0 votes 0 votes About the number of pairs which have $16$ as their H.C.F. and $136$ as their L.C.M., we can definitely say that: Only one such pair exists Only two such pairs exist Many such pairs exist No such pair exists Quantitative Aptitude nielit2019feb-scientistc lcm-hcf + – Lakshman Bhaiya asked Apr 1, 2020 • retagged Nov 12, 2020 by soujanyareddy13 Lakshman Bhaiya 13.7k points 791 views answer comment Share See all 0 reply Please log in or register to add a comment.
0 votes 0 votes Option D ( Bcz HCF has to divide LCM ) s_dr_13 answered Mar 27, 2022 s_dr_13 228 points comment Share See all 0 reply Please log in or register to add a comment.
0 votes 0 votes Answer is D, no such pair exists as HCF does not divide LCM completely. https://www.toppr.com/ask/question/about-the-number-of-pairs-which-have-16-as-their-hcf-and-136-as-their/ neethu_seb answered Dec 10, 2022 neethu_seb 3.4k points comment Share See all 0 reply Please log in or register to add a comment.