Page 158 - Coincidences in the Bible and in Biblical Hebrew
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Table 9.1. Specific heat capacity, C p (at constant atmospheric pressure) for
137
“WATER,” “CLOUDS,” “FOG,” AND OTHER WATER-RELATED WORDS
CHAPTER 9
CHAPTER 9 “WATER,” “CLOUDS,” “FOG,” AND OTHER WATER-RELATED WORDS 137
“WATER,” “CLOUDS,” “FOG,” AND OTHER WATER-RELATED WORDS
CHAPTER 9 water in its various phases (in joule per kilogram per 1 degree Kelvin) with 137
respective numerical values of the biblical Hebrew names, WNV (water
Table 9.1. Specific heat capacity, C (at constant atmospheric pressure) for water in its
Table 9.1. Actual specific heat capacity for water in its various phases (in joule per
numerical values). Source: http://www.engineeringtoolbox.com/
p
various phases (in joule per kilogram per 1 degree Kelvin) with respective numerical
kilogram per 1 degree Kelvin) and corresponding WNV (water numerical values), the
Table 9.1. Actual specific heat capacity for water in its various phases (in joule per
values of the biblical Hebrew names, WNV (water numerical values).
numerical values of the Hebrew names.
kilogram per 1 degree Kelvin) and corresponding WNV (water numerical values), the
Source: http://www.engineeringtoolbox.com/
numerical values of the Hebrew names.
Heat capacity
Heat capacity
Phase Heat capacity WNV
J/(kg-Kelvin)
Phase J / (kg-Kelvin) WNV
2060
308
Phase J/(kg-Kelvin) WNV
Ice
90
Ice (“Kerach”) at 0Cq 2050 4186 308 308
Water
Ice
2060
Steam
90
Water
1850
Water (“Mayim”) at 25Cq 4181 4186 90 325
Steam 1850 325
Steam (“Kitor”) at 100Cq 1970 325
Figure 9.1. Specifi c heat capacity for the three phases of water (water, ice , steam)
as a function of their Hebrew names’ WNV (water numerical values).
Figure 9.1. Specifi c heat capacity for the three phases of water (water, ice , steam)
as a function of their Hebrew names’ WNV (water numerical values).
Linear regression analysis was applied with water’s SHC values as the response
(the dependent variable ) and the WNV values as the regressor (the independent
Linear regression analysis was applied with water’s SHC values as the response
variable).
(the dependent variable ) and the WNV values as the regressor (the independent
For sample size n = 3, the linear correlation coefficient is -0.9999, with R -
variable). 2
adjusted value of 0.9997. The model F-ratio is 3704, which at the 5% level 2
For sample size n = 3, the linear correlation coefficient is -0.9999, with R - is
significant (p = 0.01046). In other words, the likelihood of the three points to be
adjusted value of 0.9997. The model F-ratio is 3704, which at the 5% level is
aligned on a straight line, as was obtained, by chance alone, is about 1%.
significant (p = 0.01046). In other words, the likelihood of the three points to be
The original observations with the fitted regression equation
aligned on a straight line, as was obtained, by chance alone, is about 1%. and 95%
confidence limits are shown in Figure 9.1. For easy identification, the WNV value
The original observations with the fitted regression equation and 95%
confidence limits are shown in Figure 9.1. For easy identification, the WNV value
