Question 1144069: Verify that sqrt2|z|≤|Re(z)|+|Im(z)|
Answer by ikleyn(52814)   (Show Source):
You can put this solution on YOUR website! .
Hello, I do understand what is written in the right side of this inequality.
> > > But I do not understand what is written in its left side. < < <
If it is
sqrt(2) * |z| <= |Re(z)| + |Im(z)|, (1)
then I can easily disprove it: take z = 1 = 1 + 0*i;
Then sqrt(2) * |z| = sqrt(2) in the left side
and |Re(z)| + |Im(z)| = 1 + 0 = 1,
so the inequality (1) is not correct in this case.
If it is
sqrt((2)*|z|) <= |Re(z)| + |Im(z)|, (2)
then I can easily disprove it, again:
take z = 1 = 1 + 0*i;
Then sqrt((2) * |z|) = sqrt(2) in the left side
and |Re(z)| + |Im(z)| = 1 + 0 = 1 in the right side,
so the inequality (2) is not correct in this case, too.
Could you PLEASE write your post / posts more ACCURATELY, in a way the tutors do not spend their time for NOTHING,
trying to guess and/or decipher your writing ?
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