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2.3 – Slope 2.3 – Slope Slope 2.3 – Slope Slope – ratio of the difference in the y-coordinates to the difference in the x-coordinates 2.3 – Slope Slope – ratio of the difference in the y-coordinates to the difference in the x-coordinates slope 2.3 – Slope Slope – ratio of the difference in the y-coordinates to the difference in the x-coordinates slope = change in y’s 2.3 – Slope Slope – ratio of the difference in the y-coordinates to the difference in the x-coordinates slope = change in y’s change in x’s 2.3 – Slope Slope – ratio of the difference in the y-coordinates to the difference in the x-coordinates slope = change in y’s = rise change in x’s 2.3 – Slope Slope – ratio of the difference in the y-coordinates to the difference in the x-coordinates slope = change in y’s = rise change in x’s run 2.3 – Slope Slope – ratio of the difference in the y-coordinates to the difference in the x-coordinates slope = change in y’s = rise change in x’s run m = y2 – y 1 2.3 – Slope Slope – ratio of the difference in the y-coordinates to the difference in the x-coordinates slope = change in y’s = rise change in x’s run m = y2 – y 1 x2 - x1 2.3 – Slope Slope – ratio of the difference in the y-coordinates to the difference in the x-coordinates slope = change in y’s = rise change in x’s run m = y2 – y 1 x2 - x1 2.3 – Slope Slope – ratio of the difference in the y-coordinates to the difference in the x-coordinates slope = change in y’s = rise change in x’s run m = y2 – y 1 x2 - x1 2.3 – Slope Slope – ratio of the difference in the y-coordinates to the difference in the x-coordinates slope = change in y’s = rise change in x’s run m = y2 – y 1 x2 - x1 2.3 – Slope Slope – ratio of the difference in the y-coordinates to the difference in the x-coordinates slope = change in y’s = rise change in x’s run m = y2 – y1 x2 - x1 2.3 – Slope Slope – ratio of the difference in the y-coordinates to the difference in the x-coordinates slope = change in y’s = rise change in x’s run m = y2 – y 1 x2 - x1 2.3 – Slope Slope – ratio of the difference in the y-coordinates to the difference in the x-coordinates slope = change in y’s = rise change in x’s run m = y2 – y 1 x2 - x1 2.3 – Slope Slope – ratio of the difference in the y-coordinates to the difference in the x-coordinates slope = change in y’s = rise change in x’s run m = y2 – y 1 x2 - x1 2.3 – Slope Slope – ratio of the difference in the y-coordinates to the difference in the x-coordinates slope = change in y’s = rise change in x’s run m = y2 – y 1 x2 - x1 Example 1 Find the slope of the line passing through (-1,4) and (1,-2) and graph. Example 1 Find the slope of the line passing through (-1,4) and (1,-2) and graph. m = y2 – y1 x2 - x1 Example 1 Find the slope of the line passing through (-1,4) and (1,-2) and graph. m = y2 – y1 x2 - x1 Example 1 Find the slope of the line passing through (-1,4) and (1,-2) and graph. m = y2 – y1 x2 - x1 = -2 Example 1 Find the slope of the line passing through (-1,4) and (1,-2) and graph. m = y2 – y1 x2 - x1 = -2 Example 1 Find the slope of the line passing through (-1,4) and (1,-2) and graph. m = y2 – y1 x2 - x1 = -2 – Example 1 Find the slope of the line passing through (-1,4) and (1,-2) and graph. m = y2 – y1 x2 - x1 = -2 – Example 1 Find the slope of the line passing through (-1,4) and (1,-2) and graph. m = y2 – y1 x2 - x1 = -2 – 4 Example 1 Find the slope of the line passing through (-1,4) and (1,-2) and graph. m = y2 – y1 x2 - x1 = -2 – 4 Example 1 Find the slope of the line passing through (-1,4) and (1,-2) and graph. m = y2 – y1 x2 - x1 = -2 – 4 1 Example 1 Find the slope of the line passing through (-1,4) and (1,-2) and graph. m = y2 – y1 x2 – x1 = -2 – 4 1– Example 1 Find the slope of the line passing through (-1,4) and (1,-2) and graph. m = y2 – y1 x2 - x1 = -2 – 4 1– Example 1 Find the slope of the line passing through (-1,4) and (1,-2) and graph. m = y2 – y1 x2 - x1 = -2 – 4 1 – (-1) Example 1 Find the slope of the line passing through (-1,4) and (1,-2) and graph. m = y2 – y1 x2 - x1 = -2 – 4 1 – (-1) = -6 Example 1 Find the slope of the line passing through (-1,4) and (1,-2) and graph. m = y2 – y1 x2 - x1 = -2 – 4 1 – (-1) = -6 2 Example 1 Find the slope of the line passing through (-1,4) and (1,-2) and graph. m = y2 – y1 x2 - x1 = -2 – 4 1 – (-1) = -6 = -3 2 Example 1 Find the slope of the line passing through (-1,4) and (1,-2) and graph. m = y2 – y1 x2 - x1 = -2 – 4 1 – (-1) = -6 = -3 2 Example 1 Find the slope of the line passing through (-1,4) and (1,-2) and graph. m = y2 – y1 x2 - x1 = -2 – 4 1 – (-1) = -6 = -3 2 Example 1 Find the slope of the line passing through (-1,4) and (1,-2) and graph. m = y2 – y1 x2 - x1 = -2 – 4 1 – (-1) = -6 = -3 2 Example 1 Find the slope of the line passing through (-1,4) and (1,-2) and graph. m = y2 – y1 x2 - x1 = -2 – 4 1 – (-1) = -6 = -3 2 Example 1 Find the slope of the line passing through (-1,4) and (1,-2) and graph. m = y2 – y1 x2 - x1 = -2 – 4 1 – (-1) = -6 = -3 2 1 Example 1 Find the slope of the line passing through (-1,4) and (1,-2) and graph. m = y2 – y1 x2 - x1 = -2 – 4 1 – (-1) = -6 = -3 2 1 3 Example 1 Find the slope of the line passing through (-1,4) and (1,-2) and graph. m = y2 – y1 x2 - x1 = -2 – 4 1 – (-1) = -6 = -3 2 1 3 1 Example 1 Find the slope of the line passing through (-1,4) and (1,-2) and graph. m = y2 – y1 x2 - x1 = -2 – 4 1 – (-1) = -6 = -3 2 1 3 1 3 1 Example 1 Find the slope of the line passing through (-1,4) and (1,-2) and graph. m = y2 – y1 x2 - x1 = -2 – 4 1 – (-1) = -6 = -3 2 1 3 1 3 1 Example 2 Graph the line passing through (-4,-3) with a slope of ⅔. Example 2 Graph the line passing through (-4,-3) with a slope of ⅔. Example 2 Graph the line passing through (-4,-3) with a slope of ⅔. Example 2 Graph the line passing through (-4,-3) with a slope of ⅔. Example 2 Graph the line passing through (-4,-3) with a slope of ⅔. 2 Example 2 Graph the line passing through (-4,-3) with a slope of ⅔. 3 2 Example 2 Graph the line passing through (-4,-3) with a slope of ⅔. 3 2 Example 2 Graph the line passing through (-4,-3) with a slope of ⅔. 3 2 Example 2 Graph the line passing through (-4,-3) with a slope of ⅔. 3 2 3 2 • Parallel Lines • Parallel Lines – have the same slope! • Parallel Lines – have the same slope! • Perpendicular Lines • Parallel Lines – have the same slope! • Perpendicular Lines – the slope is the opposite reciprical • Parallel Lines – have the same slope! slope = m • Perpendicular Lines – the slope is the opposite reciprical • Parallel Lines – have the same slope! slope = m • Perpendicular Lines – the slope is the opposite reciprical. slope = -1 m • Parallel Lines – have the same slope! • Perpendicular Lines – the slope is the opposite reciprical, i.e. -1 m Example 3 Graph the line that passes through (-1,3) that is parallel to the line with equation x + 4y = -4. • Parallel Lines – have the same slope! • Perpendicular Lines – the slope is the opposite reciprical, i.e. -1 m Example 3 Graph the line that passes through (-1,3) that is parallel to the line with equation x + 4y = -4. • Parallel Lines – have the same slope! • Perpendicular Lines – the slope is the opposite reciprical, i.e. -1 m Example 3 Graph the line that passes through (-1,3) that is parallel to the line with equation x + 4y = -4. • Parallel Lines – have the same slope! • Perpendicular Lines – the slope is the opposite reciprical, i.e. -1 m Example 3 Graph the line that passes through (-1,3) that is parallel to the line with equation x + 4y = -4. • Parallel Lines – have the same slope! • Perpendicular Lines – the slope is the opposite reciprical, i.e. -1 m Example 3 Graph the line that passes through (-1,3) that is parallel to the line with equation x + 4y = -4. Slope-Intercept form: y = mx + b, where m = slope, b = y-int. (y= form) • Parallel Lines – have the same slope! • Perpendicular Lines – the slope is the opposite reciprical, i.e. -1 m Example 3 Graph the line that passes through (-1,3) that is parallel to the line with equation x + 4y = -4. Slope-Intercept form: y = mx + b, where m = slope, b = y-int. (y= form) x + 4y = -4 • Parallel Lines – have the same slope! • Perpendicular Lines – the slope is the opposite reciprical, i.e. -1 m Example 3 Graph the line that passes through (-1,3) that is parallel to the line with equation x + 4y = -4. Slope-Intercept form: y = mx + b, where m = slope, b = y-int. (y= form) x + 4y = -4 -x -x 4y = -x – 4 4 4 y = -x – 4 4 4 y = -¼x – 1 • Parallel Lines – have the same slope! • Perpendicular Lines – the slope is the opposite reciprical, i.e. -1 m Example 3 Graph the line that passes through (-1,3) that is parallel to the line with equation x + 4y = -4. Slope-Intercept form: y = mx + b, where m = slope, b = y-int. (y= form) x + 4y = -4 -x -x 4y = -x – 4 4 4 y = -x – 4 4 4 y = -¼x – 1 y = mx + b • Parallel Lines – have the same slope! • Perpendicular Lines – the slope is the opposite reciprical, i.e. -1 m Example 3 Graph the line that passes through (-1,3) that is parallel to the line with equation x + 4y = -4. Slope-Intercept form: y = mx + b, where m = slope, b = y-int. (y= form) x + 4y = -4 -x -x 4y = -x – 4 4 4 y = -x – 4 4 4 y = -¼x – 1 y = mx + b • • Parallel Lines – have the same slope! Perpendicular Lines – the slope is the opposite reciprical, i.e. -1 m Example 3 Graph the line that passes through (-1,3) that is parallel to the line with equation x + 4y = -4. Slope-Intercept form: y = mx + b, where m = slope, b = y-int. (y= form) x + 4y = -4 -x -x 4y = -x – 4 4 4 y = -x – 4 4 4 y = -¼x – 1 y = mx + b m1 = -¼ • • Parallel Lines – have the same slope! Perpendicular Lines – the slope is the opposite reciprical, i.e. -1 m Example 3 Graph the line that passes through (-1,3) that is parallel to the line with equation x + 4y = -4. Slope-Intercept form: y = mx + b, where m = slope, b = y-int. (y= form) x + 4y = -4 -x -x 4y = -x – 4 4 4 y = -x – 4 4 4 y = -¼x – 1 y = mx + b m1 = -¼ m2 = -¼ • • Parallel Lines – have the same slope! Perpendicular Lines – the slope is the opposite reciprical, i.e. -1 m Example 3 Graph the line that passes through (-1,3) that is parallel to the line with equation x + 4y = -4. Slope-Intercept form: y = mx + b, where m = slope, b = y-int. (y= form) x + 4y = -4 -x -x 4y = -x – 4 4 4 y = -x – 4 4 4 y = -¼x – 1 y = mx + b m1 = -¼ m2 = -¼ • • Parallel Lines – have the same slope! Perpendicular Lines – the slope is the opposite reciprical, i.e. -1 m Example 3 Graph the line that passes through (-1,3) that is parallel to the line with equation x + 4y = -4. Slope-Intercept form: y = mx + b, where m = slope, b = y-int. (y= form) x + 4y = -4 -x -x 4y = -x – 4 4 4 1 y = -x – 4 4 4 y = -¼x – 1 y = mx + b m1 = -¼ m2 = -¼ • • Parallel Lines – have the same slope! Perpendicular Lines – the slope is the opposite reciprical, i.e. -1 m Example 3 Graph the line that passes through (-1,3) that is parallel to the line with equation x + 4y = -4. Slope-Intercept form: y = mx + b, where m = slope, b = y-int. (y= form) x + 4y = -4 -x -x 4y = -x – 4 4 4 1 y = -x – 4 4 4 4 y = -¼x – 1 y = mx + b m1 = -¼ m2 = -¼ • • Parallel Lines – have the same slope! Perpendicular Lines – the slope is the opposite reciprical, i.e. -1 m Example 3 Graph the line that passes through (-1,3) that is parallel to the line with equation x + 4y = -4. Slope-Intercept form: y = mx + b, where m = slope, b = y-int. (y= form) x + 4y = -4 -x -x 4y = -x – 4 4 4 1 y = -x – 4 4 4 4 y = -¼x – 1 y = mx + b m1 = -¼ m2 = -¼ • • Parallel Lines – have the same slope! Perpendicular Lines – the slope is the opposite reciprical, i.e. -1 m Example 3 Graph the line that passes through (-1,3) that is parallel to the line with equation x + 4y = -4. Slope-Intercept form: y = mx + b, where m = slope, b = y-int. (y= form) x + 4y = -4 -x -x 4y = -x – 4 4 4 1 y = -x – 4 4 4 4 y = -¼x – 1 y = mx + b m1 = -¼ m2 = -¼ Example 4 Graph the line through (-3,1) that is perpendicular to the line with equation 2x + 5y = -10. Example 4 Graph the line through (-3,1) that is perpendicular to the line with equation 2x + 5y = -10. *Find slope of line, then find opp. reciprical! Example 4 Graph the line through (-3,1) that is perpendicular to the line with equation 2x + 5y = -10. *Find slope of line, then find opp. reciprical! 2x + 5y = -10 Example 4 Graph the line through (-3,1) that is perpendicular to the line with equation 2x + 5y = -10. *Find slope of line, then find opp. reciprical! 2x + 5y = -10 -2x -2x 5y = -2x – 10 5 5 5 y = -2 x – 2 5 Example 4 Graph the line through (-3,1) that is perpendicular to the line with equation 2x + 5y = -10. *Find slope of line, then find opp. reciprical! 2x + 5y = -10 -2x -2x 5y = -2x – 10 5 5 5 y = -2 x – 2 5 m1 = -2/5 Example 4 Graph the line through (-3,1) that is perpendicular to the line with equation 2x + 5y = -10. *Find slope of line, then find opp. reciprical! 2x + 5y = -10 -2x -2x 5y = -2x – 10 5 5 5 y = -2 x – 2 5 m1 = -2/5 m2 = 5/2 Example 4 Graph the line through (-3,1) that is perpendicular to the line with equation 2x + 5y = -10. *Find slope of line, then find opp. reciprical! 2x + 5y = -10 -2x -2x 5y = -2x – 10 5 5 5 y = -2 x – 2 5 m1 = -2/5 m2 = 5/2 Example 4 Graph the line through (-3,1) that is perpendicular to the line with equation 2x + 5y = -10. *Find slope of line, then find opp. reciprical! 2x + 5y = -10 -2x -2x 5y = -2x – 10 5 5 5 y = -2 x – 2 5 m1 = -2/5 m2 = 5/2 Example 4 Graph the line through (-3,1) that is perpendicular to the line with equation 2x + 5y = -10. *Find slope of line, then find opp. reciprical! 2x + 5y = -10 -2x -2x 5y = -2x – 10 5 5 5 y = -2 x – 2 5 m1 = -2/5 m2 = 5/2 Example 4 Graph the line through (-3,1) that is perpendicular to the line with equation 2x + 5y = -10. *Find slope of line, then find opp. reciprical! 2 2x + 5y = -10 -2x -2x 5y = -2x – 10 5 5 5 5 y = -2 x – 2 5 m1 = -2/5 m2 = 5/2 Example 4 Graph the line through (-3,1) that is perpendicular to the line with equation 2x + 5y = -10. *Find slope of line, then find opp. reciprical! 2 2x + 5y = -10 -2x -2x 5y = -2x – 10 5 5 5 5 y = -2 x – 2 5 m1 = -2/5 m2 = 5/2
