Assembling the heterogeneous elements for digital learning

Real life, mathematics, partial proportion and race horses

The following post brings together two recent events in my life into an attempt at a WCYDWT question for mathematics. It’s not a perfect fit for WCWYDT, but close.

What can you do with this?

The following is a photo of “Credit Muncher” just one of the race horses that has arisen out of my wife’s latest hobby, breeding race horses.

Portrait #1

She’s called “Credit Muncher” because I am somewhat worried about the potential for this hobby to consume vast amounts of money. I was, however, a little happy that we were breeding race horses, not racing them.

Racing a horse involves a continual outlay of money. First, there’s the expense of purchasing a yearling and then breaking it. At which stage you pause for a while before the horse is sent off to a trainer. This is when the real money starts being spent. Paying for someone to train the horse can cost upwards of $3,000 a month and the chances of winning are pretty slim. This has always seemed like a mug’s game to me. A good way to burn money. Thankfully, we were only breeding horses to sell to others.

That changed last night. My wife and mother-in-law went to the local thoroughbred sales. “Only to look”, said the wife. “I left my wallet at home by mistake”, was the cry on the day of the sales. So, I felt safe. Then last night, to my great surprise and chagrin, I find that both my wife and mother-in-law have purchased a yearling each. With the grand plan of breaking them, training them, and entering them in the Capricornia Sales race this time next year. The race has a total price purse of around $150,000 and all horses sold through a specific brand of sales is qualified (59 from this sale alone).

What questions spring to mind?


As of yet, I haven’t seen the new horse. We’ve already spent some money for it to go to a professional for breaking. A video or photo of the specific horse would be an improvement. Perhaps a bit more context of horse racing as well.

The story could do with some work. I do, however, think that the pain in my voice as I explain the story is likely to be the secret ingredient to motivate the students.

Working in some more detail about the prize money (1st, 2nd, 3rd etc) and other potential races might help.

Of course, the big potential problem is that the topic is horse racing and I hear gambling can be a bit of a no go topic in schools.

There’s also the problem that this problem doesn’t leave a lot of room for exploration, or at least I don’t see it.

My questions

The proper WCYDWT is to leave it to the students to come up with the questions from the story/prompt.

This idea comes about from the fact that I have a driving question. How much is this going to cost us? And an extension, how much is this going to cost me as the months roll on?

The idea for this post came from the fact that one of the first mathematics classes I was in during EPL (embedded professional learning i.e. prac teaching) covered partial proportion. And the students just didn’t see the application. This class was one of those that contributed to an earlier post about the relevance of mathematics.

Partial proportion

The basic formula for partial proportion is

y = kx + c

In this case, y is the total cost of the horse. The total cost is partially proportional to the monthly cost of training plus the initial cost of purchasing and breaking the horse. Using some round about figures, that gives

y = $3000*x + $5000

Given there is about 6 months of training to occur before the sales race

y = $3000*6 + $5000
y = $23,000


If we race the horse for 12 months

y = $3000 * 12 + $5000
y = $41,000

2 years

y = $3000 * 24 + $5000
y = $77,000

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