Note : log x = log10 x: log58^50...

Note : `log x = log_10 x`: `log_58^50`

REAL NUMBERS
VGS PUBLICATION-BRILLIANT|Exercise CREATIVE BITS FOR CCE MODEL EXAMINATION(MCQs)|131 Videos
QUADRATIC EQUATIONS (MULTIPLE CHOICE QUESTION)
VGS PUBLICATION-BRILLIANT|Exercise QUADRATIC EQUATIONS (MULTIPLE CHOICE QUESTION)|20 Videos
REAL NUMBERS (MULTIPLE CHOICE QUESTION)
VGS PUBLICATION-BRILLIANT|Exercise REAL NUMBERS (MULTIPLE CHOICE QUESTION)|22 Videos

Similar Questions

Explore conceptually related problems

Note : log x = log_10 x : log_27^25

Note : log x = log_10 x : log 5^23

Note : log x = log_10 x : log 1024

If x^2 + y^2 = 10xy , prove that 2 log (x + y) = log x + log y + 2 log 2 + log 3 .

If x^(2) + y^(2)=6xy , prove that 2 log (x+ y)= log x + log y + 3 log 2

We can write log"" x/y = log (x.y^(-1 )) Can you prove that log"" x/y = log x - logy using product and power rules.

The domain of function: log_(10) log_(10) log_(10) log_(10) log_(10)^(x) is:

Find the derivative of the w.r.t.x log [(sin (log x ) + x log x log (log x)]

If y = log _(a) x + log _(x ) a + log _(x ) x + log _(a) a then (dy)/(dx) =

The derivative of (log x) ^(x) w.r.t x is (log x)^(x-1) [1+ log x log (log x)] R : (d)/(dx) {f (x) ^(g(x))[g (x) (f'(x))/(f (x)) + g'(x) log (f(x) ]