Question

How do you simplify `35^(log_35x)`?

Answer 1

`35^(log_35x)=x`.

Explanation:

By the Defn. of `log` fun., we can immediately answer that,

`35^(log_(35)x)=x`.

To see, how this is so, let us recall the Defn. of `log` fun. :

`log_bx=m iff b^m=x`

Now, let us subst. the value of `m` from the L.H.S of "`iff`" to the

R.H.S., to get, the Desired Result : `b^(log_bx)=x`

Alternatively,

Suppose that, `35^(log_(35)x)=y`.

Taking `log_35` of both the sides, we have,

`log_35 (35^m)=log_35 y, ..........(1)`, where, `m=log_35x`.

But, `log_35(35^m)=mlog_35 35=m*1=m`.

Therefore, by `(1)`, we get,

`m=log_35y, i.e., log_35x=log_35y`.

As, `log` fun. is `1-1`, we have, `x=y, i.e., 35^(log_35x)=x`.

Enjoy Maths.!