Solve for x. (e^x-e^-x)/((e^x+e^-x)=t - QAmmunity.org

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Solve for x. (e^x-e^-x)/((e^x+e^-x)=t

asked Dec 12, 2019 6.3k views

5 votes

Solve for x. (e^x-e^-x)/((e^x+e^-x)=t

Mathematics
middle-school

Allan Jiang asked

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2 Answers

5 votes

$(e^x-e^(-x))/(e^x+e^(-x))=t\\\\ (e^(2x)-1)/(e^(2x)+1)=t\\\\ e^(2x)-1=t(e^(2x)+1)\\\\ e^(2x)-1=e^(2x)t+t\\\\ e^(2x)-e^(2x)t=t+1\\\\ e^(2x)(1-t)=t+1\\\\ e^(2x)=(t+1)/(1-t)\\\\ e^(2x)=-(t+1)/(t-1)\\\\ 2x=\ln\left(-(t+1)/(t-1)\right)\\\\ x=(\ln\left(-(t+1)/(t-1)\right))/(2)\qquad t\in(-1,1)$

Sasanka Panguluri answered Dec 14, 2019

by Sasanka Panguluri

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2 votes

Answer:

d on edge

Explanation:

Jelle Oosterbosch answered Dec 17, 2019

by Jelle Oosterbosch

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