A little over a year ago, I wrote up my Leapfrog Division post. It's about time for a modification!

The original technique showed you how to work out the decimal equivalent for fractions whose denominators end in 9. In today's post, you'll learn a similar technique for denominators ending in 1.

Before learning this technique, you do want to be very comfortable working with the original Leapfrog Division technique, as it has all the basics of this modified version.

In that post, we worked out ¹³⁄₁₉, so I thought it might keep things simple if we used ¹³⁄₂₁ for our first example this time around. Just like before, we're going to use 20 as a base to divide, and minimize it to the number 2 (simply by dropping the 0), but there are a few changes.

Before any dividing, the next step this time is to take the numerator and subtract 1. So, we've taken ¹³⁄₂₁, converted it to ¹³⁄₂₀, dropped the zero to get ¹³⁄₂. Subtracting 1 from the numerator at this point gives us ¹²⁄₂ as our starting point.

Do this calculation in your head so that you get a quotient and a remainder, just as in the original technique: 12 ÷ 2 = 6 (remainder 0)

Just as in the original, you're going to have the remainder “leap in front of” the quotient, but here's where the new extra step comes in. Before the “leaping” is done, you're going to subtract the quotient from 9, then put the remainder in front of that new result.

With our 6 (remainder 0) example, we'd work out 9 - 6 (the quotient) = 3, and then put the remainder of 0 in front of that to get 03. You keep repeating the steps in this manner as far as you wish. Starting from the ¹²⁄₂ step:

• 12 ÷ 2 = 6 (remainder 0)
• 03 ÷ 2 = 1 (remainder 1)
• 18 ÷ 2 = 9 (remainder 0)
• 00 ÷ 2 = 0 (remainder 0)
• 09 ÷ 2 = 4 (remainder 1)
• 15 ÷ 2 = 7 (remainder 1)
• 12 ÷ 2 = 6 (remainder 0)
• 03 ÷ 2 = 1 (remainder 1)