Question

if m^n=32 when m&n are positive integers then find the volume of n^m+n

Answer 1

Heya,
here is your answer,
_________________

Given : m^n=  32  , So

m^n = 2^5                              ( As we know 2^5 =  32 )

By comparing both side we get

m  = 2 and  n = 5  , So

Value of n^(m + n)  , So

⇒5^(2 + 5)

⇒5^7 

⇒ 78125                                                   ( Ans )

______________

# nikzz

HOPE U LIKE IT

CHEERS !!!☺☺

Answer 2

Answer:

Value of $n^{m+n}$ =  78125  

Step-by-step explanation:

Given : $m^{n}$ =  32  

∵ $m$ and $n$ are positive integers.

we know $2^{5}$ =  32

$m^{n}$ =  $2^{5}$              

By comparing both side

$m$ = 2 and  $n$ = 5  

Value of $n^{m+n}$ = $5^{2+5}$

Value of $n^{m+n}$ = $5^{7}$

Value of $n^{m+n}$ =  78125