\(\displaystyle{e}^{{{5}}}={x}-{2}\)
Since ln of x equals y means that e to the y = x you can apply this here and get this.

Question

asked 2021-02-02

Write the following in exponential form.

\(\displaystyle{\log{{1.27}}}{5.86}\)

\(\displaystyle{\log{{1.27}}}{5.86}\)

asked 2021-01-16

Write in exponential form.

\(\displaystyle{\log{{3}}}{1}={0}\)

\(\displaystyle{\log{{3}}}{1}={0}\)

asked 2020-12-25

Solve the equations and inequalities:
\(\frac{2^{x}}{3}\leq\frac{5^{x}}{4}\)

asked 2020-10-27

Solve the equations and inequalities:
\(\displaystyle{\frac{{{2}^{{{x}}}}}{{{3}}}}\leq{\frac{{{5}^{{{x}}}}}{{{4}}}}\)

asked 2020-11-23

\(\displaystyle{\log{

asked 2020-11-22

ln \(\displaystyle{\left({n}²+{12}\right)}={\ln{{\left(-{9}{n}-{2}\right)}}}\)

asked 2021-02-05

\(\displaystyle{\log{{3}}}{\left({x}+{3}\right)}−{\log{{3}}}{\left({x}−{3}\right)}={2}\)

asked 2021-01-05

\(\displaystyle{\ln{{\left({\ln{{x}}}\right)}}}={2}\)

asked 2021-02-25

Write \(\log_3 \frac{1}{27x^{2}\) in the form a+b \(\log_3x\) where a and b are integers

asked 2020-11-14

\(\displaystyle{6}^{{x}}+{2}={4}^{{x}}\)