Find the value of log((a^n)/(b^n)) + log...

Find the value of `log((a^n)/(b^n)) + log((b^n)/(c^n)) + log((c^n)/(a^n))`

LOGARITHM
CHHAYA PUBLICATION|Exercise Short Answer Type Question|38 Videos
LOGARITHM
CHHAYA PUBLICATION|Exercise Long Answer Type Question|12 Videos
LOGARITHM
CHHAYA PUBLICATION|Exercise Multiple Choice Type Question|14 Videos
LINEAR PROGRAMMING GRAPHICAL METHOD
CHHAYA PUBLICATION|Exercise Assertion Reason Type|2 Videos
MAPPING OR FUNCTION
CHHAYA PUBLICATION|Exercise Sample questions (Assertion -Reason type C)|3 Videos

Similar Questions

Explore conceptually related problems

Find the value of root(ln)((x^l)/(x^n))xxroot(mn)((x^n)/(x^m))xxroot(lm)((x^m)/(x^l)) .

Find the values : (log_(a)b)xx(log_(b)c)xx(log_(c )d)xx(log_(d)a)

Show that log_(b)(1/(b^n)) = -n

If 2^(x+y)=6^ya n d3^(x-1)=2^(y+1), then the value of (log3-log2)(x-y) is 1 (b) (log)_2 3- (log)_3 2 (c) log(3/2) (d) none of these

Find the value of n so that (a^(n+1)+b^(n+1))/(a^(n)+b^n) may be the geometric mean between a and b.

Prove that : (vi) log_(a)x + log_(a^2)x^(2) + log_(a^3)x^(3) + ………….+ log_(a^n)x^(n) = log_(a)x^(n)

Find the value of n so that (a^(n+1)+b^(n+1))/(a^n+b^n) may be the geometric mean between a and b.

If a > 0, c > 0, b = sqrt(ac), ac != 1 and N > 0 , then prove that (log_(a)N)/(log_(c )N) = (log_(a)N - log_(b)N)/(log_(b)N - log_(c )N) .

Prove the following identities: (a) (log_(a) n)/(log_(ab) n) = 1+ log_(a) b" "(b) log_(ab) x = (log_(a) x log_(b) x)/(log_(a) x + log_(b) x) .

Two sequence {t_(n)} and {s_(n)} are difined by t_(n) =log ((5^(n+1))/(3 ^(n-1)))and s_(n) =[log ((5)/(3))]^(n), then-