Home
Class 11
MATHS
The value of loga b logb c logc a is ……...

The value of `log_a b log_b c log_c a ` is ………………. .

A

2

B

1

C

3

D

4

Text Solution

Verified by Experts

Promotional Banner

Topper's Solved these Questions

  • SAMPLE PAPER -8

    FULL MARKS|Exercise PART-II|9 Videos

  • SAMPLE PAPER -8

    FULL MARKS|Exercise PART-III|9 Videos

  • SAMPLE PAPER -5

    FULL MARKS|Exercise PART-I (CHOOSE THE CORRECT ANSWER)|2 Videos

  • SAMPLE PAPER 09

    FULL MARKS|Exercise PART-IV|11 Videos

Similar Questions

Explore conceptually related problems

The value of 2log 10+3log2 is

If a ,b ,c ,d in R^+-{1}, then the minimum value of (log)_d a+(log)_b d+(log)_a c+(log)_c b is (a) 4 (b) 2 (c) 1 (d)none of these

The value of loga b-log|b|= (a) loga (b) "log"|a| (c) -loga (d) none of these

Find the value of log_(c) sqrtc

Find the value of log_(5) log_(2)log_(3) log_(2) 512 .

If x ,y ,z are in G.P. and a^x=b^y=c^z , then (log)_b a=(log)_a c b. (log)_c b=(log)_a c c. (log)_b a=(log)_c b d. none of these

The value of |[log _(3) 512 , log _(4) 3 ],[ log _(3) 8 , log _(4) 9]||[log _(2) 3 , log _(8) 3],[ log _(3) 4 , log _(3) 4]| is

If a ,b ,a n dc are positive and 9a+3b+c=90 , then the maximum value of (loga+logb+logc) is (base of the logarithm is 10).

The value of (6a^((log)_e b)((log)_(a^2)b)((log)_(b^2)a))/(e^((log)_e a(log)_e b)) is (a) independent of a (b) independent of b (c) dependent on a (d) dependent on b