Question 156339


Looking at the expression {{{x^2+6x+5}}}, we can see that the first coefficient is {{{1}}}, the second coefficient is {{{6}}}, and the last term is {{{5}}}.



Now multiply the first coefficient {{{1}}} by the last term {{{5}}} to get {{{(1)(5)=5}}}.



Now the question is: what two whole numbers multiply to {{{5}}} (the previous product) <font size=4><b>and</b></font> add to the second coefficient {{{6}}}?



To find these two numbers, we need to list <font size=4><b>all</b></font> of the factors of {{{5}}} (the previous product).



Factors of {{{5}}}:

1,5

-1,-5



Note: list the negative of each factor. This will allow us to find all possible combinations.



These factors pair up and multiply to {{{5}}}.

1*5
(-1)*(-5)


Now let's add up each pair of factors to see if one pair adds to the middle coefficient {{{6}}}:



<table border="1"><th>First Number</th><th>Second Number</th><th>Sum</th><tr><td  align="center"><font color=red>1</font></td><td  align="center"><font color=red>5</font></td><td  align="center"><font color=red>1+5=6</font></td></tr><tr><td  align="center"><font color=black>-1</font></td><td  align="center"><font color=black>-5</font></td><td  align="center"><font color=black>-1+(-5)=-6</font></td></tr></table>



From the table, we can see that the two numbers {{{1}}} and {{{5}}} add to {{{6}}} (the middle coefficient).



So the two numbers {{{1}}} and {{{5}}} both multiply to {{{5}}} <font size=4><b>and</b></font> add to {{{6}}}



Now replace the middle term {{{6x}}} with {{{x+5x}}}. Remember, {{{1}}} and {{{5}}} add to {{{6}}}. So this shows us that {{{x+5x=6x}}}.



{{{x^2+highlight(x+5x)+5}}} Replace the second term {{{6x}}} with {{{x+5x}}}.



{{{(x^2+x)+(5x+5)}}} Group the terms into two pairs.



{{{x(x+1)+(5x+5)}}} Factor out the GCF {{{x}}} from the first group.



{{{x(x+1)+5(x+1)}}} Factor out {{{5}}} from the second group. The goal of this step is to make the terms in the second parenthesis equal to the terms in the first parenthesis.



{{{(x+5)(x+1)}}} Combine like terms. Or factor out the common term {{{x+1}}}


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Answer:



So {{{x^2+6x+5}}} factors to {{{(x+5)(x+1)}}}.



Note: you can check the answer by FOILing {{{(x+5)(x+1)}}} to get {{{x^2+6x+5}}} or by graphing the original expression and the answer (the two graphs should be identical).