m}{s^2}}$$

$${\displaystyle LowendofgravityonEart{h}^{\prime }ssurface\approx 9.76\frac{m}{s^2}}$$

The following relationship can be derived using the Bully Mnemonic Extension in conjunction with the Bully Mnemonic:

$${\displaystyle 1lightyear\approx 9,460,528,400,000,000meters}$$

Complete steps 1 and 2 of the The Bully Mnemonic to form integers a) and b) as shown below:

$${\displaystyle \begin{array}{ccccc}1& \text{2}& 3& \text{4}& 5\end{array}}$$

$${\displaystyle a)10330}$$ $${\displaystyle b)3055}$$

The Bully Mnemonic Extension will use two variants of integer a). The first variant will have 33 removed and replaced with 00. The second variant will have 330 removed and replaced with 22:

$${\displaystyle av1)10000}$$ $${\displaystyle av2)1022}$$ $${\displaystyle b)3055}$$

Multiply integers av2) and b) from Step 2.

$${\displaystyle 1022\times 3055=3122210}$$

Using Long Multiplication:

     3055
×    1022
————————————
     6110
    6110
   0000
  3055
————————————
  3122210

Drop the zero from the integer obtained in step 3, swap each 2 with 3, and swap each 1 with 9, to obtain integer f) shown below:

   312221
f) 293339

Multiply integer av2) from Step 2, and integer f) from step 4, to get the total number of meters that light travels in one second.

$${\displaystyle 1022\times 293339=299792458}$$

Using Long Multiplication:

         1022
×      293339
——————————————
        9198
       3066
      3066
     3066
    9198
   2044
——————————————
   299792458

Divide the speed of light obtained in step 5, by integers av1) and b) from step 2, to obtain a value for Earth's gravity:

$${\displaystyle \frac{299792458\frac{m}{s}}{10000\times 3055s}=\frac{299792458\frac{m}{s}}{30550000s}\approx 9.81\frac{m}{s^2}}$$

In terms of Long Multiplication, 30550000 and 9.81 are approximately related to 299792458 as follows:

   30550000
×         9.81
————————————
     305500.00
   24440000.0
  274950000
————————————
  2997.....

The range of gravitational accelerations that occur on the surface of the Earth, due to Newtonian gravity, can be approximated by repeating step 6 with the denominator increased or decreased by half a percent:

$${\displaystyle \frac{299792458\frac{m}{s}}{(30550000s)+(150000s)}=\frac{299792458\frac{m}{s}}{30700000s}\approx 9.76\frac{m}{s^2}}$$

$${\displaystyle \frac{299792458\frac{m}{s}}{(30550000s)-(150000s)}=\frac{299792458\frac{m}{s}}{30400000s}\approx 9.86\frac{m}{s^2}}$$

As shown in steps 8 and 9 of the Bully Mnemonic, the earth's standard gravitational parameter (μ = MG) divided by the speed of light cubed, can be approximated as follows:

$${\displaystyle 10^{10}\times \frac{{\mu }_{earth}}{c^3}=\frac{3055s}{2\times (10330-4.6316922)}\approx \frac{3055s}{2\times 10330}}$$

Rearranging terms:

$${\displaystyle {\mu }_{earth}=G{M}_{earth}=\frac{c^3\times 10^{-10}\times 3055s}{2\times (10330-4.6316922)}\approx \frac{c^3\times 10^{-10}\times 3055s}{2\times 10330}}$$

As shown in step 6 above, a typical gravitational acceleration on earth is:

$${\displaystyle g_{earth}=\frac{c}{30550000s}=\frac{299792458\frac{m}{s}}{30550000s}\approx 9.81\frac{m}{s^2}}$$

Taking a ratio of the standard gravitational parameter with the gravitational acceleration:

$${\displaystyle \frac{{\mu }_{earth}}{g_{earth}}=\frac{30550000s\times c^3\times 10^{-10}\times 3055s}{c\times 2\times (10330-4.6316922)}\approx \frac{30550000s\times c^3\times 10^{-10}\times 3055s}{c\times 2\times 10330}}$$

Simplifying Terms:

$${\displaystyle \frac{{\mu }_{earth}}{g_{earth}}=\frac{(c\times 3.055s{)}^2}{2\times (10330-4.6316922)}\approx \frac{(c\times 3.055s{)}^2}{2\times 10330}}$$

It turns out that the radius of the earth can be approximated as the square root of the ratio of standard gravitational parameter with the gravitational acceleration. Using the approximation obtained in step 8:

$${\displaystyle r_{earth}\approx \sqrt{\frac{{\mu }_{earth}}{g_{earth}}}\approx \sqrt{\frac{(c\times 3.055s{)}^2}{2\times 10330}}\approx \frac{c\times 3.055s}{\sqrt{2\times 10330}}=6371km}$$