Answer:
machines A, B and C complete job in 44 hours
Explanation:
given data
15 A machines and 7 B machines = 4 hours
8 B machines and 15 C machines = 11 hours
to find out
How many hours take one A machine, one B machine and one C machine working together to complete the job
solution
we consider here rates of machines A, B and C are a, b, and c respectively
so equation will be when work together
15a + 7b = [tex]\frac{1}{4}[/tex] ...................1
and
8b + 15c = [tex]\frac{1}{11}[/tex] ....................2
now add both these equation 1 and 2
15a + 7b + 8b + 15c = [tex]\frac{1}{4}[/tex] + [tex]\frac{1}{11}[/tex]
15a + 15 b + 15c = [tex]\frac{15}{44}[/tex]
solve we get
a + b + c = [tex]\frac{1}{44}[/tex]
here combine work in [tex]\frac{1}{44}[/tex] jobs per hours
so here we know time is reciprocal of the rate
so that machines A, B and C complete job in 44 hours
