Using the Quotient Rule of Exponents, what is an equivalent form of 2^8÷2^4 ?(1 point) Responses 24 2 superscript 4 baseline 212 2 superscript 12 baseline 232 2 superscript 32 baseline 22
The Quotient Rule of Exponents states that when dividing two numbers with the same base, we subtract the exponents.
In this case, 2^8 ÷ 2^4 can be written as 2^(8-4) = 2^4
Therefore, an equivalent form of 2^8 ÷ 2^4 is 2^4.
To find an equivalent form of 2^8 ÷ 2^4 using the Quotient Rule of Exponents, you subtract the exponents:
2^8 ÷ 2^4 = 2^(8-4) = 2^4
So, the equivalent form of 2^8 ÷ 2^4 is 2^4.
To find an equivalent form of 2^8 ÷ 2^4 using the Quotient Rule of Exponents, we subtract the exponent of the divisor from the exponent of the dividend.
In this case, the denominator 2^4 has an exponent of 4, and the numerator 2^8 has an exponent of 8.
So, using the Quotient Rule, we subtract the exponents:
8 - 4 = 4
Therefore, an equivalent form of 2^8 ÷ 2^4 is 2^4.