For Loop Java - Page 2
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(x-1)²sin²(arctanx) built geometrically
This file contains a geometric diagram with (x-1)²sin²(arctanx) as a square at its centre. This square was built using fundamental geometrical principles related to SOH CAH TOA, CHO SHA CAO and Pythagoras' theorem. This file is suitable for students studying higher level geometry at college or university. It was constructed with care using a pair of compasses and a ruler.
Adult Education, Higher Education
Geometry, Math, Other (Math)
Area of a Parallelogram, Area = Base x Height, Geometric Proof
With these workings it is easy to see why the area of a parallelogram is its base multiplied by its height. You'll also notice why the opposite sides of a parallelogram have angles that are equal. This is an excellent resource for teachers who want to explain the reasoning why A=bh for a parallelogram or just mathematics enthusiasts who enjoy looking at proofs. It may also be useful to mathematics artists who require a deeper understanding of specific formulas, for things such as vectors and com
Not Specific
Geometry, Other (Math)
SOH CAH TOA, CHO SHA CAO Inverse Pythagorean Triangle
This inverse Pythagorean triangle contains the distances: sinθ=cos((π/2)-θ), cosθ=sin((π/2)-θ), tanθ=cot((π/2)-θ), cosecθ=sec((π/2)-θ), secθ=cosec((π/2)-θ), cotθ=tan((π/2)-θ) This file is perfect for geometry classes based on the fundamental principles of SOH CAH TOA and CHO SHA CAO.
Not Specific
Geometry, Math, Other (Math)
BUNDLE of 36 SENSORY PATHS, HOPSCOTCHES, JUMPING WAYS, FLOOR STICKERS
All my Hopscotches in one product. Descriptions are in each product. You can combine them on your own way. Sensory path is an obstacle game that helps to strength the children's sensory pathways, but it is also recognized as a perfect practice for children with Autism spectrum disorder, ADHD, ADD, sensory processing disorder, and other special needs. Every child love to relax itself from sitting in a classroom. Arranging your classroom or hallway with a Sensory Path will help your students to ma
PreK - 4th
Geometry, Graphic Arts, Mental Math
BUNDLE of 26 SENSORY PATHS, HOPSCOTCHES, JUMPING WAYS, FLOOR STICKERS
All my Hopscotches in one product. Descriptions are in each product. You can combine them in your own way. Sensory Path is an obstacle game that helps to strength the children's sensory pathways, but it is also recognized as a perfect practice for children with Autism spectrum disorder, ADHD, ADD, sensory processing disorder, and other special needs. Every child loves to relax itself from sitting in a classroom. Arranging your classroom or hallway with a Sensory Path will help your students to m
PreK - 4th
Geometry, Graphic Arts, Mental Math
Inverse Pythagorean Right Angled Triangles SOH CAH TOA, CHO SHA CAO
This is a sheet of paper with inverse Pythagorean right angled triangles and also the values of SOH CAH TOA and CHO SHA CAO. It can be used to derive the measurements of the sides of inverse Pythagorean right angled triangles in a very quick manner. It's an excellent resource for mathematics / geometry artists or students that want to get to grips with the fundamentals of SOH CAH TOA and CHO SHA CAO. It can also be used as a handout in a classroom for activities related to trigonometry.
Not Specific
Geometry, Other (Math)
(tanθ-cotθ)² built geometrically
This file contains a geometric diagram with (tanθ-cotθ)² as a square at its centre. This square was built using fundamental geometrical principles related to SOH CAH TOA, CHO SHA CAO and Pythagoras' theorem. With this diagram it becomes clear as to why tan²θ-2tanθcotθ+cot²θ=(tanθ-cotθ)². This file is suitable for students studying higher level geometry at college or university. It was constructed with care using a pair of compasses and a ruler.
Adult Education, Higher Education
Geometry, Math, Other (Math)
arctan(1) to arctan(9) trigonometry visual
This is a diagram which contains the angles arctan(1) all the way up to arctan(9). It's a visual designed to demonstrate how simple it is to construct arctan(θ) angles. The reason why it's simple to construct arctan(θ) angles is because all that's required is the adjacent side of a right angled triangle to be equal to 1. It turns out, arctan(θ) angles aren't as ugly as once thought... They are the most easy and natural angles to produce. This document is perfect for teachers that would like to d
Not Specific
Geometry, Other (Math)
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