Home
Class 12
MATHS
Let log(c)ab = x, log(a)bc = y and log(b...

Let `log_(c)ab = x, log_(a)bc = y` and `log_(b) ca = z`. Find the value of `(xyz - x - y - z)`.

Text Solution

Verified by Experts

The correct Answer is:
`|{:(A,B,C,D),(R,P,P,S):}|`
Promotional Banner

Topper's Solved these Questions

Similar Questions

Explore conceptually related problems

If log_(4)5 = x and log_(5)6 = y then

Find the value of log_(c) sqrtc

y log y dx - x dy = 0

In the adjacent figure AB || CD. Find the values of x, y and z.

In the adjacent figure AB || CD. Find the value of x, y and z.

If log ((x+y)/3)=1/2 (log x +log y) then find the value of x/y+y/x

Suppose that, log_(10) (x-2) + log_(10) y=0 and sqrt(x)+sqrt(y-2)=sqrt(x+y) . Then the value of (x + y) , is

Given log_(10)2 = a and log_(10)3 = b . If 3^(x+2) = 45 , then the value of x in terms of a and b is-

f(x)=log_(e)abs(log_(e)x) . Find the domain of f(x) .

If x=1+(log)_a b c , y=1+(log)_b c a and z=1+(log)_c a b , then prove that x y z=x y+y z+z x