Quiz: Right Triangle Side and Angle Calculator
Check your right triangle skills. Solve the problem, enter your answer, and get instant feedback with a full worked solution.
📐 What is a Right Triangle Side and Angle Quiz?
A right triangle quiz is a structured practice tool that presents randomised right triangle problems and gives you instant feedback on your answer. Instead of passively reading formulas, you actively solve problems, which accelerates learning and builds the automatic recall needed in exams, standardised tests, and engineering courses.
Right triangles appear in an enormous range of real-world contexts. Architects use them when calculating roof pitch. Surveyors use them when measuring horizontal distances from slope measurements. Pilots and navigators use them to resolve velocity vectors. Electricians use them when calculating the length of conduit runs in three dimensions. Carpenters use the 3-4-5 rule to check whether corners are square. Every profession that works with spatial relationships relies on these same two formulas: the Pythagorean theorem for sides, and inverse trigonometric functions for angles.
The quiz covers two core skills: finding a missing side (using the Pythagorean theorem c = sqrt(a squared plus b squared), or b = sqrt(c squared minus a squared)) and finding a missing angle (using arctan for two known legs, or arcsin/arccos when the hypotenuse is known). These skills are the foundation of all further trigonometry, from the unit circle to the law of sines and cosines in oblique triangles.
The built-in random problem generator produces an unlimited variety of right triangles with different side lengths and angle magnitudes, preventing the rote memorisation of a fixed problem set. After each attempt the full worked solution is displayed, so whether you answered correctly or not, you can follow every step of the arithmetic and build genuine understanding rather than just answer-checking.
📐 Formulas Used
📖 How to Use This Quiz
Steps to practise right triangle problems
💡 Example Problems
Example 1 — Classic 3-4-5 Triple (Find Hypotenuse)
Leg a = 3 units, Leg b = 4 units. Find the hypotenuse.
Example 2 — Find Missing Leg (5-12-13 Triple)
Leg a = 5 units, Hypotenuse c = 13 units. Find leg b.
Example 3 — Find an Angle (arctan)
Leg a (opposite) = 5 units, Leg b (adjacent) = 5 units. Find angle A.
Example 4 — Find an Angle (arcsin)
Leg a (opposite) = 10 units, Hypotenuse c = 20 units. Find angle A.
❓ Frequently Asked Questions
🔗 Related Calculators
How do I find the hypotenuse of a right triangle?
Use the Pythagorean theorem: c = sqrt(a squared plus b squared), where a and b are the two legs and c is the hypotenuse. For example, if a = 6 and b = 8, then c = sqrt(36 + 64) = sqrt(100) = 10. The hypotenuse is always opposite the 90-degree angle and is always the longest side.
How do I find a missing leg of a right triangle?
Rearrange the Pythagorean theorem. If the hypotenuse is c and one leg is a, the missing leg is b = sqrt(c squared minus a squared). For example, c = 13, a = 5, so b = sqrt(169 - 25) = sqrt(144) = 12. Always check that the leg is shorter than the hypotenuse before computing.
How do I find a missing angle in a right triangle?
If you know two sides, use the inverse trig functions. To find angle A: arctan(opposite leg / adjacent leg), arcsin(opposite leg / hypotenuse), or arccos(adjacent leg / hypotenuse). All three give the same angle. For example, with legs 3 and 4, angle A opposite the leg of 3 = arctan(3/4) = 36.87 degrees.
What are the three sides of a right triangle called?
The two shorter sides that form the right angle are called legs (also called the base and perpendicular, or side a and side b). The longest side opposite the right angle is called the hypotenuse (side c). The Pythagorean theorem relates them: a squared plus b squared equals c squared.
What is the Pythagorean theorem?
The Pythagorean theorem states that in any right triangle, the square of the hypotenuse equals the sum of the squares of the other two sides: a squared plus b squared equals c squared. It was known to Babylonian mathematicians and systematically proven by Euclid. It applies only to right triangles (those with a 90-degree angle).
What is a Pythagorean triple?
A Pythagorean triple is a set of three positive integers (a, b, c) that satisfy a squared plus b squared equals c squared. Common triples are 3-4-5, 5-12-13, 8-15-17, 7-24-25, and 9-40-41. Any multiple of a triple also works: 6-8-10, 9-12-15, and so on. Recognising triples lets you find sides and angles quickly without a calculator.
How many decimal places should I use for my answer?
For side lengths, give your answer to 2 decimal places. For angles in degrees, also give 2 decimal places. The quiz checker accepts answers within a tolerance of plus or minus 0.05 for sides and plus or minus 0.5 degrees for angles, so minor rounding differences do not count as wrong.
What is the difference between arcsin, arccos, and arctan?
All three are inverse trigonometric functions that convert a ratio back into an angle. arcsin(x) gives the angle whose sine is x (range -90 to 90 degrees). arccos(x) gives the angle whose cosine is x (range 0 to 180 degrees). arctan(x) gives the angle whose tangent is x (range -90 to 90 degrees). In a right triangle where all angles are between 0 and 90 degrees, all three give equivalent results when applied to the correct ratio.
How do I know which trig function to use?
Label the three sides relative to the angle you want to find: the side opposite the angle, the side adjacent to the angle, and the hypotenuse. Then: sin(A) = opposite / hypotenuse, cos(A) = adjacent / hypotenuse, tan(A) = opposite / adjacent. A helpful mnemonic is SOH-CAH-TOA. To find the angle, take the inverse (arcsin, arccos, or arctan) of the ratio you can compute.
Can this quiz help with 30-60-90 and 45-45-90 special triangles?
Yes. Special right triangles are common in the random problems. In a 30-60-90 triangle the sides are in ratio 1 : sqrt(3) : 2. In a 45-45-90 triangle the sides are in ratio 1 : 1 : sqrt(2). Knowing these ratios lets you answer certain problems instantly. The quiz will show the full solution step after you check your answer.
What does the quiz tolerance mean?
The quiz accepts your answer if it differs from the correct answer by no more than 0.05 for side lengths or 0.5 degrees for angles. This accounts for rounding. For example, if the correct hypotenuse is 7.07 (which is 5 times sqrt(2)), entering 7.07 or 7.08 or 7.06 are all accepted. Entering 7.10 would be outside tolerance.