a, b, c ar the length of sides BC, CA, AB respectively of `DeltaABC` satisfying `log(1+(c )/(a))+log a-log b=log2`. a, b, c are in :

a, b, c are the length of sides BC, CA, AB respectively of DeltaABC satisfying log(1+(c )/(a))+log a-log b=log2 . a, b, c are in : i) A.P. ii) G.P. iii) H.P. iv) none

a, b, c are the length of sides BC, CA, AB respectively of DeltaABC satisfying log(1+(c )/(a))+log a-log b=log2 . Also the quadratic equation a(1-x^(2))+2bx+c(1+x^(2))=0 has two equal roots. . Measure of angle C is :

If a,b,c are the sides of triangle ABC satisfying log (1 +c/a)+log a - log b = log 2. Also a(1 - x^2) + 2 b x+c(1 + x^2) = 0 has two equal roots. Find the value of sin A + sin B + sin C.

The value of log ab- log|b|=

a, b, c are sides of a triangle and a, b, c are in GP If log a- log 2b, log 2b-log 3c and log 3c-log a are in AP then

a, b, c are sides of a triangle and a, b, c are in GP If log a- log 2b, log 2b-log 3c and log 3c-log a are in AP then

The value of N satisfying log_(a)[1+log_(b){1+log_(c)(1+log_(p)N)}]=0 is

Find the value of x satisfying log_a{1+log_b{1+log_c(1+log_px)}}=0 .

- If log(5c/a),log((3b)/(5c)) and log(a/(3b)) are in AP, where a, b, c are in GP, then a, b, c are the lengths ofsides of(A) an isosceles triangle(B) an equilateral triangle(D) none of these(C) a scalene triangle

If log(a+c)+log(a+c-2b)=2log(a-c) then