You run a nail salon. Fixed monthly cost is $5,654.00 for rent and utilities, $5,513.00 is spent in salaries and

Question

You run a nail salon. Fixed monthly cost is $5,654.00 for rent and utilities, $5,513.00 is spent in salaries and $1,409.00 in insurance. Also every customer requires approximately $3.00 in supplies. You charge $61.00 on average for each service. You are considering moving the salon to an upscale neighborhood where the rent and utilities will increase to $10,440.00, salaries to $6,480.00 and insurance to $2,274.00 per month. Cost of supplies will increase to $6.00 per service. However you can now charge $154.00 per service. At what point will you be indifferent between your current location and the new loaction?

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Computation of Indifferent Point between your current location and the new loaction: Let the number of services to be indifferent between current location and the new location = x For Current Location: Revenue per services = $61 Variable cost per service = $3 Fixed cost = Rent + Salaries + Insurance = $5,654+$5,513+$1,409 = $12,576 Profit = Sales - Variable cost - Fixed costs = 61x - 3x -12,576 For New Location: Revenue per service = $154 Variable cost per service = $6 Fixed cost = Rent + Salaries + Insurance = $10,440 + $6,480 + $2,274 = $19,194 Profit = Sales - Variable cost - Fixed costs = 154x - 6x - 19,194 To be indifferent , profit from both the location must be same 61x - 3x -12,576 = 154x - 6x - 19,194 58x - 12,576 = 148x - 19,194 19,194 - 12,576 = 148x - 58x 6,618 = 90x x = 6,618/90 x = 73.53 or 74 Hence , indifference point = 74 services

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