Question #301c5

1 Answer
Oct 21, 2014

I would say no. Let us solve the equation for #x#.

#|x^2-a|=|x^2+b|#

By removing the absolute value sign,

Case 1
#x^2-a=x^2+b Rightarrow -a=b#

Case 2
#x^2-a=-(x^2+b)#

by adding #x^2# and #a#,

#Rightarrow2x^2=a-b#

by dividing by 2,

#Rightarrow x^2={a-b}/2#

by taking the square-root,

#Rightarrow x=pmsqrt{{a-b}/2}#

Hence, if #b=-a#, then the solution is any real number; otherwise, #x=pmsqrt{{a-b}/2}#.

Note
I am guessing that whoever came up with this question was thinking to plug #b=-a# (Case 1) into #x^2={a-b}/2# (Case 2); however, that is incorrect.


I hope that this was helpful.