Answer:
[tex]\frac{\Delta Q}{\Delta Y} \frac{Y}{Q}=0.2\frac{501}{1300}=0.077[/tex]
Explanation:
To find the income elasticity we first must recall the formula
[tex]\eta_{q,y}=\frac{\Delta Q}{\Delta Y} \frac{Y}{Q}[/tex]
which is the percentage change in quantity when income increases in one percent.
From the demand curve we can find [tex]\frac{\Delta Q}{\Delta Y} [/tex] by taking derivative of Q with respect to Y: [tex]\frac{\Delta Q}{\Delta Y} =0.2[/tex]
Next we need to know what is the income at the equilibrium quantity of 1300, which we can back out from the data given in the question
[tex]Q=1200-10p+16p_p+0.2Y[/tex]
[tex]1300=1200-10\times .50+16\times .30+0.2Y\\100+5-4.8=0.2Y\\Y=\frac{100.2}{0.2}=501[/tex]
Then
[tex]\eta_{q,y}=\frac{\Delta Q}{\Delta Y} \frac{Y}{Q}=0.2\frac{501}{1300}=0.077[/tex]
