What is the slope of the line through (-6, 3) and (4, -6)?
- A. -1.1111
- B. 0.9
- C. -0.9
- D. -9
Show worked solution
Use the slope formula m = (y₂ − y₁)/(x₂ − x₁).
Plug in: m = (-6 − 3) / (4 − -6) = -9/10.
Simplify: m = -0.9.
Answer: C · -0.9
Use equal slopes for parallel lines and opposite-reciprocal slopes for perpendicular lines.
ACT Math Coordinate Geometry 6 worked questions
Parallel and Perpendicular Lines is one of the foundational skills tested in the Coordinate Geometry section of ACT Math. Use equal slopes for parallel lines and opposite-reciprocal slopes for perpendicular lines. This page walks you through the core idea, common variations you can expect to see on test day, and pitfalls that drop the average student a band.
On ACT Math, questions in Coordinate Geometry tend to reward students who can move quickly between symbolic and verbal forms of the same idea. Examiners often disguise Parallel and Perpendicular Lines inside word problems, multi-step algebra, or geometry diagrams, so practising it in isolation here will pay off when it appears as a sub-step inside a harder problem.
Start every Parallel and Perpendicular Lines problem by identifying what the question is actually asking for. Re-state it in your own words before you write a single equation. Then translate the situation into the cleanest mathematical form available — usually one equation, one inequality, or one diagram. Solve, then sanity-check by substituting your answer back into the original setup. The College Board and ACT both reward students who avoid careless slips far more than they reward speed.
If the problem feels long, don't panic. Almost every Coordinate Geometry question can be reduced to a one- or two-step manipulation once you see the structure. The fastest students aren't the ones who compute fastest; they're the ones who recognise the structure fastest.
For ACT Math, allow yourself roughly 1 minute 15 seconds per question on average. If a Parallel and Perpendicular Lines question is taking longer than two minutes, mark it, take your best guess, and come back. There is no penalty for guessing on either test, so never leave a bubble blank.
Students who score in the top 10% on Coordinate Geometry almost always do the same three things: they write neat work in the booklet, they read every answer choice before selecting one, and they verify with a quick estimate. Build those habits in the practice questions below.
The six practice problems on this page mirror the difficulty mix you can expect from a real ACT Math section: two easier warm-ups, two medium calibration questions, and two harder problems that combine Parallel and Perpendicular Lines with another idea from Coordinate Geometry. Work each one with paper and pen before opening the worked solution.
Six questions calibrated to the difficulty mix of the real test — two easy, two medium, two hard. Each comes with a fully worked step-by-step solution.
What is the slope of the line through (-6, 3) and (4, -6)?
Use the slope formula m = (y₂ − y₁)/(x₂ − x₁).
Plug in: m = (-6 − 3) / (4 − -6) = -9/10.
Simplify: m = -0.9.
Answer: C · -0.9
What value of x satisfies the system 2x + 5y = 25 and 2x − 2y = 4 ?
Multiply the equations to align the y coefficients (or use substitution).
Adding eliminates y; solve the resulting one-variable equation.
You obtain x = 5. Substituting back gives y = 3.
Answer: C · 5
What is the area of a circle with radius 12?
A = πr² with r = 12.
A = π · = 144π.
Answer: A · 144π
A right triangle has legs of length 18 and 24. What is the length of the hypotenuse?
Apply a² + b² = c²: + = 900.
c = √900 = 30.
Answer: C · 30
If f(x) = 4x² − 2x + 4, what is f(1)?
Substitute x = 1 into the rule.
f(1) = 4·(1)² + (-2)·(1) + (4) = 4 + -2 + 4 = 6.
Answer: C · 6
Solve for x: 9x − 11 = 61.
Subtract 11 from both sides: 9x = 72.
Divide both sides by 9: x = 8.
Verify: 9·8 − 11 = 61 = 61. ✓
Answer: B · 8
Topics like Parallel and Perpendicular Lines appear on most recent ACT Math sittings, sometimes as a standalone question and sometimes as a sub-step inside a longer problem. Browse the past paper index to see where it has appeared recently and re-attempt the question with the worked solution open.
For the formulas you'll need on test day, see our Coordinate Geometry formula sheet. To plan a study path that targets your current score, jump to the score-band guides.