Cho các số thực dương a , b , c thỏa mãn a ^ log3(7) = 27 ,b ^ log11(7)= 49 , c^log11(25) = √ 11 . Mỗi phát biểu sau đây là đúng hay sai?
Đáp án
Phát biểu | Đúng | Sai |
\(\sqrt[3]{{{a^{{{\left( {{\rm{lo}}{{\rm{g}}_3}7} \right)}^2}}}}} = 14\). | X | |
\({c^{{{\left( {{\rm{lo}}{{\rm{g}}_{11}}25} \right)}^2}}} = 5\) | X | |
\(\sqrt[3]{{{a^{{{\left( {{\rm{lo}}{{\rm{g}}_3}7} \right)}^2}}}}} + \sqrt {{b^{{{\left( {{\rm{lo}}{{\rm{g}}_7}11} \right)}^2}}}} + {c^{{{\left( {{\rm{lo}}{{\rm{g}}_{11}}25} \right)}^2}}} = 23\) | X |
Giải thích
\(\sqrt[3]{{{a^{{{\left( {{\rm{lo}}{{\rm{g}}_3}7} \right)}^2}}}}} = \sqrt[3]{{{{\left( {{a^{{\rm{lo}}{{\rm{g}}_3}7}}} \right)}^{{\rm{lo}}{{\rm{g}}_3}7}}}} = \sqrt[3]{{{{27}^{{\rm{lo}}{{\rm{g}}_3}7}}}} = \sqrt[3]{{{{\left( {{3^{{\rm{lo}}{{\rm{g}}_3}7}}} \right)}^3}}} = 7\).
\(\sqrt {{b^{{{\left( {{\rm{lo}}{{\rm{g}}_7}11} \right)}^2}}}} = \sqrt {{{\left( {{b^{{\rm{lo}}{{\rm{g}}_7}11}}} \right)}^{{\rm{lo}}{{\rm{g}}_7}11}}} = \sqrt {{{49}^{{\rm{lo}}{{\rm{g}}_7}11}}} = \sqrt {{{\left( {{7^{{\rm{lo}}{{\rm{g}}_7}11}}} \right)}^2}} = 11\).
\({c^{{{\left( {{\rm{lo}}{{\rm{g}}_{11}}25} \right)}^2}}} = {\left( {{c^{{\rm{lo}}{{\rm{g}}_{11}}25}}} \right)^{{\rm{lo}}{{\rm{g}}_{11}}25}} = {(\sqrt {11} )^{{\rm{lo}}{{\rm{g}}_{11}}25}} = \sqrt {{{11}^{{\rm{lo}}{{\rm{g}}_{11}}25}}} = \sqrt {25} = 5\).
Vậy \(\sqrt[3]{{{a^{{{\left( {{\rm{lo}}{{\rm{g}}_3}7} \right)}^2}}}}} + \sqrt {{b^{{{\left( {{\rm{lo}}{{\rm{g}}_7}11} \right)}^2}}}} + {c^{{{\left( {{\rm{lo}}{{\rm{g}}_{11}}25} \right)}^2}}} = 7 + 11 + 5 = 23\).