To simplify \( 12^{87} \div 12^{25} \), you can use the rule of exponents that states:
\[ a^m \div a^n = a^{m-n} \]
Applying this rule:
\[ 12^{87} \div 12^{25} = 12^{87 - 25} = 12^{62} \]
So the simplified expression is:
\[ \boxed{12^{62}} \]
1 answer
To simplify \( 12^{87} \div 12^{25} \), you can use the rule of exponents that states:
\[ a^m \div a^n = a^{m-n} \]
Applying this rule:
\[ 12^{87} \div 12^{25} = 12^{87 - 25} = 12^{62} \]
So the simplified expression is:
\[ \boxed{12^{62}} \]