Given the inequality:
$$\left(x^{2} - x\right) - 30 \leq 0$$
To solve this inequality, we must first solve the corresponding equation:
$$\left(x^{2} - x\right) - 30 = 0$$
Solve:
This equation is of the form
a*x^2 + b*x + c = 0
A quadratic equation can be solved
using the discriminant.
The roots of the quadratic equation:
$$x_{1} = \frac{\sqrt{D} - b}{2 a}$$
$$x_{2} = \frac{- \sqrt{D} - b}{2 a}$$
where D = b^2 - 4*a*c - it is the discriminant.
Because
$$a = 1$$
$$b = -1$$
$$c = -30$$
, then
D = b^2 - 4 * a * c =
(-1)^2 - 4 * (1) * (-30) = 121
Because D > 0, then the equation has two roots.
x1 = (-b + sqrt(D)) / (2*a)
x2 = (-b - sqrt(D)) / (2*a)
or
$$x_{1} = 6$$
$$x_{2} = -5$$
$$x_{1} = 6$$
$$x_{2} = -5$$
$$x_{1} = 6$$
$$x_{2} = -5$$
This roots
$$x_{2} = -5$$
$$x_{1} = 6$$
is the points with change the sign of the inequality expression.
First define with the sign to the leftmost point:
$$x_{0} \leq x_{2}$$
For example, let's take the point
$$x_{0} = x_{2} - \frac{1}{10}$$
=
$$-5 + - \frac{1}{10}$$
=
$$- \frac{51}{10}$$
substitute to the expression
$$\left(x^{2} - x\right) - 30 \leq 0$$
$$-30 + \left(- \frac{-51}{10} + \left(- \frac{51}{10}\right)^{2}\right) \leq 0$$
111
--- <= 0
100
but
111
--- >= 0
100
Then
$$x \leq -5$$
no execute
one of the solutions of our inequality is:
$$x \geq -5 \wedge x \leq 6$$
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