# In Mathematica, how can I cut off the high-order terms in a polynomial?

For example, I have a polynomial y＝a_0＋a_1 x + ..... + a_50 x^50. Since I know that the high-order terms are imposing negligible effects on the evaluation of y, I want to cut off them and have something like y＝a_0＋a_1 x + ..... + a_10 x^10, the first eleven terms. How can I realize this?

I thank you all in advance.

``````In[1]:= y = a0 + a1*x + a2*x^2 + a3*x^3 + a4*x^4;
y /. x^b_ /; b >= 3 -> 0

Out[2]= a0 + a1 x + a2 x^2
``````
• Please explain a bit what is going on here. – vonbrand Feb 3 '14 at 2:06
• Sure. In the expression y replace (that is the /.) the pattern x^b_ (that is x to any power b) under the condition (that is the /;) that the exponent is greater than or equal to 3 with (that is the ->) zero. So all x^n with n>=3 become zero and 0*an=0 and those terms disappear from the expression. – Bill Feb 3 '14 at 2:14

The mathematically proper approach..

``````  Series[ a0 + a1*x + a2*x^2 + a3*x^3 + a4*x^4, {x, 0, 2}] // Normal

-> a0 + a1 x + a2 x^2
``````

If your polynomial is actually as simple as shown, with a term for every power of `x` and none others, you can simply use `Take` or `Part` to extract only those terms that you want because of the automatic ordering (in `Plus`) that Mathematica uses. For example:

``````exp1 = Expand[(1 + x)^9]

Take[exp1, 5]
``````
``````1 + 9 x + 36 x^2 + 84 x^3 + 126 x^4 + 126 x^5 + 84 x^6 + 36 x^7 + 9 x^8 + x^9

1 + 9 x + 36 x^2 + 84 x^3 + 126 x^4
``````

If it is not you will need something else. Bill's replacement rule is one concise and efficient method. For more complex manipulations you may wish to decompose the polynomial using `CoefficientArrays`, `CoefficientRules`, or `CoefficientList`.