Let `a`, `b`, `c`, `d` are positive integer such that `log_(a)b=3//2` and `log_(c)d=5//4`. If `a-c=9`, then value of `(b-d)` is equal to

Let a,b,c,d be positive integers such that log_(a)b=(3)/(2) and log_(c)d=(5)/(4). If (a-c)=9, then find the value of (b-d)

Let a, b, c, d be positive integers such that log_(a) b = 3//2 and log_(c) d = 5//4 . If (a-c) = 9, then find the value of (b-d).

Let a , b , c , d be positive integers such that (log)_a b=3/2a n d(log)_c d=5/4dot If (a-c)=9, then find the value of (b-d)dot

Let a , b , c , d be positive integers such that (log)_a b=3/2a n d(log)_c d=5/4dot If (a-c)=9, then find the value of (b-d)dot

Let a , b , c , d be positive integers such that (log)_a b=3/2a n d(log)_c d=5/4dot If (a-c)=9, then find the value of (b-d)dot

Assume that a,b,and d are positive integers such that a^(5)=b^(4),c^(3)=d^(2) and c-a=19 determine d-b

Let a,b,c are positive real number such that 9a+3b+c=90, then,(1) Maximum value of log_(10)a+log_(10)b+log_(10)c is equal to: (2) Maximum value of ab^(2)c^(3) is equal to:

If a , b , c are consecutive positive integers and (log(1+a c)=2K , then the value of K is logb (b) loga (c) 2 (d) 1

If a , b , c are consecutive positive integers and (log(1+a c)=2K , then the value of K is (a) logb (b) loga (c) 2 (d) 1