Question 1054364
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<U>Answer</U>.  a) 4, 9, 14.  b) 14, 9, 4.


You may think that there are only two conditions for three unknowns, so the answer is not uniquely defined.
But actually the third condition is that the numbers form AP, and it makes the answer an unique.


<U>Solution</U>


<pre>
If the members of AP are {a-d), a and (a+d), where a is the middle term and d is the common difference,
then 3a = 27 and a = 9.

Then (a-d)*(a+d) = {{{504/9}}} = 56.

Or, in other words,  {{{9^2 - d^2}}} = 56,  or  {{{d^2}}} = 81-56 = 25.
Then  d = +/- 5.
</pre>

Solved.