RIGHT PRISM A right prism is a solid which has two parallel planes of same shape and size. Also, its lateral surface are perpendicular to its parallel.

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Presentation transcript:

RIGHT PRISM A right prism is a solid which has two parallel planes of same shape and size. Also, its lateral surface are perpendicular to its parallel sides

Volume of Right Prism h h h Parallel sides base Volume = Area of cross-section x Distance between parallel sides = Base area x height

Triangular Prism b3 Length b2 h b1 Base Volume = Base area x height = Triangle area x length of the solid = ½ x base x height x length

Net of Triangular Prism h b2 b3 b1 L Total surface area = Two triangles + three rectangles = 2 x ½ x b x h + L x b1 + L x b2 + L x b3 = 2 x base area + (b1 + b2 + b3) x L = 2 base area + Perimeter of the base x Length

Volume of a Prism Volume = Base Area x Height = ½ x 12 x 16 x 30 20cm 30cm 12cm 16cm Volume = Base Area x Height = ½ x 12 x 16 x 30 = 2880 cm3

Total Surface area Perimeter of the base = 12 + 16 + 20 = 48cm T.S.A = 2 x Base Area + Perimeter of the base x height = 2 x 96 + 48 x 30 = 1632cm2.

Trapezoid Volume = Base Area x Length = ½ x (8 + 15) x 10 x 20 8cm 13cm 20cm 12cm 10cm 15cm Volume = Base Area x Length = ½ x (8 + 15) x 10 x 20 = 2300cm3.

The Net T.S.A = 2 x Base area + Perimeter of the base x height 8cm 12cm 13cm 12cm 13cm 8cm 15cm 30cm 30cm 15cm 12cm 13cm 8cm 8cm T.S.A = 2 x Base area + Perimeter of the base x height = 1670 cm2.

Happiness is not success, But the path leading to success. THE END

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