How do you factor $y^{3} - 3 y^{2} + 3 y - 1$ $y^3-3y^2+3y-1$ ?

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How do you factor $y^{3} - 3 y^{2} + 3 y - 1$ $y^3-3y^2+3y-1$ ?

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Answer 1 · 2015-09-23T11:16:59

$y^{3} - 3 y^{2} + 3 y - 1 = {(y - 1)}^{3}$ $y^3-3y^2+3y-1 = (y-1)^3$

Explanation:

The 1, 3, 3, 1 pattern is a giveaway.

In general, ${(a + b)}^{3} = a^{3} + 3 a^{2} b + 3 a b^{2} + b^{3}$ $(a+b)^3 = a^3+3a^2b+3ab^2+b^3$

More generally, you can expand ${(a + b)}^{n}$ $(a+b)^n$ or recognise an expanded power of ${(a + b)}^{n}$ $(a+b)^n$ by looking at the appropriate row of Pascal's triangle:

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For example:

${(a + b)}^{5} = a^{5} + 5 a^{4} b^{3} + 10 a^{3} b^{2} + 10 a^{2} b^{3} + 5 a b^{4} + b^{5}$ $(a+b)^5 = a^5+5a^4b^3+10a^3b^2+10a^2b^3+5ab^4+b^5$

Answer 2 · 2015-09-23T11:22:33

$y^{3} - 3 y^{2} + 3 y - 1 = {(y - 1)}^{3}$ $y^3-3y^2+3y-1 = (y-1)^3$

Explanation:

A quick inspection reveals that if $y = 1$ $y=1$ then
$XXX y^{3} - 3 y^{2} + 3 y - 1 = 0$ $color(white)("XXX")y^3-3y^2+3y-1 = 0$

Therefore $(y - 1)$ $(y-1)$ is a factor of $y^{3} - 3 y^{2} + 3 y - 1$ $y^3-3y^2+3y-1$

$(y^{3} - 3 y^{2} + 3 y - 1) \div (y - 1) = y^{2} - 2 y + 1$ $(y^3-3y^2+3y-1)div(y-1) = y^2-2y+1$
and
$y^{2} - 2 y + 1 = (y - 1) (y - 1)$ $y^2-2y+1 = (y-1)(y-1)$

Therefore
$y^{3} - 3 y^{2} + 3 y - 1$ $y^3-3y^2+3y-1$
$XXX = (y - 1) (y - 1) (y - 1)$ $color(white)("XXX")=(y-1)(y-1)(y-1)$
$XXX = {(y - 1)}^{3}$ $color(white)("XXX")=(y-1)^3$

Note that this could also have been solved if you recognized the pattern of the given expression as a row from Pascal's triangle, but I thought a more general method of solution might be useful.

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