I'm aware of other questions regarding "increasing" mathematical intuition, but I wanted to explain my own context, since that way any advice posted on this question feed will be specific to myself.
I'm 16. I'm a (new) Sixth Former (roughly college level) student and has just today had my fifth Further Pure Mathematics lesson. When I entered the classroom there were two questions on the board, one of them was the following:
If $s$ and $r$ are integers, when will
$$\frac{6^{r+s}\cdot12^{r-s}}{8^r\cdot9^{r+2s}}$$
definitely be an integer?
There were then $4$ options to pick as an answer which I cannot all recall, but I do remember how the answer was attained:
$$\frac{3^{r+s}\cdot2^{r+s}\cdot2^{2r-2s}\cdot3^{r-s}}{2^{3r}\cdot3^{2r+4s}}$$ $$\frac{3^r\cdot3^s\cdot3^r\cdot3^{-s}\cdot2^r\cdot2^s\cdot2^{2r}\cdot2^{-2s}}{2^{3r}\cdot3^{2r}\cdot3^{4s}}$$ then, after cancelling the like terms; $$\frac{3^{-s}\cdot2^{-s}}{3^{3s}}$$ $$3^{-4s}\cdot2^{-2s}$$
therefore, the answer was (and after all this, quite obviously) "when $s\leq0$". The issue is, when originally sitting down, I did not come to this conclusion myself. Mind you we did not have much time to solve this problem, but even so; someone studying further mathematics should be able to prove simply and rather easily why this answer is what it is. From my understanding of what the term intuition means to mathematicians, I can see why it is so important to those working on rigorous research tasks; intuition is an important key in utilising knowledge effectively. Hence, my question is: how can I improve my own intuition, if at all? I've heard before that intuition comes simply from experience, but I don't like to believe that I'm destined to lack the desired intuition until I've come of age, mathematically.
Any responses are appreciated, thank you.
