How do you find the 7th term in the binomial expansion for $(x - y)^6$ ?

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How do you find the 7th term in the binomial expansion for $(x - y)^6$ ?

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Answer 1 · 2015-10-24T14:12:04

$T_7=y^6$

Explanation:

From the Binomial Theorem, we obtain that for the expression
$(x+y)^n=sum_(r=0)^n""^nC_rx^(n-r)y^r$ ,

The term in position $(r+1)$ is given by

$T_(r+1)=""^nC_rx^(n-r)y^r$

Hence the 7th term is the term in position $T_(6+1)$ and may be given by

$T_7=T_(6+1)=""^6C_6x^(6-6)(-y)^6$

$=y^6$

Alternatively, we also note that any binomial of form $(x+y)^n$ always has $(n+1)$ terms.
Hence the 7th term is the last term of the series $sum_(r=0)^n""^nC_rx^(n-r)y^r$ , and is hence $""^6C_6x^(6-6)(-y)^6=y^6$

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How do you find the 7th term in the binomial expansion for $(x - y)^6$ ?

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How do you find the 7th term in the binomial expansion for $(x - y)^6$ ?