Question

in a factory the ratio of the number of employees of types of A B and C is 9 is to 3 is to 18 and their wages are in the ratio 3 is to 7 is to 4 if the number of employees of foetus is 54 and the wages of every employee a b type is rupees 140 find the total wages of all employees of a types​

Answer 1

Answer:

₹54000

Step by step explanation:Given ratio of employee = 9 : 13 : 18

Let number of A's emplouees = 9k

Number of B's employees = 13k

and number of C's employees = 18k

According to the question

18k = 54

∴ k = 3

∴ Number of employee of type A = 9 x 3 = 27

Similarly, Wages of every employee of types A = 10/7 x 1400 = ₹ 2000

Required wages = 27 x 2000 = ₹ 54000

Answer 2

Answer:

The total wages of all employees of type A is equal to Rs.54000.

Step-by-step explanation:

Given: In a factory the ratio of employees A, B and C is $9:13:18$

Ratio of their wages is $10:7:4$

Suppose that the number of employees of type A $=9x$

Number of employees of type B $=13x$

Number of employees of type C $=18x$

No. of employee of type C $=54$

Therefore, $18x=54\\x=3$

Now, the number of employee of type A $=9*3=27$

Wages of every A type of employee $=\frac{10}{7}*1400=Rs.2000$

So, the total wages of all A type of employees $=27*2000=Rs.54000$