Proof that Sum of Angles in ANY Triangle = 180 degrees https://peakd.com/hive-128780/@mes/angles-in-triangle-equal-180-degrees
$HIVE #math #calculus #science #Geometry #STEM
$HIVE #math #calculus #science #Geometry #STEM
PeakD
Proof that Sum of Angles in ANY Triangle = 180 degrees | PeakD
https://youtu.be/4bI3BXIe2k8 ▶️Watch on 3Speak - Odysee - BitChute - Rumble - YouTube - PDF notes This is a short vide... by mes
Laboratory Project: Taylor Polynomials: Question 5: Proof https://rumble.com/v4lwur0-laboratory-project-taylor-polynomials-question-5-proof.html
$RUM #math #calculus #science #STEM #education
$RUM #math #calculus #science #STEM #education
Rumble
Laboratory Project: Taylor Polynomials: Question 5: Proof
In this video I go over Question 5 of the Laboratory Project: Taylor Polynomials and this time derive the general formula for an n-th degree Taylor Polynomial approximating the function f(x) and cente
Polynomial Remainder Theorem: Elementary Proof https://odysee.com/@mes:8/polynomial-remainder-theorem-elementary:e
$LBC #math #STEM #calculus #science
$LBC #math #STEM #calculus #science
Odysee
Polynomial Remainder Theorem: Elementary Proof
In this video I go over a second proof of the Polynomial Remainder Theorem which I derived in my earlier video but this time look at a what is sometimes referred to as a more “elementary” proof. In my...
Laboratory Project: Taylor Polynomials: Question 4: Approximating Square Roots https://rumble.com/v4onypb-laboratory-project-taylor-polynomials-question-4-approximating-square-roots.html
#math #calculus #science #STEM $RUM
#math #calculus #science #STEM $RUM
Rumble
Laboratory Project: Taylor Polynomials: Question 4: Approximating Square Roots
In this video I go over Question 4 of the Laboratory Project: Taylor Polynomials and this time go over an example on approximating a square root function using the quadratic approximation notation fro
Trigonometry: Sine, Cosine and Tan Functions https://peakd.com/hive-128780/@mes/trigonometry-sine-cosein-tan
$HIVE #trigonometry #math #calculus #science #education
$HIVE #trigonometry #math #calculus #science #education
PeakD
Trigonometry: Sine, Cosine and Tan Functions | PeakD
https://youtu.be/WKTIlF2oWw8 ▶️Watch on 3Speak - Odysee - BitChute - Rumble - YouTube - PDF notes This video shows a b... by mes
Laboratory Project: Taylor Polynomials: Question 3: (x - a) Approximation Form https://rumble.com/v4re54h-laboratory-project-taylor-polynomials-question-3-x-a-approximation-form.html
#science #math #education #calculus #STEM $RUM
#science #math #education #calculus #STEM $RUM
Rumble
Laboratory Project: Taylor Polynomials: Question 3: (x - a) Approximation Form
In this video I go over Question 3 of the Laboratory Project: Taylor Polynomials, and this time revisit the quadratic approximation but instead use a slightly different notation. In Question 1 I illus
Polynomial Remainder Theorem: Proof + Factor Theorem https://odysee.com/@mes:8/polynomial-remainder-theorem-proof:7
$LBC #math #algebra #science #education #calculus
$LBC #math #algebra #science #education #calculus
Odysee
Polynomial Remainder Theorem: Proof + Factor Theorem
In this video I go over a special case of Euclidean Division known as the Polynomial Remainder Theorem. This theorem states that the if a polynomial f(x) is divided by the linear polynomial x – a, whe...
Euclidean Division of Polynomials: Theorem and Proof https://odysee.com/@mes:8/euclidean-division-of-polynomials:1
$LBC #math #calculus #science #algebra #education
$LBC #math #calculus #science #algebra #education
Odysee
Euclidean Division of Polynomials: Theorem and Proof
In this video I go over further into Euclidean Division and this time look at the theorem and algorithm for univariate (i.e. single-variable) polynomials. The theorem is very similar to that for integ...
Power Functions Part 3: Graphing https://peakd.com/hive-128780/@mes/power-functions-part-3-graphing
$HIVE #math #calculus #science #education
$HIVE #math #calculus #science #education
PeakD
Power Functions Part 3: Graphing | PeakD
https://youtu.be/OMMBY0KPCcI ▶️ Watch on 3Speak - Odysee - BitChute - Rumble - YouTube - PDF notes This video walks th... by mes
MES Links
Blackbody Radiation: Rayleigh-Jeans Law, Planck's Law, and the Ultraviolet Catastrophe https://youtu.be/YIl2SmTWZZo In this video I provide an overview of blackbody radiation, which is an object that absorbs all radiation and emits radiation that is dependent…
Blackbody Radiation Question 1: Limit of Planck's Law is 0 as Wavelength Approaches 0 or ∞ https://youtu.be/8gcdHAhVVG0
In this video I show by using l'Hospital's Rule for indeterminate limits, that Planck's Law for blackbody radiation approaches zero as the wavelength approaches zero or infinity.
#math #calculus #science #STEM #physics
In this video I show by using l'Hospital's Rule for indeterminate limits, that Planck's Law for blackbody radiation approaches zero as the wavelength approaches zero or infinity.
#math #calculus #science #STEM #physics
Polar Coordinates: Example 3: Cartesian to Polar https://3speak.tv/watch?v=mes/cgrvxkmf
#math #science #calculus #3Speak $HIVE
#math #science #calculus #3Speak $HIVE
3Speak
Polar Coordinates: Example 3: Cartesian to Polar
<p>In this video I go over another example on Polar Coordinates, and this times show how to convert Cartesian coordinates...
Laboratory Project: Taylor Polynomials: Question 2: Approximation Accuracy https://rumble.com/v4z7712-laboratory-project-taylor-polynomials-question-2-approximation-accuracy.html
#math $RUM #calculus #science #education
#math $RUM #calculus #science #education
Rumble
Laboratory Project: Taylor Polynomials: Question 2: Approximation Accuracy
In this video I go over Question 2 of the Laboratory Project: Taylor Polynomials and this time look at determining the accuracy of the quadratic approximation determined in Question 1. Recall from Que
Polynomials - A Simple Explanation https://peakd.com/hive-128780/@mes/polynomials-simple
$HIVE #math #calculus #algebra #science #education
$HIVE #math #calculus #algebra #science #education
PeakD
Polynomials - A Simple Explanation | PeakD
https://youtu.be/IHIh7Y0kStE ▶️Watch on 3Speak - Odysee - BitChute - Rumble - YouTube - PDF notes A simple explanation... by mes
Polar Coordinates: Example 2: Polar to Cartesian https://3speak.tv/watch?v=mes/efufbwrl
#3Speak $HIVE #science #math #calculus #education
#3Speak $HIVE #science #math #calculus #education
3Speak
Polar Coordinates: Example 2: Polar to Cartesian
<p>In this video I go over another quick example on polar coordinates and show how we can quickly write the point (2, pi/3...
MES Links
Vectors and the Geometry of Space: Cylinders and Quadric Surfaces https://youtu.be/k4EyLr4uOUA In this video I explore the wonderful world of cylinders and quadric surfaces. Cylinders are defined as a 3D surface that consists of all lines (called rulings)…
Vectors and the Geometry of Space: Review of Chapter https://youtu.be/VMKb69uDVt0
In this video I go over the end of chapter review questions covering the Vectors and the Geometry of Space chapter. There are 19 questions in total and serve as a good review on vectors, dot products, cross products, as well as the equations of lines, planes, and their applications.
#math #science #geometry #calculus #education
In this video I go over the end of chapter review questions covering the Vectors and the Geometry of Space chapter. There are 19 questions in total and serve as a good review on vectors, dot products, cross products, as well as the equations of lines, planes, and their applications.
#math #science #geometry #calculus #education
Laboratory Project: Taylor Polynomials: Question 1: Quadratic Approximation https://rumble.com/v52flyr-laboratory-project-taylor-polynomials-question-1-quadratic-approximation.html
$RUM #math #science #education #calculus
$RUM #math #science #education #calculus
Rumble
Laboratory Project: Taylor Polynomials: Question 1: Quadratic Approximation
In this video I go over another Laboratory Project, which are very interesting math projects at the end of some of the chapters in my Calculus textbook, and this time look at Taylor Polynomials. In th