2.3 Potenciranje potencije s bazom 10

Zadatke rješavamo primjenjujući definiciju potenciranja:

1. Baza je ${10}^5,$ a eksponent $2.$ Zapišimo ${\left({10}^5\right)}^2$ u obliku umnoška potencija s bazom $10:$

   ${\left({10}^5\right)}^2={10}^5·{10}^5={10}^{5+5}={10}^{5·2}={10}^{10}$

2. Baza je ${10}^2$ , a eksponent $3.$ Zapišimo ${\left({10}^2\right)}^3$ u obliku umnoška potencija s bazom $10:$
   

   ${\left({10}^2\right)}^3={10}^2·{10}^2·{10}^2={10}^{2+2+2}={10}^{2·3}={10}^6.$

3. Baza je ${10}^3,$ a eksponent $4.$ Zapišimo ${\left({10}^3\right)}^4$ u obliku umnoška potencija s bazom $10:$
   

   ${\left({10}^3\right)}^4={10}^3·{10}^3·{10}^3·{10}^3={10}^{3+3+3+3}={10}^{3·4}={10}^{12}.$

4. Baza je ${10}^2,$ a eksponent $5.$ Zapišimo ${\left({10}^2\right)}^5$ u obliku umnoška potencija s bazom $10:$
   

   ${\left(\begin{array}{l}{10}^2\end{array}\right)}^5={10}^2·{10}^2·{10}^2·{10}^2·{10}^2={10}^{2+2+2+2+2}={10}^{2·5}={10}^{10}.$

Na temelju riješenih primjera možemo zaključiti da potenciju s bazom $10$ potenciramo tako da bazu prepišemo, a eksponente pomnožimo.

Primijenimo li pravilo za potenciranje potencije, dobit ćemo:

1. ${\left({10}^5\right)}^3={10}^{5·3}={10}^{15}$
2. ${\left({10}^3\right)}^5={10}^{3·5}={10}^{15}$ 
3. ${\left({10}^6\right)}^7={10}^{6·7}={10}^{42}$
   
4. ${\left({10}^7\right)}^6={10}^{7·6}={10}^{42}$
   

1. ${\left({10}^4\right)}^7={10}^{4·7}={10}^{28}$
2. ${\left({10}^9\right)}^5={10}^{9·5}={10}^{45}$
3. ${\left({10}^{15}\right)}^6={10}^{15·6}={10}^{90}$

1. ${100}^5={\left({10}^2\right)}^5={10}^{2·5}={10}^{10}$
2. $10{000}^3={\left({10}^4\right)}^3={10}^{4·3}={10}^{12}$
3. $1000{000}^7={\left({10}^6\right)}^7={10}^{6·7}={10}^{42}$

1. ${\left({\left({10}^4\right)}^3\right)}^2={\left({10}^4\right)}^3·{\left({10}^4\right)}^3=\left({10}^4·{10}^4·{10}^4\right)·\left({10}^4·{10}^4·{10}^4\right)={10}^{12}·{10}^{12}={10}^{24}$
2. ${\left({\left({10}^4\right)}^2\right)}^3={\left({10}^4\right)}^2·{\left({10}^4\right)}^2·{\left({10}^4\right)}^2=\left({10}^4·{10}^4\right)·\left({10}^4·{10}^4\right)·\left({10}^4·{10}^4\right)={10}^8·{10}^8·{10}^8={10}^{24}$
3. ${\left({\left({10}^2\right)}^4\right)}^3={\left({10}^2\right)}^4·{\left({10}^2\right)}^4·{\left({10}^2\right)}^4=\left({10}^2·{10}^2·{10}^2·{10}^2\right)·\left({10}^2·{10}^2·{10}^2·{10}^2\right)·\left({10}^2·{10}^2·{10}^2·{10}^2\right)={10}^8·{10}^8·{10}^8={10}^{24}$ ​

Dobiveni su rezultati jednaki jer umnožak ne ovisi o redoslijedu faktora.

${\left({\left({\left(10\right)}^4\right)}^3\right)}^2={\left({\left({10}^4\right)}^2\right)}^3={\left({\left({10}^2\right)}^4\right)}^3={10}^{4·3·2}={10}^{24}$