Matéria: Matemática
Autor: Nitoryu
Perguntado 3 anos atrás

Desafio:

Calcule o valor de "x" na seguinte expressão:
$\mathsf{\frac{\mathsf{-\sqrt[2x]{n^{2(x-1)}n^{2}}}}{(\frac{-n^{x^{2}}}{n^{x^{2} } }+1+\frac{18\pi^{2} }{9\pi})(-n)}\sqrt{\frac{1+(\sqrt{x})^{2} }{3(10^{8}+3)+(10^{6}+11110^{3})(2^{4} 5)+8880}} =\sqrt{\frac{2}{16 } }}$
Se for possível aproximar o resultado para a menor casa decimal!!!

Respostas

respondido por: auditsys

Resposta:

$\textsf{Leia abaixo}$

Explicação passo a passo:

$\mathsf{\frac{\mathsf{-\sqrt[2x]{n^{2(x - 1)}*n^{2}}}}{(\frac{-n^{x^{2}}}{n^{x^{2}}} + 1+\frac{18\pi^{2}}{9\pi})(-n)}*\sqrt{\frac{1 + (\sqrt{x})^{2}}{3(10^{8} + 3)+(10^{6} + 111 * 10^{3})(2^{4}*5)+8880}} = \sqrt{\frac{2}{16}}}$

$\mathsf{\frac{\mathsf{-\sqrt[2x]{n^{(2x - 2)}*n^{2}}}}{(\frac{-n^{x^{2}}}{n^{x^{2}}} + 1+\frac{18\pi^{2}}{9\pi})(-n)}*\sqrt{\frac{1 + (\sqrt{x})^{2}}{3(10^{8} + 3)+(10^{6} + 111* 10^{3})(2^{4}*5)+8880}} = \sqrt{\frac{2}{16}}}$

$\mathsf{\frac{\mathsf{-\sqrt[2x]{n^{2x}.n^{-2}*n^{2}}}}{(\frac{-n^{x^{2}}}{n^{x^{2}}} + 1+\frac{18\pi^{2}}{9\pi})(-n)}*\sqrt{\frac{1 + (\sqrt{x})^{2}}{3(10^{8} + 3)+(10^{6} + 111 * 10^{3})(2^{4}*5)+8880}} = \sqrt{\frac{2}{16}}}$

$\mathsf{\frac{\mathsf{-n}}{(\frac{-n^{x^{2}}}{n^{x^{2}}} + 1+\frac{18\pi^{2}}{9\pi})(-n)}*\sqrt{\frac{1 + (\sqrt{x})^{2}}{3(10^{8} + 3)+(10^{6} + 111 * 10^{3})(2^{4}*5)+8880}} = \sqrt{\frac{2}{16}}}$

$\mathsf{\frac{\mathsf{-n}}{(-1 + 1+\frac{18\pi^{2}}{9\pi})(-n)}*\sqrt{\frac{1 + (\sqrt{x})^{2}}{3(10^{8} + 3)+(10^{6} + 111 * 10^{3})(2^{4}*5)+8880}} = \sqrt{\frac{2}{16}}}$