3 votes 3 votes $At\ x\ =\ 0,\ the\ function\ f(x)\ =\ |x|\ has\ a\\ (a)Minimum\\(b)Maximum\\(c)a\ point\ of\ inflection\\(d)Neither\ a\ maxima\ nor\ a\ minima$ Calculus engineering-mathematics calculus maxima-minima + – Tuhin Dutta asked Jan 4, 2018 Tuhin Dutta 792 views answer comment Share Follow See all 10 Comments See all 10 10 Comments reply rahul sharma 5 commented Jan 4, 2018 reply Follow Share graph looks like v shape.Is is a? 0 votes 0 votes srestha commented Jan 4, 2018 reply Follow Share ans point of inflection 0 votes 0 votes rahul sharma 5 commented Jan 4, 2018 reply Follow Share Are you sure? 0 votes 0 votes srestha commented Jan 4, 2018 reply Follow Share yes what is ans? 0 votes 0 votes Anu007 commented Jan 4, 2018 reply Follow Share it is (a) since graph has V kind shape and at x= 0 it s 0 otherwise maximum we cannot say. 0 votes 0 votes Tuhin Dutta commented Jan 4, 2018 reply Follow Share Ans is A) 0 votes 0 votes srestha commented Jan 4, 2018 reply Follow Share ok got then here no point of inflection? 0 votes 0 votes Tuhin Dutta commented Jan 4, 2018 reply Follow Share ...................... no 0 votes 0 votes smsubham commented Apr 15, 2018 reply Follow Share Good read: https://gradestack.com/Complete-CAT-Prep/Graphs-Maxima-and-Minima/Finding-Maxima-and-Minima/19140-3882-35772-study-wtw 0 votes 0 votes ankitgupta.1729 commented Apr 15, 2018 reply Follow Share if f(x) = x3 then there will be a point of inflection at x = 0 0 votes 0 votes Please log in or register to add a comment.