URGENTE, VALENDO 50 PORQUE PRECISO MUITO.
Dados log2= 0,301, log3= 0,477 e log7=0845, calcule.
A) Log ⁴√125
B) Log 25/6
C) Log 35
Soluções para a tarefa
Respondido por
1
No enunciado deveria ter o log de 5 também. As respostas estão na foto.
Anexos:
Logizinho:
Mas no enunciado não tem, e aí? Da para resolver mesmo assim ?
Creio que era necessário o log de 5 pra aplicar as propriedades.
a letra b esqueci de pôr um parêntese
2x0.699-(0.477+0.301)=0.62
Respondido por
0
Ae mano,
Use as propriedades,
Produto:
Quociente:
Potência:
Decorrente da Definição:
.............................
![\mathsf{log(^4 \sqrt{125})=log(^4 \sqrt{5^3}) }\\
\mathsf{log(^4 \sqrt{125})=log(5^{ \tfrac{3}{4} }) }\\\\
\mathsf{log(^4 \sqrt{125})= \dfrac{3}{4}\cdot log(5) }\\\\
\mathsf{log(^4 \sqrt{125})= \dfrac{3}{4}\cdot log\left( \dfrac{10}{2} \right) }\\\\
\mathsf{log(^4 \sqrt{125})= \dfrac{3}{4}\cdot[log(10)-log(2)] }\\\\
\mathsf{log(^4 \sqrt{125})= \dfrac{3}{4}\cdot[log_{10}(10)-log(2)] }\\\\
\mathsf{log(^4 \sqrt{125})= \dfrac{3}{4}\cdot(1-0,301) }](https://tex.z-dn.net/?f=%5Cmathsf%7Blog%28%5E4+%5Csqrt%7B125%7D%29%3Dlog%28%5E4+%5Csqrt%7B5%5E3%7D%29++%7D%5C%5C%0A%5Cmathsf%7Blog%28%5E4+%5Csqrt%7B125%7D%29%3Dlog%285%5E%7B+%5Ctfrac%7B3%7D%7B4%7D+%7D%29+%7D%5C%5C%5C%5C%0A%5Cmathsf%7Blog%28%5E4+%5Csqrt%7B125%7D%29%3D++%5Cdfrac%7B3%7D%7B4%7D%5Ccdot+log%285%29+%7D%5C%5C%5C%5C%0A%5Cmathsf%7Blog%28%5E4+%5Csqrt%7B125%7D%29%3D+%5Cdfrac%7B3%7D%7B4%7D%5Ccdot+log%5Cleft%28+%5Cdfrac%7B10%7D%7B2%7D+%5Cright%29++%7D%5C%5C%5C%5C%0A%5Cmathsf%7Blog%28%5E4+%5Csqrt%7B125%7D%29%3D+%5Cdfrac%7B3%7D%7B4%7D%5Ccdot%5Blog%2810%29-log%282%29%5D++%7D%5C%5C%5C%5C%0A%5Cmathsf%7Blog%28%5E4+%5Csqrt%7B125%7D%29%3D++%5Cdfrac%7B3%7D%7B4%7D%5Ccdot%5Blog_%7B10%7D%2810%29-log%282%29%5D+%7D%5C%5C%5C%5C%0A%5Cmathsf%7Blog%28%5E4+%5Csqrt%7B125%7D%29%3D+%5Cdfrac%7B3%7D%7B4%7D%5Ccdot%281-0%2C301%29++%7D%0A "\mathsf{log(^4 \sqrt{125})=log(^4 \sqrt{5^3}) }\\
\mathsf{log(^4 \sqrt{125})=log(5^{ \tfrac{3}{4} }) }\\\\
\mathsf{log(^4 \sqrt{125})= \dfrac{3}{4}\cdot log(5) }\\\\
\mathsf{log(^4 \sqrt{125})= \dfrac{3}{4}\cdot log\left( \dfrac{10}{2} \right) }\\\\
\mathsf{log(^4 \sqrt{125})= \dfrac{3}{4}\cdot[log(10)-log(2)] }\\\\
\mathsf{log(^4 \sqrt{125})= \dfrac{3}{4}\cdot[log_{10}(10)-log(2)] }\\\\
\mathsf{log(^4 \sqrt{125})= \dfrac{3}{4}\cdot(1-0,301) }")
............................
![\mathsf{log\left( \dfrac{25}{6} \right)=log\left( \dfrac{5^2}{2\cdot3}\right) }\\\\ \mathsf{log\left( \dfrac{25}{6} \right)=[log(5^2)]-log(2\cdot3)}\\\\ \mathsf{log\left( \dfrac{25}{6}\right)=[log(5)^2]-log(2)+log(3)}\\\\ \mathsf{log\left( \dfrac{25}{6}\right)=\{[2\cdot log(5)]-[log(2)+log(3)]}\\\\
\mathsf{log\left( \dfrac{25}{6}\right)=\left[2\cdot log\left( \dfrac{10}{2} \right)\right]-[log(2)+log(3)]}](https://tex.z-dn.net/?f=%5Cmathsf%7Blog%5Cleft%28+%5Cdfrac%7B25%7D%7B6%7D+%5Cright%29%3Dlog%5Cleft%28+%5Cdfrac%7B5%5E2%7D%7B2%5Ccdot3%7D%5Cright%29+%7D%5C%5C%5C%5C+%5Cmathsf%7Blog%5Cleft%28+%5Cdfrac%7B25%7D%7B6%7D+%5Cright%29%3D%5Blog%285%5E2%29%5D-log%282%5Ccdot3%29%7D%5C%5C%5C%5C+%5Cmathsf%7Blog%5Cleft%28+%5Cdfrac%7B25%7D%7B6%7D%5Cright%29%3D%5Blog%285%29%5E2%5D-log%282%29%2Blog%283%29%7D%5C%5C%5C%5C+%5Cmathsf%7Blog%5Cleft%28+%5Cdfrac%7B25%7D%7B6%7D%5Cright%29%3D%5C%7B%5B2%5Ccdot+log%285%29%5D-%5Blog%282%29%2Blog%283%29%5D%7D%5C%5C%5C%5C+%0A%5Cmathsf%7Blog%5Cleft%28+%5Cdfrac%7B25%7D%7B6%7D%5Cright%29%3D%5Cleft%5B2%5Ccdot+log%5Cleft%28+%5Cdfrac%7B10%7D%7B2%7D++%5Cright%29%5Cright%5D-%5Blog%282%29%2Blog%283%29%5D%7D%0A "\mathsf{log\left( \dfrac{25}{6} \right)=log\left( \dfrac{5^2}{2\cdot3}\right) }\\\\ \mathsf{log\left( \dfrac{25}{6} \right)=[log(5^2)]-log(2\cdot3)}\\\\ \mathsf{log\left( \dfrac{25}{6}\right)=[log(5)^2]-log(2)+log(3)}\\\\ \mathsf{log\left( \dfrac{25}{6}\right)=\{[2\cdot log(5)]-[log(2)+log(3)]}\\\\
\mathsf{log\left( \dfrac{25}{6}\right)=\left[2\cdot log\left( \dfrac{10}{2} \right)\right]-[log(2)+log(3)]}")
![\mathsf{log\left( \dfrac{25}{6}\right)=\{2\cdot [log(10)-[log(2)\}-[log(2)+log(3)}\\\\
\mathsf{log\left( \dfrac{25}{6}\right)=\{2\cdot[1-0,301]\}-[0,301+0,477]}\\\\
\mathsf{log\left( \dfrac{25}{6}\right)=[2\cdot0,699]-[0,778]}\\\\
\mathsf{log\left( \dfrac{25}{6}\right)=1,398-0,778}\\\\
\Large\boxed{\mathsf{log\left( \dfrac{25}{6}\right)=0,62}}](https://tex.z-dn.net/?f=%5Cmathsf%7Blog%5Cleft%28+%5Cdfrac%7B25%7D%7B6%7D%5Cright%29%3D%5C%7B2%5Ccdot+%5Blog%2810%29-%5Blog%282%29%5C%7D-%5Blog%282%29%2Blog%283%29%7D%5C%5C%5C%5C%0A%5Cmathsf%7Blog%5Cleft%28+%5Cdfrac%7B25%7D%7B6%7D%5Cright%29%3D%5C%7B2%5Ccdot%5B1-0%2C301%5D%5C%7D-%5B0%2C301%2B0%2C477%5D%7D%5C%5C%5C%5C%0A%5Cmathsf%7Blog%5Cleft%28+%5Cdfrac%7B25%7D%7B6%7D%5Cright%29%3D%5B2%5Ccdot0%2C699%5D-%5B0%2C778%5D%7D%5C%5C%5C%5C%0A%5Cmathsf%7Blog%5Cleft%28+%5Cdfrac%7B25%7D%7B6%7D%5Cright%29%3D1%2C398-0%2C778%7D%5C%5C%5C%5C%0A%5CLarge%5Cboxed%7B%5Cmathsf%7Blog%5Cleft%28+%5Cdfrac%7B25%7D%7B6%7D%5Cright%29%3D0%2C62%7D%7D "\mathsf{log\left( \dfrac{25}{6}\right)=\{2\cdot [log(10)-[log(2)\}-[log(2)+log(3)}\\\\
\mathsf{log\left( \dfrac{25}{6}\right)=\{2\cdot[1-0,301]\}-[0,301+0,477]}\\\\
\mathsf{log\left( \dfrac{25}{6}\right)=[2\cdot0,699]-[0,778]}\\\\
\mathsf{log\left( \dfrac{25}{6}\right)=1,398-0,778}\\\\
\Large\boxed{\mathsf{log\left( \dfrac{25}{6}\right)=0,62}}")
.................................
![\mathsf{log(35)=log(5\cdot7)}\\
\mathsf{log(35)=log(5)+log(7)}\\\\
\mathsf{log(35)=log\left( \dfrac{10}{2}\right)+log(7)}\\\\\mathsf{log(35)=[log(10)-log(2)]+log(7)}\\\\\mathsf{log(35)=[1-0,301]+0,845}\\\\
\Large\boxed{\mathsf{log(35)=1,544}}](https://tex.z-dn.net/?f=%5Cmathsf%7Blog%2835%29%3Dlog%285%5Ccdot7%29%7D%5C%5C%0A%5Cmathsf%7Blog%2835%29%3Dlog%285%29%2Blog%287%29%7D%5C%5C%5C%5C%0A%5Cmathsf%7Blog%2835%29%3Dlog%5Cleft%28+%5Cdfrac%7B10%7D%7B2%7D%5Cright%29%2Blog%287%29%7D%5C%5C%5C%5C%5Cmathsf%7Blog%2835%29%3D%5Blog%2810%29-log%282%29%5D%2Blog%287%29%7D%5C%5C%5C%5C%5Cmathsf%7Blog%2835%29%3D%5B1-0%2C301%5D%2B0%2C845%7D%5C%5C%5C%5C%0A%5CLarge%5Cboxed%7B%5Cmathsf%7Blog%2835%29%3D1%2C544%7D%7D "\mathsf{log(35)=log(5\cdot7)}\\
\mathsf{log(35)=log(5)+log(7)}\\\\
\mathsf{log(35)=log\left( \dfrac{10}{2}\right)+log(7)}\\\\\mathsf{log(35)=[log(10)-log(2)]+log(7)}\\\\\mathsf{log(35)=[1-0,301]+0,845}\\\\
\Large\boxed{\mathsf{log(35)=1,544}}")
Tenha ótimos estudos mano!
Use as propriedades,
Produto:
Quociente:
Potência:
Decorrente da Definição:
.............................
............................
.................................
Tenha ótimos estudos mano!
atualiza aí velho ;P
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