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We have the following reasoning.
A < B < C < A
Can you make this statement solvable?
Find
-2 solutions by removing 2 straight lines and adding 2 straight lines.
-1 solution by adding 3 straight lines.
-1 solution by adding only 1 straight line.
NOTE
The solutions must be aesthetically acceptable.
The solutions must be simple. No fancy symbols accepted.
2 solutions by removing 2 straight lines and adding 2 straight lines.
$A\lt B\lt C+A, A\lt B\lt C\gt A$
1 solution by adding 3 straight lines.
$A\le B\le C\le A$
1 solution by adding only 1 straight line.
going with JA on this, $-A\lt B\lt C\lt A$
Seems like there may be a huge number of ways to achieve these, but here are some...
Removing 2 straight lines and adding 2 straight lines in two ways:
$H<B<C<A$
and
$A<B<C<H$
Adding 3 straight lines:
$L-A<B<C<A$
Adding 1 straight line:
$-A<B<C<A$
2 solutions by removing 2 straight lines and adding 2 straight lines.
A > B < C < A
A < B < C > A
In both cases two straight lines removed are<, two straight lines added:>
1 solution by adding 3 straight lines.
A ≤ B ≤ C ≤ A
which resolves toA = B = C = A.
Three lines added are 'or-equal' lines in≤symbol made of<.
1 solution by adding only 1 straight line.
–A < B < C < A
A line added is the minus sign.
What do you think about this solution? It holds true without changing anything :)
rock < paper < scissors < rock
For the third question:
$A < B < C \nless A$
Of course this suggests two other possible solutions:
$A < B \nless C < A$
and
$A \nless B < C < A$
I don't think this counts as using "fancy symbols."
Some logical answers
2 solutions by removing 2 straight lines and adding 2 straight lines.
$A\lt B\lor C\lt A$, logical or
$A\lt B \land C\lt A$, logical and
1 solution by adding 3 straight lines.
$A\lt B\leftrightarrow C\lt A$, if and only if
1 solution by adding only 1 straight line.
$A\lt B\leftarrow C\lt A$, less common way of doing implication, latter implies former
2 solutions by removing 2 straight lines and adding 2 straight lines (slightly different from Jonathan’s):
A < B < C < VI
or
A < B < C < XI
(You can also do IV and IX, but the spacing is tight.)
1 solution by adding 3 straight lines (slightly different from Jonathan’s):
4A < B < C < A
(can be solved with A = −1, B = −3, and C = −2)
1 solution by adding only 1 straight line.
$A < B < \overline{C < A}$
The overline is a vinculum, which groups a subexpression. So the above is equivalent to:
$A < B < (C < A)$
Using the standard (?) paradigm of TRUE ≡ 1 and FALSE ≡ 0, this can be solved with any A < B < 0 and C ≥ A, or C < A < B < 1.
Note that $\overline{A < B} < C < A$ would also work.
