Factorize a³ + (b − a)³ − b³

Factorize a³ + (b − a)³ − b³

The factorized form of \[ a^3+(b-a)^3-b^3 \] is

Solution

Let

\[ x=a,\quad y=(b-a),\quad z=-b \]

Then,

\[ x+y+z = a+(b-a)-b \]

\[ x+y+z=0 \]

We know that if \(x+y+z=0\), then

\[ x^3+y^3+z^3=3xyz \]

Therefore,

\[ a^3+(b-a)^3-b^3 = 3(a)(b-a)(-b) \]

\[ = -3ab(b-a) \]

\[ = 3ab(a-b) \]

Therefore,

\[ \boxed{3ab(a-b)} \]

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