Answer:
The equivalent expression is [tex]7^{6}[/tex] ⇒ answer A
Step-by-step explanation:
* Lets revise some rules of the exponents
- In the exponential functions we have some rules
# In multiplication if we have same base then add the power
b^m × b^n = b^(m + n)
- Ex: [tex]5^{11}*5^{4}=5^{11+4}=5^{15}[/tex]
# In division if we have same base we subtract the power
b^m ÷ b^n = b^(m – n)
- Ex: [tex]\frac{3^{10}}{3^{4}}=3^{10-4}=3^{6}[/tex]
* Now lets solve the problem
- There is the expression [tex]\frac{7^{13}}{7^{7}}[/tex]
- We have base 7 up and down
∵ In division if we have same base we subtract the power
∵ The base up is 7 and the base down is 7
- We will subtract the powers
∴ [tex]\frac{7^{13}}{7^{7}}=7^{13-7}=7^{6}[/tex]
∴ The answer is [tex]7^{6}[/tex]
* The equivalent expression is [tex]7^{6}[/tex]
