SOLUTION: Factoring with two variables. Factor each polynomial: h^2-9hs + 9s^2
Algebra
->
Polynomials-and-rational-expressions
-> SOLUTION: Factoring with two variables. Factor each polynomial: h^2-9hs + 9s^2
Log On
Algebra: Polynomials, rational expressions and equations
Section
Solvers
Solvers
Lessons
Lessons
Answers archive
Answers
Click here to see ALL problems on Polynomials-and-rational-expressions
Question 211173
:
Factoring with two variables.
Factor each polynomial: h^2-9hs + 9s^2
Answer by
jim_thompson5910(35256)
(
Show Source
):
You can
put this solution on YOUR website!
Jump to Answer
Looking at the expression
, we can see that the first coefficient is
, the second coefficient is
, and the last coefficient is
.
Now multiply the first coefficient
by the last coefficient
to get
.
Now the question is: what two whole numbers multiply to
(the previous product)
and
add to the second coefficient
?
To find these two numbers, we need to list
all
of the factors of
(the previous product).
Factors of
:
1,3,9
-1,-3,-9
Note: list the negative of each factor. This will allow us to find all possible combinations.
These factors pair up and multiply to
.
1*9 = 9
3*3 = 9
(-1)*(-9) = 9
(-3)*(-3) = 9
Now let's add up each pair of factors to see if one pair adds to the middle coefficient
:
First Number
Second Number
Sum
1
9
1+9=10
3
3
3+3=6
-1
-9
-1+(-9)=-10
-3
-3
-3+(-3)=-6
From the table, we can see that there are no pairs of numbers which add to
. So
cannot be factored.
===============================================================
Answer:
So
doesn't factor at all (over the rational numbers).
So
is prime.
Jump to Top
(