Here's Whatcha Do

Dear Louise, This is the whole story about your book on vintage sewing. I found the book on line right before Judy's birthday. Called Ann, and asked her if she thought it would be good for Judy and for your birthday. We looked at some of the pages on Amazon (I think), and then decided that all four of us should have the same book. So, Ann was already putting in a book order at Amazon, so she said she would order her own birthday present (why wait until December 1st?). I proceeded to put in an order (I thought) for the other three books. A couple of weeks went by, and I realized that no books had come. Back to Amazon, My Account, and there was no evidence of an order - what hadn't I done? So, naturally, the thing to do was to place another order, which I thought I did. (Note: I order books from Amazon all the time, and never had any problem. In fact, two other orders came from them in the same time I thought this order should come.) Again, no books, and Ann had had hers for some time. Soooo - the third time is the charm, right? The books finally came - in time for my birthday, two months after the intended first order should come. The upshot was that now we had to figure out who owed who what for what book. Your book, Louise, was to be your birthday present from the three of us. Judy was gang-pressed into paying her fair share for the three gifts. How do you figure this out? Ann finally came up with the following solution, which is pretty darned good, I think. However, Judy had to mess the whole thing up by sending me too much money, so now I owe her something like $3.64. Sigh. We're just sorry that you couldn't have been laughing with us while all of this nonsense was going on. The one thing I'm struck by is how simplified the sewing and fashions were in the late 1920s. Love, Elizabeth




Ann came to the rescue with the following solution.

Begin forwarded message:



 From: Ann Tanner

> Date: June 1, 2011 11:30:35 AM MDT

> To: Bob and Judy Petersen , Gage

> Subject: Here's Whatcha Do Maybe

> This is a story book problem at its best.


> Major accounting issue:


> 1. Louise's book $20.00 divided by 3 = 6.35 paid by E. J. A.


> 2. Judy's book $20.00 divided by 2 = 10.00 paid by E. A.

> 3. Elizabeth's book $20.00 divided by 2 = 10.00 paid by J. A.


> 4. Ann's book $20.00 divided by 2 = 10.00 paid by E. J.

> So, now, who owes what to whom, you ask.


> Well - here's whatcha do.

> Elizabeth bought three books, Ann bought one book.

>

> Elizabeth, Judy and Ann send Elizabeth 6.35 each for Louise's book.

>

> Elizabeth and Ann pay 10.00 each for Judy's book.

>

> Judy and Ann pay 10.00 each for Elizabeth's book.

>

> Elizabeth and Judy pay 10.00 each for Ann's book.

>

> So each one of us owes $26.35 somewhere, somehow.

>

> Now, this is where it gets tricky.

>

> Judy sends Elizabeth $16.35 for Louise's book and Elizabeth's book. She sends 10.00 to Ann for her book (that she bought for herself, so does this qualify? If so, I can see a small business with potential. Shall I let you know when I buy more books?).

>

> Ann would normally (Is any of this normal????) send Elizabeth $26.35 for Judy's and Elizabeth's and Louise's books, but since she got in a hurry and bought her own book (yes, some of us remember to click on "place order" on Amazon so it doesn't take forever for an order to arrive), and paid for it herself, she really complicated matters. Elizabeth would owe Ann $10.00 for her (Ann's) book, however since Ann paid for it herself, but owes Elizabeth money, then this will balance (?) out. Ann will owe Elizabeth $16.35 - just wait - it will work out, maybe.

>

> Elizabeth would normally (? ?) send Ann 10.00 for her book and pay $16.35 for Louise's and Judy's books, but since she already paid for the books, that is Louise's and Judy's books, Elizabeth won't send anything to Ann, which will, in turn pay for part of Ann's portion.

>

> Now, the question is, does this balance out?

> Judy will pay $26.35. (She owes Ann $10.00 and Elizabeth $16.35)

> Elizabeth will pay $26.35, which she has already paid (she owes Ann $10.00, Ann owes her $26.35, so subtracting the $10.00, Ann now owes Elizabeth $16.35)

> Ann will pay $26.35, however see note directly above. So Ann owes $16.35.

>

> So - the total ins and outs should/will come to $79.05.

>

> Now, if Judy sends Elizabeth $26.35, then Ann will need to send Elizabeth only 6.35, because instead of Judy sending money to me (Ann) that I would then send to Elizabeth, it would definitely simplify ??????? the situation.

>

> And that's whatcha do. Whew, I am going to play in the flowers.