For the class of 2013's prom Norman's dress shop sold cheaper dresses for $90 each and more expensive dresses for $140 each. They took in $5250 and sold 20 more of the cheaper dresses than the expensive dresses. How many of each kind did they sell? Simply need help setting up the equations. I can solve them on my own.

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nandhini123 nandhini123 · Answer 1 · 2019-12-26T11:10:15+01:00

Answer:

Number of cheaper dresses sold is 35

Number of expensive dresses sold is 15

Step-by-step explanation:

Given:

Cost of cheaper dresses = $90

Cost of expensive dresses = $140

Total cost of the dresses = $5250

To Find:

Number of cheaper dress = ?

Number of expensive dress = ?

Solution:

Let

The number of cheaper dresses be x

The number of expensive dresses be y

(Number of cheaper dresses X cost of cheap dress) + (Number of Expensive dresses X cost of expensive dress) = $5250

[tex]x \times90 +y \times 140 = 5250[/tex]= $5250

It is given that the 20 more of the cheaper dresses than the expensive dresses is sold

So,

number of cheaper dress = 20 + number of expensive dress

x = 20 + y---------------------------------------(1)

[tex](20+y) \times90 +y \times 140 = 5250 = 5250[/tex]

[tex](20 \times 90 +y\times 90) +y \times 140= 5250 [/tex]

[tex]1800 + 90y+ 140y = 5250 [/tex]

[tex]1800 + 230y = 5250 [/tex]

[tex] 230y =5250 -1800[/tex]

[tex] 230y = 3450 [/tex]

[tex]y = \frac{3450}{230}[/tex]

y = 15

Substituting y in (1)

x = 20 +15

x= 35