If a and b are legs of the triangle and c is hypotenuse, then the value of `log_a(c+b)+log_a(c-b)` is (i)`2` (ii)`3` (iii)`4` (iv)`5`

The value of "log"_(a) b "log"_(b)c "log"_(c ) a is

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

The value of "log"_(b)a xx "log"_(c) b xx "log"_(a)c , is

The value of "log"_(b)a xx "log"_(c) b xx "log"_(a)c , is

If in a right angle triangle,a and b are the length of the sides and and c is the length of the hypotenuse and c-b!=1,c+b!=1 then show that log_(c+b)(a)+log_(c-b)(a)=2log_(c+b)(a)log_(c-b)(a)

If in a right angled triangle, a and b are the lengths of sides and c is the length of hypotenuse and c-b ne 1, c+b ne 1 , then show that log_(c+b)a+log_(c-b)a=2log_(c+b)a.log_(c-b)a.

If in a right angled triangle, a and b are the lengths of sides and c is the length of hypotenuse and c-b ne 1, c+b ne 1 , then show that log_(c+b)a+log_(c-b)a=2log_(c+b)a.log_(c-b)a.

In a right-angled triangle, a and b are the lengths of sides and c is the length of hypotenuse such that c-b ne1,c+b ne 1 . Show that "log"_(c+b)a+"log"_(c-b)a=2"log"_(c+b)a."log_(c-b)a