5 Must Know Facts For Your Next Test

1. For a function to be invertible, it must be one-to-one, meaning each input value is paired with a unique output value.
2. The graph of an invertible function is symmetric about the line $y = x$, meaning the input and output values can be swapped.
3. Invertible functions have the property that $f(f^{-1}(x)) = x$ and $f^{-1}(f(x)) = x$, allowing the original function to be 'undone'.
4. In a system of linear equations, if the coefficient matrix is invertible, the system has a unique solution that can be found by multiplying both sides by the inverse matrix.
5. Invertible matrices have a non-zero determinant, while non-invertible (singular) matrices have a determinant of zero.

Review Questions

• Explain the connection between one-to-one functions and invertible functions.
  • For a function to be invertible, it must be one-to-one. A one-to-one function is a special type of function where each input value is paired with a unique output value. This property allows the function to be 'undone' or reversed, creating an inverse function that maps each output value back to its original input value. The one-to-one property ensures that the inverse function is also a function, with a unique output for each input.
• Describe how the concept of invertibility relates to solving systems of linear equations using inverse matrices.
  • In a system of linear equations, the coefficient matrix must be invertible for the system to have a unique solution. If the coefficient matrix is invertible, meaning it has a non-zero determinant, then its inverse matrix can be used to solve the system. By multiplying both sides of the system by the inverse matrix, the original system can be transformed into an equivalent system with the identity matrix on the left side. This allows the unique solution to be found by isolating the variable values on the right side of the equation.
• Analyze the importance of invertibility in the context of inverse functions and their properties.
  • Invertibility is a crucial property of functions in the study of inverse functions. When a function is invertible, it means that the original function can be 'undone' or reversed, creating an inverse function that maps each output value back to its original input value. This allows for the important properties of inverse functions, such as $f(f^{-1}(x)) = x$ and $f^{-1}(f(x)) = x$, to hold true. These properties enable the inverse function to 'undo' the original function, making inverse functions a powerful tool in mathematics for tasks like solving equations and transforming complex expressions into simpler forms.

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