Answer:
$68 for 20 pairs
Explanation:
Demand
$93 per pair for 10 pairs
$43 per pair for 30 pairs
Supply
$98 per pair for 35 pairs
$38 per pair for 5 pairs
Let x denotes price and y denotes a pair of sunglasses
x1, y1 = (93, 10)
x2, y2 = (43, 30)
x3 y3 = (98, 35)
x4, y4 = (38, 5)
Slope intercept form is given by
y = mx + b
m = y2 - y1/x2 - x1 = 30 - 10/43 - 93 = 20/-50 = -0.4
Now put any one x, y point from demand into slope equation to find b
30 = -0.4(43) + b
30 = -17.2 + b
b = 47.2
so the demand equation becomes
y = -0.4x + 47.2 eq. 1
Now for the supply equation
m = y4 - y3/x4 - x3 = 5 - 35/38 -98 = -30/-60 = 0.5
Now put any one x, y point from supply into slope equation to find b
5 = 0.5(38) + b
5 = 19 + b
b = -14
so the supply equation becomes
y = 0.5x - 14 eq. 2
Now we want to find the intersection of these two lines so that we can get the equilibrium point
-0.4x + 47.2 = 0.5x - 14
-0.4x - 0.5x + 47.2 + 14 = 0
-0.9x + 61.2 = 0
0.9x = 61.2
x = 61.2/0.9
x = 68
Now put it into eq. 1 or eq. 2
y = 0.5(68) - 14
y = 34 - 14
y = 20
So at market equilibrium the price of sunglasses is $68 for 20 pairs.
