a) For solving the first equation, we have to take into
account the constraints for x values, for the existence of the
sqrt.
12x+72>0
3x+18>0
x>-18/3
x>-6
Now
let's solve the equation:
We'll square raise the
expressions, both sides of the equal sign.
(2x)^2=[sqrt
(12x+72)]^2
4x^2 = 12x+72
4x^2
-12x - 72 = 0
x^2 - 3x - 18 =
0
x1 = [3+sqrt(9+72)]/2
x1 =
(3+9)/2
x1 = 6
x2 =
(3-9)/2
x2 = -3
Now, we'll
verify the solutions into the equation, even if they belong to the interval [-6,
+inf.)
x1=6
12 =
sqrt(72+72)
12=sqrt144
12=12
true
x1=6 is the solution of the
equation.
For x2=-3
It is
obvious that -6=sqrt(36) it's impossible!
So,
the equation will have just one solution,
x=6!
b) Again, for solving the equation, we
have to take into account the constraints for x values, for the existence of the
sqrt.
x>0 and
x>-5
x belongs to the interval
[0,+inf.)
We'll square raise the expressions, both sides of
the equal sign.
[sqrt (x+5)]^2=(5-sqrt
x)^2
x+5=25-10sqrt x +
x
5-25=-10sqrt x
-20 = -10sqrt
x
2 = sqrt x
x =
4
c) For solving |2x|=-|x+6|, we have to
follow the rule of the absolute value.
For x belongs to the
interval (-inf,
-6)
-2x=-(-x-6)
-2x-x=6
-3x=6
x=-2
doesn't belong to the interval (-inf, -6), so is not a solution of the
equation.
For x belongs to the interval [-6,
0)
-2x=-(x+6)
-2x+x=-6
-x=-6
x=6
which belongs to the interval [-6, 0), so it is a solution of the
equation.
For x belongs to the interval [0,
inf)
2x=-(x+6)
2x+x=-6
3x=-6
x=-2
doesn't belong to the interval [0, inf), so is not a solution of the
equation.
So, the equation will have just one
solution, x=6!
d) For solving 5=|x+4|+|x-1|,
we have to follow the rule of the absolute value.
For x
belongs to the interval (-inf,
-4)
5=-x-4-x+1
8=-2x
x=-4
doesn't belong to the interval (-inf, -4), so is not a solution of the
equation.
For x belongs to the interval [-4,
1)
x+4-x+1=5
5=5
So,
any value from the interval [-4,1) will be a solution for the
equation.
For x belongs to the interval [1,
inf)
x+4+x-1=5
2x=2
x=1
which belongs to the interval [1, inf), so it is a solution of the
equation.
So, the solutions of the equation will be in the
interval [-4,1].
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