when was computer invented
when was computer invented
when was computer invented
when was computer invented
when was computer invented
Answers
Explanation:
Use chain rule
\begin{gathered} \frac{dy}{dx} = \frac{d}{dx} ( log_{7}( log_{7}(x) ) \\ \\ = \frac{1}{ log(7) .log_{7}(x) } \frac{d}{dx} ( log_{7}(x) ) \\ \\ = \frac{1}{ log(7) \frac{ log(x) }{ log(7) } } . \frac{1}{x log(7) } \\ \\ = \frac{1}{x log(x) log(7) } \end{gathered}
dx
dy
=
dx
d
(log
7
(log
7
(x))
=
log(7).log
7
(x)
1
dx
d
(log
7
(x))
=
log(7)
log(7)
log(x)
1
.
xlog(7)
1
=
xlog(x)log(7)
1
2.
\begin{gathered} \frac{d}{dx} {2}^{ log( \cos(x) ) } \\ \\ = {2}^{ log( \cos(x) ) }log(2) \frac{d}{dx} ( log( \cos(x) ) \\ \\ = {2}^{ log( \cos(x) ) } log(2). \frac{1}{ \cos(x) } \frac{d}{dx} ( \cos(x)) \\ \\ = {2}^{ log( \cos(x) ) } log(2)( \frac{ - \sin(x) }{ \cos(x) } )\\ \\ = - \log(2) \tan(x) {2}^{ log( \cos(x) ) } \end{gathered}
dx
d
2
log(cos(x))
=2
log(cos(x))
log(2)
dx
d
(log(cos(x))
=2
log(cos(x))
log(2).
cos(x)
1
dx
d
(cos(x))
=2
log(cos(x))
log(2)(
cos(x)
−sin(x)
)
=−log(2)tan(x)2
log(cos(x))
Answer:
between 1833 and 1871.
between 1833 and 1871.
between 1833 and 1871.
between 1833 and 1871.
between 1833 and 1871.
Explanation:
hehe