Step 1:

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The density function of Lamina is $\"\"$ . \ \

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Region bounded by a triangle with vertices $\"\"$ .

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The lamina mass can be defined as $\"\"$ .

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Region bounded:

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First graph the vertices to find the region.

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Graph :

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(1) Draw the coordinate plane.

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(2) Plot the vertices $\"\"$ .

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(3) Connect the plotted vertices to a smooth triangle.

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$\"\"$

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Observe the graph :

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The x-bounds are $\"\"$ .

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The line passing (0,0) and (2,1) :

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Using two points form of a line equation is $\"\"$ .

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$\"\"$

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The line passing (0,3) and (2,1) :

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$\"\"$

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Therefore y-bounds are $\"\"$ .

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Region bounded by the density function is $\"\"$ and $\"\"$ .

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Step 2:

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Evaluate the mass of lamina $\"\"$ .

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$\"\"$

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The mass of the lamina is $\"\"$ .

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Step 3:

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Centre of mass of the lamina :

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Centre mass of the lamina can be defined as

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$\"\"$

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Where $\"\"$ ,

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$\"\"$ ,

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and $\"\"$ is mass of lamina : $\"\"$ .

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Step 4:

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$\"\"$

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Step 5:

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$\"\"$

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$\"\"$ .

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Step 6:

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Centre of mass of the lamina : $\"\"$ .

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$\"\"$

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Solution:

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The mass of the lamina is $\"\"$ .

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Centre of mass of the lamina : $\"\"$ .

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