Question 1142961
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Let x be the "another" number ;  then "a number" is (2x+1).


From the condition, you have <U>ONE OF THE TWO equations</U>


    x^2 - (2x+1)^2 = 176,     (1)    

or

    (2x+1)^2 - x^2 = 176.     (2)



Equation (1) implies


    x^2 - 4x^2 - 4x - 1 = 176

    -3x^2 - 4x - 177 = 0,

    3x^2  + 4x + 177 = 0.


It has no real solutions.  It only has the solutions in the complex domain.
To find its solutions in complex numbers, use the quadratic formula.
But for complex numbers the notion  "one complex number is 1 more than another"  <U>IS NOT DEFINED</U>,
since complex numbers do not form an ordered set (!) 


So, based on common sense, we should not consider this case.



Equation (2) implies


    4x^2 + 4x + 1 - x^2 = 176

    3x^2  + 4x - 175 = 0


Its real roots are 


    {{{x[1,2]}}} = {{{(-4 +- sqrt(4^2 + 4*3*175))/(2*3)}}} = {{{(-4 +- 46)/6}}}


    {{{x[1]}}} = {{{(-4 + 46)/6}}} = {{{42/6}}} = 7,   and

    {{{x[2]}}} = {{{(-4 - 46)/6}}} = {{{-50/6}}} = {{{-8}}}{{{1/3}}}.


<U>ANSWER</U>.  There are two pairs of numbers satisfying the condition.

         One pair is (7, 2*7+1) = (7,15) with the smaller number 7.

         The other pair is  ({{{-8}}}{{{1/3}}},{{{-15}}}{{{2/3}}})  with the smaller number  {{{-15}}}{{{2/3}}}.
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