Сандық өрнектерді тепе-тең түрлендіру (Рустюмова 1.1.5)

Шешуі: $${(3 – \sqrt 2 )\sqrt {11 + 2 \cdot 3 \cdot \sqrt 2 } = (3 + \sqrt 2 )\sqrt {{3^2} + 2 \cdot 3\sqrt 2 + {{(\sqrt 2 )}^2}} = }$$ $${ = (3 – \sqrt 2 )\sqrt {{{(3 + \sqrt 2 )}^2}} = (3 – \sqrt 2 )(3 + \sqrt 2 ) = 9 – 2 = 7}$$

Шешуі: $${(3 – \sqrt 5 )\sqrt {14 + 2 \cdot 3 \cdot \sqrt 5 } = (3 – \sqrt 5 )\sqrt {{3^2} + 2 \cdot 3 \cdot \sqrt 5 + {{(\sqrt 5 )}^2}} = }$$ $${ = (3 – \sqrt 5 )\sqrt {{{(3 + \sqrt 5 )}^2}} = (3 – \sqrt 5 )(3 + \sqrt 5 ) = 9 – 5 = 4}$$

Шешуі: $${\left( {7 + \sqrt {33} } \right) + 2\sqrt {\left( {7 + \sqrt {33} } \right)\left( {7 – \sqrt {33} } \right)} + \left( {7 – \sqrt {33} } \right) = }$$ $${ = 7 + \sqrt {33} + 8 + 7 – \sqrt {33} = 22}$$

Шешуі: $${\sqrt {3 – 2\sqrt 2 } \cdot \sqrt[4]{{17 + 2 \cdot 6\sqrt 2 }} = }$$ $${ = \sqrt {3 – 2\sqrt 2 } \cdot \sqrt[4]{{{3^2} + 2 \cdot 3 \cdot 2\sqrt 2 + {{(2\sqrt 2 )}^2}}} = }$$ $${ = \sqrt {3 – 2\sqrt 2 } \cdot \sqrt {3 + 2\sqrt 2 } = \sqrt {9 – 8} = 1}$$

Шешуі: $$ = \left| {\sqrt 3 – 1} \right| + \left| {\sqrt 3 – 2} \right| = \sqrt 3 – 1 + 2 – \sqrt 3 = 1$$

Шешуі: $$ = \left| {2 – \sqrt 5 } \right| + \left| {3 – \sqrt 5 } \right| = \sqrt 5 – 2 + 3 – \sqrt 5 = 1$$

Шешуі: $$ = 2 – \sqrt 3 – \left( {\sqrt 3 – 1} \right) + \sqrt 3 = $$ $$ = 2 – \sqrt 3 – \sqrt 3 + 1 + \sqrt 3 = 3 – \sqrt 3 $$

Шешуі: $$\sqrt[3]{{\sqrt {4 – 2\sqrt 3 } }} \cdot \sqrt[3]{{1 + \sqrt 3 }} \cdot \sqrt[3]{4} = $$ $$ = \sqrt[3]{{\sqrt {{{(\sqrt 3 )}^2} – 2 \cdot \sqrt 3 \cdot 1 + {1^2}} }} \cdot \sqrt[3]{{1 + \sqrt 3 }} \cdot \sqrt[3]{4} = $$ $$ = \sqrt[3]{{(\sqrt 3 – 1)(\sqrt 3 + 1)}} \cdot \sqrt[3]{4} = \sqrt[3]{2} \cdot \sqrt[3]{4} = \sqrt[3]{{2 \cdot 4}} = 2$$

Шешуі: $${ = | – \sqrt {14} + 2| + 2\sqrt {14} – 8 = \sqrt {14} – 2 + 2\sqrt {14} – 8 = 3\sqrt {14} – 10}$$

Шешуі: $$ = \dfrac{{\sqrt 5 (5\sqrt 5 + 8)}}{{8 + 5\sqrt 5 }} \cdot \sqrt {9 – 2 \cdot 2 \cdot \sqrt 5 } = \sqrt 5 \cdot \sqrt {{2^2} – 2 \cdot 2 \cdot \sqrt 5 + {{\left( {\sqrt 5 } \right)}^2}} = $$ $$ = \sqrt 5 \cdot \sqrt {{{(2 – \sqrt 5 )}^2}} = \sqrt 5 \cdot \left( {\sqrt 5 – 2} \right) = 5 – 2\sqrt 5 $$

Шешуі: $$\sqrt[6]{{7 + 4\sqrt 3 }} = \sqrt[6]{{{2^2} + 2 \cdot 2 \cdot \sqrt 3 + {{\left( {\sqrt 3 } \right)}^2}}} = \sqrt[3]{{2 + \sqrt 3 }}$$ $$\sqrt[3]{{2 – \sqrt 3 }} \cdot \sqrt[3]{{2 + \sqrt 3 }} = \sqrt[3]{{\left( {2 – \sqrt 3 } \right)\left( {2 + \sqrt 3 } \right)}} = 1$$

Шешуі: $$ = 3 + 2\sqrt 3 + 1 + 3 – 4\sqrt 3 + 4 + 3\sqrt 3 + \sqrt {{{(\sqrt 3 )}^2} + 2\sqrt 3 + {1^2}} + \sqrt {{2^2} – 2 \cdot 2 \cdot \sqrt 3 + {{(\sqrt 3 )}^2}} = $$ $$ = 11 + \sqrt 3 + \sqrt 3 + 1 + 2 – \sqrt 3 = 14 + \sqrt 3 $$

Шешуі: $${2 + 6\sqrt 2 + 9 + 2 – 2\sqrt 2 + 1 + 2\sqrt 2 + \sqrt {{{(\sqrt 2 )}^2} + 2 \cdot \sqrt 2 \cdot 1 + {1^2}} + \sqrt {{3^2} – 2 \cdot 3 \cdot \sqrt 2 + {{(\sqrt 2 )}^2}} = }$$ $${ = 14 + 6\sqrt 2 + \sqrt 2 + 1 + 3 – \sqrt 2 = 18 + 6\sqrt 2 }$$

Шешуі: $${\sqrt {17 – 4\sqrt {{2^2} + 2 \cdot 2 \cdot \sqrt 5 + {{(\sqrt 5 )}^2}} } = \sqrt {17 – 4(2 + \sqrt 5 )} = \sqrt {17 – 8 – 4\sqrt 5 } = }$$ $${ = \sqrt {9 – 4\sqrt 5 } = \sqrt {{2^2} – 2 \cdot 2 \cdot \sqrt 5 + {{(\sqrt 5 )}^2}} = \sqrt {{{(2 – \sqrt 5 )}^2}} = \sqrt 5 – 2}$$

Шешуі: $${\sqrt {15 – 4\sqrt {{2^2} + 2 \cdot 2 \cdot \sqrt 3 + {{(\sqrt 3 )}^2}} } = \sqrt {15 – 4(2 + \sqrt 3 )} = }$$ $${ = \sqrt {15 – 8 – 4\sqrt 3 } = \sqrt {7 – 4\sqrt 3 } = \sqrt {{2^2} – 2 \cdot 2 \cdot \sqrt 3 + {{(\sqrt 3 )}^2}} = }$$ $${ = \sqrt {{{(2 – \sqrt 3 )}^2}} = 2 – \sqrt 3 }$$