Hi all! Down to the last question I couldnt get on my proofs homework...I just dont understand where to start with this one!
For all x in R, if there exists m in (0,inf), for all a in (0, inf), x<ma then for all b in (0, inf) x<b
Can I say,
If x<ma, and b is b+ma, (b>0, ma>0 by definition, so b+ma is in the interval (0,inf))
then by transitory property if x<ma<b+ma then x<b?
I'm sorry im wicked confused by how to prove this. I mean its really obvious that this is a true statement and I think thats messing me up as if a number is less than any number in an interval, then obviously its less than another any number in that interval.
A push in the right direction would be awesome!
Thanks
p.s. I was unsure which forum to post this in. Which should I have?
Edit:
Can I say,
Suppose ma<=b then b still has it's full interval
then since x<ma<=b, x<b?
I just feel like thats not enough or im missing something/doing something wrong
For all x in R, if there exists m in (0,inf), for all a in (0, inf), x<ma then for all b in (0, inf) x<b
Can I say,
If x<ma, and b is b+ma, (b>0, ma>0 by definition, so b+ma is in the interval (0,inf))
then by transitory property if x<ma<b+ma then x<b?
I'm sorry im wicked confused by how to prove this. I mean its really obvious that this is a true statement and I think thats messing me up as if a number is less than any number in an interval, then obviously its less than another any number in that interval.
A push in the right direction would be awesome!
Thanks
p.s. I was unsure which forum to post this in. Which should I have?
Edit:
Can I say,
Suppose ma<=b then b still has it's full interval
then since x<ma<=b, x<b?
I just feel like thats not enough or im missing something/doing something wrong
Last edited:
