Answer:
The values of T which satisfies the inequality are: [tex](8.8, \infty)[/tex]
Step-by-step explanation:
In the equation [tex]P= T^4+ 5T^3 + 5T^2 + 6T[/tex]
- Represent P by 10,000
- Write an inequality where the expression is greater than 10000: [tex]T^4+ 5T^3 + 5T^2 + 6T>10000[/tex]
- Get 0 on one side of the inequality.
[tex]T^4+ 5T^3 + 5T^2 + 6T-10000>0[/tex]
- Graph the polynomial function.
- We have real x-intercepts of 8.84 and -11.38.
- Determine intervals where the graph is above the x-axis.
- Since negative values of x in this situation are irrelevant, the values of T which satisfies the inequality are: [tex](8.8, \infty)[/tex]
- We now test a value from the set of solution to see if it is valid.
- Let T=9
[tex]T^4+ 5T^3 + 5T^2 + 6T>10000\\9^4+ 5(9)^3 + 5(9)^2 + 6(9)>10000\\10665>10000[/tex]
Since 10665 is grater than 10000, the result is reasonable.
