calcdummy said:Oh man I copied down the wrong problem. I'm so sorry. It was supposed to be:
4096^3/4 / 4096^2/3 x 4096^5/6
I got the common denominator which would been 12. That is how I got 4096^(9-8+10)/12
= 4096^11/12
am I still incorrect?
A rational exponent is an exponent in the form of a fraction. It represents a power or root of a number. For example, the exponent 1/2 represents the square root of a number, while the exponent 1/3 represents the cube root of a number.
To evaluate powers with rational exponents, you can either convert the exponent to a radical form and simplify, or use the power rule for exponents. For example, if you have the expression 16^(3/4), you can rewrite it as the fourth root of 16 cubed, which is equal to 8. Alternatively, you can use the power rule and calculate 16^(3/4) as (16^3)^(1/4), which is also equal to 8.
Rational exponents and radical expressions are different ways of representing the same mathematical concept. Rational exponents use fractional exponents, while radical expressions use roots. For example, 8^(1/3) is equivalent to the cube root of 8, or ∛8.
Yes, rational exponents can be negative. A negative exponent indicates the reciprocal of the base raised to the positive exponent. For example, 2^(-1/2) is equal to 1/(2^(1/2)), which is the same as 1/√2.
To simplify expressions with rational exponents, you can use the laws of exponents, such as the power rule, product rule, and quotient rule. You can also use the rules of radicals, such as the product and quotient rules for radicals. It is important to simplify the expression as much as possible, using any applicable rules, to get the most simplified form.