the answer to this question is , there are not 2 such numbers(integers). you may not exhibit pi because of the fact the ratio of two integers, hence for this reason TT is an irrational quantity. there are distinctive ratio which you will have which would be very on the ingredient of pi yet they'd in no way equivalent TT, because of the fact irrational numbers have the valuables of having infinite, non-repeating decimals. Technically, TT can not be won because of the fact it in no way ends. this is like asking whilst does infinity end; nicely this is call infinity because of the fact it has no certain. there are the variety to have a numerical definition of TT, regarding something like a limiteless sequence. i don't recognize in case you have taken any path in calculus yet(exceptionally calc II), yet which will make you recognize the concept of infinite sequence. somewhat, you have a function like : f(x) = arctan(x). this is bigger employing a limiteless sequence, called its Taylor sequence. arctan(x) = x - (x^3)/3 + (x^5)/5 - (x^7)/7 + (x^9)/9 - (x^11)/11+...... From trigonometry, all of us recognize arctan(a million) = TT/4. you may plug a million for x in the infinite sequence for arctan(x), and multiplying it by skill of four provides you with TT. the ingredient with this formula, is that it converges very, very slowly, so it takes a protracted tie formerly you get somewhat on the ingredient of TT.
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Verified answer
It isn't irrational; rather, pi is transcendental. It is not the root of any polynomial of any degree having integer coefficients.
Even the computers and algorithms that give pi out to 50 billion places only approximate its true value.
the answer to this question is , there are not 2 such numbers(integers). you may not exhibit pi because of the fact the ratio of two integers, hence for this reason TT is an irrational quantity. there are distinctive ratio which you will have which would be very on the ingredient of pi yet they'd in no way equivalent TT, because of the fact irrational numbers have the valuables of having infinite, non-repeating decimals. Technically, TT can not be won because of the fact it in no way ends. this is like asking whilst does infinity end; nicely this is call infinity because of the fact it has no certain. there are the variety to have a numerical definition of TT, regarding something like a limiteless sequence. i don't recognize in case you have taken any path in calculus yet(exceptionally calc II), yet which will make you recognize the concept of infinite sequence. somewhat, you have a function like : f(x) = arctan(x). this is bigger employing a limiteless sequence, called its Taylor sequence. arctan(x) = x - (x^3)/3 + (x^5)/5 - (x^7)/7 + (x^9)/9 - (x^11)/11+...... From trigonometry, all of us recognize arctan(a million) = TT/4. you may plug a million for x in the infinite sequence for arctan(x), and multiplying it by skill of four provides you with TT. the ingredient with this formula, is that it converges very, very slowly, so it takes a protracted tie formerly you get somewhat on the ingredient of TT.
because pi was found through an equation and that happened to be the answer
geez
Because it is an irrational number.
If there was a repeating pattern you could write it as a rational number.
thee is no end to the number but it is normaly rounded to 3.14
because is not rational