# Addition

Mathematicians love arithmetic. No matter how fancy the objects are, it seems like we always want to find ways to add, subtract, multiply and divide them. Polynomials are no exception. In this part of the course, we're going to look at how we do all of those basic operations on polynomials.

## The Rules . . .

- Terms can be added only if they have
*exactly*the same variable parts. - To add terms, you add their coefficients and keep the variable parts the same.
- To add two polynomials, add their individual terms.

I think the best way to approach this material is by looking at some specific examples.

# Example 1

**Simplify 2 x^{2} + 3x^{2}.**

In this case, the direction to "simplify" is asking us to make the polynomial "smaller" by adding together any "like terms". Since the two terms in the expression both have *exactly* the same variable parts, *x*^{2}, we can combine them by adding their variable parts:

2*x*^{2} + 3*x*^{2} = (2 + 3)*x*^{2} = 5*x*^{2}

# Example 2

**Simplify x^{3} - 3x^{2}.**

This one can't be simplified any further. Notice that the exponents on the variables are different - two versus three. Because they aren't the same, those terms can't be added together.

This is a phrase that gets thrown around a lot when people are talking about polynomials and it often doesn't get carefully defined. When we refer to like terms, we mean two terms that have the same variable parts. So, for example, in the expression *x*^{2} + 3*x*^{2} - 2*x*^{3}, *x*^{2} and 3*x*^{2} are 'like terms' because they both have exactly the same variable part, i.e. the *x*^{2}. On the other hand, *x*^{2} and -2*x* aren't like terms because their variable parts are different - one has a two in the exponent where the other has a three.

# Example 3 - The Grouping Method

**Simplify 2 x^{3} + 3y^{3} - 3x^{3}.**

The first thing we need to do is rearrange the terms (being *very* careful of negative signs) so that all the like terms are together. In this case, that means moving the *x*^{3} terms:

2*x*^{3} - 3*x*^{3} + 3*y*^{3}

The two *x* terms can be combined together to make (2 - 3)*x*^{3} = -*x*^{3}. There's nothing we can do with the *y*^{3} term. It does have the same exponent as the other two terms but, because the variables are different - *x* versus *y*, we can't combine it with the other two terms. That makes the simplified version:

2*x*^{3} - 3*x*^{3} + 3*y*^{3} = (2 - 3)*x*^{3} + 3*y*^{3} = -*x*^{3} + 3*y*^{3}

# Example 3 - The Table Method

**Add the polynomials 3 x^{4} + 2x^{3} + 4x - 5 and -2x^{3} - 4x^{2} + 4x + 2.**

When you've got two large polynomials like these two work with, a strategy that's often helpful is to write the two polynomials, one over the other, with their like terms lined up. Then you can just add down the columns. With these two polynomials it would like looks this:

3x^{4} | + 2x^{3} | + 4x | - 5 | |

-2x^{3} | - 4x^{2} | + 4x | + 2 |

Notice how some of the terms, e.g. the -4*x*^{2} one in the second polynomial, don't have a match in the other polynomial. That's okay. That term will just get carried down to the final answer, unchanged. You can think of it as adding a zero to that term. (I'll even write it that way in the next part of the solution.)

Now to add the polynomials together, we just add down the columns:

3x^{4} | + 2x^{3} | + 4x | - 5 | |

-2x^{3} | - 4x^{2} | + 4x | + 2 | |

3x^{4} | + (2 - 2)x^{3} | - 4x^{2} | + (4 + 4)x | - 5 + 2 |

3x^{4} | + 0x^{3} | - 4x^{2} | + 8x | - 3 |

3x^{4} - 4x^{2} + 8x - 3 |