Use ‘right-angled triangle’ in a sentence | ‘right-angled triangle’ example sentences
1- The three indicators together form a right-angled triangle .
2- Another approach is to split the triangle into two right-angled triangles .
3- It is easy to see immediately that a right-angled triangle “ABC” has been created.
4- Similarly, the identities for a quadrantal triangle can be derived from those for a right-angled triangle .
5- Certain methods are suited to calculating values in a right-angled triangle ; more complex methods may be required in other situations.
6- This is a border of superposed, right-angled triangles ,” which recalls those of pavement B, Pitney (V.C.H. Som.
7- The book was open at Pythagoras’ discovery about the relative lengths of the sides of a right-angled triangle , and Hobbes was amazed by Euclid’s proof of this complex idea.
8- Ironically, this unnerving discovery followed from applying their very own theorem–Pythagoras’ theorem–to the simplest possible right-angled triangle : half a square, a triangle with its two shorter sides both equal to one.
9- The classic example is Pythagoras’ theorem, which tells us that for all right-angled triangles , the square of the hypotenuse is equal to the sum of the squares of the other two sides: x 2 + y 2 = z 2 .
10- The basis of this calendar of jubilees seems to have been the famous Pythagorean right-angled triangle of sides three, four, and five.
11- By considering the (evidently) congruent right-angled triangles ABF and ABM, we find AF = BM = a . This length AF is subsequently recognized as ‘the mean distance’, which is of great significance in Part III below.
12- The hypotenuse is the side opposite the right angle, in this case side h . The hypotenuse is always the longest side of a right-angled triangle .
13- However,it does not tackle the traverse problem in one go, like the Law of Sines, but rather splits the problem into two right-angled triangles which it proceeds to solve successively.
14- A right-angled triangle with two sides of 12 will have a hypotenuse of approximately 17 (16.97+); similarly if it has two sides of 17 its hypotenuse will be approximately 24 (24.04+).
15- He listed the six distinct cases of a right-angled triangle in spherical trigonometry, and in his “On the Sector Figure”, he stated the law of sines for plane and spherical triangles, discovered the law of tangents for spherical triangles, and provided proofs for both these laws.
16- The square faces of the cube were each made up of four isosceles right-angled triangles and the triangular faces of the tetrahedron, octahedron, and icosahedron were each made up of six right-angled triangles.
17- The square faces of the cube were each made up of four isosceles right-angled triangles and the triangular faces of the tetrahedron, octahedron, and icosahedron were each made up of six right-angled triangles .
18- Another method is known as Deletang’s Method or Deletang’s Triangles , involving confining the lone king in a series of three shrinking isosceles right-angled triangles , with the “right” corner at the 90-degree angle of the triangle.
19- According to the old formula for the right-angled triangle , this means I was no more than 3 metres wide of him,” (Ella, 1995, p. 86).
20- The three right-angled triangles below are simply triangles which have one angle of 90° Can you see which triangle is also isosceles?
21- Stated geometrically, this says that if a right-angled triangle has a base of length “a = mx” and altitude of length “b = m + d”, then the length, “c”, of its hypotenuse is given by “c = m (1+x) – d”.
22- Paxton set the dimensions of this prism by using the length of single pane of glass (49 inches) as the hypotenuse of a right-angled triangle , thereby creating a triangle with a length-to-height ratio of 2.5:1, whose base (adjacent side) was 4 feet long.
23- Using chalk , he drew a right-angled triangle on the floor and, using stones, arranged a square on each side, out of 5 x 5, 4 x 4 and 3 x 3 glass stones.
24- For instance, Pythagoras’ proof that the sides of a right-angled triangle are related by the formula a N2 + b N2 = c N2 shows more than the mere fact that all right-angled triangles do have this property.
25- For instance, Pythagoras’ proof that the sides of a right-angled triangle are related by the formula a N2 + b N2 = c N2 shows more than the mere fact that all right-angled triangles do have this property.
26- The hypotenuse of an isosceles right-angled triangle , the diagonal of a square, ought surely to have produced some great revelation; and he could not get a rational value for it at all.
27- By statistical analysis of his surveys he showed that the megaliths were set out to a common unit of measurement, the megalithic yard of 0.83 m., not in simple circles but in circular arcs centred on right-angled triangles .
28- A square can be dissected into numbers of equal isosceles right-angled triangles given by the following series: 2, 4, 8, 16, … What is the next number in this series? (This question is reminiscent of “IQ” tests school children used to be given, and probably still are.
29- To put it another way, the basic structural unit is an isosceles right-angled triangle made by bisecting a grid square, and all larger puzzle pieces are composed of these unit triangles joined together different ways.
30- You can get thr triangles isosceles triangles, right-angled triangle and
31- 3 An isosceles triangle, which is also a right-angled triangle must have equal angles of… degrees?
32- These are right-angled triangles with integral sides for which the lengths of the non-hypotenuse edges differ by one, such as,
33- “I demand that you provide me the evidence for the validity of the Pythagorean Theorem (that is, in a right-angled triangle , A^2 + B^2 = C^2 where C is the hypotenuse and A & B are the remaining sides).”
34- Therefore, in a right-angled triangle , the two non-right angles total 90° (π/2 radians), so each of these angles must be in the range of (0°,90°) as expressed in interval notation.
35- (Diagramatically, Lull’s “miliaria in mari” is measured by constructing a right-angled triangle by running a cord from the distance sailed on the actual course to the intended course, meeting the latter at a 90° angle).
More Sentences:
Related Words:
triangle trade – iron triangle – warning triangle – equilateral triangle – plane triangle – congruent triangle – right triangle – right-angled triangle – triangle inequality – equiangular triangle – triangle-shaped – velocity triangle – safety triangle – power triangle – triangle up –
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