Here is another interesting pattern in Pascal's Triangle, which we will call the "hockey stick" property. C(i,r)=C(n+1,r+1) for 0≤r≤n. Below is an illustration where n=9 and r= 2 showing the "hockey stick" and the smaller "hockey stick" used in the induction step. ..C. C i=r Co C .c C₂ 2Co 2C₁ C₁ Co CoC 3C 3C 3C₂ 4C SCO SC₁/5C2₂/5C3 C4 3Cs C G C 4C1/C₂ S C C₁ с CC. Prove this result using mathematical induction. 2C₂ છે. છે. ઠે. . . . 3C₂ 4C3 4C4 C, /C₂ C₁ C₂ C C₂ C₁ C₂ C C₂ с с с с с с с C. 18 с, с, с CC. C. C

Here is another interesting pattern in Pascal's Triangle, which we will call the "hockey stick" property. C(i,r)=C(n+1,r+1) for 0≤r≤n. Below is an illustration where n=9 and r= 2 showing the "hockey stick" and the smaller "hockey stick" used in the induction step. ..C. C i=r Co C .c C₂ 2Co 2C₁ C₁ Co CoC 3C 3C 3C₂ 4C SCO SC₁/5C2₂/5C3 C4 3Cs C G C 4C1/C₂ S C C₁ с CC. Prove this result using mathematical induction. 2C₂ છે. છે. ઠે. . . . 3C₂ 4C3 4C4 C, /C₂ C₁ C₂ C C₂ C₁ C₂ C C₂ с с с с с с с C. 18 с, с, с CC. C. C

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter1: Fundamental Concepts Of Algebra

Section1.2: Exponents And Radicals

Problem 87E

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Question

Here is another interesting pattern in Pascal's Triangle, which we will call the "hockey stick" property.
C(i,r)=C(n+1,r+1) for 0≤r≤n.
Below is an illustration where n=9 and r=2 showing the "hockey stick" and the smaller "hockey stick"
used in the induction step.
i=r
- Co C₂
C.
C
4C
SCo 5C₁5C₂
C G/
C₁
3C0 3₁ 3₂ 33
C₁
IC C
C
C.
1oC. 10.C 1C₂
Prove this result using mathematical induction.
6.
4C1/C₂/4C3 C4
Se S. S. S. S. S.S.S.
7.C.C..Cs
/C₂ C₁ C₂ C
C₂ C₂ C₂ C₂ C₂
KC C C C C C
C₁ с с с
C. C, C
18
C
с с
C
с
C C

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