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Attached pdf of this Article as SPOILER at the top! Happy learning!
Hi All,
I have recently uploaded a video on YouTube to discuss Slope of a Line in Detail:
Following is covered in the video
¤ Proof of Slope of a Line formula ¤ How to find slope of a Generic Line ¤ Sign of Slope of a Line ¤ Slope of Parallel and Perpendicular Lines ¤ Solved Problem : Find slope of a line given two points ¤ Solved Problem : Find slope of a line given equation of a line ¤ Solved Problem : Find value of a variable given the slope of a line ¤ Solved Problem : Find equation of a line parallel to a line and passing through a point ¤ Solved Problem : Find equation of a line perpendicular to a line and passing through a point
Proof of Slope of a Line formula
Let's say we have a line(l) passing through two point A(\(x_1\),\(y_1\)) and B(\(x_2\),\(y_2\)) and having a slope of m. Lets draw perpendicular lines as shown in the below figure to complete △ABC Let ∠BAC = θ
Attachment:
Slope of a Line - 1.jpg [ 16.96 KiB | Viewed 1581 times ]
Slope of a line, m = tan(Angle made by the line with positive X-Axis) = tan(θ) = Opposite Side / Adjacent Side = \(\frac{BC}{AC}\) = \(\frac{y_2 - y_1}{x_2 - x_1}\)
How to find slope of a Generic Line
Let's say we have a generic equation of the line given by ax + by = c => by = -ax + c => y = \(\frac{-a}{b}\)x + \(\frac{c}{b}\)
Comparing above equation with generic equation of a line y = mx + b we get m = \(\frac{-a}{b}\)
=> Slope of the line ax + by = c, is given by m = \(\frac{-a}{b}\) = -Coefficient of x / Coefficient of y
Sign of Slope of a Line
¤ Positive Slope: Line tilted towards right ¤ Negative Slope: Line tilted towards left ¤ Zero Slope: Line parallel to x-axis ¤ Infinite Slope: Line parallel to y-axis
Attachment:
Sign of slope.jpg [ 22.08 KiB | Viewed 1602 times ]
Slope of Parallel and Perpendicular Lines
If two lines are Parallel, then their slopes will be equal.
¤ If we have two parallel lines \(L_1\) and \(L_2\), with below equations ¤ Line L1 : y = \(m_1\)x + \(c_1\) ¤ Line L2 : y = \(m_2\)x + \(c_2\) ¤ then \(m_1\) = \(m_2\)
Attachment:
Parallel Lines.jpg [ 4.93 KiB | Viewed 1570 times ]
If two lines are Perpendicular, then product of their slopes will be equal to -1
¤ If we have two perpendicular lines \(L_1\) and \(L_2\), with below equations ¤ Line L1 : y = \(m_1\)x + \(c_1\) ¤ Line L2 : y = \(m_2\)x + \(c_2\) ¤ then \(m_1\) * \(m_2\) = -1
Attachment:
Perpendicular Lines.jpg [ 3.41 KiB | Viewed 1553 times ]
Solved Problem : Find slope of a line given two points
Q1. Find the slope of the line passing through two points (1,3) and (3,5).
Sol 3: Slope of a line is given by m = \(\frac{y_2 - y_1}{x_2 - x_1}\) = \(\frac{x - 5}{2 - x}\) = 2 (given) => x - 5 = 4 - 2x => 3x = 9 => x = \(\frac{9}{3}\) = 3
Solved Problem : Find equation of a line parallel to a line and passing through a point
Q4. Find the equation of the line which is parallel to the line 2x + 4y = 5 and passes through the point (2,3).
Sol 4: Equation of line 2x + 4y = 5 = \(\frac{-2}{4}\) = \(\frac{-1}{2}\) => Parallel line will have the same slope = \(\frac{-1}{2}\) => Equation of the line is given by y - \(y_1\) = m * (x - \(x_1\)) => y - 3 = \(\frac{-1}{2}\) * (x - 2) => 2y - 6 = -x + 2 => x + 2y = 8 is the equation of the line parallel to 2x + 4y = 5 and passes through the point (2,3)
Solved Problem : Find equation of a line perpendicular to a line and passing through a point
Q5. Find the equation of the line which is perpendicular to the line 2x + 4y = 5 and passes through the point (2,3).
Sol 5: Equation of line 2x + 4y = 5 = \(\frac{-2}{4}\) = \(\frac{-1}{2}\) => Slope of perpendicular line, m will be given by m * \(\frac{-1}{2}\) = -1 => m = 2 => Equation of the line is given by y - \(y_1\) = m * (x - \(x_1\)) => y - 3 = \([fraction]2[/fraction]\) * (x - 2) => y - 3 = 2x - 4 => y = 2x - 1 is the equation of the line perpendicular to 2x + 4y = 5 and passes through the point (2,3)
Watch the following video to learn the Basics of Co-ordinate Geometry
Watch the following video to learn about Equation of a Line