Chứng minh rằng với mọi (a,b,c) ta luôn có:
Ta có: \({\left( {a + b + c} \right)^3} = {\left( {a + b} \right)^3} + 3{\left( {a + b} \right)^2}c + 3\left( {a + b} \right){c^2} + {c^3}\)
\( = {a^3} + 3{a^2}b + 3a{b^2} + {b^3} + 3{\left( {a + b} \right)^2}c + 3\left( {a + b} \right){c^2} + {c^3}\)
\( = {a^3} + {b^3} + {c^3} + 3ab\left( {a + b} \right) + 3{\left( {a + b} \right)^2}c + 3\left( {a + b} \right){c^2}\)
\( = {a^3} + {b^3} + {c^3} + 3\left( {a + b} \right)\left[ {ab + \left( {a + b} \right)c + {c^2}} \right]\)
\[ = {a^3} + {b^3} + {c^3} + 3\left( {a + b} \right)\left( {ab + ac + bc + {c^2}} \right)\]
\[ = {a^3} + {b^3} + {c^3} + 3\left( {a + b} \right)\left[ {a\left( {b + c} \right) + c\left( {b + c} \right)} \right]\]
\[ = {a^3} + {b^3} + {c^3} + 3\left( {a + b} \right)\left( {b + c} \right)\left( {a + c} \right)\].