Given:
Selling price = ₹200 per unit
Variable costs = ₹150 per unit.
Fixed costs for the period = ₹5,00,000
To find:
The minimum number of units that must be sold for the company to attain break even and break even in terms of rupees.
Solution:
We know that,
Total cost = Fixed cost + Variable cost
Let the number of manufacturing shirts be x, so the cost function for the shirts is
[tex]C(x)=500000+150x[/tex]
Selling price is ₹200 per unit. So, revenue function is
[tex]R(x)=200x[/tex]
At break even point the company has no profit no loss. It means, revenue is equal to cost.
[tex]R(x)=C(x)[/tex]
[tex]200x=5,00,000+150x[/tex]
[tex]200x-150x=5,00,000[/tex]
[tex]50x=5,00,000[/tex]
Divide both sides by 50.
[tex]x=10000[/tex]
Therefore, minimum number of units that must be sold for the company to attain break even is 10,000.
To find the break even price, substitute x=10000 in either cost function or revenue function.
[tex]R(10000)=200(10,000)[/tex]
[tex]R(10000)=20,00,000[/tex]
Therefore, the break even in terms of rupees is ₹20,00,000.
