You're a manager in a company that produces rocket ships. Machine \text{A}Astart text, A, end text and Machine \text{B}Bstart text, B, end text both produce cockpits and propulsion systems. Machine \text{A}Astart text, A, end text and Machine \text{B}Bstart text, B, end text produce cockpits at the same rate, and they produce propulsion systems at the same rate. Machine \text{A}Astart text, A, end text ran for 262626 hours and produced 444 cockpits and 666 propulsion systems. Machine \text{B}Bstart text, B, end text ran for 565656 hours and produced 888 cockpits and 121212 propulsion systems.
Answers
Answer:
we can not solve this for a unique amount of time that it takes each machine to produce a cockpit and to produce a propulsion system
Step-by-step explanation:
Question is :
Can we solve for a unique amount of time that it takes each machine to produce a cockpit and to produce a propulsion system?
Let say time taken to produce 1 cockpit = C hr
time taken to produce 1 Propulsion = P per hr
Machine A run for 26 hrs and produced 4 cockpits and 6 propulsion systems
=> 4C + 6P = 26
Machine B run for 56 hrs and produced 8 cockpits and 12 propulsion systems
8C + 12P = 56
Dividing by 2 both sides
4C + 6P = 28
4C + 6P gives two different values 26 & 28
so we can not solve this for a unique amount of time that it takes each machine to produce a cockpit and to produce a propulsion system
Answer:
No: the system has no solution
Step-by-step explanation:
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