0. Functions
Introduction to Functions
3:30 minutesProblem 1.23
Textbook Question
In Exercises 19–32, find the (a) domain and (b) range.
𝔂 = 2e⁻ˣ - 3
Verified step by step guidance1
Step 1: Identify the function type. The given function is \( y = 2e^{-x} - 3 \), which is an exponential function. Exponential functions are defined for all real numbers.
Step 2: Determine the domain. Since the exponential function \( e^{-x} \) is defined for all real numbers \( x \), the domain of the function is all real numbers, \( (-\infty, \infty) \).
Step 3: Analyze the behavior of the function to find the range. The term \( e^{-x} \) is always positive, and as \( x \) approaches infinity, \( e^{-x} \) approaches zero. As \( x \) approaches negative infinity, \( e^{-x} \) approaches infinity.
Step 4: Consider the transformation applied to the exponential function. The function \( y = 2e^{-x} - 3 \) involves a vertical stretch by a factor of 2 and a downward shift by 3 units. This affects the range of the function.
Step 5: Determine the range. Since \( 2e^{-x} \) can take any positive value, \( 2e^{-x} - 3 \) can take any value greater than \(-3\). Therefore, the range of the function is \( (-3, \infty) \).
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