Using the quotient rule of exponents, what is an equivalent form of two with a small eight on top of it divided by two with a small four on top of it is the answer to when they small 32 on top of it or two with the small tube on top of it or two with a small 12 on top of it or two with a small core on top of it

To simplify the expression, let's write out the given expression in a clear manner first:

$2^{8} \div 2^{4} = 2^{32} \div 2^{2} \div 2^{12} \div 2$

Now, let's apply the quotient rule of exponents. According to the quotient rule, when dividing two numbers with the same base, we subtract the exponents:

$2^{8-4} = 2^{32-2-12-1}$

This simplifies to:

$2^{4} = 2^{17}$

Therefore, an equivalent form of the given expression is $2^{4} = 2^{17}$.