This is an alphabetical index of articles related to curves used in mathematics. * Acnode * Algebraic curve * Arc * Asymptote * Asymptotic curve * Barbier's theorem * Bézier curve * Bézout's theorem * Birch and Swinnerton-Dyer conjecture * Bitangent * Bitangents of a quartic * Cartesian coordinate system * Caustic * Cesàro equation * Chord (geometry) * Cissoid * Circumference * Closed timelike curve * concavity * Conchoid (mathematics) * Confocal * Contact (mathematics) * Contour line * Crunode * Cubic Hermite curve * Curvature * Curve orientation * Curve fitting * Curve-fitting compaction * Curve of constant width * Curve of pursuit * Curves in differential geometry * Cusp * Cyclogon * De Boor algorithm * Differential geometry of curves * Eccentricity (mathematics) * Elliptic curve cryptography * Envelope (mathematics) * Fenchel's theorem * Genus (mathematics) * Geodesic * Geometric genus * Great-circle distance * Harmonograph * [1] * Hilbert's sixteenth problem * Hyperelliptic curve cryptography * Inflection point * Inscribed square problem * intercept, y-intercept, x-intercept * Intersection number * Intrinsic equation * Isoperimetric inequality * Jordan curve * Jordan curve theorem * Knot * Limit cycle * Linking coefficient * List of circle topics * Loop (knot) * M-curve * [2] * Meander (mathematics) * Mordell conjecture * Natural representation * Opisometer * Orbital elements * Osculating circle * Osculating plane * Osgood curve * Parallel (curve) * Parallel transport * Parametric curve * Bézier curve * Spline (mathematics) * Hermite spline * * B-spline * * NURBS * Perimeter * Pi * Plane curve * Pochhammer contour * Polar coordinate system * Prime geodesic * Projective line * Ray * Regular parametric representation * Reuleaux triangle * [3][4] * Riemann–Hurwitz formula * Riemann–Roch theorem * Riemann surface * Road curve * Sato–Tate conjecture * secant * Singular solution * Sinuosity * Slope * Space curve * Spinode * Square wheel * Subtangent * Tacnode * Tangent * Tangent space * Tangential angle * Torsion of curves * Trajectory * Transcendental curve * W-curve * Whewell equation * World line (Wikipedia).
Circles, Angle Measures, Arcs, Central & Inscribed Angles, Tangents, Secants & Chords - Geometry
This geometry video tutorial goes deeper into circles and angle measures. It covers central angles, inscribed angles, arc measure, tangent chord angles, chord chord angles, secant tangent angles and more. Here is a list of topics: 1. Central Angles & Arc Measure 2. Inscribed Angles &
From playlist Geometry Video Playlist
Determine the values of two angles that lie on a lie with a third angle
👉 Learn how to define and classify different angles based on their characteristics and relationships are given a diagram. The different types of angles that we will discuss will be acute, obtuse, right, adjacent, vertical, supplementary, complementary, and linear pair. The relationships
From playlist Angle Relationships From a Figure
3D Trigonometry Example (1 of 2: Setting up the triangles)
More resources available at www.misterwootube.com
From playlist Trigonometry and Measure of Angles
Types of Angles and Angle Relationships
What are angles? What kinds of angles are there and how do they relate? Vertical angles, supplementary angles, complementary angles, corresponding angles, we cover them all in here! Watch the whole Mathematics playlist: http://bit.ly/ProfDaveMath Classical Physics Tutorials: http://bit.l
From playlist Geometry
Determining if two angles are supplementary
👉 Learn how to define and classify different angles based on their characteristics and relationships are given a diagram. The different types of angles that we will discuss will be acute, obtuse, right, adjacent, vertical, supplementary, complementary, and linear pair. The relationships
From playlist Angle Relationships From a Figure
Integration 11 Lengths of Plane Curves Part 1
Using Integration to determine the length of a curve.
From playlist Integration
Identify the type of angle from a figure acute, right, obtuse, straight ex 1
👉 Learn how to define and classify different angles based on their characteristics and relationships are given a diagram. The different types of angles that we will discuss will be acute, obtuse, right, adjacent, vertical, supplementary, complementary, and linear pair. The relationships
From playlist Angle Relationships
Identifying an acute, straight and obtuse angle- Online Tutor- Free Math Videos
👉 Learn how to define and classify different angles based on their characteristics and relationships are given a diagram. The different types of angles that we will discuss will be acute, obtuse, right, adjacent, vertical, supplementary, complementary, and linear pair. The relationships
From playlist Angle Relationships From a Figure
How the portfolio possibilities curve (PPC) illustrates the benefit of diversification (FRM T1-7)
When correlations are imperfect, diversification benefits are possible. The portfolio possibilities curve illustrates this and it contains two notable points: the minimum variance portfolio (MVP) and the optimal portfolio (with the highest Sharpe ratio). At the end, I summarize four featur
From playlist Risk Foundations (FRM Topic 1)
Why par yields are the best interest rate measure
Par yields are the best interest rate because they summarize the spot rate term structure into a single yield measure. I also show the so-called "coupon effect" which is also an argument in favor of par yields. But I think the better reason is their information content. Yield to maturity (
From playlist FRM applications
Capital market line (CML) versus security market line (SML), FRM T1-8
The CML contains ONLY efficient portfolios (and plots return against volatility; aka, total risk) while the SML plots any portfolio (and plots return against beta; aka, systematic risks) including inefficient portfolios. [here is my xls https://trtl.bz/2Fru70r] 💡 Discuss this video here i
From playlist Risk Foundations (FRM Topic 1)
Fixed Income: Effective duration (FRM T4-34)
Effective duration approximates modified duration. Both express interest rate sensitivity: an effective (or modified) duration of 6.2 years tells us to expect a 0.620% price change if the yield changes by 10 basis points; i.e., 0.10% ∆y * 6.2 years = 0.620% ∆P. Effective duration is given
From playlist Valuation and RIsk Models (FRM Topic 4)
Calculus Sketching a Curve with Stationary Points Ultimate revision guide for Further maths GCSE
Ultimate Guide to Further maths GCSE Calculus - Calculus Sketching a curve with stationary points(level 2 Qualification from AQA) 1. Number - https://www.youtube.com/watch?v=ciR2OfUdO0g&list=PL2De0DVeFj3UQsVP217m4432peZ7Jow6r&index=19 2. Algebra - https://www.youtube.com/watch?v=IFqmY9UfA
From playlist Ultimate Guide to Further Maths GCSE
Laurent Polynumbers and Leibniz's Formula for pi/4 | Algebraic Calculus One | Wild Egg
We can use the Fundamental Theorem of the Algebraic Calculus to give a new and simplified derivation of Leibniz's famous alternating series for "pi/4". To set this up, we take an applied point of view, going beyond the polynumber framework established so far, to more general quotient polyn
From playlist Old Algebraic Calculus Videos
Fixed Income: Hedging the DV01 (FRM T4-33)
The DV01 is dollar change in the position for a one basis point (1 bps) decline in the interest rate (typically, yield). The DV01 is expressed per $100 face amount; for example, $0.035 implies that when rates drop by one basis point, the bond will increase in value by $0.035 per $100 face
From playlist Valuation and RIsk Models (FRM Topic 4)
Inverse transform method (FRM T2-2)
[my XLS is here http://trtl.bz/yt-120217-inverse-transform] The inverse transform method is simply a way to create a random variable that is characterized by a SPECIFICALLY desired distribution (it can be any distribution, parametric or empirical). For example, =NORM.S.INV(RAND()) transfor
From playlist Quantitative Analysis (FRM Topic 2)
Angle Side Relationships in a Triangle - Geometry
This video focuses on the angle side relationships in a triangle. In particular, I show students how to use the idea that the smallest angle is opposite the smallest side. This concept is used to order the sides of the triangle from least to greatest. Your feedback and requests are encour
From playlist Geometry
A brief history of geometry II: The European epoch | Sociology and Pure Mathematics | N J Wildberger
Let's have a quick overview of some of the developments in the European story of geometry -- at least up to the 19th century. We'll discuss Cartesian geometry, Projective geometry, Descriptive geometry, Algebraic geometry and Differential geometry. This is meant for people from outside m
From playlist Sociology and Pure Mathematics
Chapter 5 of the Dimensions series. See http://www.dimensions-math.org for more information. Press the 'CC' button for subtitles.
From playlist Dimensions
I introduce log transformations and show how to make curved exponential data linear so that we can analyze the data with a linear regression line. Part 2 is transforming data that follows a power function. Check out http://www.ProfRobBob.com, there you will find my lessons organized by c
From playlist AP Statistics