Question

How do you solve `sqrt(1-2t)=1+t` and check your solution?

Answer 1

`t=0`

Explanation:

`sqrt(1-2t)=1+t`

Square both sides to get rid of the square root.

`(sqrt(1-2t))^2=(1+t)^2`

`1-2t=t^2+2t+1`

Recognize that we should move everything to the right side of the equals sign to get a complete quadratic function for this equation.

`1-2t=t^2+2t+1`

`0=t^2+2tcancel(+1)cancel(-1)+2t`

`0=t^2+4t`

Take out common factor `t`

`0=t(t+4)`

Now we have our two values for `t` :

`t=0`
`t=-4` `<---`Remember it is not positive 4 because we have not put the 4 on the other side of our equals sign yet

Now to check our possible solutions we substitute our values for `t` into the ORIGINAL EQUATION

Lets start with `-4`

`sqrt(1-2(-4))=1+(-4)`

`sqrt(1+8)=1-4`

`sqrt(9)=-3`

`3=-3`
`color(red)"So -4 is NOT an answer for this equation"` `", lets try 0"`

`sqrt(1-2(0))=1+(0)`

`sqrt(1-0)=1+0`

`sqrt(1)=1`

`1=1`

`color(green)"0 IS an answer for this equation"`

Answer 2

`color(blue)(t=0`

Explanation:

`sqrt(1-2t)=1+t`

Square L.H.S. and R.H.S

`:.(sqrt(1-2t)^2)=(1+t)^2`

`:.sqrt(1-2t)*sqrt(1-2t)=1-2t`

`:.(1+t)*(1+t)=1+2t+t^2`

`:.1+2t+t^2=1-2t`

`:.t^2=1-1-2t-2t`

`:.t^2=-4t`

`:.t^2+4t=0`

`t(t+4)=0`

`color(blue)(t=0` or `color(blue)(t=-4`

substitute `color(blue)(t=-4`

`:.sqrt(1-2(color(blue)(-4)))=1+(color(blue)(-4))`

`:.sqrt(1+8)=1-4`

`:.+-sqrt(9)=-3`

`-3` or `+3 =-3`

`:.-3=-3`

`:.3=-3` extraneous solution

substitute `color(blue)(t=0`

`:.sqrt(1-2(color(blue)(0)))=1+(color(blue)(0))`

`:.sqrt(1)=1`

`:.1=1`