Finding the first forward difference of f ( x ) = x &#x2212;<!-- − -->

skylsn

skylsn

Answered question

2022-06-14

Finding the first forward difference of f ( x ) = x q ( 1 q x ) p + q x c
So I am trying to unravel the derivation of some literature equations and one equation I'm struggling at, is to find the first forward difference of the following equation:
f ( x ) = x q ( 1 q x ) p + q x c
So, actually, how to find a simplification of
f ( x + 1 ) f ( x ) = ( ( x + 1 ) q ( 1 q x + 1 ) p + q x + 1 c ) ( x q ( 1 q x ) p + q x c ) )
Now I think that the difference between first and third term of the left and right part is equal to
1 c q x
But I don't seem to get that second part involved, especially if I look at the desired result, which is:
f ( x + 1 ) f ( x ) = 1 q x ( p c + q )

Answer & Explanation

odmeravan5c

odmeravan5c

Beginner2022-06-15Added 20 answers

Solution:
So you are right about the first term: ( x + 1 ) x = 1 indeed.
Third term: c q x + 1 c q x = c q x ( q 1 )
Not sure if p = 1 q here and if so, this would be p c q x .
Second Term:
q p [ 1 q x + 1 ] + q p [ 1 q x ] = q p [ q x + 1 q x ] = q q x p ( q 1 ) = q x + 1 ( q 1 ) / p = q x + 1  if  q = 1 p

Do you have a similar question?

Recalculate according to your conditions!

New Questions in Discrete math

Ask your question.
Get an expert answer.

Let our experts help you. Answer in as fast as 15 minutes.

Didn't find what you were looking for?