Old Chinese Units of Area Converter

From:
To:
\(1 \left[\mathrm{Meou}\right] = 614.4 \left[\mathrm{m}^2\right]\)
\(1 \left[\mathrm{Meou}\right] = 734.816284 \left[\mathrm{yd}^2\right]\)

Unit conversion procedure (Click Convert to view the procedure)

The Ancinet Chinese units that were used to measure area are Ching, King, Meou, Kish, Fen, Lyi, Kung, and Hao. The base area unit is Meou where 1 [Meou] is equal to 614.4 \(\left[\mathrm{m}^2\right]\) or 734.816284 \(\left[\mathrm{yd}^2\right]\). The largets unit is Ching where 1 [Ching] is equal to 100 [Meou] or 61440 \(\left[\mathrm{m}^2\right]\) of 73481.6284 \(\left[\mathrm{yd}^2\right]\). The smallest unit is Hao where 1 [Hao] is equal to 0.001 [Meou] or 0.6144 \(\left[\mathrm{m}^2\right]\) or 0.734816284 \(\left[\mathrm{yd}^2\right]\). The conversion factors for all are units are presented in the following table.
Ching King Meou Kish Fen Lyi Kung Hao
Ching $$1$$ $$10$$ $$100$$ $$400$$ $$1000$$ $$10000$$ $$24000$$ $$100000$$
King $$\frac{1}{10}$$ $$1$$ $$10$$ $$40$$ $$100$$ $$1000$$ $$2400$$ $$10000$$
Meou $$\frac{1}{100}$$ $$\frac{1}{10}$$ $$1$$ $$4$$ $$10$$ $$100$$ $$240$$ $$1000$$
Kish $$\frac{1}{400}$$ $$\frac{1}{40}$$ $$\frac{1}{4}$$ $$1$$ $$\frac{5}{2}$$ $$25$$ $$60$$ $$250$$
Fen $$\frac{1}{1000}$$ $$\frac{1}{100}$$ $$\frac{1}{10}$$ $$\frac{2}{5}$$ $$1$$ $$10$$ $$24$$ $$100$$
Lyi $$\frac{1}{10000}$$ $$\frac{1}{1000}$$ $$\frac{1}{100}$$ $$\frac{1}{25}$$ $$\frac{1}{10}$$ $$1$$ $$\frac{12}{5}$$ $$10$$
Kung $$\frac{1}{24000}$$ $$\frac{1}{2400}$$ $$\frac{1}{240}$$ $$\frac{1}{60}$$ $$\frac{1}{24}$$ $$\frac{5}{12}$$ $$1$$ $$\frac{25}{6}$$
Hao $$\frac{1}{100000}$$ $$\frac{1}{10000}$$ $$\frac{1}{1000}$$ $$\frac{1}{250}$$ $$\frac{1}{100}$$ $$\frac{1}{10}$$ $$\frac{6}{25}$$ $$1$$
The unit conversion procedure from different are units to [Meou] units and then to \(\left[\mathrm{m}^2\right]\) and \(\left[\mathrm{yd}^2\right]\) is shown below.
$$\require{cancel} 1 \left[\mathrm{Ching}\right] = 1 \cancel{\left[\mathrm{Ching}\right]} \cdot \left(100\frac{\left[\mathrm{Meou}\right]}{\cancel{\left[\mathrm{Ching}\right]}}\right) = 100\left[\mathrm{Meou}\right]$$ $$\require{cancel}100 \left[\mathrm{Meou}\right] = 100 \cancel{\left[\mathrm{Meou}\right]} \cdot \left(614.4\frac{\left[\mathrm{m}^2\right]}{\cancel{\left[\mathrm{Meou}\right]}}\right) = 61440\left[\mathrm{m}^2\right]$$ $$\require{cancel}100 \left[\mathrm{Meou}\right] = 100 \cancel{\left[\mathrm{Meou}\right]} \cdot \left(734.816284\frac{\left[\mathrm{yd}^2\right]}{\cancel{\left[\mathrm{Meou}\right]}}\right) = 73481.6284\left[\mathrm{yd}^2\right]$$
$$\require{cancel} 1 \left[\mathrm{King}\right] = 1 \cancel{\left[\mathrm{King}\right]} \cdot \left(10\frac{\left[\mathrm{Meou}\right]}{\cancel{\left[\mathrm{King}\right]}}\right) = 10\left[\mathrm{Meou}\right]$$ $$\require{cancel}10 \left[\mathrm{Meou}\right] = 10 \cancel{\left[\mathrm{Meou}\right]} \cdot \left(614.4\frac{\left[\mathrm{m}^2\right]}{\cancel{\left[\mathrm{Meou}\right]}}\right) = 6144\left[\mathrm{m}^2\right]$$ $$\require{cancel}10 \left[\mathrm{Meou}\right] = 10 \cancel{\left[\mathrm{Meou}\right]} \cdot \left(734.816284\frac{\left[\mathrm{yd}^2\right]}{\cancel{\left[\mathrm{Meou}\right]}}\right) = 7348.16284\left[\mathrm{yd}^2\right]$$
$$\require{cancel} 1 \left[\mathrm{Meou}\right] = 1 \cancel{\left[\mathrm{Meou}\right]} \cdot \left(1\frac{\left[\mathrm{Meou}\right]}{\cancel{\left[\mathrm{Meou}\right]}}\right) = 1\left[\mathrm{Meou}\right]$$ $$\require{cancel}1 \left[\mathrm{Meou}\right] = 1 \cancel{\left[\mathrm{Meou}\right]} \cdot \left(614.4\frac{\left[\mathrm{m}^2\right]}{\cancel{\left[\mathrm{Meou}\right]}}\right) = 614.4\left[\mathrm{m}^2\right]$$ $$\require{cancel}1 \left[\mathrm{Meou}\right] = 1 \cancel{\left[\mathrm{Meou}\right]} \cdot \left(734.816284\frac{\left[\mathrm{yd}^2\right]}{\cancel{\left[\mathrm{Meou}\right]}}\right) = 734.816284\left[\mathrm{yd}^2\right]$$
$$\require{cancel} 1 \left[\mathrm{Kish}\right] = 1 \cancel{\left[\mathrm{Kish}\right]} \cdot \left(0.25\frac{\left[\mathrm{Meou}\right]}{\cancel{\left[\mathrm{Kish}\right]}}\right) = 0.25\left[\mathrm{Meou}\right]$$ $$\require{cancel}0.25 \left[\mathrm{Meou}\right] = 0.25 \cancel{\left[\mathrm{Meou}\right]} \cdot \left(614.4\frac{\left[\mathrm{m}^2\right]}{\cancel{\left[\mathrm{Meou}\right]}}\right) = 153.6\left[\mathrm{m}^2\right]$$ $$\require{cancel}0.25 \left[\mathrm{Meou}\right] = 0.25 \cancel{\left[\mathrm{Meou}\right]} \cdot \left(734.816284\frac{\left[\mathrm{yd}^2\right]}{\cancel{\left[\mathrm{Meou}\right]}}\right) = 183.704071\left[\mathrm{yd}^2\right]$$
$$\require{cancel} 1 \left[\mathrm{Fen}\right] = 1 \cancel{\left[\mathrm{Fen}\right]} \cdot \left(0.1\frac{\left[\mathrm{Meou}\right]}{\cancel{\left[\mathrm{Fen}\right]}}\right) = 0.1\left[\mathrm{Meou}\right]$$ $$\require{cancel}0.1 \left[\mathrm{Meou}\right] = 0.1 \cancel{\left[\mathrm{Meou}\right]} \cdot \left(614.4\frac{\left[\mathrm{m}^2\right]}{\cancel{\left[\mathrm{Meou}\right]}}\right) = 61.44\left[\mathrm{m}^2\right]$$ $$\require{cancel}0.1 \left[\mathrm{Meou}\right] = 0.1 \cancel{\left[\mathrm{Meou}\right]} \cdot \left(734.816284\frac{\left[\mathrm{yd}^2\right]}{\cancel{\left[\mathrm{Meou}\right]}}\right) = 73.4816284\left[\mathrm{yd}^2\right]$$
$$\require{cancel} 1 \left[\mathrm{Lyi}\right] = 1 \cancel{\left[\mathrm{Lyi}\right]} \cdot \left(0.01\frac{\left[\mathrm{Meou}\right]}{\cancel{\left[\mathrm{Lyi}\right]}}\right) = 0.01\left[\mathrm{Meou}\right]$$ $$\require{cancel}0.01 \left[\mathrm{Meou}\right] = 0.01 \cancel{\left[\mathrm{Meou}\right]} \cdot \left(614.4\frac{\left[\mathrm{m}^2\right]}{\cancel{\left[\mathrm{Meou}\right]}}\right) = 6.144\left[\mathrm{m}^2\right]$$ $$\require{cancel}0.01 \left[\mathrm{Meou}\right] = 0.01 \cancel{\left[\mathrm{Meou}\right]} \cdot \left(734.816284\frac{\left[\mathrm{yd}^2\right]}{\cancel{\left[\mathrm{Meou}\right]}}\right) = 7.348162\left[\mathrm{yd}^2\right]$$
$$\require{cancel} 1 \left[\mathrm{Kung}\right] = 1 \cancel{\left[\mathrm{Kung}\right]} \cdot \left(\frac{1}{240}\frac{\left[\mathrm{Meou}\right]}{\cancel{\left[\mathrm{Kung}\right]}}\right) = 0.00417\left[\mathrm{Meou}\right]$$ $$\require{cancel}0.00417 \left[\mathrm{Meou}\right] = 0.00417 \cancel{\left[\mathrm{Meou}\right]} \cdot \left(614.4\frac{\left[\mathrm{m}^2\right]}{\cancel{\left[\mathrm{Meou}\right]}}\right) = 2.56\left[\mathrm{m}^2\right]$$ $$\require{cancel}0.00417 \left[\mathrm{Meou}\right] = 0.00417 \cancel{\left[\mathrm{Meou}\right]} \cdot \left(734.816284\frac{\left[\mathrm{yd}^2\right]}{\cancel{\left[\mathrm{Meou}\right]}}\right) = 3.061734\left[\mathrm{yd}^2\right]$$
$$\require{cancel} 1 \left[\mathrm{Hao}\right] = 1 \cancel{\left[\mathrm{Hao}\right]} \cdot \left(0.001\frac{\left[\mathrm{Meou}\right]}{\cancel{\left[\mathrm{Hao}\right]}}\right) = 0.001\left[\mathrm{Meou}\right]$$ $$\require{cancel}0.001 \left[\mathrm{Meou}\right] = 0.001 \cancel{\left[\mathrm{Meou}\right]} \cdot \left(614.4\frac{\left[\mathrm{m}^2\right]}{\cancel{\left[\mathrm{Meou}\right]}}\right) = 0.6144\left[\mathrm{m}^2\right]$$ $$\require{cancel}0.001 \left[\mathrm{Meou}\right] = 0.001 \cancel{\left[\mathrm{Meou}\right]} \cdot \left(734.816284\frac{\left[\mathrm{yd}^2\right]}{\cancel{\left[\mathrm{Meou}\right]}}\right) = 0.734816284\left[\mathrm{yd}^2\right]$$

No comments:

Post a Comment

Subscribe to: Post Comments (Atom)