Recall that a set B is dense in R if an element of B can befound between any two real numbers a < b. Take p∈Z and q∈N inevery case. It is given that the set of all rational numbers p/qwith 10|p| ≥ q is not dense in R.Explain, using plain words (without a rigorous proof), why this is.That is, present a general argument in plainwords. Does this set violate the Archimedean Property? If so, how?(PLEASE DON'T REPEAT THE ANSWERS TO THIS QUESTION ALREADY POSTED ONCHEGG)
