[" All logarithms being calculated to the base "10," prove that "],[qquad (1)/(6)sqrt((3log1728)/(1+(1)/(2)log0.36+(1)/(8)log8))=(1)/(2)]

Similar Questions

Explore conceptually related problems

Calculate : (v) 1/6 sqrt((3log 1728)/(1+1/2 log 0.36 + 1/3log8))

The value [(1)/(6)((2log_(10)(1728))/(1+(1)/(2)log_(10)(0.36)+(1)/(3)log_(10)8))^(1//2)]^(-1) is :

8^(-(1)/(log_(3)2))=(1)/(27)

If log_((1)/(8))(log_((1)/(4))(log_((1)/(2))x))=(1)/(3)th n x is

log x-(1)/(2)log(x-(1)/(2))=log(x+(1)/(2))-(1)/(2)log(x+(1)/(8))

Prove that int_(0)^(1) log(sqrt(1-x)+sqrt(1+x))dx = (1)/(2) log 2 + (pi)/(4) - (1)/(2)

Prove that (log3sqrt(3)+log sqrt(8)-log sqrt(125))/(log6-log5)=(3)/(2)

Assuming the base as 10,prove that log(1+1/2)+log(1+1/3)+log(1+1/4)+….+log(1+1/19)=1

Prove that : int_(0)^(1) (log x)/(sqrt(1-x^(2)))dx=-(pi)/(2)log 2