using the quotient rule of exponents what is 7^7÷7^3 in exponential simplest form [1 point]
The quotient rule of exponents states that when dividing two exponential expressions with the same base, you subtract the exponents.
So, using the quotient rule of exponents, we have:
7^7 ÷ 7^3 = 7^(7-3) = 7^4
Therefore, 7^7 ÷ 7^3 simplifies to 7^4 in exponential simplest form.
To simplify the expression 7^7 ÷ 7^3 using the quotient rule of exponents, we subtract the exponents:
7^7 ÷ 7^3 = 7^(7-3)
Simplifying the exponent, we have:
7^7 ÷ 7^3 = 7^4
Therefore, the expression 7^7 ÷ 7^3, in exponential simplest form, is 7^4.
To simplify the expression using the quotient rule of exponents, we need to subtract the exponent in the denominator from the exponent in the numerator.
The quotient rule states that when dividing exponents with the same base, you subtract the exponents. In this case, we have 7^7 ÷ 7^3.
To simplify, subtract the exponent in the denominator (3) from the exponent in the numerator (7):
7^7 ÷ 7^3 = 7^(7-3)
7^(7-3) simplifies to 7^4.
Therefore, 7^7 ÷ 7^3 in exponential simplest form is 7^4.