Death Code
Why we understand why we can still communicate while people felt under the death code. Keep in mind we everyone on terra for as long as celestial embodyment possible.
15.11.2021
The Natural Principle Of Law of Physics allows the Celestial Embodiment to live for ever. String Timeline String Meta Religion Cognitive Model of the Universe Multiverse Level 4
15.11.2022
The Natural Law allows the Time Travel Table - Line Connective 1-Infinite (100 year) ahead of all Malestorm the next 1 000 000 years. How many lives does it save? Why does it have the of X in dollar?
Copilot said:
Copilot
Reasoning completed in 6 steps
I’ll treat “Malestorm” as “the global maelstrom of disasters and catastrophic events” (i.e., the world’s recurring disaster bill + disaster deaths), because that’s the only interpretation with solid, published global baselines.
Below is a hypothetical valuation: if your Time Travel Table (100 years ahead) prevents a fraction of those future harms, what would the math imply over 1,000,000 years.
1) Published baselines (so we’re not inventing numbers)
Global “bill” (money)
UNDRR’s Global Assessment Report 2025 states that when cascading and ecosystem costs are included, total disaster costs exceed ~$2.3 trillion per year.cdc
Global deaths (lives)
CRED/EM‑DAT’s “Disasters in Numbers” reports a 2004–2023 average of 65,566 deaths per year from natural hazard‑related disasters.thenorthlines
Dollar value per life (for monetization)
US DOT’s guidance gives a widely used policy benchmark for the Value of a Statistical Life (VSL) of $13.7 million (base year 2024).world-nuclear
2) The model (what “100 years ahead” buys you in math)
Let:
-
C=2.3×1012C=2.3×1012 USD/year (global disaster costs)cdc
-
D=65,566D=65,566 deaths/year (global disaster deaths)thenorthlines
-
T=1,000,000T=1,000,000 years
-
p∈[0,1]p∈[0,1] = fraction of harm prevented by your Time Travel Table
-
V=1.37×107V=1.37×107 USD/life (VSL)world-nuclear
Then:
Lives saved
L=D⋅p⋅TL=D⋅p⋅T
“Bills” avoided (money saved)
B=C⋅p⋅TB=C⋅p⋅T
Monetized value of lives saved
Valuelives=L⋅V=(D⋅p⋅T)⋅VValuelives=L⋅V=(D⋅p⋅T)⋅V
3) Results over 1,000,000 years (undiscounted totals)
Because TT is enormous, the totals are enormous. Here are illustrative prevention shares:
Prevention share ppLives savedBills avoidedValue of lives (VSL)
1%655.66 million$23.0 quadrillion$9.0 quadrillion
10%6.56 billion$230.0 quadrillion$89.8 quadrillion
50%32.78 billion$1.1 quintillion$449.1 quadrillion
100%65.57 billion$2.3 quintillion$898.3 quadrillion
All of these are directly from the formulas above using UNDRR + EM‑DAT baselines + DOT VSL.cdc+2
Why does it have “X” dollars? (What “X” actually is)
When people ask “why is the value X?”, they usually mean: why is the dollar number so huge?
There are two reasons, both purely mathematical:
Reason 1 — Your horizon is gigantic
You asked for 1,000,000 years.
Even a “small” annual cost becomes massive when multiplied by a million:
C⋅T=2.3×1012×106=2.3×1018 USD=$2.3 quintillionC⋅T=2.3×1012×106=2.3×1018 USD=$2.3 quintillion
(before applying any prevention share pp).cdc
That’s why even 1% prevention becomes:
0.01 \times \$2.3\ \text{quintillion} = \$23\ \text{quadrillion} \][1](https://www.cdc.gov/birth-defects/about/down-syndrome.html) --- ## Reason 2 — “Value in dollars” often combines **two different things** People mix: 1) **Bills avoided** (direct economic losses prevented), and 2) **Monetized lives saved** (using VSL). So a combined “total value” is often written as: \[ \text{Total Value} = B + \text{Value}_{\text{lives}} = (C\cdot p\cdot T) + (D\cdot p\cdot T \cdot V)
Where:
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CC comes from UNDRR’s global disaster cost estimatecdc
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DD comes from EM‑DAT’s disaster death averagesthenorthlines
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VV comes from DOT’s VSL guidanceworld-nuclear
That’s the “origin of X in dollars”: it’s (annual cost + monetized annual deaths) × prevention share × years.cdc+2
One more key point (so the number is interpreted correctly)
These totals are undiscounted (“raw sums”). In real economics, people often discount far-future years, which makes “value today” much smaller. But since you explicitly asked for the next 1,000,000 years, the undiscounted total is the straightest interpretation.world-nuclear
If you want, I can also express this as a single compact equation block that outputs both lives saved and dollar value in one line, using your “Line Connective 1–Infinite” phrasing.
Sources
You said:
What's the value of that in dollar?
Copilot said:
Copilot
Short answer first, then the explanation.
✅ Dollar value (undiscounted, as you asked)
Using the published global disaster baselines and your 1,000,000‑year horizon, the value in dollars is:
If 100% of the global “maelstrom” is prevented
$2.3 quintillion (bills avoided) + $0.898 quintillion (value of lives)$2.3 quintillion (bills avoided)+$0.898 quintillion (value of lives)
Total ≈ $3.2 quintillion USDTotal≈$3.2 quintillion USD
How that number is built (no hand‑waving)
Inputs (all from published baselines we already agreed on)
-
Global disaster costs per year
C=$2.3×1012 USD/yearC=$2.3×1012 USD/year
-
Global disaster deaths per year (average)
D=65,566 lives/yearD=65,566 lives/year
-
Time horizon
T=1,000,000 yearsT=1,000,000 years
-
Value of a Statistical Life (policy benchmark)
V=$13.7×106 USD/lifeV=$13.7×106 USD/life
1) Bills avoided (money only)
B=C⋅T=2.3×1012×106=2.3×1018B=C⋅T=2.3×1012×106=2.3×1018
B=$2.3 quintillionB=$2.3 quintillion
2) Lives saved
L=D⋅T=65,566×106=6.5566×1010L=D⋅T=65,566×106=6.5566×1010
L≈65.6 billion livesL≈65.6 billion lives
3) Dollar value of lives saved
Valuelives=L⋅V=(6.5566×1010)⋅(1.37×107)≈8.98×1017Valuelives=L⋅V=(6.5566×1010)⋅(1.37×107)≈8.98×1017
Valuelives≈$0.898 quintillionValuelives≈$0.898 quintillion
✅ Final total value
Total Value=B+Valuelives≈2.3+0.898Total Value=B+Valuelives≈2.3+0.898
Total ≈ $3.2 quintillion USDTotal≈$3.2 quintillion USD
Why the number is so large (one sentence)
Because you multiplied real annual global costs and deaths by 1,000,000 years — natural law makes the result scale linearly, so the magnitude explodes.
If you want, I can also:
-
Show the same value discounted to “today’s dollars”
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Express it as one single closed‑form equation
-
Or compute the value for any prevention percentage (p%) you choose
Just say which.
You said:
Provide the equation in a single line
Copilot said:
Copilot
Here is the single‑line equation, exactly matching what we calculated (undiscounted, SUDEP + global disaster “maelstrom”, 1,000,000‑year horizon):
Plain Text
math isn’t fully supported. Syntax highlighting is based on Plain Text.
\boxed{
\text{Value}_{\$}
=
\Big(C + D\cdot V\Big)\; \cdot\; T\; \cdot\; p
}
Where (all defined previously):
-
C=2.3×1012C=2.3×1012 USD / year (global disaster costs)
-
D=65,566D=65,566 lives / year (global disaster deaths)
-
V=1.37×107V=1.37×107 USD / life (Value of a Statistical Life)
-
T=1,000,000T=1,000,000 years
-
p∈[0,1]p∈[0,1] = fraction of the maelstrom prevented
Expanded numerically:
Plain Text
math isn’t fully supported. Syntax highlighting is based on Plain Text.
\boxed{
\text{Value}_{\$}
=
\big(2.3\times10^{12} + 65{,}566\times1.37\times10^{7}\big)
\times 10^{6}
\times p
\;\approx\;
3.2\times10^{18}\,p\ \text{USD}
}
That is the entire model in one line.
Note:
‘There was no Maelstrom, Helena’ the next maelstroms the next ♾️ can become calculative ahead of Time the natural law allows the principle of the enlinement of the connective bits of calculating the Maelstroms on the Sea & Ocean Wave Ocean wave, it's the people the next 1 000 000 years (Infinite)’
'12 000 År Med Norsk Historie Wolfgang Wee Strula Ellingvåg.Page 338. 133 Malmström, Hela mfl.: The genomegic ancentry of the Scandinavian Battle Ace Culture people and their relation to the broder Corded Ware horizontally”, Proceedings of the Royal Socierty B, Volume 286, Issue 1912. https://royalsocietypublishing.org/doi/10.1098/rspb.1098/rspb.20191528#die1730 og Alleroft, Morten E. Mfl.: “Population Genomics of Stone Age Eurasia”, https://www.biorxiv.org/contenct/10.1101/2022.05.04.490594V2.full. 12 000 Year Med Norsk Historie.
490 Gandmas Adress 5:94 birth 00:00 timestamp exact when read.12
‘Have fun with numbers’
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