# Help me write a function

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?

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

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;

}

-
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):
for y in range(n + 1):
answer += x ** n
``````

I don't quite understand the second part.

-
``````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)
``````
-
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.

-
``````function series(\$x, \$n) {

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

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

}

}

series(100, 10) * series(100, 10)
``````
-

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.

-