Prove that `log_7`11 is greater than ` log_(8)5` .

Prove that log_(3) 81- 4 =0

Prove log_3(5) is irrational.

Prove that log_(10) 2" lies between " 1/4 and 1/3 .

Prove that asqrt(log_a b)-bsqrt(log_b a)=0

Given a^2+b^2=c^2 . Prove that log_(b+c)a+log_(c-b)a=2 log_(c+b)a.log_(c-b)a,forallagt0,ane1 c-bgt0 , c+bgt0 c-bne1 , c+bne1 .

When a die is thrown,list the outcomes of an event of getting: : a number greater than 5. : a number not greater than 5.

Prove that 2 log x-log (x +1)-log (x -1)= 1/x^2+1/(2x^4)+1/(3x^6) +......, where |x|<1.

If log_(10)5=a and log_(10)3=b ,then

Prove that (log_(2)8)/(log_(3)9) =3/2

If log_(3)4=a , log_(5)3=b , then find the value of log_(3)10 in terms of a and b.