Get another book!
I am afraid I must agree.
]]>I get that too. Here's my method and working:
Let's measure the work to be done in 'shipments' = 1
Let A's rate of working be A; similarly B and C.
Adding
What is the book doing? Let's see .....
Since we know 8 is a time in days
That looks like complete nonsense to me.
Sometimes books have misprints, but this is too far removed from correct mathematics to be that as far as I can see. Coupled with what I've already said about the other question my recommendation is this:
Get another book!
Bob
]]>I am still getting mine and yours. Where does there 4 come from?
]]>The other problem is this, again 3 people A, B, and C.
A and B working together can prepare a shipment in 8 days.
A and C working together can prepare a shipment in 9 days.
B and C working together can prepare a shipment in 10 days.How long would C take working alone?
The book says 22 days. I am getting 23 and 7/31 days.That is what I am getting also.
Yeah, I don't understand the solution in the book. They have the following equations...
(A + B)/4 = 8
(A + C)/4 = 9
(B + C)/4 = 10
So, A = 14, B = 18, and C =22.
I honestly have no idea what they're doing.
I don't see how anyone can answer the first question without knowing how much 'weight' we should give to each quality.
Speed of working. The ratio of how many scarves can be made is
A:B:C = 15:20:6.
So for speed of working alone B is best.
How much cloth? The ratio of how much cloth is
A:B:C = 25:5:3
so if you want economy of material, C is best.
How warm? The ratio of how warm the scarf is
A:B:C = 12:1:4
so if you want the warmest scarf A is best.
That's what I'd go for, because I'm not bothered about how long they take or how much cloth they use; I just want to wrap up warm!
But if I were a manufacturing boss and I wanted to employ just one of the three, the other factors would also become important. I could get more scarves for the wages, if I employ B, but of labour is cheap and materials expensive, I might choose C.
How can you work together three unrelated factors like this? You could give each factor a weighting to account for how important it is relative to the other factors and then get an overall score for each person. But the score would depend on the weightings; what I have said above shows that any could come out on top if the right weighting factor is set.
My conclusion: There is no absolute solution to this problem.
Bob
]]>I am getting 23 and 7/31 days.
That is what I am getting also.
]]>In the first problem there are 3 people, we'll call them A, B, and C.
A can make 5 scarves while C makes 2.
B makes 4 scarves while A makes 3.
A's scarf takes 5 times as much cloth as B's scarf.
Three of B's scarves take as much cloth as 5 of C's scarves.
C's scarves are 4 times as warm as B's scarves.
A's scarves are 3 times the C's scarves.
Who's the best overall?
Interestingly, I have 2 books which have this exact same problem, one book is from 1885 and the other book
is from 2013. I believe that the book from 1885 has the correct answer, it claims that the best overall is C.
The book from 2013 claims the answer is A. The book from 2013 makes the mistake (which is pointed out
by the older book) of adding the numbers once the proportions are established, when they should be multiplied instead.
The other problem is this, again 3 people A, B, and C.
A and B working together can prepare a shipment in 8 days.
A and C working together can prepare a shipment in 9 days.
B and C working together can prepare a shipment in 10 days.
How long would C take working alone?
The book says 22 days. I am getting 23 and 7/31 days.