Working with Pyramids: IM Geo.5.14
[url=https://im.kendallhunt.com/HS/teachers/2/5/14/preparation.html]“Working with Pyramids”[/url] from IM Geometry © 2019 [url=https://www.illustrativemathematics.org/]Illustrative Mathematics[/url]. Licensed under the [url=https://creativecommons.org/licenses/by/4.0/]Creative Commons Attribution 4.0[/url] license.
Sadržaj
- Geo.5.14 Lesson
- IM Geo.5.14 Lesson: Working with Pyramids
- Geo.5.14 Practice
- IM Geo.5.14 Practice: Working with Pyramids
IM Geo.5.14 Lesson: Working with Pyramids
Here is a pyramid.
[img]data:image/png;base64,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[/img][br][br]Which, if either, of these solids has the same volume as the pyramid?
Calculate the volume of each solid. Round your answers to the nearest tenth if necessary.
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[/img][br]
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Ttx4kTBpuqACDCxpQ7gAixMmSxsZFXqyJEj5aqO8ePHiylTpohnnnlGLuS09h43KScfljmQkm+iLSENCVggpSHlFlCGBVIL6OQ0mmiBlIaUW0AZFkgtoJPTaKIFUhpSbgFl/A9kXhYXH5JdOAAAAABJRU5ErkJggg==[/img]
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[/img]
height 12 cm; area of base 32 cm²[br][br][img]data:image/png;base64,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[/img]
A particular cone has radius r and height h.
Write an expression for the volume of this cone in terms of [math]r[/math] and [math]h[/math].[br]
What is the height of a cone whose volume is [math]16\pi[/math] cubic units and whose radius is 3 units?[br]
What is the radius of a cone whose volume is [math]16\pi[/math] cubic units and whose height is 3 units?[br]
The Pyramid of Giza is 455 feet tall. The base is square with a 756-foot side length. How many Olympic-size swimming pool volumes of water can fit inside the Pyramid of Giza? Explain or show your reasoning.
[size=150]A caterer is making an ice sculpture in the shape of a pyramid for a party. The caterer wants to use 12 liters of water, which is about 720 cubic inches. The sculpture must be 15 inches tall. The caterer needs to decide how large to make the base, which can be any shape.[/size][br][br][list][*]Draw and label the dimensions of a base that would work.[/*][*]Find a second base that satisfies the baker’s requirements. You may use the applet to help, if you choose.[/*][/list]
Directions for using the applet:[list][*]Draw your base on the grid with the Polygon tool.[/*][*]Change to the 3D Graphics View by clicking on button.[/*][*]Click in the 3D window to switch back to the 3D menu.[/*][*]Select the Extrude to Pyramid tool and click on your polygon.[/*][*]When the dialog box opens, input the height.[/*][*]Use the Volume tool to verify your calculations and your figure.[/*][*]Refresh the page and repeat the steps with another base that works.[/*][/list]
IM Geo.5.14 Practice: Working with Pyramids
[size=150]A pyramid has a height of 5 inches and a volume of 60 cubic inches. Select [b]all[/b] figures that could be the base for this pyramid.[/size]
[size=150]A company makes a block of cheese in the shape of a rectangular prism with dimensions 4 inches by 2 inches by 2 inches. They want to make a new block, in the shape of a rectangular pyramid, that uses the same amount of cheese[/size][size=150]. Determine two sets of possible dimensions for the pyramid.[/size]
[size=150]Select [b]all [/b]the solids with volume 40 cubic units.[br][br][table][tr][td][size=100]A. rectangular prism[/size][/td][td][size=100]B. right rectangular pyramid[/size][/td][td][size=100]C. right cone[/size][/td][/tr][tr][td][img]data:image/png;base64,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[/img][/td][td][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAH0AAACECAYAAAC9HST0AAARM0lEQVR4Ae2dBbAeNRDHixQdXEqBAQqFQnErbi0wuEuB4sWdwd1pcRso7u4UdxjcneLuzuC2zC8zeZN37ySXy913tjPffHe5JJfLP7LZ7G56SUuNq4Fejfvi9oOlBb2BjaAFvQW9gTXQwE9ue3oLegNroIGf3Oiefuihh8qoUaMaB3tjQb/sssukV69e0rdv3xb0ptTAhhtuKL1795YJJ5xQRo4c2ZTPVt/ZyJ7+2GOPqV4+5ZRTqv/JJptMXnrppcYA30jQt9pqK5luuulkscUWU6Cvs846stFGG7Wg17UGXnjhBQU08/kPP/wg8847r+y2224q7MILL6zrZ3f7rsb19J133llmnHFG+eyzz1RF7LrrrjJo0CA59dRTZdZZZ5VPP/20WwXV8aZRoI8ZM0bGG288Ofroo7uwvO6661Qv/+mnn2TJJZcUGkXdqVGg77PPPjLppJPKMccco3B99913hYbAUH/vvffKiy++qK5vvfXWWuPeGNA/+eQTmWKKKWT11VeX5ZZbToE600wzyUknnSR9+vSRo446SoUddNBBarj/66+/agt8Y0A//PDD1dD+wQcfdIGpQWfNTmPQ1L9/f0FaV1dqBOjfffedzDDDDIpLN4HUoJ955pky9dRTdz265557ZJxxxhHW83WkRoCOxI15m7l8jz326MJx5ZVXlksvvVRefvll9Zw5XdPw4cNltdVW07e1+q896L/99pvMPvvssu2228rNN9/cDXQTSRqFufny66+/Kqbv9NNPN6PV4rr2oDN0A+gzzzwTC9iyyy4rSOpMuvzyy2XaaaeVt956ywyu/HXtQV9ggQVk6NChiUAdcsghMtdcc/WIt9Zaa8kWW2zRI7zKAbUG/aKLLlK9/KGHHpItt9xS/UywmMu//PJLFXTfffepuEGJ3Mcff6zCr7zySjNppa9rDToStjXXXFMBBPD8TNLcO2E///yzAvfGG280o6jrU045RQYOHCg//vhjj2dVDKgt6Ndcc40C8fbbb4/ExQSdSAMGDJB99903NP7iiy8ue+21V+izqgXWFvQVV1xRBg8erPAwBTImQEHQt99+e4GhC6Pnn39eNaK777477HGlwmoJ+ujRoxVAbKZAMHPm+lwjtO6668pVV12lb+WKK65QUruugMDFAQccENkoAlFLfVtL0Ndee21hONZET2fvPImIx/Lu0UcfDY3677//ymyzzSbHHnts6POqBNYO9AceeEABd/HFFzthMPnkk8sJJ5wQmZbhfaKJJhKUMapKtQN9k002UdowGhA4dpteruMzSqy//vr6NvR/m222kfXWWy/0WRUCawX6k08+qXr5WWed1VX3DNdRvf6JJ54Q1uEmnXzyyUqzxgwLXn/99dcyySSTyLnnnht8VIn7WoGOfB2Vp+BeeFRPD3LvIPbss8+qhvP222/HAojePOm12lVs5JI9rA3oeqcsjQ57GOg0mLjRwcQPwc92221nBlXiujag77777kqt2ezVe+65Z+x8HgY6qMH577jjjokAvvnmm6qBhEnxEhN3MEItQH/nnXcUR412jCb2xmeeeWaJEswQb9iwYXLDDTfoJF3/++23nyy44IJd93EXqFsttNBC8s8//8RFK9WzWoCO0ATGytf8escdd6geHOQNopDDaOLAAw+Mely68MqDzq4Yqk5ouvqizz//XIEeJ7c336XNpKqiXlV50NFiHXvsscXkthnSMVWKG9pN0MKu+/Xrl0o5kilhpZVWCsuqdGGVBv37779X83bQQIH5HCFLErGH/t5774VGQ4sGHTpbYmuWhsI6v+xUadCpYJZXrhanUdw7oKGAgWFEGsJIAktYGMsyU2VB/+OPP5R6ExoxrhQH+iuvvOLUoLbeemtBFFxmqizo55xzjgLl8ccf71a/iFzZSrWhONBJz8bKGWecYZNVVxz4iIknnlhQqiwrVRb0hRdeWDbYYIMe9UqlR8nag5F32GEHue2224LBXferrrqqbLbZZl33thdMDXPMMYdSwbJNU2S8SoKOgQJzOYxYnnT88cer/XOXd2Amhd17GamSoKPSRC8MkimCDT5zuX/wwQdV48KMOS0999xzKi3WsGWjyoF+/fXXq8q85ZZbetQlKlHaIrXHQ4cAbOAYUa6++mqH1KKUMZZYYgmntHkmqhzoq6yySiSwzOemPVpSxdFw2DSJI+TqbNy4EGLcRRddVI488kiX5LmlqRToWiZuKjNmqZkk7p28ATxLb8UCFu8XrrKELN8XlbZSoKOitMgii4R+Cz2cnp6GbEBHo3asscZKk22PuOjSa6OLHg87EFAZ0NF1Y349//zzQ6uJuTytoMYGdIwXeS+qWK70xRdfyCyzzNLNKtY1Lx/pKgP65ptvHmpgaFZC2p6+9957y1133WVmEXqNQ4Osas/Ywk0//fRCA+g0VQL0p556SvW20047rSP1temmmwrWq1mJkQgxbaepEqAjOUMLBkcBYYQELg3XHpZHXBgiX+zUs9Jrr72mRLs4R+gklR50Nj7w/3LcccdF1hPzOc7/8iLk+8zrPoZmZPl4qewklR50LEXRjEHX3Dcxz6JFm0SMMOOOO674ciOKNHH//fdPem1uz0sNOs790H07+OCDc6kAG+5dv3jIkCHKb42+z/L/8MMPq5EDY4tOUKlBxyUI/tjjuHI0XILOBmwrMg3oSNXmnntu26wT46G5u8IKKyTGyyNCaUFHORH33HEiUDZY4Ig1Ewf49CLzF9dg0oDOFizzui+i7Aia8HJRNPn7Cs8lh3Gjkl9//XXrnIkPU2f+4vbW8QqJlasNffTRR6o87Lz5IowkUMmK0tPz9Z5gPqUEHd8u2KThGSIN+eyJYe+dZ555BB17n4TrcdyUFkmlBJ3lFwDG+X5jeES0qYd2/vMGHa3b5Zdf3is+MKtMM0V6ryod6H/++afQo5LUlADdNGNiPucsljwJNSgYS9903nnnKfXpX375xXfWofmVDnRsvumxMGNpSPd00uofnD2NI4qobDRcbEk7G3r//fdtk1jHQ4OWob4IKh3o2IVhnZJEcWCSFq59/vnnjx2O03Dv5ImR4jTTTCOm04Okcto+Z39hggkmkPvvv982iXO8UoGO2jC9FGWJOEJ2Tbwk4HXvj4qXFnTKhAZuXowXipho2uRNpQIdYYWNKREg2mxa0NvjGocL6DghIl0e9Pvvv6vvN8+YyeM9pQGdNSsAofjoi2D02J2LohEjRkS6D4tKg/oT5fzvv/+iomQKv/POO5Wmzquvvpopn7jEpQF9jTXWkKWWWiqurOoZvVwv08zIAAwvcMQRR6gfSyu4+bC4Zrq01zgQBnRbM+a0+RMfs2vzeBGXPOLSlAJ0WjcVeckll8SVVT2L6r00BqRvPOfHWj9qLk98SUKEZZZZJtejvDhkCC1cVhd5UClA58hLW/szKiFOnp5HJQXzxBYds6o8Ce9VrBTy2FLuOOh6m/Hss8/Osw5D82Y0cNneRHrGyJQ3oVqFo0LflH/JE0qMAAVjPxv/LkjdXLdRw4rhwr2TD2pPgJ5mMyjs/Ulh6MpzRKjvwwE7CjqydSrvxBNPTPp+9RyzJRsPE1aZiailF96hXIiGGudD1iXPsDSMRmHHjITFtQ3rKOhsYKBenBfDlVQJrj2dfBl2MbEqgtDE9em9qmOgM0SOP/74HbXz4iQnxJ8uxNFdHONZBLGHT125ljVYxo6BzloUN9u2vt9YhsUpRAQ/LO97zYBGqWX7fj+qY762dTsCOrtU9BKWPrbEfF4m0JmSEP74lCDG1cU333yjhFc+DD46AjpqSlhymr7f4j64rM8wSizSYgVjyiRFUZu6Khx0DAZg3oraO46rBM5efeSRR+KixD477LDD1HIzNpLnhzvttJNsvPHGmXItHHS2D1mmpbHXZi7LY2jPwr1T6zgTLkJIYyI8ZswYmXPOOZ29Y5BXoaDju4X1bdohkbWqT6GMrsSsoKPfBugcDFAkYVvH7iGHB7tQoaCzzKGSgr7fXAruI01W0CkDmj6dcC/CfgU+7l2oMND//vtvtamSdT5y+cioNCg6Zj11CQGTzZZwVBlcw+k4bMi46OEXBjoeJOjlaXy/sSyCyzetQJjfzT1yn/fka+Znc890hVUtpONrIPO+xx1L37599eus/wsDncNuUZRIS6zPzcPxsF6hMjX5vCdfMz+be06AoDF/++23qlyk16TT53HPZg/uSHFlmnbjpxDQOc6Signz/aYrxPzvlCzeLIPtNXptGF3gxbIoAmSMKdmIefrpp1O/thDQzcNubUqIQgVi17yJw3nYKUPtOO6XpIMPU1UUr8IyETnHfPPNJyzfXCh30G+66SbVy9P4fkPTtYjejuMfTlscNWpU5I9t3yQ9fJwQucytaQGjh0811VRKKofXK1fKHXS2BVnWJBEgFwG0WQ6bJdtXX30lu+yyi5msxzVKkkxfeZIe0uEhsLTJQrmWlMNoqYwo329mwbEzT+sHzkzvcu0LdBQZkYmbDKdLeaLSMKTTw9HL82HWnCvoQ4cOtXaq04mefu2110qSfrlNTweswYMHezdjJl96OMd344Yljeg6qgERnhvotHp6OVK4KAJoG0uVqPRFhNuCjkMkmCufpIf0QYMGyYcffugt69xAR76OY4E4JQM4dIwMy0y2oKOz73NeZ0jv3bu3GimDJz9nra9cQNcnE8f5ftMFL5p50++1/bcFHUEMoPsAiB7OThpiVq59Uy6gw+326dMnVFEfkDE9KgMNGDAgdvqhjLagY9vG8M7yLwvheBjBC/J8W1WytO/zDjotE9EgOl1hpEWTZejhvrh3/Z04Lc7iQxbAkeMPHDjQi3dKXa7gv3fQ8W0Op9lp06Pgh4bd24Juq5ePDj3ycBfSTBu9PG81Mq+gAzTzEJysSfRqc/fKfFana3YQXZg5mDbmcOooD9u1YB17BR1unMNug8wHoCN4KcOQHqwAn/cAhmgXG3Zboq7g0hHjslNXBHkDHYYHFR7cdDeZcPZrq9Gih3TE1Hk4L4rCwRvoI0eOVEOb6fuN3bKyC1+iKsY1HOeC/fv3T0zOkI6kDXcrRY+AXkDnGGnmpGHDhnX72KJ2y7q9tMM3nOGWNK/Tw5GlcwKzy0F/WT/RC+g4rudD2Xem1RbdcrNWgs/0b7zxhlp2RW196iGdaYCNmjREvSL50y5WXOs5M+j4VsNVBvpaEOpCRe+Wpam4IuLiFgy17SDp3TL8yaT1Dsmoie0fdQvDjMk298g90lJm0C+44ALVy7XvNwrh2gLTFr6s8YcPHy5oC5lED0fjBa/PuDVPS9RpEGAagIu9fmbQl156aeHUg2CB0n5UneJjAm3O63pIR1qHTp0vosebipi2+WYCHRUoPg4Pii4vty1k1eLpbWWcGzOkI6VjSOfeJ9HLXabSTKCz3MC9FtT0Id0EE468X79+AoPLqgZxL6bGPkl7vXYRdzuDrtWaWZdSAFSiWK5wHXaPXbX53OV+9OjRXfmTvlP3vNd8f9g9O27Y4KN4CbPrk5hKYeJcjTqdQcfEl6G9/UXXAUIa3+5EswJO43MG3WfLbfOyqwEfgLeg29V1KWL5ArwFvRRw2hWC1RHzONuvwR8NIg21w3ua2upgXIDVTHLwP+3KqQW9g0B26tW1Ap0Wz9DnupTpFAhFv7dWoDPv4dsN8WRL0TVQG9DZ1QJ0fi3o0YDzpBagw+SgqoVIsgU9HvDagI5plFbLakFvAOhBH/At6DUHnfUqw7q5Tm1BrznoAG4ey4XuGE5/WLaVxV4uGYLiY1SakYNLD/5oCG1vj29IlQY97NNawMNqpXtYC3r3+mjEXe1AbwRqGT+yBT1jBVYxeQt6FVHLWOYW9IwVWMXkLehVRC1jmf8HMJ7Y/5L5JPgAAAAASUVORK5CYII=[/img][/td][td][img]data:image/png;base64,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[/img][/td][/tr][tr][td][size=100]D. triangular pyramid[/size][/td][td][size=100]E. right cylinder[/size][/td][td] [size=100]F. right hexagonal prism[/size][br][/td][/tr][tr][td][img]data:image/png;base64,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[/img][/td][td][img]data:image/png;base64,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[size=150]The volume of a pyramid is 50 cubic units. The base is a square with sides of length 5. What is the height? [/size]
[size=150]A cone and a cylinder have the same radius and height. The volume of the cone is [math]100\pi[/math] cubic feet. [/size][size=150]What is the volume of the cylinder?[/size]
[size=150]A solid can be constructed with 2 congruent triangles and 3 rectangles. What is the name of this solid?[/size]
An oblique cylinder with a base of radius 3 is shown.
[size=150]The top of the cylinder can be obtained by translating the base by the directed line segment [math]AB[/math] which has length [math]6\sqrt{2}[/math]. The segment [math]AB[/math] forms a [math]45°[/math] angle with the plane of the base.[br][br][/size][img]data:image/png;base64,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[/img][br][br]What is the volume of the cylinder?
[size=150]Mai, Andre, and Lin are discussing the volume of a scaled box. The original box holds 7 cubic inches. The new box holds 448 cubic inches. [/size][size=150]Mai thinks the scale factor is 4, Andre thinks the scale factor is 16, and Lin thinks the scale factor is 64. Do you agree with any of them? Explain your reasoning.[/size]