Rotation system

In mathematics, a planar lamina is a closed set in a plane of mass $m$ and surface density $ρ (x, y)$ such that:

m = \int \int_{} ρ (x, y) d x d y

, over the closed set.

The center of mass of the lamina is at the point

(\frac{M_{y}}{m}, \frac{M_{x}}{m})

where $M_{y}$ moment of the entire lamin about the x-axis and $M_{x}$ moment of the entire lamin about the y-axis.

M_{y} = \lim_{m, n \to \infty} \sum_{i = 1}^{m} \sum_{j = 1}^{n} x {i j}^{*} ρ (x {i j}^{*}, y {i j}^{*}) Δ A = \iint_{} x ρ (x, y) d x d y

, over the closed surface.

M_{x} = \lim_{m, n \to \infty} \sum_{i = 1}^{m} \sum_{j = 1}^{n} y {i j}^{*} ρ (x {i j}^{*}, y {i j}^{*}) Δ A = \iint_{} y ρ (x, y) d x d y

, over the closed surface.

Example 1.

Find the center of mass of a lamina with edges given by the lines $x = 0$ , $x = y$ and $y = 4 - x$ , where the density is given as $ρ (x, y) = 2 x + 3 y + 2$ .

m = \int_{0}^{2} {\int_{x}^{4 - x}}_{} 2 x + 3 y + 2 d y d x

m = \int_{0}^{2} (2 x y + \frac{3 y^{2}}{2} + 2 y) |_{x}^{4 - x} d x

m = \int_{0}^{2} - 4 x^{2} - 8 x + 32 d x

m = (\frac{- 4 x^{3}}{3} - 4 x^{2} + 32 x) |_{0}^{2}

m = \frac{112}{3}

M_{y} = \int_{0}^{2} \int_{x}^{4 - x} x (2 x + 3 y + 2) d y d x

M_{y} = \int_{0}^{2} (2 x^{2} y + \frac{3 x y^{2}}{2} + 2 x y) |_{x}^{4 - x} d x

M_{y} = \int_{0}^{2} - 4 x^{3} - 8 x^{2} + 32 x d x

M_{y} = (- x^{4} - \frac{8 x^{3}}{3} + 16 x^{2}) |_{0}^{2}

M_{y} = \frac{80}{3}

M_{x} = \int_{0}^{2} \int_{x}^{4 - x} y (2 x + 3 y + 2) d y d x

M_{x} = \int_{0}^{2} (x y^{2} + y^{3} + y^{2}) |_{x}^{4 - x} d x

M_{x} = \int_{0}^{2} (- 2 x^{3} + 4 x^{2} - 40 x + 80 d x

M_{x} = {(\frac{- x^{4}}{2} + \frac{4 x^{3}}{3} - 20 x^{2} + 80 x) |}_{0}^{2}

M_{x} = \frac{248}{3}

center of mass is at the point

(\frac{\frac{80}{3}}{\frac{112}{3}}, \frac{\frac{248}{3}}{\frac{112}{3}}) = (\frac{5}{7}, \frac{31}{14})

Planar laminas can be used to determine moments of inertia, or center of mass.

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