Question

In a company, 80% of the employees have graduation degree. The number of female employees who

have graduation degree is 36% of the total number of employees in the organisation, if 880 male employees

have graduation degree, what is the total number of employees in the company ?​

Answer 1

Step-by-step explanation:

Does it is to Statics chapter

Answer 2

The total number of employees in the company is 2000

• Let total number of employees in the company is x.

• Hence number of graduated employees is 80% of x = $\frac{4x}{5}$

• Again the number of graduated female employees is 36% of x = $\frac{9x}{25}$
• So the number of graduated male employees is $\frac{4x}{5}-\frac{9x}{25}$ = $\frac{11x}{25}$
• But it is given that number of graduated male employees is 880. So $\frac{11x}{25}$ = 880.
• This equation yields as x = $\frac{880*25}{11} = 2000$
• So the total number of employees in the company is 2000.