Answer:
4n²+2n as a factorial is given as:
[tex]= (2n+1)!/(2n-1)![/tex]
Step-by-step explanation:
We are given an expression which has to be converted into factorial form.
The expression is as follows:
[tex]4n^{2} + 2n\\ = 2n(2n+1)\\ = (2n+1)2n\\[/tex]
Now we know that 2n+1 and 2n differs by '1' and the next smaller term is '2n-1'.
Hence, multiplying and dividing by '(2n-1)!'; we get:
[tex]= ((2n+1)(2n)(2n-1)!)/(2n-1)![/tex]
we know that x(x-1)(x-2)! = x!, so:
[tex]= (2n+1)!/(2n-1)![/tex]
