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Hello can anyone help me write a function that calculates 1+x+x^2+...+x^n for a given x and a positive integer n and use it to calculate (1+x+x^2+...+x^10)(1+x^2+x^4+...+x^10) for x=100?

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2  
Please don't ask people to "Give teh codez". Put something you have already tried. –  dheerosaur Dec 17 '10 at 4:11

6 Answers 6

def myfunc(x, n, step):
  if n > 0:
    return x**n + myfunc(x, n - step, step)
  return 1

myfunc(100, 10, 1) * myfunc(100, 10, 2)
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I tried your program, but it says it takes 3 arguments but 2 are given. –  Ronnie Dec 17 '10 at 3:54
    
@Ronnie - the second part of your expression changes the power by 2 for each element in the sum. The last line of code shown above calculates your expression. According to what you've got, x is 100, n is 10, the first part in brackets uses the value 1 for step and the second part in brackets uses the value 2 for step. –  sje397 Dec 17 '10 at 3:58
    
I see also should it be return 1? –  Ronnie Dec 17 '10 at 4:04
    
@Ronnie: yes - this is the case when the power (n) is 0. Anything to the power of 0 is 1. The rest of the sum is held on the 'stack' from previous calls. –  sje397 Dec 17 '10 at 4:09
    
@Ronnie - sorry, there was an error there - fixed. –  sje397 Dec 17 '10 at 4:11

You can use this to calculate 1+x+x^2+...+x^n:

lambda x, n: sum([x**y for y in range(0, n + 1)])

Use the logic to calculate the second function.

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Since you put a Sage tag on it, here's a fun way to do it in Sage.

sage: R.<x> = PowerSeriesRing(ZZ)

defines R as being power series with x as the variable. ZZ means that we are using integers for the coefficients. Now, let's look at what we can do with it:

sage: R([1, 2])              # the array inside contains the coefficients 
1 + 2*x                      # for each element of the series
sage: R([1]*11)              # this gives us the first power series
1 + x + x^2 + x^3 + x^4 + x^5 + x^6 + x^7 + x^8 + x^9 + x^10
sage: R([1,0]*5 + [1])       # and here is our second one
1 + x^2 + x^4 + x^6 + x^8 + x^10
sage: R([1]*11).(5)          # we can evaluate these for various x values
12207031
sage: R([1]*11).subs(x=5)    # an alternate way to evaluate
12207031
sage: f = R([1]*11)*R([1,0]*5+[1])  # this constructs the desired function
sage: f(100)                   # we can evaluate it at any value

Anyway, hopefully you now are understanding how to do this in Sage. I'm quite new to Sage myself, but I'm really digging it so far.

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for your fist question,

x=2; (given)

n=10; (given)

check urself whether those values r positive and whteveru want

result=1;

for(a=2;a<=n;a++)

{

result+=x^a;

}

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1  
Use code wrapping tags –  Ben Dec 17 '10 at 3:54

I think this is the function you are looking for.

def f(x, n):
    answer = 0
    for y in range(n + 1):
        answer += x ** n
    return answer

I don't quite understand the second part.

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function series($x, $n) {

    $answer = 1;           

    for($i = $n; $i > 0; $i--) {

         $answer += pow($x, $i);

    }

        return $answer;
}

series(100, 10) * series(100, 10)
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