Use differential to approximate `log(9.01).` (Given, `log3=1.0986`)

Find the approximate value of log_(e)(9*01) given log_(e)3=1*0986

Use differentials to find the approximate value of log_ _(e)(4.01), having given that log_(e)4=1.3863

Using differentials, find the approximate value of (log)_(10)10. 1 , it being given that (log)_(10)e=0. 4343 .

Using differentials, find the approximate value of (log)_e 10.02 , it being given that (log)_e 10=2. 3026 .

Using differentials, find the approximate value of log_(10)10.1 when log_(10)e=0.4343 .

differentiate: log(log x)

Using differentials, find the approximate value of (log)_e 4.04 , it being given that (log)_(10)4=0. 6021 and (log)_(10)e=0. 4343 .

Find the approximate value of (log)_(10)1005 , given that (log)_(10)e=0. 4343

Differentiate log[log(logx^(5))]

A capacitor is connected to a 36 V battery through a resistance of 10 Omega . It is found that the potential difference across the capacitor rises to 4.0 V in 1 mu s. Find the capacitance of the capacitor. (Given : ln^(3)=1.0986, ln^(2)=0.693 )