This would mean that, given a relatively constant C-14 production, the living systems prior to the Flood would have diluted the overall available C-14.
This dilution artificially skews a measurement if we use today's ratios.
Now take the same one-pint container and pour it evenly into four graduated flasks, each one initially containing 1/4th of a pint.
Other useful radioisotopes for radioactive dating include Uranium -235 (half-life = 704 million years), Uranium -238 (half-life = 4.5 billion years), Thorium-232 (half-life = 14 billion years) and Rubidium-87 (half-life = 49 billion years).
By looking at the ratio of carbon-12 to carbon-14 in the sample and comparing it to the ratio in a living organism, it is possible to determine the age of a formerly living thing fairly precisely. So, if you had a fossil that had 10 percent carbon-14 compared to a living sample, then that fossil would be: t = [ ln (0.10) / (-0.693) ] x 5,700 years t = [ (-2.303) / (-0.693) ] x 5,700 years t = [ 3.323 ] x 5,700 years Because the half-life of carbon-14 is 5,700 years, it is only reliable for dating objects up to about 60,000 years old.
However, the principle of carbon-14 dating applies to other isotopes as well.
Not a precise measurement, it is in hundreds or thousands of years.
As soon as a living organism dies, it stops taking in new carbon.