Well, the first thing is to move the terms from the right
side, to the left side, changing their signs. Since both terms are positive to the right
side, they will become negative, to the left side.
x^2 =
10x + 16
x^2 - 10x - 16 =
0
Now, we'll solve the quadratic equation, using the
quadratic formula.
x1 = [-b+sqrt(b^2 -4ac
)]/2a
x2 = [-b-sqrt(b^2 -4ac
)]/2a
The coefficients a,b,c are the coefficients of the
quadratic: ax^2 + bx + c = 0
We'll identify
a,b,c:
a = 1
b =
-10
c = -16
delta = b^2 -
4ac
delta = 100 + 64
delta =
164
sqrt delta = 2sqrt41
x1 =
(10+2sqrt41)/2
x1 =
5+sqrt41
x2 =
5-sqrt41
The values of x that verify the
expression x^2 = 10x + 16 are {5-sqrt41 ;
5+sqrt41}.
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