Lexic.us

Definition of Angled

1. Adjective. Forming or set at an angle. "Angled parking"

Definition of Angled

1. a. Having an angle or angles; -- used in compounds; as, right-angled, many-angled, etc.

Definition of Angled

1. Verb. (past of angle) ¹

¹ Source: wiktionary.com

Definition of Angled

1. angle [v] - See also: angle

Lexicographical Neighbors of Angled

Literary usage of Angled

Below you will find example usage of this term as found in modern and/or classical literature:

1. A Sketch of the Botany of South-Carolina and Georgia by Stephen Elliott (1821)
"E. Stem slender, acutely 3 angled ; leaves 3 angled ; umbels compound; ... Seed 3 angled. Flowers through the whole summer. Nut-grass. ..."

2. Spherical Trigonometry, for the Use of Colleges and Schools: With Numerous by Isaac Todhunter (1863)
"SOLUTION OF OBLIQUE-angled TRIANGLES. 78. The solution of oblique-angled triangles may be made in. some cases to depend immediately upon the solution of ..."

3. The American Arithmetic: Adapted to the Currency of the United States. To by Oliver Welch (1826)
"To measure the surface of a right angled triangle. , DEFINITION.—A right angled triangle is formed by a right line falling perpendicularly on another line, ..."

4. Spherical Trigonometry, for the Use of Colleges and Schools by Isaac Todhunter (1871)
"The solution of oblique-angled triangles may be made in some cases to depend immediately on the solution of right-angled triangles ; we will indicate these ..."

5. Hermathena by Trinity College (Dublin, Ireland) (1888)
"by name the section of an acute-angled cone, which might also be that of the right-angled and obtuse-angled cone ; and, again, the section of the ..."

6. The University Arithmetic: Embracing the Science of Numbers, and Their by Charles Davies (1852)
"RIGHT angled TRIANGLE. 349. The properties of the right angled are so important ... In every right angled triangle, the square described on the hypothenuse, ..."

7. A Course of Mathematics: Composed for the Use of the Royal Military Academy by Charles Hutton, Olinthus Gregory (1843)
"LET ABC be a spherical triangle right-angled at C, and BC be the base : then ... Now in the right-angled plane triangle APQ, of which Q is the right angle, ..."

Other Resources: