No because it does not comply with Pythagoras; theorem if the lengths were 10, 24 and 26 then it would be.
The hypotenuse of a right triangle with a base of 24 inches and height of 10 inches is: 26 inches.
There are 24 because 26-2 = 24
Using Pythagoras' theorem it is 26 inches in length
26
Yes, they are a simple multiple of the Pythagorean Triple 5-12-13
Yes because they comply with Pythagoras' theorem for a right angle triangle.
Good old Arthur. There is a Pythagorean triple (5-12-13) lurking in this question. Diagonal is 26 cm making x = 7
FalseImproved Answer:-True because it complies with Pythagoras' theoremNew & Improved, 40% Whiter Answer :-False because it does not comply with the Pythagorean Theorem.(10, 24, and 26 do, but 10, 24, and 27 don't.)
3,4,5;9,40,41;6,8,10;5,12,13;30,40,50;90,120,150;10,24,26 I think that is 10 if not 300,400,500 and 20,48,52
For a right angle triangle use Pythagorean rule.Slope side2 = height2 + base2so262 = 102 + base2base2 = 262 - 102 = 676 - 100 = 576base = square root of 576 = 24
10^2 + 24^2 = 26^2 100 + 576 = 676 Verified.
It depends on the number. The multiples of 4 that are under 26 are 4, 8, 12, 16, 20, 24. The multiples of 3 under 26 are 3, 6, 9, 12, 15, 18, 21, 24. The multiples of 10 under 24 are 10, 20.
Art Treasures - 2003 10-26 was released on: USA: 24 September 2005
yes ,the sides of 10 centimeters 24 centimeters and 26 centimeters is a right triangle. IT follows hypotenuse theorem : 26^ 2 =676 24 ^2=576 10^2=100 24 ^2=(576+100)=676 which is equal to 26^ 2.
No because it does not comply with Pythagoras; theorem if the lengths were 10, 24 and 26 then it would be.
5 m. Using Pythagoras: Hypotenuse2 = side2 + other_side2 ⇒ Hypotenuse = √(side2 + other_side2) = √((3 m)2 + (4 m)2) = √(9 m2 + 16 m2) = √(25 m2) = 5 m 3, 4, 5 is a well known Pythagorean triple - the three sides of a right angle triangle (32 + 42 = 9 + 16 = 25 = 52) Another is: 5, 12, 13 (52 + 122 = 25 + 144 = 169 = 132) If you multiply each of these sides by the same number (that is scale the triangle) you get other Pythagorean triples, eg 3, 4, 5 → (x2) 6, 8, 10; (x3) 9, 12, 15; (x4) 12, 16, 20; etc are all Pythagorean triples 5, 12, 13 → (x2) 10, 24, 26; (x3) 15, 26, 39; (x4) 20, 48, 52; etc are also all Pythagorean triples.