Find the Domain 63-9y=0

Problem

63−9*y=0

Solution

1. Identify the type of equation provided. The equation 63 - 9y = 0i*s(a)*l*i*n*e*a*r*e*q*u*a*t*i*o*n*i*n*t*e*r*m*s(o)*ƒ*t*h*e*v*a*r*i*a*b*l*e$.

2. Determine the constraints on the variable. In a linear equation of the form ƒ(y)=c there are no denominators containing variables, no square roots of negative numbers, and no logarithms.

3. Apply the definition of the domain for polynomials. Since the expression 63 - 9y$ is a polynomial, it is defined for all real numbers.

4. State the domain in interval notation. The set of all real numbers is represented as (−∞,∞)

Final Answer

Domain:(−∞,∞)

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