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1. write an equation of the line containing the given point and PARALLEL to the given line. Express your answer in the form y= mx+b. (4, 9); x + 7y = 6 The equation of the line is y= ??? Step 1: Rewrite the given equation in y = mx+b form. x + 7y = 6 7y = -x +6 y = -(1/7)x + 6/7 Step 2: Determine the slope of the given line. When the equation is in y = mx + b form, the slope of the line is m. The slope of the given line is -1/7 Step 3: Determine the slope of the new line. Since the new line is parallel to the given line, they will have the same slope. Therefore, for the new line, m = -1/7 Step 4: Write equation for new line, with unknown b. y = (-1/7)x + b Step 5: Substitute the given point and solve for b. 9 = (-1/7)(4) + b 9 = -4/7 + b b = 9 + 4/7 b = 63/7 + 4/7 b = 67/7 Step 6: Write the equation of the new line: y = (-1/7)x + 67/7 2. write an equation of the line containing the given point and PARALLEL to the given line. Express your answer in the form y= mx+b. (-2, 9); 6x = 5y + 2 The equation of the line is y= ??? Same steps as the previous problem: Step 1: 6x = 5y + 2 5y = 6x – 2 y = (6/5)x – 2/5 Step 2: slope = 6/5 Step 3: Lines are parallel, so the slope of the new line is also 6/5 Step 4: New line: y = (6/5)x + b Step 5: 9 = (6/5)(-2) + b 9 = -12/5 + b b = 45/5 + 12/5 b = 57/5 Step 6: y = (6/5)x + 57/5 3. write an equation of the line containing the given point and PERPENDICULAR to the given line. (3, 9); 8x + y = 6 The equation of the line is y= ??? This is the same as the previous two problems, except for a small twist involving the slope of the new line. Step 1: 8x + y = 6 y = -8x + 6 Step 2: slope of given line: m = -8 Step 3: Since the new line is perpendicular to the given line, its slope will be the negative reciprocal of the given line’s slope. new slope = -1/m = -1/-8 = 1/8 Step 4: y = (1/8)x + b Step 5: 9 = (1/8)3 + b 9 = 3/8 + b b = 9 – 3/8 b = 72/8 – 3/8 b = 69/8 Step 6: y = (1/8)x + 69/8 4. write an equation of the line containing the given point and PERPENDICULAR to the given line. (6, -7); 9x + 2y = 7 Same procedure as #3 Step 1: 9x + 2y = 7 2y = -9x + 7 y = (-9/2)x + 7/2 Step 2: m = -9/2 Step 3: slope of new line = -1/m = -1/(-9/2) = 2/9 Step 4: y = (2/9)x + b Step 5: -7 = (2/9)(6) + b -7 = 12/9 + b b = -7 – 12/9 b = -63/9 – 12/9 b = -75/9 Step 6: y = (2/9)x – 75/9
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