Answer:
[tex]n^3+6n^2+8n=3315[/tex]
Step-by-step explanation:
Let n be the first odd number.
The 2nd consecutive odd number would be [tex]n+2[/tex] and 3rd consecutive odd number would be [tex]n+2+2=n+4[/tex].
We have been given that the product of 3 consecutive odd numbers is 3,315. The product of 3 consecutive odd numbers would be [tex]n(n+2)(n+4)[/tex].
Now we will equate the product with 3315 as:
[tex]n(n+2)(n+4)=3315[/tex]
Let us simplify the left side of equation.
[tex](n\cdot n+n\cdot 2)(n+4)=3315[/tex]
[tex](n^2+2n)(n+4)=3315[/tex]
Now, we will apply FOIL to find the product of left side as:
[tex]n^2\cdot n+n^2\cdot 4+2n\cdot n+2n\cdot4=3315[/tex]
[tex]n^3+4n^2+2n^2+8n=3315[/tex]
[tex]n^3+6n^2+8n=3315[/tex]
Therefore, our required equation would be [tex]n^3+6n^2+8n=3315[/tex].
