0 votes 0 votes Negation of the proposition $\exists \: x \: H(x)$ is $\exists \: x \: \neg \: H(x)$ $\forall \: x \: \neg \: H(x)$ $\forall \: x \: H(x)$ $\neg \: x \: H(x)$ Unknown Category ugcnetcse-nov2017-paper2 + – Arjun asked Nov 5, 2017 • edited Jul 12, 2020 by go_editor Arjun 898 views answer comment Share Follow See all 2 Comments See all 2 2 Comments reply akash.dinkar12 commented Nov 9, 2017 reply Follow Share its option 2... 1 votes 1 votes Ezhil commented Dec 27, 2018 reply Follow Share Kindly explain... Thanks 0 votes 0 votes Please log in or register to add a comment.
0 votes 0 votes x H(x) equels to for all. It means For all x ,H(x) is true. So, answer is 4 Pradip Tilala answered Apr 19, 2018 Pradip Tilala comment Share Follow See all 0 reply Please log in or register to add a comment.
0 votes 0 votes Annwer is option 2) Simple statement question: Negation of the proposition ⱻ x H(x)= Ɐ x ¬H(x) // ~ⱻ x =Ɐ x Devwritt answered Jan 2, 2019 Devwritt comment Share Follow See all 0 reply Please log in or register to add a comment.