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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.

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I believe this question belongs to the Mathematica Stack Exchange site –  Kash Feb 2 at 22:40

3 Answers 3

up vote 2 down vote accepted
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
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Please explain a bit what is going on here. –  vonbrand Feb 3 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 at 2:14

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.

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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
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