We'll subtract `sqrt(x+2-2sqrt(x+1))` both
sides:
`sqrt(x+5-4sqrt(x+1)) = 1 -
sqrt(x+2-2sqrt(x+1))`
We'll raise to square both sides to
remove the square root:
`x + 5 - 4sqrt(x+1) = 1 - 2sqrt(x +
2-2sqrt(x+1)) + x + 2 - 2sqrt(x+1)`
We'll isolate the term
`2sqrt(x + 2-2sqrt(x+1))` to the right side:
`x + 5 -
4sqrt(x+1) - 1 - x - 2 + 2sqrt(x+1) = - 2sqrt(x +
2-2sqrt(x+1))`
We'll eliminate like
terms:
`2 - 2sqrt(x+1) = -2sqrt(x +
2-2sqrt(x+1))`
We'll divide both sides by
-2:
`sqrt(x+1) - 1 = sqrt(x +
2-2sqrt(x+1))`
We'll raise again to square to eliminate the
radical from the right side:
`x + 1 - 2sqrt(x+1) + 1 = x +
2-2sqrt(x+1))`
`x + 2 - 2sqrt(x+1) - x - 2 + 2sqrt(x+1)) =
0`
We'll eliminate all terms and we'll
get:
0 =
0
Therefore, any real value of x, comprised
within interval `[-1,+oo)` is a solution of the
equation,
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