EQUATIONS CONTAINING VARIABLES UNDER ONE OR MORE RADICALS
EQUATIONS CONTAINING VARIABLES UNDER ONE OR MORE RADICALS
Note:
Answer: x=3.46939
Solution:
First make a note of the fact that you cannot take the square root of
a negative number. Therefore, 
.
Subtract 5 from both sides of the equation so that the radical term is
isolated.
Square both sides of the equation and simplify:
Subtract 100x+25 from both sides of the equation.
Solve using factoring:
or
The answers are 
Check the solution x=0 by substituting 0 for x in the
original equation. If after the substitution, the left side of the
original equation equals the right side of the original equation,
0 is a solution.
Since the left side of the original equation does not equal the right
side of the original equation after 0 was substituted for x,
x=0 is not a valid solution.
Check the solution x=3.46939 by
substituting 3.46939 for x in the original equation. If
after the substitution, the left side of the original equation equals
the right side of the original equation, 3.46939 is a solution.
Since the left side of the original equation not equals the right
side of the original equation after 3.46939 was substituted for x,
then x=3.46939 is a valid solution.
You can check the answer by graphing the equation:
The graph represents the right side of the original equation minus the left side of the original equation. You can see that there is one x-intercept, at x=3.46939. This means that there is one solution x=3.45939.
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