What is the number of terms of the expanded form of (x+3y)^7?

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What is the number of terms of the expanded form of (x+3y)^7?

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Answer 1 · 2015-10-15T22:04:22

It has $8$ terms, starting with $x^7$ and ending with $(3y)^7 = 3^7y^7$

Explanation:

To expand a binomial raised to the $7$ th power, use the row of Pascal's triangle that starts $1, 7, 21,...$ . Some people call the first row of Pascal's triangle the $0$ th row, which would make this the $7$ th row. I prefer to call it the $8$ th row.

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Then

$(a+b)^7 = a^7 + 7a^6b + 21a^5b^2 + 35a^4b^3+35a^3b^4+21a^2b^5+7ab^6+b^7$

In our case $a = x$ and $b = 3y$ , so there are all those powers of $3$ to deal with too.

Write out the row of Pascal's triangle:

$1, 7, 21, 35, 35, 21, 7, 1$

Write out ascending powers of $3$ from $3^0 = 1$ up to $3^7$ :

$1, 3, 9, 27, 81, 243, 729, 2187$

Multiply the two sequences together:

$1, 21, 189, 945, 2835, 5103, 5103, 2187$

These are the coefficients we need:

$(x+3y)^7 = x^7 + 21x^6y + 189x^5y^2 + 945x^4y^3 + 2835x^3y^4 + 5103x^2y^5 + 5103xy^6 + 2187y^7$

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What is the number of terms of the expanded form of (x+3y)^7?

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