УРЛАГ
ГОО САЙХАН БА ЭРҮҮЛ МЭНД
ГАРААР ХИЙСЭН
СОЁЛ БА ТҮҮХ
ҮЗВЭР НААДАМ
БАЙГАЛЬ ОРЧИН
ХООЛ БА УНДАА
НОГООН ИРЭЭДҮЙ
УРВУУ ИНЖЕНЕРЧЛЭЛ
SCHOOL PROJECTS
ШИНЖЛЭХ УХААН
СПОРТ
ТЕХНОЛОГИ
ӨМСДӨГ ХЭРЭГСЭЛ
Newton's Method — Chase a Root Down Tangent Lines You Draw
Mark

Зохиогч

Mark

2. Долдугаар сар 2026FI
19
0
0
0
0

Newton's Method — Chase a Root Down Tangent Lines You Draw

A hands-on maths project: plot a curve on grid paper, draw the tangent line where it starts, slide down it to the axis, and repeat -- watching your guesses march onto the solution. This is Newton's method; a Python cell checks your root, and a compendium shows its power and its pitfalls.
Анхан шат
30 minutes

Зааварчилгаа

1

Following the slope to the answer

How do you solve an equation with no tidy formula? Around 1669 Isaac Newton gave an answer: guess, draw the tangent line to the curve there, and follow it down to where it crosses zero -- that landing point is a much better guess. Repeat, and you zoom in. You will do it with a ruler.
2

Plot the curve

Rule a grid on card (your graph paper). Plot the curve y = x-cubed minus 2x minus 5 for x from 1.5 to 3 by working out a few points and joining them smoothly. It crosses the x-axis somewhere near x = 2 -- that crossing is the solution you are hunting.

Materials for this step:

Cardstock Assorted Pack (50 sheets)Cardstock Assorted Pack (50 sheets)1 ширхэг

Tools needed:

Steel Ruler (30cm)Steel Ruler (30cm)
Graphite Pencil SetGraphite Pencil Set
3

Slide down the tangents

Start at x = 2. Lay your ruler along the curve there to draw the tangent line, and mark where that straight line crosses the x-axis -- read off the new x. Move to that x on the curve, draw the new tangent, and mark where IT crosses. After just two or three tangents your marks pile up on the root, near x = 2.095.

Tools needed:

CalculatorCalculator
4

Check the root

Loading Jupyter Notebook...

Tools needed:

Desktop ComputerDesktop Computer
CalculatorCalculator
5

Compendium: fast, but handle with care

What your tangents teach. (1) Each step replaces the guess with x minus f(x) divided by the slope f'(x); near the root the accuracy doubles every step, dazzlingly fast. (2) Heron's ancient square-root trick is just Newton's method applied to 'x squared minus S'. (3) It needs a derivative (the slope) and a reasonable starting guess -- start in a bad spot, or near a flat part of the curve, and the tangents can fly AWAY from the root instead of toward it. (4) Given a good start, it is the default way computers solve equations in engineering, physics, computer graphics and the training of machine-learning models.

Материал

1

Шаардлагатай багаж

4

You can swap these in

Can't get one of the materials? Swap it for an equivalent — these work just as well.

Холбоотой загварууд

Эдгээр загварууд мэдлэг хуваалцдаг — арга техник, материал эсвэл зарчим

CC0 Нийтийн домэйн

Энэ загвар CC0 дор гаргагдсан. Та зөвшөөрөл авахгүйгээр хуулах, өөрчлөх, түгээх, ашиглах боломжтой.

Загвараар дамжуулан бүтээгдэхүүн худалдаж авч Бүтээгчийг дэмжээрэй Бүтээгчийн шимтгэл Борлуулагчаар тогтоосон, эсвэл энэ загварын шинэ хувилбар үүсгэж орлогоо хуваахын тулд өөрийн загварт холбоос болгон оруулна уу.

Хэлэлцүүлэг

(0)

Нэвтрэх хэлэлцүүлэгт нэгдэхийн тулд

Loading comments...