**GLOBAL ALGORITHM FOR STRONG LEHMER PAIRS II**”Number theory is not pure Mathematics. It is the Physics of the world of Numbers.”

The mass of each and every boson is generated by the Riemann zeta function. Each and every subquark, quark, meson, baryon and proton vibrates in resonance with the distribution of the zeros of the zeta function.

Therefore, to understand the hidden template of the zeta zeros is true quantum physics.

One of the recent attempts to understand the distribution of the zeros of the zeta function:

https://www.scribd.com/document/217732/The-Riemann-Hypothesis"It is evident that all odd or even (whole number) values of k produce an excess of nines=1 and therefore cannot generate a zeta function zero. Further, it is true that all zeros occur from the fractional values of the k’s; when an unscheduled “Excess of Nines =1” occurs, so does a “Lehmer event”. The plotted data briefly passes through an excess of nines =1, wavers, then becomes fractional again, crosses the real axis and produces a zero. These events are cyclic, happening many times along the path to infinity."

The zeros of the factor

are distributed as follows: an infinite number of complex simple zeros at

where n is a nonzero integer. Whenever a zero of the zeta function produces an "unscheduled" excess of nines=1 phenomenon, then the Lehmer event will be generated as well.

However, the author of the paper does not offer any precise equations which can explain the location of the strong Lehmer pairs (the constant 1016 is simply 254 x 4 = 1016, 63.5 x 4 = 254).

7005.0629 and 7005.10056, zeta zeros 6709 and 6710

2π/ln2 x 1 = 9.064720284

2π/ln2 x 2 = 18.129440568

2π/ln2 x 3 = 27.194160852

2π/ln2 x 4 = 36.258881136

2π/ln2 x 5 = 45.32360142

2π/ln2 x 6 = 54.388321704

2π/ln2 x 7 = 63.453041988

2π/ln2 x 8 = 72.517762272

2π/ln2 x 9 = 81.582482556

2π/ln2 x 10 = 90.64720284

2π/ln2 x 11 = 99.711923124

2π/ln2 x 12 = 108.776643408

2π/ln2 x 13 = 117.841363692

2π/ln2 x 14 = 126.906083976

2π/ln2 x 15 = 135.97080426

2π/ln2 x 16 = 145.035524544

(an addition of 1 to the decimal part after the multiplication by 16)

772 x 2π/ln2 = 6997.964

773 x 2π/ln2 = 7007.0288

17143.786 and 17143.8218, zeta zeros 18858 and 18859

1891 x 2π/ln2 = 17141.386

1892 x 2π/ln2 = 17150.45

1885 x 2π/ln2 = 17086.9977

1886 x 2π/ln2 = 17096.062

Therefore, a more in-depth analysis is needed to uncover the hidden symmetries at work in the Lehmer pairs event.

16 x 28 = 448

448 x 2π/ln2 = 4060.99469

448 + 16 = 464

464 x 2π/ln2 = 4206.0302

16 x 55 = 880

880 x 2π/ln2 = 7976.954

896 x 2π/ln2 = 8121.989

912 x 2π/ln2 = 8264.025

1808 x 2π/ln2 = 16389.014

1888 x 2π/ln2 = 17114.192

2254 x 2π/ln2 = 20450.0089

Multiplying 2π/ln2 by 32, 64, 96..., by 64, 128, 192..., by 48, 96, 144..., does not produce the produce the needed results.

However, if we multiply the constant 2π/ln2 by 192:

768 x 2π/ln2 = 6961.705

910 x 2π/ln2 = 8702.131

If we multiply the constant 2π/ln2 by 128:

1792 x 2π/ln2 = 16243.9787

1920 x 2π/ln2 = 17404.263

Now, we can see that a strong Lehmer pair will be located between 6961.705 and 8702.131, and between 16243.9787 and 17404.263.

In much the same way, multiplying by 32000, we get:

160000 x 2π/ln2 = 1430355.245

640000 x 2π/ln2 = 5801420.982

672000 x 2π/ln2 = 6091492.031

One or more strong Lehmer pairs must be located between 5801420.982 and 6091492.031.

Strong Lehmer pairs 7954022502373.43289015387 and 7954022502373.43289494012.

640000000000 x 2π/ln2 = 5801420981538.8081

960000000000 x 2π/ln2 = 8702131472308.212

A strong Lehmer pair (or more) must be located between 5801420981538.8081 and 8702131472308.212: 5907264585921.69036356 and 5907264585921.6903535, and 7954022502373.43289015387 and 7954022502373.43289494012.

Now, all we need is an accurate criterion by which to locate these strong Lehmer pairs.

Rotate a model of the Gizeh pyramid clockwise by 90 degrees.

To the right, we have another Gizeh pyramid (the shadow of the first pyramid), which is rotated anticlockwise by 90 degrees, the two pyramid frustums will be facing each other.

Total distance from one subterranean chamber to the other: 534 units.

In the center we have the two apexes of the pyramids forming a merkabah geometrical figure.

Two sothic triangles embed each of the two apexes: the height of the triangle will measure exactly 14.134725 units (the value of the first zero of Riemann's zeta function).

Two other sothic triangles will embed the top portion of the frustums of the two pyramids, again the height of these triangles will measure 14.134725 units.

The distance separating the two sets of triangles, located to the left of the center of the merkabah, will measure exactly 63.6363... units (the sacred cubit distance).

In the same manner the distance separating the two sets of triangles located to the right of the center of the merkabah will also measure 63.6363... units.

75 x π/ln2 = 339.9270107

534.171sc = 339.9270107

534 = (2 x 174.53 - two pyramids measured from the subterranean chamber to the top) + (4 x 14.134725) + (2 x 63.636363)

174.53 = 3.36 + 30 + 27.2 + 16.17 + 29.2 + 63.63636 + 5.24

27.2 distance to the queen chamber roof

27.2 + 16.17 = 43.37 distance to the bottom of the king chamber floor

33.36 height of the subterranean chamber

33.36 = 3.36 + 10.542 + 19.458

75 x π/ln2 = 339.9270107

2000 x π/ln2 = 9064.720284 = 26.666666 x 339.9270107

4000 x π/ln2 = 18129.44057 = 53.333333 x 339.9270107

Other multipliers are: 80, 106.66666, 136.1 (or 135.9708), 160, 213.33333...

7005.0629 and 7005.10056

2000 x π/ln2 = 9064.720284

9064.720284 = 26.666666 x 339.9270107 = 26.66666sc x 534

26.66666sc = 16.968

534 = 174.53 + 14.134725 + 63.636363 + 14.134725 + 14.134725 + 63.636363 + 14.134725 + 174.53

9064.720284 = 16.968 x (174.53 + 14.134725 + 63.636363 + 14.134725 + 14.134725 + 63.636363 + 14.134725 + 174.53)

9064.720284

2961.425 (174.53 x 16.968)

4281.044 (174.53 x 16.968 + 14.134725 x 16.968 + 63.636363 x 16.968)

4760.72 (4281.044 + 2 x 14.134725 x 16.968)

5840.5 (4760.72 + 63.636363 x 16.968)

6080.34 (5840.5 + 14.134725 x 16.968)

7249.03 (6080.34 + 5.24 x 16.968 + 63.636363 x 16.968)

6169.2511 (6080.34 + 5.24 x 16.968)

6974.53 (6169.2511 + 47.459 x 16.968)

(63.63636 - 16.1773 = 47.459)

7087.0647 (6974.53 + 6.6319 x 16.968)

(16.1773 - 9.5454 = 6.6319)

7009.3 (7087.0647 - 1.68632 x 16.968 - 1.2576 x 16.968 - 0.93895 x 16.968 - 0.7 x 16.968)

2.74985 - 0.7 = 2.04985

2.04985

0.521768

0.307477

0.20498

0.10249

0.20498 x 16.968 = 3.4781

7009.3 - 3.4781 = 7005.822

7009.3 - 0.10249 x 16.968 = 7007.56

9064.72028

2719.416

2307.234

1812.944

906.472

(subdivisions for the first zeta function, 534 - 160 - 136.1 - 53.4 - 26.7)

8158.248

7251.776

6757.3863

6345.3

(subdivisions for the second zeta function, 9064.72028 - 906.472 = 8158.248)

7251.776 - 6757.386 = 494.39

494.39

148.317

346.073

103.822

88.089

6757.386 + 148.317 + 103.822 = 7009.525

17143.786 and 17143.8218

4000 x π/ln2 = 18129.44057

14499.77 (174.53 x 33.94 + 4 x 14.134725 x 33.94 + 2 x 63.636363 x 33.94 + 5.24 x 33.94 + 63.6363 x 33.94)

15490.82 (14499.77 + 29.2 x 33.94)

16962.8 (15490.82 + 43.37 x 33.94)

17140.64 (16962.8 + 5.24 x 33.94)

1891 x 2π/ln2 = 17141.386

400 x π/ln2 = 1812.944

18129.44

16316.496

400 x π/ln2 = 534 x 3.394

16908.85 (16316.496 + 174.53 x 3.394)

16.956.824 (16908.85 + 14.134725 x 3.394)

17172.8 (16908.85 + 63.6363 x 3.394)

40 x π/ln2 = 534 x 0.3394

17041.45

17222.694

1900 x 2π/ln2 = 17222.968

17100.685 (17041.45 + 174.53 x .3394)

17127.081 (17100.685 + 14.134725 x 0.3394 + 63.6363 x 0.3394)

17131.88 (17127.081 + 14.134725 x 0.3394)

1890 x 2π/ln2 = 17132.321

17158.676 (17131.88 + 14.134725 x 0.3394 + 63.636363 x 0.3394)

1893 x 2π/ln2 = 17159.51