Binomial theorem query (1 Viewer)

apollo1 · Sep 27, 2011

Show that there will always be a term independent of x in the expansion of:

$(x^{p}+\frac{1}{x^{2p}})^{3n}$ (n is a positive integer), and find that term.

apollo1 · Sep 27, 2011

I got 3nCn

apollo1 · Sep 27, 2011

ok so this is wat i did:
$T_{r+1} = _{r}^{3n}\textrm{C}(x^{p})^{3n-r}(\frac{1}{x^{2p}})^{r}$
then i simplified to get:
$T_{r+1} = _{r}^{3n}\textrm{C}x^{3n-3r}$
therefore since n greater than or equal to r, a term independent of x must always exist.
3n-3r = 0
therefore 3n = 3r
therefore r = n

thefore term is 3nCn. can sumone plz confirm if my working is correct.

hayabusaboston · Sep 27, 2011

correct

OldMathsGuy · Sep 27, 2011

You want the indices to balance out, ie r = 2n therefore the term is 3nC2n.

This is the same as 3nCn (just with the indices swapped around). r = n or r = 2n are both valid solutions, and so 3nCn and 3nC2n are identical terms.

Best Regards
Old Maths Guy

taeyang · Sep 27, 2011

I don't even know if it wants an integer for the term ^^ but is it 3nCn ?

apollo1 · Sep 27, 2011

OldMathsGuy said:
You want the indices to balance out, ie r = 2n therefore the term is 3nC2n.

This is the same as 3nCn (just with the indices swapped around). r = n or r = 2n are both valid solutions, and so 3nCn and 3nC2n are identical terms.

Best Regards
Old Maths Guy

lol i luv how u do that thing at the end of your posts. very classy.

Binomial theorem query (1 Viewer)

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