hockey stick identity proof

mathstudent2000 · 2013-08-15 12:52:46

In class we studied the identity \displaystyle\binom{r}{r}+\binom{r+1}{r} +\binom{r+2}{r} + \cdots +\binom{n}{r} = \binom{n+1}{r+1} We also took a glimpse at \displaystyle\binom{r}{0}+\binom{r+1}{1} +\binom{r+2}{2} + \cdots +\binom{n}{n-r} = \binom{n+1}{n-r}. We will now take a closer look at this second identity.

(a) Confirm that the second identity works for n=5, r=2 and for n=7, r=3.

(b) What is the relationship between the first and second identities?

(c) Prove the second identity above algebraically without using what you learned in Part b. (In other words, prove it without the help of the hockey stick identity we studied in class).

(d) Prove the second identity above with a block-walking argument.

bobbym · 2013-08-15 19:20:13

Hi;

Sorry, I can not read that?!

mathstudent2000 · 2013-08-16 05:13:28

srry, i used latex, i will change it to regular english

mathstudent2000 · 2013-08-16 05:16:37

In class we studied the identity combination{r}{r}+combination{r+1}{r} +combination{r+2}{r} + ... +combination{n}{r} = combination{n+1}{r+1} We also took a glimpse at combination{r}{0}+combination{r+1}{1} +combination{r+2}{2} +... +combination{n}{n-r} = combination{n+1}{n-r}. We will now take a closer look at this second identity.

(a) Confirm that the second identity works for n=5, r=2 and for n=7, r=3.

(b) What is the relationship between the first and second identities?

(c) Prove the second identity above algebraically without using what you learned in Part b. (In other words, prove it without the help of the hockey stick identity we studied in class).

(d) Prove the second identity above with a block-walking argument.

mathstudent2000 · 2013-08-16 05:17:51

combination{x}{y} means x combination y

bobbym · 2013-08-16 05:25:32

I know that.

combination{r}{r}+combination{r+1}{r} +combination{r+2}{r} + ... +combination{n}{r} = combination{n+1}{r+1} We also took a glimpse at combination{r}{0}+combination{r+1}{1} +combination{r+2}{2} +... +combination{n}{n-r} = combination{n+1}{n-r}.

It is totally unreadable on my browser

mathstudent2000 · 2013-08-17 04:45:44

i will change it

mathstudent2000 · 2013-08-17 04:51:53

In class we studied the identity (r) combination (r) + (r+1) combination (r) +(r+2) combination (r) + ... + (n) combination (r) = (n+1) combination r+1 We also took a glimpse at (r) combination (0) + (r+1) combination (1) +(r+2) combination (2) +... +(n) combination (n-r) = (n+1) combination (n-r). We will now take a closer look at this second identity.

(a) Confirm that the second identity works for n=5, r=2 and for n=7, r=3.

(b) What is the relationship between the first and second identities?

(c) Prove the second identity above algebraically without using what you learned in Part b. (In other words, prove it without the help of the hockey stick identity we studied in class).

(d) Prove the second identity above with a block-walking argument.

bobbym · 2013-08-17 04:55:32

Hi;

What was your answer for a)?

mathstudent2000 · 2013-08-17 11:41:29

i didn't know how to do it

bobbym · 2013-08-17 13:37:09

Hi;

Did you substitute the values in?

mathstudent2000 · 2013-08-21 12:15:22

i think i got it

bobbym · 2013-08-21 12:16:28

Very good!

mathstudent2000 · 2013-08-21 12:16:29

never mind i didn't get it

mathstudent2000 · 2013-08-21 12:18:08

how do you substitute it

bobbym · 2013-08-21 12:45:17

We also took a glimpse at (r) combination (0) + (r+1) combination (1) +(r+2) combination (2) +... +(n) combination (n-r) = (n+1) combination (n-r).

You want to prove this identity for n=5, r=2 and for n=7, r=3?

mathstudent2000 · 2013-08-23 15:44:21

yes please, but i don't know how to

bobbym · 2013-08-23 16:58:54

As near as I can understand it, for n=5, r=2.

We are done.

For n=7, r=3.

We are done.

Math Is Fun Forum

#1 2013-08-15 12:52:46

hockey stick identity proof

#2 2013-08-15 19:20:13

Re: hockey stick identity proof

#3 2013-08-16 05:13:28

Re: hockey stick identity proof

#4 2013-08-16 05:16:37

Re: hockey stick identity proof

#5 2013-08-16 05:17:51

Re: hockey stick identity proof

#6 2013-08-16 05:25:32

Re: hockey stick identity proof

#7 2013-08-17 04:45:44

Re: hockey stick identity proof

#8 2013-08-17 04:51:53

Re: hockey stick identity proof

#9 2013-08-17 04:55:32

Re: hockey stick identity proof

#10 2013-08-17 11:41:29

Re: hockey stick identity proof

#11 2013-08-17 13:37:09

Re: hockey stick identity proof

#12 2013-08-21 12:15:22

Re: hockey stick identity proof

#13 2013-08-21 12:16:28

Re: hockey stick identity proof

#14 2013-08-21 12:16:29

Re: hockey stick identity proof

#15 2013-08-21 12:18:08

Re: hockey stick identity proof

#16 2013-08-21 12:45:17

Re: hockey stick identity proof

#17 2013-08-23 15:44:21

Re: hockey stick identity proof

#18 2013-08-23 16:58:54

Re: hockey stick identity proof

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