Mathematics Unit 1: Farms

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Presentation transcript:

Mathematics Unit 1: Farms Here you see a photograph of a farmhouse with a roof in the shape of a pyramid. Next to it is a student’s mathematical model of the farmhouse roof with measurements added. The attic floor, ABCD in the model, is a square. The beams that support the roof are the edges of a block (rectangular prism) EFGHKLMN. E is the middle of AT, F is the middle of BT, G is the middle of CT and H is the middle of DT. All the edges of the pyramid in the model have length 12m. QUESTION 1.1 Calculate the area of the attic floor ABCD. What do we want to find out? What useful information do we know? What other mathematical techniques do we need to apply? What have we learned?

Mathematics Unit 1: Farms Here you see a photograph of a farmhouse with a roof in the shape of a pyramid. Next to it is a student’s mathematical model of the farmhouse roof with measurements added. The attic floor, ABCD in the model, is a square. The beams that support the roof are the edges of a block (rectangular prism) EFGHKLMN. E is the middle of AT, F is the middle of BT, G is the middle of CT and H is the middle of DT. All the edges of the pyramid in the model have length 12m. QUESTION 1.1 Calculate the area of the attic floor ABCD. What do we want to find out? What useful information do we know? What other mathematical techniques do we need to apply? What have we learned? Back to start

Mathematics Unit 1: Farms Here you see a photograph of a farmhouse with a roof in the shape of a pyramid. Next to it is a student’s mathematical model of the farmhouse roof with measurements added. The attic floor, ABCD in the model, is a square. The beams that support the roof are the edges of a block (rectangular prism) EFGHKLMN. E is the middle of AT, F is the middle of BT, G is the middle of CT and H is the middle of DT. All the edges of the pyramid in the model have length 12m. QUESTION 1.1 Calculate the area of the attic floor ABCD. What do we want to find out? What useful information do we know? What other mathematical techniques do we need to apply? What have we learned? Back to start

Mathematics Unit 1: Farms Here you see a photograph of a farmhouse with a roof in the shape of a pyramid. Next to it is a student’s mathematical model of the farmhouse roof with measurements added. The attic floor, ABCD in the model, is a square. The beams that support the roof are the edges of a block (rectangular prism) EFGHKLMN. E is the middle of AT, F is the middle of BT, G is the middle of CT and H is the middle of DT. All the edges of the pyramid in the model have length 12m. QUESTION 1.1 Calculate the area of the attic floor ABCD. What do we want to find out? What useful information do we know? What other mathematical techniques do we need to apply? What have we learned? Back to start

Mathematics Unit 1: Farms Here you see a photograph of a farmhouse with a roof in the shape of a pyramid. Next to it is a student’s mathematical model of the farmhouse roof with measurements added. The attic floor, ABCD in the model, is a square. The beams that support the roof are the edges of a block (rectangular prism) EFGHKLMN. E is the middle of AT, F is the middle of BT, G is the middle of CT and H is the middle of DT. All the edges of the pyramid in the model have length 12m. QUESTION 1.1 Calculate the area of the attic floor ABCD. What do we want to find out? What useful information do we know? What other mathematical techniques do we need to apply? What have we learned? Back to start

Mathematics Unit 1: Farms The attic floor, ABCD in the model, is a square. The beams that support the roof are the edges of a block (rectangular prism) EFGHKLMN. E is the middle of AT, F is the middle of BT, G is the middle of CT and H is the middle of DT. All the edges of the pyramid in the model have length 12m. QUESTION 1.2 Calculate the length of EF, one of the horizontal edges of the block. What do we want to find out? What useful information do we know? What other mathematical techniques do we need to apply? What have we learned?

Mathematics Unit 1: Farms The attic floor, ABCD in the model, is a square. The beams that support the roof are the edges of a block (rectangular prism) EFGHKLMN. E is the middle of AT, F is the middle of BT, G is the middle of CT and H is the middle of DT. All the edges of the pyramid in the model have length 12m. QUESTION 1.2 Calculate the length of EF, one of the horizontal edges of the block. What do we want to find out? What useful information do we know? What other mathematical techniques do we need to apply? What have we learned? Back to start

Mathematics Unit 1: Farms The attic floor, ABCD in the model, is a square. The beams that support the roof are the edges of a block (rectangular prism) EFGHKLMN. E is the middle of AT, F is the middle of BT, G is the middle of CT and H is the middle of DT. All the edges of the pyramid in the model have length 12m. QUESTION 1.2 Calculate the length of EF, one of the horizontal edges of the block. What do we want to find out? What useful information do we know? What other mathematical techniques do we need to apply? What have we learned? Back to start

Mathematics Unit 1: Farms The attic floor, ABCD in the model, is a square. The beams that support the roof are the edges of a block (rectangular prism) EFGHKLMN. E is the middle of AT, F is the middle of BT, G is the middle of CT and H is the middle of DT. All the edges of the pyramid in the model have length 12m. QUESTION 1.2 Calculate the length of EF, one of the horizontal edges of the block. What do we want to find out? What useful information do we know? What other mathematical techniques do we need to apply? What have we learned? Back to start

Mathematics Unit 1: Farms The attic floor, ABCD in the model, is a square. The beams that support the roof are the edges of a block (rectangular prism) EFGHKLMN. E is the middle of AT, F is the middle of BT, G is the middle of CT and H is the middle of DT. All the edges of the pyramid in the model have length 12m. QUESTION 1.2 Calculate the length of EF, one of the horizontal edges of the block. What do we want to find out? What useful information do we know? What other mathematical techniques do we need to apply? What have we learned? Back to start