Simplify to a single power of 2:
(2^7)/(2^5)
2^__
To simplify the expression (2^7)/(2^5), we can subtract the exponents (since we are dividing).
(2^7)/(2^5) = 2^(7-5)
2^(7-5) = 2^2
Therefore, (2^7)/(2^5) simplifies to 2^2.
To simplify (2^7)/(2^5), you can subtract the exponents since they have the same base, which is 2.
So, (2^7)/(2^5) = 2^(7-5)
Simplifying the exponent, we have:
2^2
Therefore, (2^7)/(2^5) simplified to a single power of 2 is 2^2.
To simplify the expression (2^7)/(2^5), we can use the rule of exponents that states when dividing two powers with the same base, we subtract their exponents.
In this case, we have 2^7 divided by 2^5. To simplify, we subtract the exponent of the divisor (2^5) from the exponent of the dividend (2^7).
So, 2^7 divided by 2^5 gives us 2^(7-5), which is equal to 2^2.
Therefore, the simplified form of (2^7)/(2^5) is 2^2.