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Download Unit 8 Day 1 Notes - Garnet Valley School District
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Algebra II/Trigonometry Honors Unit 8 Day 1: Apply the Distance and Midpoint Formulas Objective: To find the length and midpoint of a line segment To find the distance between two points, we will use a formula similar to Pythagorean Theorem for right triangles. The Distance Formula The distance d between x1 , y1 and x2 , y2 is ___________________________________________ Example 1: Use the distance formula Find the distance between (-3, 5) and (4, -1). Example 2: Classify a triangle using the distance formula The vertices of a triangle are A(4, 6), B(7, 3) and C(2, 1) as shown to the right. Classify ∆ABC as scalene, isosceles, or equilateral. The Midpoint Formula A line segment’s midpoint is equidistant from the segment’s endpoints. The formula for the midpoint of the line segment joining A x1 , y1 and B x2 , y2 is: Example 3: Find the midpoint of a line segment Find the midpoint of the line segment joining (-5, 1) and (-1, 6). Example 4: Find a perpendicular bisector Write an equation for the perpendicular bisector of the line segment joining A(-3, 4) and B(5, 6). Recall: Perpendicular lines have opposite reciprocal slopes. Perpendicular bisectors cut a segment into two equal parts. The point-slope form y y1 mx x1 can be used to write the equation of a line. Finding a Circle’s Center The perpendicular bisector of any chord on a circle passes through the circle’s center. Given three points, you can use this theorem to find the center of a circle. Example 5: Solve a multi-step problem Many scientists believe that an asteroid slammed into Earth about 65 million years ago on what is now Mexico’s Yucatan peninsula, creating an enormous crate that is now deeply buried by sediment. Use the labeled points on the outline of the circular crater to estimate its diameter. (Each unit in the coordinate plane represents 1 mile.) Step 1: Write equations for the perpendicular bisectors of AO and OB using the method from the previous example. Step 2: Find the coordinates of the center of the circle, where AO and OB intersect. Step 3: Calculate the radius (the distance between the center and any of the given points on the circle) using the distance formula. HW: Page 493 #3-30 (M3), 31-35 odd, 41, 43, 52
