[\/et_pb_text][et_pb_text _builder_version=”4.13.1″ _module_preset=”default” text_font_size=”16px” header_2_text_color=”gcid-70a40ab1-38f4-4842-b1ac-1e69b0045607″ custom_padding=”|15px||4px|false|false” global_colors_info=”{%22gcid-70a40ab1-38f4-4842-b1ac-1e69b0045607%22:%91%22header_2_text_color%22%93}”]<\/p>\n
The Volume of a Trapezoid: Introduction<\/strong><\/h2>\nA trapezoid or trapezium is a two-dimensional figure( quadrilateral). One pair of sides of the trapezoid is parallel to each other, called the base(s) of the trapezoid. The other pair of sides are non-parallel sides are termed as the legs of the trapezoid. The distance between the bases of the trapezoid is called altitude or height. For any quadrilateral, we can calculate area and perimeter. In this article, we will learn to find out the volume of a three-dimensional trapezium. The Volume of a trapezoid is the space occupied by the object in cubic units.<\/span><\/p>\nFormula to calculate the volume<\/strong><\/h2>\nThe formula for finding the area of a 2D trapezoid is<\/span> A=\\frac{1}{2}\\times h\\times (b_1+b_2)<\/span><\/span>.<\/span><\/p>\n<\/span><\/p>\n![\"\"](\"https:\/\/eistudymaterial.s3.amazonaws.com\/Volume-of-Trapezoid-01-300x145.png\")
<\/span><\/p>\n<\/span><\/p>\nHere A is the area of a trapezoid.<\/span><\/p>\nh<\/span> is the perpendicular distance between the bases of the trapezoid(height).<\/span><\/p>\nb_1\\text{ and }b_2<\/span> <\/span>are the lengths of the bases of the trapezoid.<\/span><\/p>\nBut we cannot find the volume of a two-dimensional figure. <\/span>To find out the volume of a trapezoid, you have to construct a 3D figure with two trapezoidal bases. We can find the volume of the 3D trapezoid simply by multiplying the area of the trapezoidal base with the length of the 3D figure.<\/span><\/p>\nLet us consider:<\/span><\/p>\nl<\/span> = length of the 3D figure.<\/span><\/p>\nb\\text{ and }B<\/span> <\/span>= length of the parallel sides of the trapezoidal base.<\/span><\/p>\nh<\/span> = distance between the parallel sides of the trapezoidal base(height).<\/span><\/p>\n<\/span><\/p>\n![\"\"](\"https:\/\/eistudymaterial.s3.amazonaws.com\/Volume-of-Trapezoid-02-300x149.png\")
<\/span><\/p>\n<\/span><\/p>\nFormula to find the volume of 3D trapezoid uses four variables,<\/span><\/p>\nV=\\frac{1}{2}\\times l\\times h\\times (b+B)<\/span><\/span><\/p>\nWe can rewrite the formula as<\/span><\/p>\nV = Area of base \u00d7 length of 3D figure<\/span><\/p>\nSince the area of the trapezoid <\/span>=\\frac{1}{2}\\times h\\times (b+B)<\/span><\/span><\/p>\n<\/span><\/p>\nExamples with Solution<\/strong><\/h2>\nExample 1:<\/b><\/p>\n
Find the volume of a trapezoidal prism given that the length of the parallel sides are 10 cm and 8 cm respectively, the length of the prism is 4 cm, and the height of the trapezoidal base is 6 cm.<\/span><\/p>\nSolution:<\/b><\/p>\n
A trapezoidal prism is a polyhedron with two faces in the shape of a trapezoid. The side faces of the 3D object are rectangles. The trapezoidal faces are congruent to each other. There are 6 faces (2 trapezoidal and 4 rectangular) and 8 vertices.\u00a0<\/span><\/p>\nIn the given question,\u00a0<\/span><\/p>\nThe base 1 = 10 cm, base 2 = 8 cm, the height or perpendicular distance between the parallel sides of the trapezoidal base is 6 cm, and the length of the prism is 4 cm.\u00a0<\/span><\/p>\nArea of trapezium\/trapezoid<\/span><\/p>\n=\\frac{1}{2}\\times h\\times (b_1+b_2)<\/span><\/span><\/p>\n=\\frac{1}{2}\\times 6\\times (10+8)=54\\text{ } cm^2<\/span><\/span><\/p>\nThe volume of the trapezoid prism<\/span><\/p>\n\u00a0 \u00a0 V = Area of base \u00d7 length of the prism. <\/span><\/p>\n\u21d2 V = 54\\text{ } cm^2\\times 4\\text{ } cm<\/span><\/span><\/p>\n\u00a0 \u00a0 \u00a0 \u00a0 = 216\\text{ } cm^3<\/span><\/span><\/p>\nAnswer:<\/b> Thus, the Volume of the trapezoid prism is 216 cm^3<\/span>.<\/span><\/p>\n<\/b><\/p>\n
Example 2:<\/b><\/p>\n
Find the length of the trapezoidal tank, when the area of the base is 60 m^2<\/span><\/span> and the tank capacity is 360 m^3<\/span><\/span>?<\/span><\/p>\nSolution:<\/b><\/p>\n
Given:<\/span><\/p>\nThe Volume of the tank = 360 m^3<\/span><\/span>.<\/span><\/p>\nArea of the base = 60 m^2<\/span><\/span><\/p>\nThe Volume of a trapezoid tank <\/span>V= Area of base \u00d7length of tank. <\/span><\/p>\n360\\text{ }m^3 = 60\\text{ }m^2\\times l<\/span><\/span><\/p>\n\u21d2 <\/span> l=\\frac{360\\text{ }m^3}{60\\text{ }m^2}<\/span><\/p>\n\u2234 l=6\\text{ }m<\/span><\/p>\nAnswer:<\/b> The length of the trapezoid tank is 6 m.<\/span><\/p>\n<\/span><\/p>\n[\/et_pb_text][et_pb_text admin_label=”Sample Questions
\n” _builder_version=”4.10.4″ _module_preset=”default” header_font=”|700|||||||” header_font_size=”28px” custom_padding=”|0px||4px|false|false” global_colors_info=”{}”]<\/p>\n
Practice Multiple Choice Questions<\/h1>\n
[\/et_pb_text][et_pb_text admin_label=”Question 1″ _builder_version=”4.10.6″ _module_preset=”default” background_color=”#FFFFFF” custom_padding=”25px|25px|25px|25px|true|true” border_radii=”on|15px|15px|15px|15px” border_width_top=”3px” border_color_top=”#E02B20″ global_colors_info=”{}”]<\/p>\n
\n\nQuestion:
\n<\/b>PQRS is a rhombus. Each of its sides is 20 cm long, diagonal PR is 32 cm long and diagonal QS is 24 cm.<\/p>\n
![](\"http:\/\/www.educationalinitiatives.com\/detailed_assessment\/images\/DAM_50824.jpg\")
<\/p>\n
What is the area of PQRS?<\/p>\n
1. 384 cm\u00b2
\n2. 400 cm\u00b2
\n3. 560 cm\u00b2
\n4. 768 cm\u00b2<\/p>\n<\/div>\n
\nType your answer option :<\/b> <\/span><\/p>\n<\/div>\n<\/div>\n<\/div>\nAnswer:<\/b> 1<\/span><\/span><\/div>\n
Formula to calculate the volume<\/strong><\/h2>\nThe formula for finding the area of a 2D trapezoid is<\/span> A=\\frac{1}{2}\\times h\\times (b_1+b_2)<\/span><\/span>.<\/span><\/p>\n<\/span><\/p>\n<\/span><\/p>\n<\/span><\/p>\nHere A is the area of a trapezoid.<\/span><\/p>\nh<\/span> is the perpendicular distance between the bases of the trapezoid(height).<\/span><\/p>\nb_1\\text{ and }b_2<\/span> <\/span>are the lengths of the bases of the trapezoid.<\/span><\/p>\nBut we cannot find the volume of a two-dimensional figure. <\/span>To find out the volume of a trapezoid, you have to construct a 3D figure with two trapezoidal bases. We can find the volume of the 3D trapezoid simply by multiplying the area of the trapezoidal base with the length of the 3D figure.<\/span><\/p>\nLet us consider:<\/span><\/p>\nl<\/span> = length of the 3D figure.<\/span><\/p>\nb\\text{ and }B<\/span> <\/span>= length of the parallel sides of the trapezoidal base.<\/span><\/p>\nh<\/span> = distance between the parallel sides of the trapezoidal base(height).<\/span><\/p>\n<\/span><\/p>\n<\/span><\/p>\n<\/span><\/p>\nFormula to find the volume of 3D trapezoid uses four variables,<\/span><\/p>\nV=\\frac{1}{2}\\times l\\times h\\times (b+B)<\/span><\/span><\/p>\nWe can rewrite the formula as<\/span><\/p>\nV = Area of base \u00d7 length of 3D figure<\/span><\/p>\nSince the area of the trapezoid <\/span>=\\frac{1}{2}\\times h\\times (b+B)<\/span><\/span><\/p>\n<\/span><\/p>\nExamples with Solution<\/strong><\/h2>\nExample 1:<\/b><\/p>\n
Find the volume of a trapezoidal prism given that the length of the parallel sides are 10 cm and 8 cm respectively, the length of the prism is 4 cm, and the height of the trapezoidal base is 6 cm.<\/span><\/p>\nSolution:<\/b><\/p>\n
A trapezoidal prism is a polyhedron with two faces in the shape of a trapezoid. The side faces of the 3D object are rectangles. The trapezoidal faces are congruent to each other. There are 6 faces (2 trapezoidal and 4 rectangular) and 8 vertices.\u00a0<\/span><\/p>\nIn the given question,\u00a0<\/span><\/p>\nThe base 1 = 10 cm, base 2 = 8 cm, the height or perpendicular distance between the parallel sides of the trapezoidal base is 6 cm, and the length of the prism is 4 cm.\u00a0<\/span><\/p>\nArea of trapezium\/trapezoid<\/span><\/p>\n=\\frac{1}{2}\\times h\\times (b_1+b_2)<\/span><\/span><\/p>\n=\\frac{1}{2}\\times 6\\times (10+8)=54\\text{ } cm^2<\/span><\/span><\/p>\nThe volume of the trapezoid prism<\/span><\/p>\n\u00a0 \u00a0 V = Area of base \u00d7 length of the prism. <\/span><\/p>\n\u21d2 V = 54\\text{ } cm^2\\times 4\\text{ } cm<\/span><\/span><\/p>\n\u00a0 \u00a0 \u00a0 \u00a0 = 216\\text{ } cm^3<\/span><\/span><\/p>\nAnswer:<\/b> Thus, the Volume of the trapezoid prism is 216 cm^3<\/span>.<\/span><\/p>\n<\/b><\/p>\n
Example 2:<\/b><\/p>\n
Find the length of the trapezoidal tank, when the area of the base is 60 m^2<\/span><\/span> and the tank capacity is 360 m^3<\/span><\/span>?<\/span><\/p>\nSolution:<\/b><\/p>\n
Given:<\/span><\/p>\nThe Volume of the tank = 360 m^3<\/span><\/span>.<\/span><\/p>\nArea of the base = 60 m^2<\/span><\/span><\/p>\nThe Volume of a trapezoid tank <\/span>V= Area of base \u00d7length of tank. <\/span><\/p>\n360\\text{ }m^3 = 60\\text{ }m^2\\times l<\/span><\/span><\/p>\n\u21d2 <\/span> l=\\frac{360\\text{ }m^3}{60\\text{ }m^2}<\/span><\/p>\n\u2234 l=6\\text{ }m<\/span><\/p>\nAnswer:<\/b> The length of the trapezoid tank is 6 m.<\/span><\/p>\n<\/span><\/p>\n[\/et_pb_text][et_pb_text admin_label=”Sample Questions
\n” _builder_version=”4.10.4″ _module_preset=”default” header_font=”|700|||||||” header_font_size=”28px” custom_padding=”|0px||4px|false|false” global_colors_info=”{}”]<\/p>\n
Practice Multiple Choice Questions<\/h1>\n
[\/et_pb_text][et_pb_text admin_label=”Question 1″ _builder_version=”4.10.6″ _module_preset=”default” background_color=”#FFFFFF” custom_padding=”25px|25px|25px|25px|true|true” border_radii=”on|15px|15px|15px|15px” border_width_top=”3px” border_color_top=”#E02B20″ global_colors_info=”{}”]<\/p>\n
\n\nQuestion:
\n<\/b>PQRS is a rhombus. Each of its sides is 20 cm long, diagonal PR is 32 cm long and diagonal QS is 24 cm.<\/p>\n
<\/p>\n
What is the area of PQRS?<\/p>\n
1. 384 cm\u00b2
\n2. 400 cm\u00b2
\n3. 560 cm\u00b2
\n4. 768 cm\u00b2<\/p>\n<\/div>\n
\nType your answer option :<\/b> <\/span><\/p>\n<\/div>\n<\/div>\n<\/div>\nAnswer:<\/b> 1<\/span><\/span><\/div>\n
<\/span><\/p>\n <\/span><\/p>\n Here A is the area of a trapezoid.<\/span><\/p>\n h<\/span> is the perpendicular distance between the bases of the trapezoid(height).<\/span><\/p>\n b_1\\text{ and }b_2<\/span> <\/span>are the lengths of the bases of the trapezoid.<\/span><\/p>\n But we cannot find the volume of a two-dimensional figure. <\/span>To find out the volume of a trapezoid, you have to construct a 3D figure with two trapezoidal bases. We can find the volume of the 3D trapezoid simply by multiplying the area of the trapezoidal base with the length of the 3D figure.<\/span><\/p>\n Let us consider:<\/span><\/p>\n l<\/span> = length of the 3D figure.<\/span><\/p>\n b\\text{ and }B<\/span> <\/span>= length of the parallel sides of the trapezoidal base.<\/span><\/p>\n h<\/span> = distance between the parallel sides of the trapezoidal base(height).<\/span><\/p>\n <\/span><\/p>\n <\/span><\/p>\n Formula to find the volume of 3D trapezoid uses four variables,<\/span><\/p>\n V=\\frac{1}{2}\\times l\\times h\\times (b+B)<\/span><\/span><\/p>\n We can rewrite the formula as<\/span><\/p>\n V = Area of base \u00d7 length of 3D figure<\/span><\/p>\n Since the area of the trapezoid <\/span>=\\frac{1}{2}\\times h\\times (b+B)<\/span><\/span><\/p>\n <\/span><\/p>\n Example 1:<\/b><\/p>\n Find the volume of a trapezoidal prism given that the length of the parallel sides are 10 cm and 8 cm respectively, the length of the prism is 4 cm, and the height of the trapezoidal base is 6 cm.<\/span><\/p>\n Solution:<\/b><\/p>\n A trapezoidal prism is a polyhedron with two faces in the shape of a trapezoid. The side faces of the 3D object are rectangles. The trapezoidal faces are congruent to each other. There are 6 faces (2 trapezoidal and 4 rectangular) and 8 vertices.\u00a0<\/span><\/p>\n In the given question,\u00a0<\/span><\/p>\n The base 1 = 10 cm, base 2 = 8 cm, the height or perpendicular distance between the parallel sides of the trapezoidal base is 6 cm, and the length of the prism is 4 cm.\u00a0<\/span><\/p>\n Area of trapezium\/trapezoid<\/span><\/p>\n =\\frac{1}{2}\\times h\\times (b_1+b_2)<\/span><\/span><\/p>\n =\\frac{1}{2}\\times 6\\times (10+8)=54\\text{ } cm^2<\/span><\/span><\/p>\n The volume of the trapezoid prism<\/span><\/p>\n \u00a0 \u00a0 V = Area of base \u00d7 length of the prism. <\/span><\/p>\n \u21d2 V = 54\\text{ } cm^2\\times 4\\text{ } cm<\/span><\/span><\/p>\n \u00a0 \u00a0 \u00a0 \u00a0 = 216\\text{ } cm^3<\/span><\/span><\/p>\n Answer:<\/b> Thus, the Volume of the trapezoid prism is 216 cm^3<\/span>.<\/span><\/p>\n <\/b><\/p>\n Example 2:<\/b><\/p>\n Find the length of the trapezoidal tank, when the area of the base is 60 m^2<\/span><\/span> and the tank capacity is 360 m^3<\/span><\/span>?<\/span><\/p>\n Solution:<\/b><\/p>\n Given:<\/span><\/p>\n The Volume of the tank = 360 m^3<\/span><\/span>.<\/span><\/p>\n Area of the base = 60 m^2<\/span><\/span><\/p>\n The Volume of a trapezoid tank <\/span>V= Area of base \u00d7length of tank. <\/span><\/p>\n 360\\text{ }m^3 = 60\\text{ }m^2\\times l<\/span><\/span><\/p>\n \u21d2 <\/span> l=\\frac{360\\text{ }m^3}{60\\text{ }m^2}<\/span><\/p>\n \u2234 l=6\\text{ }m<\/span><\/p>\n Answer:<\/b> The length of the trapezoid tank is 6 m.<\/span><\/p>\n <\/span><\/p>\n [\/et_pb_text][et_pb_text admin_label=”Sample Questions [\/et_pb_text][et_pb_text admin_label=”Question 1″ _builder_version=”4.10.6″ _module_preset=”default” background_color=”#FFFFFF” custom_padding=”25px|25px|25px|25px|true|true” border_radii=”on|15px|15px|15px|15px” border_width_top=”3px” border_color_top=”#E02B20″ global_colors_info=”{}”]<\/p>\n Question: What is the area of PQRS?<\/p>\n 1. 384 cm\u00b2 Type your answer option :<\/b> <\/span><\/p>\n<\/span><\/p>\n<\/span><\/p>\nExamples with Solution<\/strong><\/h2>\n
\n” _builder_version=”4.10.4″ _module_preset=”default” header_font=”|700|||||||” header_font_size=”28px” custom_padding=”|0px||4px|false|false” global_colors_info=”{}”]<\/p>\nPractice Multiple Choice Questions<\/h1>\n
\n<\/b>PQRS is a rhombus. Each of its sides is 20 cm long, diagonal PR is 32 cm long and diagonal QS is 24 cm.<\/p>\n<\/p>\n
\n2. 400 cm\u00b2
\n3. 560 cm\u00b2
\n4. 768 cm\u00b2<\/p>\n<\/div>\n