#25 is fairly simple. Plug in -4 and 3 into the equation, and the extraneous root will be the one that does not work.
[tex] \sqrt{12-(-4)} = \sqrt{16} = \frac{+}{}4[/tex]
Extraneous root in this case is positive four since +4≠-4
[tex] \sqrt{12-3} = \sqrt{9} = \frac{+}{}3[/tex]
In this case it's negative 3, since -3≠3
#29 can be turned into a quadratic equation.
[tex]x= \sqrt{2x+3}[/tex]
Square both sides to get
[tex]x^{2}=2x+3[/tex]
Then bring the 2x+3 to the other side, setting the quadratic equal to zero.
[tex] x^{2}-2x-3=0[/tex]
Factor to find that it's equivalent to
(x-3)(x+1)=0
Therefore x is equal to positive 3 and negative 1. Plug both back into the original equation. Whichever does not work is the extraneous root, and the answer is the one that does.
[tex]x= \sqrt{2x+3}[/tex]
[tex]3= \sqrt{2(3)+3}[/tex]
[tex]3= \sqrt{9}[/tex]
Extraneous root would be negative 3.
[tex]-1= \sqrt{2(-1)+3}[/tex]
[tex]-1= \sqrt{1}[/tex]
Extraneous root would be positive 1.
Your answers are positive 3 and negative 1.
Extraneous roots are negative 3 and positive 1.
