Answer:
13,200 Seconds, or 220 Minutes
Step-by-step explanation:
Since there are 2 employees working at the same time, so in 20 seconds, they will be tagging a total of 2 garments. So we can say the rate is:
rate = [tex]\frac{20 Seconds}{2 Garments}[/tex]
So how long would it take to tag 1320 garments?
We set up the ratio, cross multiply, and solve.
[tex]\frac{TimeInSeconds}{NumberOfGarments}=\frac{20}{2}=\frac{x}{1320}}\\\frac{20}{2}=\frac{x}{1320}\\20*1320=2x\\x=\frac{26400}{2}=13,200[/tex] seconds
Or in minutes, we divide by 60, so we have:
[tex]\frac{13,200}{60}=220[/tex] Minutes
Answer:
3 hours 40 minutes.
Step-by-step explanation:
We are told that we have 1320 garments and it takes an employee 20 seconds to tag a garment.
1 employee tags one garment in 20 seconds.
So garments tagged by 1 employees in 1 minute will be [tex]\frac{60}{20} =3[/tex] garments.
2 employees will tag 3*2=6 garments in 1 minute.
To find the total time it will take two employees to tag all the garments we will divide total number of garments by 6.
[tex]\text{Time taken by two employees to tag 1320 garments}=\frac{1320}{6}[/tex]
[tex]\text{Time taken by two employees to tag 1320 garments}=220[/tex]
Therefore, it will take 220 minutes or 3 hours and 40 minutes for 2 employees to tag 1320 garments.
