Introduction to Coordinate Geometry

Coordinate geometry (also called analytic geometry) was developed by Rene Descartes (1596-1650). It establishes a relationship between algebra and geometry using coordinate axes.

Slope of a Line

The slope (or gradient) of a line is a measure of its steepness and direction.

If a line passes through points P(x_1, y_1) and Q(x_2, y_2): m = (y_2 - y_1)/(x_2 - x_1), where x_1 != x_2

Types of Slope

  • Positive slope: line rises from left to right (m > 0)
  • Negative slope: line falls from left to right (m < 0)
  • Zero slope: horizontal line (m = 0)
  • Undefined slope: vertical line (denominator zero)

Slope Intercept Form

If theta is the angle a line makes with positive x-axis, m = tan theta.

Angle Between Two Lines

If m_1 and m_2 are slopes of two lines, the acute angle theta between them: tan theta = |(m_2 - m_1)/(1 + m_1 m_2)|

Parallel Lines

Lines are parallel if m_1 = m_2.

Perpendicular Lines

Lines are perpendicular if m_1 * m_2 = -1 (product of slopes is -1).

Various Forms of Equations

Point-Slope Form

Line through (x_1, y_1) with slope m: y - y_1 = m(x - x_1)

Two-Point Form

Line through (x_1, y_1) and (x_2, y_2): (y - y_1)/(y_2 - y_1) = (x - x_1)/(x_2 - x_1) or y - y_1 = ((y_2 - y_1)/(x_2 - x_1))(x - x_1)

Slope-Intercept Form

Line with slope m and y-intercept c: y = mx + c

Intercept Form

Line with x-intercept a and y-intercept b: x/a + y/b = 1

Normal Form

If p is perpendicular distance from origin and omega is angle of the perpendicular: x cos omega + y sin omega = p

General Form

Ax + By + C = 0, where A, B are not both zero.

Distance of a Point from a Line

Distance from point (x_1, y_1) to line Ax + By + C = 0: d = |Ax_1 + By_1 + C|/sqrt(A^2 + B^2)

Distance Between Parallel Lines

For lines Ax + By + C_1 = 0 and Ax + By + C_2 = 0: d = |C_1 - C_2|/sqrt(A^2 + B^2)

Concurrent Lines

Three lines are concurrent if they pass through a common point.

Condition for concurrency: The intersection point of any two lines must satisfy the third equation.

Alternatively, the determinant condition: |A_1 B_1 C_1| |A_2 B_2 C_2| = 0 |A_3 B_3 C_3|

Worked Examples

Example 1: Find the slope of the line passing through (2, 3) and (5, 7). Solution: m = (7-3)/(5-2) = 4/3.

Example 2: Find the equation of the line with slope 2 passing through (3, -1) in point-slope form. Solution: y - (-1) = 2(x - 3) => y + 1 = 2x - 6 => y = 2x - 7.

Example 3: Find the equation of a line passing through (2, 3) and (4, 7). Solution: m = (7-3)/(4-2) = 2. Using point-slope: y - 3 = 2(x - 2) => y = 2x - 1.

Example 4: Find the distance of point P(3, 4) from the line 3x + 4y - 10 = 0. Solution: d = |3(3) + 4(4) - 10|/sqrt(9+16) = |9+16-10|/5 = 15/5 = 3 units.

Example 5: Find the lines parallel and perpendicular to y = 2x + 3 passing through (1, 2). Solution: Parallel (same slope m=2): y - 2 = 2(x-1) => y = 2x. Perpendicular (slope m = -1/2): y - 2 = (-1/2)(x-1) => 2y - 4 = -x + 1 => x + 2y = 5.

Common Mistakes

  1. Slope of vertical line: It is undefined, not 0.
  2. Perpendicular condition: m_1 * m_2 = -1, not m_1 = -m_2.
  3. Intercept form sign: x/a + y/b = 1. Intercepts are signed quantities.
  4. Distance formula absolute value: Distance is always positive, use modulus.

Transformation Between Forms

  • General to slope-intercept: y = (-A/B)x + (-C/B), so m = -A/B, c = -C/B.
  • General to intercept: x/(-C/A) + y/(-C/B) = 1, so a = -C/A, b = -C/B.

ISC Exam Focus

  • Theory (70%): Slope, angle between lines, distance formula derivations, standard forms.
  • Application (30%): Equation finding, concurrency problems, distance calculations.
  • Typical ISC questions: "Find the equation of line passing through ... and perpendicular to ...".
  • 4-6 mark questions often combine multiple concepts.

Self-Test Questions

Q1: Find the slope of the line making an angle of 60 degrees with the positive x-axis. Answer: m = tan 60 = sqrt(3).

Q2: Find the equation of a line with x-intercept 4 and y-intercept 5. Answer: x/4 + y/5 = 1 => 5x + 4y = 20.

Q3: Find the angle between lines y = 3x + 2 and y = -x + 5. Answer: m_1 = 3, m_2 = -1. tan theta = |(-1-3)/(1+3(-1))| = |(-4)/(-2)| = 2. theta = tan^(-1)(2).

Q4: Show that lines 2x + 3y - 5 = 0, 4x + 6y + 7 = 0 are parallel. Answer: m_1 = -2/3, m_2 = -4/6 = -2/3. Since m_1 = m_2, lines are parallel. Distance = |(-5) - (7/2)|/sqrt(4+9) = |-17/2|/sqrt(13) = 17/(2sqrt(13)).

Q5: Find the foot of perpendicular from (1, 2) to line 2x + y = 5. Answer: Let foot be (h, k). Then (h-1)/2 = (k-2)/1 = -(2(1)+2-5)/(4+1) = -(-1)/5 = 1/5. So h = 1 + 2/5 = 7/5, k = 2 + 1/5 = 11/5. Foot = (7/5, 11/5).

Q6: Find k if lines 2x + 3y + 4 = 0, 3x + 4y - 5 = 0, and 4x + 5y + k = 0 are concurrent. Answer: Intersection of first two: solving gives x = -31, y = 22. Substituting in third: 4(-31) + 5(22) + k = 0 => -124 + 110 + k = 0 => k = 14.

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