Question 1208180
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If 6×5 = 41 , 7+2 = 51 , 2+2= 2 then 5×5 = ?
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I will apply another logical imitation to get another solution for this puzzle.


Why I so inclined to get another/different solution ? - Because we all love variety.



<pre>
In this problem, they want you find the result of the operation " 5×5 ".

As the base, we will use the given operation 6×5 = 41.


    +---------------------------------------------------------------+
    |   We will not use two other operations 7+2 = 51 , 2+2= 2,     |
    |   since they use the addition sign, while we are interested   |
    |      in the multiplication sign.  Therefore, we ignore        |
    |          7+2 = 51 , 2+2= 2, as they are irrelevant,           |
    |     and concentrate/focus on the unique operation 6×5 = 41,   |
    |           since it is only relevant to our goal.              |
    +---------------------------------------------------------------+


We notice that 6×5 = 41  produces the same output value as traditional  6 + 5 + 6*5 = 41.

So, following this notice, we interpret operation  a×b  as  traditional  a + b + ab.


Now we apply this fundamental rule to compute 5×5 = ?

We get  5×5 = 5 + 5 + 5*5 = 10 + 25 = 35.


At this point, the solution to this puzzle is complete, and we get the

       <U>ANSWER</U>.  ? = 35.    <font face="wingdings" size=7>J</font> 
</pre>

.devloS      &nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;&nbsp;<<<---=== &nbsp;&nbsp;it should be read from right to left.  


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Acknowledge.


In this my solution, &nbsp;I followed the logical imitation, &nbsp;similar to 
and firstly discovered and developed by Edwin in his post


https://www.algebra.com/algebra/homework/equations/Equations.faq.question.1208181.html



Also, &nbsp;everywhere as possible, &nbsp;I tried to maintain a humoristic style of &nbsp;Edwin's writing 
in the referred post, &nbsp;so I hope it will be funny and you will smile, &nbsp;if you read to the end.



Nothing else is required from a puzzle, &nbsp;as to smile at the end.



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Thanks to Alan for pointing the meaningless of this "problem".