Proof for a real number infinite amount of potential itofazpaths

There are an infinite number of real numbers. The number of real numbers is much larger (infinitely larger) than the counting infinite number. A real number is like the number pi. It is infinitely long. There are as many digits in the number pi as there are the counting infinite numbers. The natural number 2 can be uniquely represented by a 2 followed by a decimal point and then an infinite amount of zeros --- 2.000...., The number 1/3 is represented by .333..., there are a counting infinite number threes in this sequence. Real and natural numbers can be represented by the the infinite long real number representation. A itofazpath can be infinitely long, made up of as little as two itofazsection or itofazmoments that repeat over and over again in one or many different sequences.There are many more unique potential itofazmoments or itofazsections than there are the ten digits is mathematics. If we combine all the possible infinitely long potential itofazpaths we have a real number of potential itofazpath created from a finite amount of potential or actual itofazsections.