a) \(A \vdots 500.\) b) \(B \vdots 3.\)
Lời giải
a) Đúng.
Ta có: \(A = \left( {363 + 137} \right)\left( {{{363}^2} - 363 \cdot 137 + {{137}^2}} \right) = 500\left( {{{363}^2} - 363 \cdot 137 + {{137}^2}} \right).\) Do đó, \(A \vdots 500.\)
b) Đúng.
Ta có: \(B = \left( {362 - 131} \right)\left( {{{362}^2} + 362 \cdot 131 + {{131}^2}} \right) = 231\left( {{{362}^2} + 362 \cdot 131 + {{131}^2}} \right).\)
Vì \(231 \vdots 3\) nên \(231\left( {{{362}^2} + 362 \cdot 131 + {{131}^2}} \right) \vdots 3\) hay \(B \vdots 3.\)
c) Sai.
Vì \(A = 500\left( {{{363}^2} - 363 \cdot 137 + {{137}^2}} \right)\) nên \(A \vdots \left( {{{363}^2} - 363 \cdot 137 + {{137}^2}} \right).\)
d) Sai.
Vì \(B = 231\left( {{{362}^2} + 362 \cdot 131 + {{131}^2}} \right)\) nên \(B \vdots \left( {{{362}^2} + 362 \cdot 131 + {{131}^2}} \right).\)