x - Greater Nanticoke Area School District
... Standard 2.9: Geometry CS 2.9.11A. Construct geometric figures using geometry tools. 167. Identify and name sets of points including line, plane, segment, ray 168. Draw representations of points, lines, segments, rays and planes, 169. Use straight edge, protractor and compass to construct geometric ...
... Standard 2.9: Geometry CS 2.9.11A. Construct geometric figures using geometry tools. 167. Identify and name sets of points including line, plane, segment, ray 168. Draw representations of points, lines, segments, rays and planes, 169. Use straight edge, protractor and compass to construct geometric ...
Triangles
... • The student will be able to prove and apply that the sum of the interior angles of a triangle is 180°. • The student will be able to prove and apply that the base angles of an isosceles triangle are congruent. • The student will be able to prove and apply the midsegment (midline) of triangle theor ...
... • The student will be able to prove and apply that the sum of the interior angles of a triangle is 180°. • The student will be able to prove and apply that the base angles of an isosceles triangle are congruent. • The student will be able to prove and apply the midsegment (midline) of triangle theor ...
2.4-2.5 Deductive Reasoning and Postulates PPT
... Is the conclusion a result of inductive or deductive reasoning? There is a myth that you can balance an egg on its end only on the spring equinox. A person was able to balance an egg on July 8, September 21, and December 19. Therefore this myth is false. Since the conclusion is based on a pattern of ...
... Is the conclusion a result of inductive or deductive reasoning? There is a myth that you can balance an egg on its end only on the spring equinox. A person was able to balance an egg on July 8, September 21, and December 19. Therefore this myth is false. Since the conclusion is based on a pattern of ...
Euler angles
The Euler angles are three angles introduced by Leonhard Euler to describe the orientation of a rigid body. To describe such an orientation in 3-dimensional Euclidean space three parameters are required. They can be given in several ways, Euler angles being one of them; see charts on SO(3) for others. Euler angles are also used to describe the orientation of a frame of reference (typically, a coordinate system or basis) relative to another. They are typically denoted as α, β, γ, or φ, θ, ψ.Euler angles represent a sequence of three elemental rotations, i.e. rotations about the axes of a coordinate system. For instance, a first rotation about z by an angle α, a second rotation about x by an angle β, and a last rotation again about z, by an angle γ. These rotations start from a known standard orientation. In physics, this standard initial orientation is typically represented by a motionless (fixed, global, or world) coordinate system; in linear algebra, by a standard basis.Any orientation can be achieved by composing three elemental rotations. The elemental rotations can either occur about the axes of the fixed coordinate system (extrinsic rotations) or about the axes of a rotating coordinate system, which is initially aligned with the fixed one, and modifies its orientation after each elemental rotation (intrinsic rotations). The rotating coordinate system may be imagined to be rigidly attached to a rigid body. In this case, it is sometimes called a local coordinate system. Without considering the possibility of using two different conventions for the definition of the rotation axes (intrinsic or extrinsic), there exist twelve possible sequences of rotation axes, divided in two groups: Proper Euler angles (z-x-z, x-y-x, y-z-y, z-y-z, x-z-x, y-x-y) Tait–Bryan angles (x-y-z, y-z-x, z-x-y, x-z-y, z-y-x, y-x-z). Tait–Bryan angles are also called Cardan angles; nautical angles; heading, elevation, and bank; or yaw, pitch, and roll. Sometimes, both kinds of sequences are called ""Euler angles"". In that case, the sequences of the first group are called proper or classic Euler angles.