Part a: For all real no X ,there exist a real no Y for which X is less than Y Part b: For all real no X and all Y,if X is greater or equal to zero OR Y is greater or equal to zero ,then product of XY is grearer or equal to zero .. Part c: For all real no X n for all real no Y there exist a real no Z for which product of XY =Z
😕: b) ∀x∀y(((x ≥ 0) ∧ (y ≥ 0)) → (xy ≥ 0)) y 😕: is k translation ye bane gi * For all real no. x and y if x is greater than and equal to 0 and y is greater than and equal to 0 then xy is greater than equal to 0 plz bata dy is k translation yehe bane gi ?/pls
Yes, its correct but there is a small mistake. when x is greater than or equall to. You cant say x is greater than and equal to 0. In case of and both condition should be true that is x should be 0 as well as greater than 0 which is not possible. Same goes for y. The remaining translation is correct.
Very nice video and is helpful
very helpful 💖
thanks
Ma'am I don't understand the question 14 part 5.if you have time then kindly help me.
What is the question?
Part a: For all real no X ,there exist a real no Y for which X is less than Y
Part b: For all real no X and all Y,if X is greater or equal to zero OR Y is greater or equal to zero ,then product of XY is grearer or equal to zero ..
Part c: For all real no X n for all real no Y there exist a real no Z for which product of XY =Z
😕: b) ∀x∀y(((x ≥ 0) ∧ (y ≥ 0)) → (xy ≥ 0))
y 😕: is k translation ye bane gi * For all real no. x and y if x is greater than and equal to 0 and y is greater than and equal to 0 then xy is greater than equal to 0
plz bata dy is k translation yehe bane gi ?/pls
Yes, its correct but there is a small mistake. when x is greater than or equall to. You cant say x is greater than and equal to 0. In case of and both condition should be true that is x should be 0 as well as greater than 0 which is not possible. Same goes for y. The remaining translation is correct.
@@digitaldebug4729 Thanku
i no understand madamji,please slow karo.