Question

How do you solve `\sqrt { 2z + 33} + 2= z + 1`?

Answer 1

`z=8`

Explanation:

`sqrt(2z+33)+2=z+1` => subtract 2 from both sides:
`sqrt(2z+33)=z-1` => square both sides:
`2z+33=z^2-2z+1` => subtract 2z and 33 from both sides:
`z^2-4z-32=0` => factor:
`(z+4)(z-8)=0`
`z=-4, 8` => all roots must be checked in the original equation:

`z=-4:`
`sqrt(2*(-4)+33)+2=-4+1`
`sqrt(33-8)+2=-3`
`sqrt25+2=-3`
`5+2=-3`
`7=-3` => obviously 7 is not equal to -3, so this is always false, therefore `z=-4` is an Extraneous root and must be rejected

`z=8:`
`sqrt(2*(8)+33)+2=8+1`
`sqrt(16+33)+2=9`
`sqrt49+2=9`
`7+2=9`
`9=9` => verified `z=8` is a valid root thus:
`z=8` => the only valid solution