# Calculating percent difference between elements in a list with functional programming in Mathematica?

This stems from a related discussion, How to subtract specific elements in a list using functional programming in Mathematica?

How does one go about easily calculating percent differences between values in a list?

The linked question uses Differences to easily calculate absolute differences between successive elements in a list. However easy the built-in Differences function makes that particular problem, it still leaves the question as to how to perform different manipulations.

As I mentioned earlier, I am looking to now calculate percent differences. Given a list of elements, `{value1, value2, ..., valueN}`, how does one perform an operation like `(value2-value1)/value1` to said list?

I've tried finding a way to use `Slot` or `SlotSequence` to isolate specific elements and then apply a custom function to them. Is this the most efficient way to do something like this (assuming that there is a way to isolate elements and perform operations on them)?

There are a few natural ways to do it.

You could form the list of arguments to your "percentage decrease" function using Partition:

``````In[3]:= list = {a, b, c, d, e};

In[4]:= Partition[list, 2, 1]

Out[4]= {{a, b}, {b, c}, {c, d}, {d, e}}
``````

Then you can Apply a function to these:

``````In[6]:= f @@@ Partition[list, 2, 1]

Out[6]= {f[a, b], f[b, c], f[c, d], f[d, e]}
``````

``````In[7]:= PercentDecrease[a_, b_] := (b - a)/a

In[8]:= PercentDecrease @@@ Partition[list, 2, 1]

Out[8]= {(-a + b)/a, (-b + c)/b, (-c + d)/c, (-d + e)/d}
``````

Instead of Partition you can use Most and Rest to form lists of the first and second arguments and then combine them using MapThread:

``````In[14]:= MapThread[PercentDecrease, {Most[list], Rest[list]}]

Out[14]= {(-a + b)/a, (-b + c)/b, (-c + d)/c, (-d + e)/d}
``````

A different way is to form your operation (a subtraction and a division) in two steps like this:

``````In[10]:= Differences[list] / Most[list]

Out[10]= {(-a + b)/a, (-b + c)/b, (-c + d)/c, (-d + e)/d}
``````

The divide operation (/) threads over the two lists `Differences[list]` and `Most[list`].

• Great answer! By the way, I like this explanation of @@@ better: stackoverflow.com/questions/1141166/… – dreeves Jul 10 '10 at 4:54
• +1, great answer. I personally, like the last one the best. Although, I'd probably write it `Differences[#]/Most[#]& @ list`, but that's just me. – rcollyer Jul 13 '10 at 0:12