Does the fact that our perceptions can be represented geometrically and that geometry consists of eternal truths independent of the mind prove that an external reality underlies our perceptions?

Is it ethical for game theory to be applied to conflicts which may involve mass human deaths for non-defensive wars?

Are dimensions exceeding 3 actually comceivable or are they purely intellectual constructs? Is this even debated in philosophy?

I have a question. Years ago me and two friends got into a debate about a riddle. The riddle goes like this: A train starts from point A and is travelling towards point B. A wasp is travelling in the opposite direction at twice the speed of the train, the wasp touches the tip of the train and goes back to point B. How many times does the wasp touch the train? (this may be one version of many, but this is how it was told that faithful evening) So the "correct" answer was, infinte times. (similar to Zeno's paradox with Achilles and the tortoise). I said, well in theory it's infinte times, but if you were to actually do it, the train would hit point B eventually so it can't be infinte times? For it to be infinite times it would have to stop time (or something) So what would happen if you actually tried this? Say we do an experiment with a model train and instead of a wasp we use a laser (for accuracy). First we measure the railway track and only run the train, let's say it takes 10 seconds to go from...

Is 0 really a fraction? Because some do not agree that it is not a fraction. But I have a thought Fraction=no. of equal parts considered/total no. of parts So if I divide a chocolate in 4 parts and eat no parts then I can associate with no part the no. zero and so 0/4 a fraction. Am I right?

In mathematics numbers are abstract notions. But when we divide number say we do 1 divided by 2 i.e. ½ does this mean abstract notions are divisible. It gives me a feeling like abstract notions have magnitude but then it comes to my mind that abstract has no magnitude.1=1/2 + 1/2 can we say the abstract notion 1 is equal to the sum of two equal half abstract notions? How should I conceptualize the division? The other part related to abstract notion is that how is the abstract notion of number 1 different from the unit cm? how can we say that the unit cm is abstract when we consider it a definite length. How is the unit apple different from unit cm if I count apples and measure length respectively? I am in a fix kindly help me to sort out this. I will be highly- highly grateful to you.

How would a philosopher of math describe what happened when ancient mathematicians discovered (?) the number zero?

Does a point in geometry (cartesian and euclidean) occupy space or have volume (if we consider 3-D geometry)? And is a line segment always perpendicular to its point of origin? Or can we frame this as, is a line perpendicular to each and every point lying on it?

What does it mean when a certain axiom is neither provable nor deniable? Does it imply that such axiom is self-evident and can't be doubted? I don't think that "real skeptics"(a skeptic who is so deep in doubt that he doubts his own existence and even his own doubt) like Pyrrho would be happy with that.

Are mathematical truths such as 2+2 =4 arguable exceptions to the correspondence theory of truth? I mean is 2+2=4 a truth that corresponds to "the world"?