Baker's percentages and how not to explain them
Posted by Tom Moertel Sat, 16 Sep 2006 06:11:00 GMT
I like to bake, and I work in a professional kitchen from time to time, so I picked up The Baker’s Manual, 5th ed., hoping to carry it in my kitchen bag as a quick reference for large-scale recipes.
Before going further, you need to know two things about professional bakers. First, they measure dry ingredients not by volume, the way home bakers do, but by weight, which is both faster and more precise for the large quantities frequently used in professional kitchens. Second, when the pros write bread recipes, they express quantities in relative terms called “baker’s percentages.” Each ingredient’s quantity is given as a percentage of the recipe’s total flour weight. For example, the book provides the following recipe, referred to as a “formula,” in the section on baker’s percentages:
80.0% bread flour 20.0% whole wheat flour 66.0% water 2.0% salt 1.2% yeast
As you would expect, the percentages for bread flour and whole wheat flour add to 100 percent.
Now, here’s where the book goes down in flames. It attempts to explain how baker’s percentages let you easily scale recipes to any desired batch size, but it fails. Utterly. Here’s the book’s explanation for how to scale the above recipe to 300 pounds:
[T]o calculate the weight of each ingredient in the [300-pound] recipe, you add up all of the percentages in the above formula. This total percentage value is 169.2. Divide this number by the desired dough weight, 300 pounds, to get .564. Round this number up to get .6. Then multiply the percentage amount for each ingredient in the above recipe by .6 to obtain the larger weight required by the larger recipe. (Emphasis mine.)
When I read that explanation, I thought, Multiply? That’s the exact opposite of what you ought to do. And, sure enough, the book went on to prove its own explanation completely wrong:
80% bread flour * .6 = 48 pounds 20% whole wheat flour * .6 = 12 pounds 66% water * .6 = 39.6 pounds 2% salt * .6 = 1.2 pounds 1.2% yeast * .6 = .7 pound
Note: the above is quoted verbatim from the book.
Does the “scaled-up” recipe yield 300 pounds? Nope. Add up the resulting weights and you get 101.5 pounds. Oops.
Is it really that hard to see that the correct method is simply to multiply each percentage by desired batch size and then divide by the sum of percentages? In the case of the book’s 300-pound example, we would multiply each percentage in the recipe by the following factor:
300 pounds / 169 percent = 177.5 pounds
Let’s try it out:
80% bread flour * 177.5 pounds = 142 pounds 20% whole wheat flour * 177.5 pounds = 35.5 pounds 66% water * 177.5 pounds = 117.2 pounds 2% salt * 177.5 pounds = 3.55 pounds 1.2% yeast * 177.5 pounds = 2.13 pounds
Now if you add up the resulting weights, you get the desired total of 300 pounds.
That the book not only gets the scaling method completely backward but then goes on to prove itself wrong is amazing. Didn’t anybody at John Wiley & Sons proofread the math?
Not exactly a confidence-builder for the rest of the book.
readers
What kitchen do you work in from time to time?
I volunteer at a local church most Sundays and, along with another guy, cook the meal served after the evening service. Because the church is large (about 3,500 members), it has a well-equipped professional kitchen, which is usually managed by the staff chef. On Sunday evening, however, the chef is off, and we take care of the cooking.
Tonight we prepared a diner-style menu, providing the perfect opportunity to give The Baker’s Manual its first recipe test: chocolate cream pie. I had to scale the recipe up by 50 percent, and it worked like a champ. We even received a few compliments on the pie.
Even though the book’s explanation of baking mathematics is broken, I suspect that its recipes are probably reliable.
The book isn’t wrong, Tom is! He didn’t convert the lbs into oz’s before his initial calculation. It all went down hill from there. Divide 169.2 by 4,800 oz’s, NOT 300 lbs. 300 lbs = 4,800 oz’s, and you need to work your math based on oz’s to get the correct factor. Multiply 28.4 by each of those percentages in the formula, and then add the weight.
ryeguy, thanks for your comments.
If you read page 12 of the book I’m criticizing, The Baker’s Manual, 5th ed., you’ll see that the worked-out example is flat-out wrong. The total weight of the scaled-up ingredients in the worked-out example is 101.5 pounds, not the 300 pounds the authors claim is their goal. The incorrect weights are right there, in the book. Add them up and see if I’m mistaken.
I’m not sure why you think the ounces-versus-pounds issue comes into play, but I would be interested in hearing your reasoning. Would you mind elaborating?
What I find fascinating is that in the authors’ companion book, Understanding Baking, 3rd ed., the exact same example is presented on page 157. But in this version, there is no error. The authors correctly scale by 1/0.6 = 1.7 and arrive at the correct result of 300 pounds.
Cheers,
Tom
The units (ounces or pounds) don’t matter as long as you are consistent. Ounces into the equation produce ounces out. Pounds in produce pounds out. Percentages have no units.
boy you are right!
and i am confused. i am a used to reading a recipe book in cups for flour not ozs. can you help me with that?
nice recipe i would like to go for it…