The prime factorization of <math> 2013 </math> is <math> 61\cdot11\cdot3 </math>. To have a factor of <math>61</math> in the numerator and to minimize <math>a_1,</math> <math>a_1</math> must equal <math>61</math>. Now we notice that there can be no prime <math>p</math> which is not a factor of <math>2013</math> such that <math> b_1<p<61,</math> because this prime will not be represented in the denominator, but will be represented in the numerator. The highest <math> p </math> less than <math>61</math> is <math>59</math>, so there must be a factor of <math>59</math> in the denominator. It follows that <math>b_1 = 59</math> (to minimize <math>b_1</math> as well), so the answer is <math>|61-59| = \boxed{\textbf{(B) }2}</math>. One possible way to express <math> 2013 </math> with <math>(a_1, b_1) = (61, 59)</math> is  <cmath> 2013 = \frac{61!\cdot19!\cdot11!}{59!\cdot20!\cdot10!}. </cmath>