The following steps are involved in finding the value of `3^(n-3)` , when `3^n=729`. Arrange them in seqential order.
(A) `3^(n-3)=3^(6-3)=3^3=27`
(B) `rArrn=6`
(C)`3^(n)=729rArr3^n=3^6`

If 9 xx 3^(n)=3^(6), find the value of n.

The following are the steps involved in solving the problem, if (32/243)^(n)=8/27 , find ((n+0.4)/1024)^(-n) . Arrange them in sequential order from the first to the last. (A) (32/243)^(n)=8/27 implies ((2/5)^(5))^(n)=(2/3)^(3) (B) (2^(-10))^((-3)/5)=2^(6)=64 (C) 5n=3implies n=3/5 (D) ((n+0.4)/1024)^(-n)=((3/5+0.4)/1024)^((-3)/5)=(1/1024)^((-3)/5)

Find the value of n. (6^(n))/(6^(-2))=6^(3)

If 3^n = 27 then 3^(n - 2) is:

Evaluate (n!)/(r!(6-3)!) , where n=6,r=3

If 6^n=1296 , then 6^(n-3) is

The value of (6^(n+3) - 32.6^(n+1))/(6^(n+2) - 2.6^(n+1)) is equal to