Self-Supporting Growth Rate
Maggie's Muffins Bakery generated $4 million in sales during 2019, and its year-end total assets were $2.2 million. Also, at year-end 2019, current liabilities were $1 million, consisting of $300,000 of notes payable, $500,000 of accounts payable, and $200,000 of accruals. Looking ahead to 2020, the company estimates that its assets must increase at the same rate as sales, its spontaneous liabilities will increase at the same rate as sales, its profit margin will be 7%, and its payout ratio will be 65%. How large a sales increase can the company achieve without having to raise funds externally—that is, what is its self-supporting growth rate? Do not round intermediate calculations. Enter your answer for sales increase in dollars. For example, an answer of $2 million should be entered as 2,000,000. Round the monetary value to the nearest dollar and percentage value to one decimal place.
Sales can increase by $ _____, that is by 7%.
Self-supporting growth rate = M (1-POR) (S0) / A0 – L0 – M (1-POR) (S0)
Where:
M = Net Income/Sales = 7%
POR = Payout ratio = 65%
S0 = Sales = $4,000,000
A0 = $2,200,000
L0 = Spontaneous liabilities = $500,000 + $200,000 = $700,000[only the accounts payable and accruals are considered spontaneous liabilities]
Substituting in the above equation, we get:
= 0.07 (1 - 0.65) (4,000,000) / 2,200,000 - 700,000 - 0.07(1 - 0.65)(4,000,000)
= 98,000 / 2,200,000 – 700,000 – 98,000
= 6.990014265%
Therefore, the self-sustaining growth rate is 4.04624%
Calculation of “how large a sales can increase” amount:
= Sales amount * Self-sustaining growth rate
= $4,000,000 * 6.990014265%
= $279,601
Therefore, sales can increase by $279,601
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