Intercepts of y = mx + c

\( y\text{-intercept}:(0,c),\quad x\text{-intercept}:(-\tfrac{c}{m},0)\ (m\ne0) \)
Coordinate Geometry GCSE
Question 10 of 20
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\( \text{Equation }y=4x\text{ passes through which intercepts?} \)

Hint (H)
\( Set x=0 and y=0. \)

Explanation

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Statement

For a straight-line equation in the form \(y = mx + c\), the line crosses the axes at two important points called intercepts:

\[ \text{y-intercept: } (0,c), \quad \text{x-intercept: } \left(-\tfrac{c}{m}, 0\right) \quad (m \neq 0) \]

Why it’s true

  • The y-intercept occurs when \(x=0\). Substituting into \(y=mx+c\) gives \(y=c\), so the point is \((0,c)\).
  • The x-intercept occurs when \(y=0\). Solving \(0=mx+c\) gives \(x=-c/m\), so the point is \((-c/m,0)\).

Recipe (how to use it)

  1. To find the y-intercept, set \(x=0\) in the equation and solve for \(y\).
  2. To find the x-intercept, set \(y=0\) in the equation and solve for \(x\).
  3. Plot these two points on the axes. They provide a quick way to sketch the line.

Spotting it

Whenever a line is written in the form \(y=mx+c\), the constant \(c\) gives the y-intercept immediately. The x-intercept requires solving a simple equation.

Common pairings

  • Finding the equation of a line given intercepts.
  • Checking parallel and perpendicular lines using gradient and intercept form.
  • Intersection problems in simultaneous equations.

Mini examples

  1. Equation: \(y=2x+3\). Intercepts: y-intercept \((0,3)\), x-intercept \((-3/2,0)\).
  2. Equation: \(y=-x+4\). Intercepts: y-intercept \((0,4)\), x-intercept \((4,0)\).

Pitfalls

  • Forgetting the negative: The x-intercept is \(-c/m\), not \(c/m\).
  • Zero gradient case: If \(m=0\), the line is horizontal. It has no x-intercept unless \(c=0\).
  • Dividing incorrectly: Always divide by \(m\), ensuring it’s non-zero.

Exam strategy

  • Use intercepts to sketch a line quickly.
  • Check intercepts to confirm solutions to simultaneous equations graphically.
  • Remember: the intercepts are reliable anchor points for straight-line graphs.

Summary

The intercepts of \(y=mx+c\) give quick access to the points where the line meets the axes. The y-intercept is \((0,c)\), and the x-intercept is \((-c/m,0)\) provided \(m\neq0\). These intercepts are essential for sketching and solving problems involving straight lines.

Worked examples

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  1. \( Find the intercepts of y=2x+5. \)
    1. \( y-intercept: set x=0 → y=5. \)
    2. \( x-intercept: set y=0 → 0=2x+5 → x=-5/2. \)
    Answer: y-intercept (0,5), x-intercept (-2.5,0)
  2. \( Find the intercepts of y=-3x+6. \)
    1. y-intercept: (0,6).
    2. \( x-intercept: 0=-3x+6 → x=2. \)
    Answer: y-intercept (0,6), x-intercept (2,0)
  3. \( Find the intercepts of y=x-4. \)
    1. y-intercept: (0,-4).
    2. \( x-intercept: 0=x-4 → x=4. \)
    Answer: y-intercept (0,-4), x-intercept (4,0)
  4. \( Find intercepts of y=5x. \)
    1. y-intercept: (0,0).
    2. x-intercept: (0,0).
    Answer: Both intercepts at origin (0,0)
  5. \( Find the intercepts of y=4x+8. \)
    1. y-intercept: (0,8).
    2. \( x-intercept: 0=4x+8 → x=-2. \)
    Answer: y-intercept (0,8), x-intercept (-2,0)
  6. \( Equation: y=-2x+10. Find intercepts. \)
    1. y-intercept: (0,10).
    2. \( x-intercept: 0=-2x+10 → x=5. \)
    Answer: y-intercept (0,10), x-intercept (5,0)
  7. \( Equation: y=0.5x-3. Find intercepts. \)
    1. y-intercept: (0,-3).
    2. \( x-intercept: 0=0.5x-3 → x=6. \)
    Answer: y-intercept (0,-3), x-intercept (6,0)
  8. \( Equation: y=-4x-12. Find intercepts. \)
    1. y-intercept: (0,-12).
    2. \( x-intercept: 0=-4x-12 → x=-3. \)
    Answer: y-intercept (0,-12), x-intercept (-3,0)
  9. \( Equation: y=7x+21. Find intercepts. \)
    1. y-intercept: (0,21).
    2. \( x-intercept: 0=7x+21 → x=-3. \)
    Answer: y-intercept (0,21), x-intercept (-3,0)
  10. \( Equation: y=-0.25x+2. Find intercepts. \)
    1. y-intercept: (0,2).
    2. \( x-intercept: 0=-0.25x+2 → x=8. \)
    Answer: y-intercept (0,2), x-intercept (8,0)