Congruent number

In number theory, a congruent number is a positive integer that is the area of a right triangle with three rational number sides. A more general definition includes all positive rational numbers with this property.

The sequence of (integer) congruent numbers starts with

5, 6, 7, 13, 14, 15, 20, 21, 22, 23, 24, 28, 29, 30, 31, 34, 37, 38, 39, 41, 45, 46, 47, 52, 53, 54, 55, 56, 60, 61, 62, 63, 65, 69, 70, 71, 77, 78, 79, 80, 84, 85, 86, 87, 88, 92, 93, 94, 95, 96, 101, 102, 103, 109, 110, 111, 112, 116, 117, 118, 119, 120, ... (sequence A003273 in the OEIS)

Congruent number table:

n

≤ 120

Congruent number table: $n$ ≤ 120
—: non-Congruent number
C: square-free Congruent number
S: Congruent number with square factor
$n$	1	2	3	4	5	6	7	8
	—	—	—	—	C	C	C	—
$n$	9	10	11	12	13	14	15	16
	—	—	—	—	C	C	C	—
$n$	17	18	19	20	21	22	23	24
	—	—	—	S	C	C	C	S
$n$	25	26	27	28	29	30	31	32
	—	—	—	S	C	C	C	—
$n$	33	34	35	36	37	38	39	40
	—	C	—	—	C	C	C	—
$n$	41	42	43	44	45	46	47	48
	C	—	—	—	S	C	C	—
$n$	49	50	51	52	53	54	55	56
	—	—	—	S	C	S	C	S
$n$	57	58	59	60	61	62	63	64
	—	—	—	S	C	C	S	—
$n$	65	66	67	68	69	70	71	72
	C	—	—	—	C	C	C	—
$n$	73	74	75	76	77	78	79	80
	—	—	—	—	C	C	C	S
$n$	81	82	83	84	85	86	87	88
	—	—	—	S	C	C	C	S
$n$	89	90	91	92	93	94	95	96
	—	—	—	S	C	C	C	S
$n$	97	98	99	100	101	102	103	104
	—	—	—	—	C	C	C	—
$n$	105	106	107	108	109	110	111	112
	—	—	—	—	C	C	C	S
$n$	113	114	115	116	117	118	119	120
	—	—	—	S	S	C	C	S

For example, 5 is a congruent number because it is the area of a (20/3, 3/2, 41/6) triangle. Similarly, 6 is a congruent number because it is the area of a (3,4,5) triangle. 3 and 4 are not congruent numbers.

If $q$ is a congruent number then $s 2 q$ is also a congruent number for any natural number $s$ (just by multiplying each side of the triangle by $s$ ), and vice versa. This leads to the observation that whether a nonzero rational number $q$ is a congruent number depends only on its residue in the group

\mathbb {Q} ^{*}/\mathbb {Q} ^{*2}

,

where $\mathbb {Q} ^{*}$ is the set of nonzero rational numbers.

Every residue class in this group contains exactly one square-free integer, and it is common, therefore, only to consider square-free positive integers, when speaking about congruent numbers.

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