Question:

Value of $\left[\left(\log_{b}\,a\right)\left(\log_{c}\,b\right)\left(\log_{a}\,c\right)\right]$ is

Updated On: Aug 1, 2022
  • 0
  • 1
  • abc
  • log abc
Hide Solution
collegedunia
Verified By Collegedunia

The Correct Option is B

Solution and Explanation

$\left(\log _{b}\right.$ a) $\left(\log _{c} b\right)\left(\log _{a} c\right)$ $=\frac{\log a}{\log b} \times \frac{\log b}{\log c} \times \frac{\log c}{\log a}\left[\because \log _{m} n=\frac{\log n}{\log m}\right]$ $=1$
Was this answer helpful?
0
0

Top Questions on Exponential and Logarithmic Functions

View More Questions

Questions Asked in UPSEE exam

View More Questions

Concepts Used:

Exponential and Logarithmic Functions

Logarithmic Functions:

The inverses of exponential functions are the logarithmic functions. The exponential function is y = ax and its inverse is x = ay. The logarithmic function y = logax is derived as the equivalent to the exponential equation x = ay. y = logax only under the following conditions: x = ay, (where, a > 0, and a≠1). In totality, it is called the logarithmic function with base a.

The domain of a logarithmic function is real numbers greater than 0, and the range is real numbers. The graph of y = logax is symmetrical to the graph of y = ax w.r.t. the line y = x. This relationship is true for any of the exponential functions and their inverse.

Exponential Functions:

Exponential functions have the formation as:

f(x)=bx

where,

b = the base

x = the exponent (or power)