Answer:
Step-by-step explanation:
We have the polynomial
[tex]16n^3+13n^2+7n-10[/tex] ( 1 )
To solve this problem we have to take into account that only we can sum term with the same order in the variable. We have the polynomials
[tex]8n_{3}-5n+11n^{2}-5\\7n^2 + 8n - n^3 + 2\\15n^2 - 10n + 3n^3 - 4\\2n^2 + 12n - 5 + 8n^3[/tex]
we can note (by summing term by term) that only the sum of the first and the fourth equation correspond to the given polynomial ( 1 ) of the problem. If we organize these polynomials (that is, write the equation down in a form where higher order appears first ) we have
[tex]8n^3 +11n^2 - 5n - 5\\ 8n^3+2n^2 + 12n - 5\\[/tex]
and if we sum we obtain
[tex]16n^3+13n^2+7n-10[/tex]
that is what we was looking for
I hope this is useful for you
regards
