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Essential Questions: 1)What are the features of the 3D coordinate system? 2) How can we solve problems involving distance and midpoint formulas in the 3D coordinate system? 6.4 (orange geometry book)
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The Arrangement of the Axes
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______ axis _______ axis Right Handed System INDEX FINGER: ___________ MIDDLE FINGER: __________ THUMB: ___________
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EXAMPLE: Locate the point P(1, 2, 3) in a 3-D coordinate system. *How to graph in the 3-D plane* STEP 1:Starting at the origin, count 1 unit in the positive direction along the x-axis. Make a mark on the x-axis at this position. STEP 2: From your mark on the x-axis, count 2 units in the positive direction along the y-axis, drawing a dashed line to represent the distance. Make a mark on the new position. STEP 3: From the new position, count 3 units in the positive direction along the z-axis, drawing a dashed line to represent the distance. Label the final position at point P(1, 2, 3).
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EXAMPLE: Locate the point P(2,3,6) in a 3-D coordinate system. *How to graph in the 3-D plane* STEP 1:Starting at the origin, count 1 unit in the positive direction along the x-axis. Make a mark on the x-axis at this position. STEP 2: From your mark on the x-axis, count 2 units in the positive direction along the y-axis, drawing a dashed line to represent the distance. Make a mark on the new position. STEP 3: From the new position, count 3 units in the positive direction along the z-axis, drawing a dashed line to represent the distance. Label the final position at point P(1, 2, 3).
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The x and y axes divide the plane into 4 _________________, so the x, y and z-axes will divide space into ___________ ____________________. Octant #LocationCoordinates 1 1 st Octant ( ) 2 Top – front – left ( ) 3 Top – back – right ( ) 4 Top – back – left ( ) 5 Bottom – front – right ( ) 6 Bottom – front – left ( ) 7 Bottom – back – right ( ) 8 Bottom – back – left ( )
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There are three coordinate planes, and each plane is named by the pair of axes that determines the plane: In the xy-plane, the ______________ of every point is zero. In the xz-plane, the ______________ of every point is zero. In the yz-plane, the ______________ of every point is zero.
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The Distance Formula in 3-D The distance, d, between the points (x 1, y 1, z 1 ) and (x 2, y 2, z 2 ) is given by Example: Find the distance between points R(4, 6, -9) and S (-3, 2, -6). Example: Find the distance between points P(2, -4, -2) and Q(0, -3, 1).
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The Midpoint Formula in 3-D The midpoint of a segment with endpoints at (x 1, y 1, z 1 ) and (x 2, y 2, z 2 ) is the point: Example: Find the midpoint of the segment with the given endpoints. a.(5, -2, 3) and (6, -7, 4) b. (3, 2, 1) and (1, 2, 3)
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