The number of terms in (x+y+z)^{30} is 496. How many terms

Cheexorgeny

Cheexorgeny

Answered question

2022-01-19

The number of terms in (x+y+z)30 is 496. 
How many terms would there be if the same terms were combined?

Answer & Explanation

Hattie Schaeffer

Hattie Schaeffer

Beginner2022-01-19Added 37 answers

Step 1 
First note that every xaybzc with a+b+c=30 appears. 
To see this, one approach is to observe.
30(x+y+z)30xaybzc at (0, 0, 0) is 30!, which is not zero. So for a given value of a, every possible (b, c) with 
b+c=30a 
can happen. Since b goes from 0 to 30a, there are 31a possibilities for b, each of which forces c to have the single value 
30ab 
Thus for a given a there are 
31a 
different possible (b,c). Adding this over all a from 0 to 31 this gives the sum of 
31+30++0=496

reinosodairyshm

reinosodairyshm

Beginner2022-01-20Added 36 answers

Step 1
No, the 496 is the number of terms after like terms are combined. Before like terms are combined there are 330 terms.
This is because you have 30 different factors, and so the number of terms you get before combining is the number of ways to choose 30 elements when there are three choices for each.
Zaricuses

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