Answer:
The interval of increase of g(x) is [tex](-6,+\infty)[/tex].
Step-by-step explanation:
The interval of increase occurs when first derivative of given function brings positive values. Let be [tex]g(x) = 190 + 8 \cdot x^{3} + x^{4}[/tex], the first derivative of the function is:
[tex]g'(x) = 24 \cdot x ^{2} + 4\cdot x^{3}[/tex]
[tex]g'(x) = 4 \cdot x^{2}\cdot (6+x)[/tex]
The following condition must be met to define the interval of increase:
[tex]4\cdot x^{2} \cdot (x+6) > 0[/tex]
The first term is always position due to the quadratic form, the second one is a first order polynomial and it is known that positive value is a product of two positive or negative values. Then, the second form must satisfy this:
[tex]x + 6 > 0[/tex]
The solution to this inequation is:
[tex]x > - 6[/tex]
Now, the solution to this expression in interval notation is: [tex](-6,+\infty)[/tex]
