Задание

Разложите выражение \({\frac{4}{25}a^6b^4 - 2\frac{14}{25}m^{10}p^8}\) на множители, воспользовавшись формулой разности квадратов.

\({\left(\frac{2}{5}a^3b^2 - 1\frac{3}{5}m^5p^4\right)\!\left(\frac{2}{5}a^3b^2 + 1\frac{3}{5}m^5p^4\right)}\)

\({\left(\frac{1}{5}a^3b^2 + 1\frac{2}{5}m^5p^4\right)\!\left(\frac{2}{5}a^3b^2 + 1\frac{3}{5}m^5p^4\right)}\)

\({\left(\frac{2}{5}a^3b^2 - 1\frac{3}{5}m^5p^4\right)\!\left(\frac{2}{5}a^3b^2 - 1\frac{2}{5}m^5p^4\right)}\)

\({\left(1\frac{2}{5}a^3b^2 - 1\frac{3}{5}m^5p^4\right)\!\left(1\frac{2}{5}a^3b^2 + 1\frac{3}{5}m^5p^4\right)}\)