Find the factors of y^3 + y^2 + y + 1

Question

asked Jul 27, 2023 166k views

1 Answer

LWimsey · Answer 1 · 2023-08-02T01:29:25+0000

The given expression is

We will use the grouping to factor it

Take y^2 as a common factor from the first bracket

$\begin{gathered} (y^3+y^2)+(y+1)=y^2((y^3)/(y^2)+(y^2)/(y^2))+(y+1) \\ (y^3+y^2)+(y+1)=y^2(y+1)+(y+1) \end{gathered}$

Take the bracket (y + 1) as a common factor

$\begin{gathered} y^2(y+1)+(y+1)=(y+1)\lbrack(y^2(y+1))/((y+1))+((y+1))/((y+1))\rbrack \\ y^2(y+1)+(y+1)=(y+1)\lbrack y^2+1\rbrack \end{gathered}$

The factored form is