How do you add (2x^2 - 4xy + y^2) + ( -6x^2 - 9xy - y^2) + (x^2 + xy - 6y^2)(2x24xy+y2)+(6x29xyy2)+(x2+xy6y2)?

1 Answer
Jarob R G.
May 11, 2018

-3x^2 - 12xy - 6y^23x212xy6y2

Explanation:

When adding terms in polynomials, you are allowed to combine "like terms".

Two terms are "like" if they have the same variable(s) with possibly different constant coefficients. Recall that in a term like 17x^217x2, the number 1717 is the coefficient and the x^2x2 is the variable.

For some examples, 6x^26x2 and 8x^28x2 are "like terms", because their variable parts are both x^2x2. Also, xyzh^2xyzh2 and -13xyzh^213xyzh2 are also like, since their variables are both xyzh^2xyzh2. The terms 3y3y and 3xy3xy are not like terms, because one has a variable of xx and the other of xyxy.

If you have two "like terms", you add them (or subtract them) by adding (or subtracting) their coefficients. So 2x^2 + 5x^2 = 7x^22x2+5x2=7x2. Similarly, 4xy - 7xy = -3xy4xy7xy=3xy.

Now to the problem at hand. We have:

2x^2 - 4xy + y^2 - 6x^2 - 9xy - y^2 + x^2 + xy - 6y^22x24xy+y26x29xyy2+x2+xy6y2

To make things more clear, we'll rearrange the terms (keeping their positive or negative signs) so that like terms are next to one another.

(2x^2 - 6x^2 + x^2) + (- 4xy - 9xy + xy) + (y^2 - y^2 - 6y^2)(2x26x2+x2)+(4xy9xy+xy)+(y2y26y2)

Now we just add the coefficients.

(2 - 6 + 1)x^2 + (-4 - 9 + 1)xy + (1 - 1 - 6)y^2(26+1)x2+(49+1)xy+(116)y2
= -3x^2 - 12xy - 6y^2=3x212xy6y2

Now there are no two like terms, meaning we are done adding. This is our final answer.

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