Mathematica Index Equation (basic algebra)

I am currently working on a Mathematica project to calculate Riemann's sums and put them in a table. I am having trouble printing the row numbers (intervals). (The row numbers are also parameters to the secondary functions). I don't know of any way to just access the index of the iterator in a Mathematica Table, so I am trying to compute them using the function parameters.

Here is an example of what I'd like to print, for the integral of x^2 over the range {0, 1}, with 10 subdivisions.

``````tableRiemannSums[#^2 &, {0, 1}, 10]
``````

I need to figure out what the index of each iteration is, based on the value of the current subdivision k, the range of the integral {a, b}, and the number of subdivisions, n. Below is the main piece of code.

``````tableRiemannSums[fct_, {a_, b_}, n_] := Table[{'insert index here',
leftRiemannSum[fct, {a, b}, 'insert index here'],
rightRiemannSum[fct, {a, b}, 'insert index here']},
{k, a, b - (N[b - a]/n), N[b - a]/n}]
``````

In the above equation, the line

``````{k, a, b - (N[b - a]/n), N[b - a]/n}]
``````

means the range of the table is k as k goes from 'a' to 'b - ((b - a)/n)' in steps of size '(b - a)/n'.

In each of the places where my code says 'insert index here,' I need to put the same equation. Right now, I am using 'n * k + 1' to calculate the index, which is working for positive ranges, but breaks when I have a range like {a,b} = {-1, 1}.

I think this is a fairly straightforward algebra problem, but I have been racking my brain for hours and can't find a general equation.

(I apologize if this is a duplicate question - I tried searching through the Stack overflow archives, but had a hard time summarizing my question into a few key words.)

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Maybe this Demonstration can help. You may also want to consider this designated forum. –  Vitaliy Kaurov Dec 7 '12 at 19:59

2 Answers

What you may want to consider is creating a function to make each line of the table. One argument to this function would be the row number.

Execute this function using MapIndexed, which will provide you a way to traverse your range as required while providing an incrementing row number.

(Create a list with the range of values, then apply your MapIndexed function to this list.)

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I finally figured out how to solve this. I was over thinking the range, rather than relying on the inner functions to control it. I rewrote the function as:

``````tableRiemannSums[fct_, {a_, b_}, n_] := Table[{k,
leftRiemannSum[fct, {a, b}, k],
rightRiemannSum[fct, {a, b}, k]},
{k, 1, n}}]
``````

For reference, here are the left and right sums (for anyone interested!):

``````leftRiemannSum[fct_, {a_, b_}, n_] :=
N[b - a]/n* Apply[Plus, Map[fct, Range[a, b - N[b - a] / n, N[b - a]/n]]]
rightRiemannSum[fct_, {a_, b_}, n_] :=
N[b - a]/n* Apply[Plus, Map[fct, Range[a + (N[b - a]/n), b, N[b - a]/n]]]
``````
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