Answer:
t = 2489 years
Step-by-step explanation:
The equation you need for this is
[tex]N=N_{0}e^{kt}[/tex]
where N is the amount AFTER the decomposition, N-sub-0 is the initial amount, k is the decomposition constant and t is time in years.
If we are told that the tusk LOST 26% of its carbon-14, that means 74% of it remains from the initial 100% it had.
Filling in:
[tex]74=100e^{-.00012097t}[/tex]
Begin by dividing both sides by 100 to get a decimal of .74:
[tex].74=e^{-.00012097t}[/tex]
The goal is to get that t out of the exponential position in which it is currently sitting. Do this by "undoing" the e. Do THAT by taking the natural log of both sides because a natural log "undoes" an e. This is due to the fact that the base of a natural log is e.
[tex]ln(.74)=ln(e^{-.00012097t})[/tex]
The ln and the e disappear on the right side, leaving
ln(.74) = -.00012097t
Plug ln(.74) into your calculator to get
-.3011050928 = -.00012097t
t = 2489
