Solve for
m
\displaystyle {m}
m
in the equation below. It may be helpful to convert the equation into exponential form. Write answer as an integer or reduced fraction.
4
⋅
log
4
(
m
)
+
19
=
27
\displaystyle {4}\cdot{{\log}_{{4}}{\left({m}\right)}}+{19}={27}
4
⋅
lo
g
4
(
m
)
+
19
=
27
m
=
\displaystyle {m}=
m
=
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\displaystyle