Apply the properties of integer exponents to generate an equivalent algebraic expression to((-2x^(-3))/(4x^(0)))^(0)
To generate an equivalent algebraic expression, we can use the property that any non-zero number raised to the power of zero is equal to 1.
((-2x^(-3))/(4x^(0)))^(0) = 1
Use the properties of integer exponents to simplify the expression (3y)0
To generate an equivalent algebraic expression, we can apply the properties of integer exponents as follows:
1. Any number raised to the power of 0 is equal to 1. Hence, we have:
((-2x^(-3))/(4x^(0)))^(0) = 1
So, the equivalent algebraic expression is simply 1.
To generate an equivalent algebraic expression, we'll apply the properties of integer exponents. The main property we'll use is that any non-zero number raised to the power of zero is always equal to 1. So, let's simplify the expression step by step:
((-2x^(-3))/(4x^(0)))^(0)
First, let's deal with the exponent of 0 in the denominator: x^(0) is always equal to 1, so our expression becomes:
((-2x^(-3))/(4*1))^0
Simplifying further:
((-2x^(-3))/4)^0
Now, as mentioned before, any non-zero number divided by itself is equal to 1. So, we have -2x^(-3)/4 = -2/4 * x^(-3) = -1/2 * (1/x^3) = -1/(2x^3).
Substituting this into our expression:
(-1/(2x^3))^0
Since any non-zero number raised to the power of zero is 1, the simplification leads us to:
1
Therefore, the equivalent algebraic expression for ((-2x^(-3))/(4x^(0)))^(0) is 1.