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A kink in an otherwise linear demand curve. Note how marginal costs can fluctuate between MC1 and MC3 without the equilibrium quantity or price changing. The Kinked-Demand curve theory is an economic theory regarding oligopoly and monopolistic competition. Kinked demand was an initial attempt to explain sticky prices.
The graph below depicts the kinked demand curve hypothesis which was proposed by Paul Sweezy who was an American economist. [29] It is important to note that this graph is a simplistic example of a kinked demand curve. Kinked Demand Curve. Oligopolistic firms are believed to operate within the confines of the kinked demand function.
At any given price, the corresponding value on the demand schedule is the sum of all consumers’ quantities demanded at that price. Generally, there is an inverse relationship between the price and the quantity demanded. [1] [2] The graphical representation of a demand schedule is called a demand curve. An example of a market demand schedule
When the demand curve is perfectly inelastic (vertical demand curve), all taxes are borne by the consumer. When the demand curve is perfectly elastic (horizontal demand curve), all taxes are borne by the supplier. If the demand curve is more elastic, the supplier bears a larger share of the cost increase or tax. [16]
The demand curve the oligopolist faces is that of two separate curves spliced together, creating a discontinuity in the MR curve. This means that a profit maximising firm will still produce at quantity Q and price P if marginal costs are equal to MC1, MC2 or MC3, thus explaining price stability.
Starting from one point on the aggregate demand curve, at a particular price level and a quantity of aggregate demand implied by the IS–LM model for that price level, if one considers a higher potential price level, in the IS–LM model the real money supply M/P will be lower and hence the LM curve will be shifted higher, leading to lower ...
The marginal revenue function is the first derivative of the total revenue function or MR = 120 - Q. Note that in this linear example the MR function has the same y-intercept as the inverse demand function, the x-intercept of the MR function is one-half the value of the demand function, and the slope of the MR function is twice that of the ...
For L = -1/E d and E d = -1/L, the elasticity of demand for industry A will be -2.5. We can use the value of the Lerner index to calculate the marginal cost (MC) of a firm as follows: 0.4 = (10 – MC) ÷ 10 ⇒ MC = 10 − 4 = 6. The missing values for industry B are found as follows: from the E d value of -2, we find that the Lerner index is ...