Example of a Quasi-Linear Utility Function (u(t,c) = βt^α + c)
A general example of a quasi-linear utility function is given by the formula . This function combines the non-linear utility from good , represented by , with the linear utility from good . For this function to properly represent standard convex preferences, its parameters must satisfy the conditions and $0 < \alpha < 1$.
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Example of a Quasi-Linear Utility Function (u(t,c) = βt^α + c)
Positive Parameters and the Increasing Property of v(t) = βt^α
Parameter Constraints and the Concavity of v(t) = βt^α
A consumer's preference for a good,
t, is represented by the functionv(t) = βt^α. For this function to accurately model well-behaved preferences, it must be both increasing (meaning more of the good is always better) and concave (meaning the additional satisfaction from each extra unit of the good decreases). Which of the following parameter sets forβandαwould result in a function with these properties?Modeling Consumer Preferences
Analyzing a Utility Function's Properties
A consumer's satisfaction from consuming a quantity
tof a good is modeled by the functionv(t) = βt^α. The values of the parametersβandαdetermine the shape of this function and its economic interpretation. Match each set of parameter constraints to the corresponding description of the function's properties.In the function v(t) = βt^α, which represents a consumer's satisfaction from a quantity 't' of a good, setting the parameter α to a value greater than 1 (α > 1) implies that the consumer experiences increasing marginal satisfaction from each additional unit of the good.
Evaluating a Proposed Utility Function
A consumer's satisfaction from consuming a quantity
tof a good is described by the functionv(t) = 10t^0.5. The mathematical properties of this function (specifically, that it is increasing but concave) imply that the consumer experiences diminishing marginal ____ from consuming more of the good.Constructing a Valid Utility Component
Evaluating Economic Models for Consumer Preference
Consider two consumers, Alex and Ben, whose satisfaction from consuming a quantity
tof a particular good is modeled by the functionsv_A(t) = 10t^0.2andv_B(t) = 10t^0.8, respectively. Both functions represent valid, well-behaved preferences where more of the good is always preferred, but with diminishing added satisfaction. Which of the following statements accurately compares their preferences for quantities greater than one (t > 1)?
Learn After
Optimal Labor-Leisure Choice Calculation
A consumer's preferences for two goods, t and c, can be represented by a utility function of the form u(t,c) = βt^α + c. Which of the following specific functions represents a consumer who gains satisfaction from both goods, but experiences a diminishing marginal benefit from consuming more of good t?
A consumer's preferences are represented by the utility function u(t,c) = 10t^1.2 + c. This implies that as the consumer consumes more of good 't', each additional unit provides a smaller increase in their overall satisfaction.
A consumer's preferences are described by the utility function u(t,c) = βt^α + c, where β > 0. Match each condition for the parameter α with its corresponding implication for the marginal utility of good t (the change in utility from one additional unit of t).
A consumer's preferences are described by the utility function u(t,c) = βt^α + c, where β > 0. Match each condition for the parameter α with its corresponding implication for the marginal utility of good t (the change in utility from one additional unit of t).
Interpreting Utility Function Parameters
Comparing Consumer Preferences with Quasi-Linear Utility
Consider two individuals, Alex and Ben, whose preferences for two goods, a non-essential good (t) and a composite good representing all other consumption (c), are described by the following utility functions:
- Alex: u(t,c) = 20t^0.4 + c
- Ben: u(t,c) = 20t^0.8 + c
Assuming both individuals currently consume the same positive quantity of good t, which of the following statements accurately compares the satisfaction they would gain from consuming one additional unit of good t?
Evaluating a Consumer Preference Model
Formulating a Utility Function