It makes no sense to call something “true” without specifying prior information. That would imply that we could never update on evidence, which we know not to be the case for statements like “2 + 3 = 5.” Much of the confusion comes from different people meaning different things by the proposition “2 + 3 = 5,” which we can resolve as usual by tabooing the symbols.
Consider the propositions ”
A =“The next time I put two sheep and three sheep in a pen, I will end up with five sheep in the pen.” B = “The universe works as if in all cases, combining two of something with three of something results in five of that thing.”
C = “the symbolic expression 2 + 3 = 5 is consistent with mathematical formalism”
These are a few examples of what we might mean when we ask “Is ‘2+3=5’ true?” In all cases, we can in principle perform the computation of P(A|Q), or P(B|Q), etc, where Q represents prior information including what I know about sheep and mathematical formalism.
It makes no sense to call something “true” without specifying prior information. That would imply that we could never update on evidence, which we know not to be the case for statements like “2 + 3 = 5.” Much of the confusion comes from different people meaning different things by the proposition “2 + 3 = 5,” which we can resolve as usual by tabooing the symbols.
Consider the propositions ” A =“The next time I put two sheep and three sheep in a pen, I will end up with five sheep in the pen.”
B = “The universe works as if in all cases, combining two of something with three of something results in five of that thing.” C = “the symbolic expression 2 + 3 = 5 is consistent with mathematical formalism”
These are a few examples of what we might mean when we ask “Is ‘2+3=5’ true?” In all cases, we can in principle perform the computation of P(A|Q), or P(B|Q), etc, where Q represents prior information including what I know about sheep and mathematical formalism.