Solve each equation in Exercises 15–34 by the square root property. (x + 3)^2 = - 16

The square root property states that if x^2 = k, then x = ±√k. This property is essential for solving quadratic equations, as it allows us to isolate the variable by taking the square root of both sides. It is particularly useful when the equation is in the form of a perfect square, enabling us to find both positive and negative solutions.

Complex numbers extend the real number system to include solutions to equations that do not have real solutions, such as the square root of negative numbers. A complex number is expressed in the form a + bi, where a is the real part, b is the imaginary part, and i is the imaginary unit defined as √(-1). Understanding complex numbers is crucial when dealing with equations that yield negative results under the square root.

Isolating the variable is a fundamental algebraic technique used to solve equations. It involves rearranging the equation to get the variable on one side and all other terms on the opposite side. In the context of the square root property, this often means first simplifying the equation to a standard form before applying the property to find the solutions.