Pizza-No!

The Fibonacci numbers are $$F_1=1 , F_2=1 , F_3=2 , F_4=3 , F_5=5 , F_6=8 , F_7=13$$…

where the first two are both equal to $$1$$, and from then on, each one is the sum of the two preceding it. Of the first $$2324$$ Fibonacci numbers, how many have $$3$$ as their last digit?

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