Transformations of Exponential Functions Made Easy! | Shift, Reflect & Stretch 🚀 Example 1

Transforming exponential functions doesn’t have to be confusing! In this short and clear lesson, Dr. Terri J. Speights from Math Exam Prep: Study on the Go! breaks down the transformations applied to the parent exponential function: ✨ f(x)=bxf(x) = b^x You’ll learn how each part of the function affects the graph: 🔸 Horizontal Shifts → f(x)=bx−hf(x) = b^{x - h} 🔸 Vertical Shifts → f(x)=bx+kf(x) = b^x + k 🔸 Reflections → f(x)=−bxf(x) = -b^x or f(x)=b−xf(x) = b^{-x} 🔸 Vertical Stretch/Compression → f(x)=a⋅bxf(x) = a \cdot b^x This video is perfect for understanding how exponential graphs move and change — helping you master graphing questions quickly and accurately. 📲 Great for mobile learners, SAT/ACT prep, or reviewing for Algebra & Precalculus exams! #ExponentialTransformations #ExponentialFunctions #GraphingExponentialFunctions #MathExamPrep #StudyOnTheGo #TransformationsMadeEasy #AlgebraHelp #CollegeAlgebra