Fibonacci sequence is embedded in Pascal’s triangle by investigating “stretched diagonals”. While this is true, it is not obvious how the sequence is embedded. Redraw Pascal’s triangle to make it clear how the Fibonacci sequence is embedded in the triangle, and explain the calculation required to obtain the sequence. A formal proof is not required; an observation over 12 rows of the triangle will suffice. You may use the fact that the r-th number in the n-th row of the triangle is C(n; r) when explaining the calculation.

dizxindlert7

dizxindlert7

Answered question

2022-09-04

Fibonacci sequence is embedded in Pascal’s triangle by investigating “stretched diagonals”. While this is true, it is not obvious how the sequence is embedded. Redraw Pascal’s triangle to make it clear how the Fibonacci sequence is embedded in the triangle, and explain the calculation required to obtain the sequence. A formal proof is not required; an observation over 12 rows of the triangle will suffice. You may use the fact that the r-th number in the n-th row of the triangle is C(n; r) when explaining the calculation.

Answer & Explanation

Lena Ibarra

Lena Ibarra

Beginner2022-09-05Added 13 answers

Step 1
Shear the usual representation of Pascal's triangle by shifting each successive row further to the right. The Fibonacci numbers can be made to appear as column sums.
Step 2
1 1 1 1 2 1 1 3 3 1 1 4 6 4 1 1 1 2 3 5

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