Test if two triangles are similar using AA, SAS, or SSS similarity criteria. Verify corresponding side ratios, find scale factors, and identify matching angles and sides.
Triangle similarity is a foundational concept in geometry that determines whether two triangles have the same shape, regardless of their size. Two triangles are similar when their corresponding angles are equal and their corresponding sides are in proportion.
There are three primary criteria for testing triangle similarity. **Angle-Angle (AA)** requires that two pairs of corresponding angles be equal — since the angles in any triangle sum to 180°, matching two automatically matches the third. **Side-Angle-Side (SAS)** requires two pairs of corresponding sides to be proportional with the included angle equal. **Side-Side-Side (SSS)** requires all three pairs of corresponding sides to be proportional, sharing a common scale factor.
This calculator lets you input the sides and angles of two triangles and automatically checks all three similarity criteria. It calculates the scale factor between corresponding sides, verifies proportionality, and identifies which parts correspond to each other. The tool also shows how similarity can be used to find unknown measurements when one triangle's dimensions are known along with the ratio to another. Whether you're solving homework problems, preparing for a geometry exam, or working through proofs, this calculator provides instant verification and step-by-step reasoning for triangle similarity tests.
Triangle similarity problems often fail because the wrong sides are matched or because AA, SAS, and SSS conditions are mixed together. This calculator checks the chosen criterion directly, sorts comparable sides when needed, and shows the resulting scale factor and corresponding angles. It is especially useful for homework checks, proof prep, and any coordinate or measurement problem where you need to confirm whether two triangles really represent the same shape at different sizes.
SSS Similarity: a₁/a₂ = b₁/b₂ = c₁/c₂ (all ratios equal). AA Similarity: ∠A₁ = ∠A₂ and ∠B₁ = ∠B₂ (two angle pairs equal). SAS Similarity: a₁/a₂ = b₁/b₂ and ∠C₁ = ∠C₂ (two sides proportional with included angle equal). Scale Factor k = side₁ / side₂.
Result: Triangles are similar with scale factor 0.5 from Triangle 1 to Triangle 2.
Triangle 1 has sides 3, 4, 5. Triangle 2 has sides 6, 8, 10. Ratios: 3/6 = 0.5, 4/8 = 0.5, 5/10 = 0.5. All ratios are equal → SSS Similar with scale factor k = 0.5 (or 2 from T2 to T1).
The hardest part of many similarity questions is not the arithmetic but the matching. If side $a_1$ corresponds to $a_2$, then the same ordering must carry through every other comparison. This calculator helps by sorting side sets for SSS checks and by showing angle comparisons alongside ratio checks, so you can see whether the same scale factor really applies across the whole figure.
AA is the fastest route when angle information is available, because two equal angle pairs automatically force the third angle to match. SAS is more restrictive: the equal angle must be the included angle between the two proportional sides. SSS is strongest when all three side lengths are known. Seeing all three tests side by side makes it easier to choose the right theorem for a proof or a missing-measurement problem.
Once triangles are confirmed similar, proportional reasoning becomes much easier. A scale factor lets you move from a model drawing to a full-size structure, from a shadow measurement to a building height, or from a reduced map to real distance. The output here is useful not just for saying yes or no to similarity, but for spotting the multiplier you need for the next step of the problem.
Similar triangles have the same shape (equal angles, proportional sides) but can differ in size. Congruent triangles are both the same shape and the same size — a special case of similarity where the scale factor is 1.
Because the three interior angles of any triangle always sum to 180°, knowing two angles determines the third. If two pairs of angles match, the third pair must also match.
The scale factor is the constant ratio between corresponding side lengths of two similar triangles. If triangle A has sides 3, 4, 5 and triangle B has sides 6, 8, 10, the scale factor from A to B is 2.
Yes, every triangle is similar to itself with a scale factor of 1. This is the reflexive property of similarity.
SAS congruence requires two sides to be equal with the included angle equal. SAS similarity only requires the two sides to be proportional (same ratio) with the included angle equal.
Yes, you must compare corresponding sides. Sort both sets of sides in ascending (or descending) order first, then check that the ratios of the first pair, second pair, and third pair are all equal.