Задание

Установите соответсвие, используя формулы сокращенного умножения.

\(49-14x+x^2\)

\(27-8a^3\)

\(169y^2-225\)

\(25n^2+20n+4\)

\((4+m)(16-4m+m^2)\)

\((6p+9s)^2\)

\((9+l)(9-l)\)

\(125d^3+27t^6\)

\(1225-49k^4\)

\(2\sqrt3-4\sqrt3n+n^2\)

\(343b^3-64a^3\)

\((a+2b)^3\)

\(0,008m^3-343000n^3\)

\(14n^2-25m^2\)

\(8q^3-6q^2v+6qv^2-8v^3\)

\((7-x)^2\)

\((3-2a)(9+6a+4a^2)\)

(13y-15)(13y+15)

\((5n+2)^2\)

\(64+m^3\)

\(36p^2+108ps+81s^2\)

\(81-l^2\)

\((5d+3t^2)(25d^2-15dt^2+9t^4)\)

\((\sqrt35-\sqrt7k)(\sqrt35+\sqrt7k)(35+7k)\)

\((12-n)^2\)

\((7b-4a)(49a^2+28ab+16a^2)\)

\(a^3+6a^2b+12ab^2+8b^3\)

\((0,2m-70n)(0,04m^2+14mn+4900n^2)\)

\((\sqrt14n-5m)(\sqrt14n+5m)\)

\((2q-2v)^3\)