Respuesta :
Answer:
a) [tex](-\infty, -1) \cup (5, \infty)[/tex]
b) [tex](-1,5)[/tex]
Step-by-step explanation:
The first step to solve this question is finding the roots of the derivative of x.
Solving a quadratic equation:
Given a second order polynomial expressed by the following equation:
[tex]ax^{2} + bx + c, a\neq0[/tex].
This polynomial has roots [tex]x_{1}, x_{2}[/tex] such that [tex]ax^{2} + bx + c = a(x - x_{1})*(x - x_{2})[/tex], given by the following formulas:
[tex]x_{1} = \frac{-b + \sqrt{\bigtriangleup}}{2*a}[/tex]
[tex]x_{2} = \frac{-b - \sqrt{\bigtriangleup}}{2*a}[/tex]
[tex]\bigtriangleup = b^{2} - 4ac[/tex]
In this question:
[tex]f(x) = x^{3} - 6x^{2} - 15x + 2[/tex]
So
[tex]f'(x) = 3x^{2} - 12x - 15[/tex]
Finding the roots:
[tex]3x^{2} - 12x - 15 = 0[/tex]
Simplifying by -3
[tex]x^{2} - 4x - 5 = 0[/tex]
So [tex]a = 1, b = -4, c = -5[/tex]
Then
[tex]\bigtriangleup = (-4)^{2} - 4*1*(-5) = 36[/tex]
[tex]x_{1} = \frac{-(-4) + \sqrt{36}}{2} = 5[/tex]
[tex]x_{2} = \frac{-(-4) - \sqrt{36}}{2} = -1[/tex]
So the function can be divided in three intervals.
They are:
Less than -1
Between -1 and 5
Higher than 5
In which it increases and which it decreases?
Less than -1
Lets find the derivative in a point in this interval, for example, -2
[tex]f'(x) = 3x^{2} - 12x - 15[/tex]
[tex]f'(-2) = 3*(-2)^{2} - 12*(-2) - 15 = 21[/tex]
Positive.
So in the interval of [tex](-\infty, -1)[/tex], the function increases.
Between -1 and 5
Will choose 0.
[tex]f'(x) = 3x^{2} - 12x - 15[/tex]
[tex]f'(0) = 3*(0)^{2} - 12*(0) - 15 = -15[/tex]
Negative.
So in the interval of [tex](-1,5)[/tex], the function decreases.
Higher than 5
Will choose 6.
[tex]f'(x) = 3x^{2} - 12x - 15[/tex]
[tex]f'(6) = 3*(6)^{2} - 12*(6) - 15 = 21[/tex]
Positive
So in the interval of [tex](5, \infty)[/tex], the function increases.
(a) Find the interval on which f is increasing.
Using interval notation
[tex](-\infty, -1) \cup (5, \infty)[/tex]
b) Find the interval on which f is decreasing.
[tex](-1,5)[/tex]
