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A company makes and sells charm bracelets. The cost of producing x bracelets is represented by the function C(x) = 180+8x . The revenue from selling x bracelets is represented by the function r(x) =20x write and simplify a function P that represents the profit made from selling x bracelets . How many bracelets must the company sell to break even ?

Respuesta :

anthougo

To break even the company must sell 15 charm brackets, given the cost function of C(x) = 180+8x and the revenue function of r(x) =20x.

What is the break-even point?

The break-even point is the sales point at which the total costs equal the total revenue.

At this break-even point, the entity does not incur any loss or earn any profit.

Data and Calculations:

Total cost, C(x) = 180+8x

Revenue, r(x) =20x

At break-even point, C(x) = r(x)

= 180+8x =20x

= 180 = 20x - 8x

= 180 = 12x

= 15 (180/12) = x

x = 15 units

Thus, to break even the company must sell 15 charm brackets.

Learn more about the break-even point at https://brainly.com/question/24233845

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