Square Root Parent Function
Domain: (-∞, ∞) Range: (0, ∞)
The square root parent function is a unique type of function that is represented by the equation y = √x. This function is commonly referred to as the “principal root function” or the “1/2 power function,” and it is one of the simplest forms of exponential functions.
The graph of the square root function resembles a half-parabolic curve, with the origin as the vertex. It demonstrates a one-to-one relationship and is continuous for all x-values greater than or equal to zero.
In terms of domain and range, the domain of the square root function is all non-negative real numbers, since the square root of a negative number is not real. The range of the function is also all non-negative real numbers since square roots cannot be negative.
The function is useful in various applications in mathematics and science, particularly in geometry, physics, and engineering. For instance, it is used in calculating the distance or magnitude between two points in a coordinate plane, calculating the time it takes for a body to fall freely, or determining the radius of a circle.
In summary, the square root parent function is a simple function with a one-to-one relationship, continuous for all non-negative x-values, and its graph is a half-parabolic curve. It plays an important role in many applications in mathematics and science.
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