. Linear Relations .
A linear relations describes a relationship that has a "constant change" - it will produce a perfectly straight line when graphed.
1. The Slope of a Line
2. Parallel and perpendicular lines
3. Slope Intercept Form y = mx + b
4. Slope-point Form (y-y1) = m(x-x1)
5. General Form Ax + By + C = 0
1. The Slope of a Line
2. Parallel and perpendicular lines
3. Slope Intercept Form y = mx + b
4. Slope-point Form (y-y1) = m(x-x1)
5. General Form Ax + By + C = 0
. NOTES for Linear Relations .
m10fp_-_5-1_slope_of_a_line NOTES.pdf | |
File Size: | 32 kb |
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m10fp_-_5-1_slope_NOTES_-_day_2.pdf | |
File Size: | 216 kb |
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m10fp_-_5-2_parallel_and_perpendicular_lines_NOTES.pdf | |
File Size: | 200 kb |
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m10fp_-_5-3_slope-intercept_form_notes__day_1_and_day_2_.pdf | |
File Size: | 173 kb |
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m10fp_-_5-3_graphing_picture_using_slope_and_y-intercept.pdf | |
File Size: | 234 kb |
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m10fp_-_5-4_slope_point_form_notes.pdf | |
File Size: | 1365 kb |
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m10fp_-_5-5_general_form_notes.pdf | |
File Size: | 149 kb |
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Extra Lesson - discussed in class, but formal notes not given
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m10fp_-_linear_relations__slope___eqn__review_-_2019.pdf | |
File Size: | 649 kb |
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