Your method is wrong because it does not produce the answer. One does not, in college algebra, say the solution is:
lim a_n as n->infinity
For one thing you did not prove convergence. It is understood that solutions to algebraic equations over the reals are numbers and not approximations. Any student who knows about Dedekind cuts or infinite sequences knows to take the cube root of both sides.
Most mathematicians consider it silly (strange, wrong) to say that 2 is an element of 3 even though it is.
Anyone solving x^3 = 27 in the method specified does not know any of these finer points of mathematics. The method is bad. It's useful for positive integer solutions but not for the general situation.
Your method is wrong because it does not produce the answer. One does not, in college algebra, say the solution is:
lim a_n as n->infinity
For one thing you did not prove convergence. It is understood that solutions to algebraic equations over the reals are numbers and not approximations. Any student who knows about Dedekind cuts or infinite sequences knows to take the cube root of both sides.
Most mathematicians consider it silly (strange, wrong) to say that 2 is an element of 3 even though it is.
Anyone solving x^3 = 27 in the method specified does not know any of these finer points of mathematics. The method is bad. It's useful for positive integer solutions but not for the general situation.