A sporting goods store sells 90 ski jackets in a season for $200 each. Each $10 decreases in the price would result in 5 more jackets being sold. Find the number of jackets sold and the selling price to give revenues of $17,600 from sales of ski jackets

Let's start by assuming that the number of jackets sold at $200 each is denoted by n. The total revenue from these sales would then be 200n.

The number of jackets sold can be increased by decreasing the price by $10, resulting in an increase in the number of jackets sold by 5. This means that for each decrease of $10 in the price, the number of jackets sold increases by a factor of 5.

Let's say the price is decreased by $10 m times. This would result in an increase in the number of jackets sold to n + 5m.

The new selling price after decreasing the price by $10 m times would be $200 - $10m.

The new revenue from these sales would be (200 - 10m)(n + 5m).

Given that the total revenue is $17,600, we can set up the following equation:

(200 - 10m)(n + 5m) = 17,600

Expanding the equation, we get:

200n + 1000m - 10mn - 50m^2 = 17,600

Rearranging the terms, we get:

-10mn - 50m^2 + 200n + 1000m = 17,600

Now, we can solve for n and m.

Since we have two variables, we need another equation to solve the system. We can use the fact that initially, 90 jackets were sold at $200 each.

This gives us the equation:

200n = 90(200)

Simplifying, we get:

200n = 18,000

Dividing by 200, we get:

n = 90

Now we can substitute this value of n back into the first equation:

-10mn - 50m^2 + 200n + 1000m = 17,600

-10(90)m - 50m^2 + 200(90) + 1000m = 17,600

-900m - 50m^2 + 18,000 + 1000m = 17,600

-50m^2 + 100m + 18,000 = 17,600

-50m^2 + 100m + 400 = 0

Dividing the equation by -50, we get:

m^2 - 2m - 8 = 0

Factoring the equation, we get:

(m - 4)(m + 2) = 0

Setting each factor equal to 0, we find two possible values for m:

m - 4 = 0 --> m = 4

m + 2 = 0 --> m = -2

Since the number of jackets sold cannot be negative, we discard the solution m = -2.

Therefore, the number of jackets sold, n, is 90 and the number of $10 decreases in the price, m, is 4.

To find the selling price, we substitute the value of m into $200 - $10m:

Selling price = $200 - $10(4) = $200 - $40 = $160

Thus, to give revenues of $17,600, the sporting goods store needs to sell 90 jackets at a price of $160 each.