Meboreen Mary: Created page with "{| Border=1 |'''Time''' |'''Narration''' |- | 00:01 |Paralok, ngi pdiangsngewbha ia phi sha ka Spoken Tutorial halor ka '''Composite Numerical Integration'''. |- |00:07 |Ha ka..."

2017-08-17T17:22:33Z

Created page with "{| Border=1 |'''Time''' |'''Narration''' |- | 00:01 |Paralok, ngi pdiangsngewbha ia phi sha ka Spoken Tutorial halor ka '''Composite Numerical Integration'''. |- |00:07 |Ha ka..."

New page

{| Border=1
|'''Time'''
|'''Narration'''
|-
| 00:01
|Paralok, ngi pdiangsngewbha ia phi sha ka Spoken Tutorial halor ka '''Composite Numerical Integration'''.
|-
|00:07
|Ha kaba kut jong kane ka jinghikai, phin sa nang kumno ban:
|-
|00:11
|Develop ia ka '''Scilab''' code na ka bynta bun jait ki '''Composite Numerical Integration algorithms'''
|-
| 00:17
|Divide ia ka '''integral''' ha ki equal '''intervals'''
|-
|00:21
|Apply ia ka algorithm sha man kawei ka '''interval''' bad
|-
|00:24
|Khein ia ka '''composite value of the integral'''.
|-
| 00:28
|Ban record ia kane ka jinghikai, nga pyndonkam
|-
| 00:30
| '''Ubuntu 12.04''' kum ka operating system
|-
|00:34
| Ryngkat bad ka '''Scilab 5.3.3''' version.
|-
|00:38
||Shwa ban pyrshang ia kane ka jinghikai, u ne ka nongpule kidei ban don ia ka jingtip ba donkam jong
|-
| 00:42
|Ka '''Scilab''' bad
|-
|00:44
| '''Integration using Numerical Methods'''.
|-
| 00:47
| Na ka bynta ka '''Scilab''', sngewbha peit ia ki jinghikai ba iadei ba don ha ka '''Spoken Tutorial''' website.
|-
| 00:55
| '''Numerical Integration''' kadei ka
|-
| 00:58
| Jingpule halor kumno ba u numerical value jong ka '''integral''' lah ban wad.
|-
|01:03
| La pyndonkam ia u haba u mathematical integration ba dei thik um don.
|-
|01:08
|U antad ia u '''definite integral''' na ki values jong ka '''integrand'''.
|-
|01:15
|To ngin pule ia ka '''Composite Trapezoidal Rule.'''
|-
|01:18
|Kane ka rule kadei ka tnad baiar jong ka '''trapezoidal rule'''.
|-
| 01:22
|| Ngi phiah ia ka interval '''a comma b ''' ha ki '''n''' intervals ba iaryngkat.
|-
| 01:29
| Nangta, '''h equals to b minus a divided by n''' kadei ka common lengths jong ki intervals.
|-
|01:36
| Nangta ka '''composite trapezoidal rule''' la ai da:
|-
|01:41
|''' The integral of the function F of x in the interval a to b is approximately equal to h multiplied by the sum of the values of the function at x zero to x n'''
|-
|01:57
|| To ngin solve ia kawei ka nuksa da kaba pyndonkam ia ka '''composite trapezoidal rule.'''
|-
|02:02
| Shu shim ia u number jong ki intervals n is equal to 10 (n=10)
|-
|02:09
|To ngin peit ia u code na ka bynta ka '''Composite Trapezoidal Rule''' ha ka '''Scilab editor'''
|-
| 02:16
||Nyngkong ngi define ia ka function ryngkat bad ki parameters '''f , a , b , n.'''
|-
| 02:22
|'''f ''' u thew ia ka function ba ngi hap ban solve.
|-
| 02:25
|| '''a''' udei u lower limit jong ka integral,
|-
|02:28
||''' b''' kadei ka upper limit jong ka integral bad
|-
|02:31
| '''n''' udei u number jong ki intervals.
|-
|02:34
| '''linspace''' function la pyndonkam ban create shiphew tylli ki intervals ba iaryngkat hapdeng zero bad one.
|-
| 02:42
|| Ngi wad ia u value jong ka integral bad buh ia u ha ''' I one'''.
|-
| 02:49
| Nion ha '''Execute''' ha ka '''Scilab editor''' bad jied '''Save and execute ''' ia u code.
|-
|03:02
| Define ia ka example function da kaba type:
|-
| 03:05
| '''d e f f open parenthesis open single quote open square bracket y close square bracket is equal to f of x close quote comma open quote y is equal to one by open parenthesis two asterisk x plus one close parenthesis close quote close parenthesis'''
|-
| 03:30
| Nion '''Enter '''. Type '''Trap underscore composite open parenthesis f comma zero comma one comma ten close parenthesis'''
|-
|03:41
| Nion '''Enter '''.
|-
|03:43
| Ka jubab la pyni ha ka '''console '''.
|-
| 03:47
| Nangta ngin sa pule ia ka '''Composite Simpson's rule.'''
|-
| 03:51
| Ha kane ka rule, ngi thep ia ka interval ''' a comma b''' sha ka '''n is greater than 1''' sub-intervals kaba ka jingjrong ka iaryngkat .
|-
| 04:03
|| Apply '''Simpson's rule''' sha man kawei ka interval.
|-
| 04:06
| Ngi ioh ia u value jong ka integral u ban dei:
|-
|04:10
| '''h by three multiplied by the sum of f zero, four into f one , two into f two to f n'''.
|-
|04:19
||To ngin solve ia kawei ka nuksa da kaba pyndonkam ia ka '''Composite Simpson's rule. '''
|-
| 04:24
|Ngi ai ia ka '''function one by one plus x cube d x in the interval one to two'''.
|-
| 04:32
| Ai ba ka number jong ki intervals kan dei '''twenty '''.
|-
|04:37
| To ngin phai sha u code na ka bynta ka '''Composite Simpson's rule'''.
|-
|04:42
| Nyngkong eh ngi define ia ka function ryngkat ki parameters '''f , a , b , n. '''
|-
| 04:49
| '''f''' ka thew sha ka function ba ngi hap ban solve,
|-
|04:52
||'''a''' udei u lower limit jong ka integral,
|-
|04:56
| '''b''' udei u upper limit jong ka integral bad
|-
| 04:58
| '''n''' udei u number jong ki intervals.
|-
| 05:02
|Ngi wad artylli ki sets jong ki points
|-
| 05:04
| Ngi wad ia u value jong ka function ryngkat bad uwei u set bad multiply ia u da two.
|-
| 05:10
| Bad kawei ka set, ngi wad ia u value bad multiply ia u da four.
|-
| 05:16
||Ngi sum ia kine ki values bad muliply ia u da '''h by three and store the final value in I '''.
|-
| 05:24
||To ngin execute ia u code.
|-
| 05:28
|| Save bad execute ia ka file '''Simp underscore composite dot s c i'''.
|-
| 05:39
|Nyngkong to ngan clear ia ka screen.
|-
| 05:42
| Define ia ka function ba la ai ha ka nuksa da kaba type:
|-
|05:45
|'''d e f f open parenthesis open single quote open square bracket y close square bracket is equal to f of x close quote comma open quote y is equal to one divided by open parenthesis one plus x cube close parenthesis close quote close parenthesis'''
|-
|06:12
| Nion '''Enter '''.
|-
| 06:14
| Type '''Simp underscore composite open parenthesis f comma one comma two comma twenty close parenthesis'''
|-
|06:24
||Nion '''Enter '''.
|-
| 06:26
| Ka jubab la pyni ha ka console.
|-
| 06:31
| To mynta ngin peit ia ka '''Composite Midpoint Rule.'''
|-
| 06:35
| Ka integrate ia ki polynomials jong ka degree one lane duna ia one.
|-
|06:40
| Divide ia ka interval '''a comma b''' sha ki ''' sub-intervals'''ba iaryngkat ka width.
|-
|06:49
| Wad ia u midpoint jong man kawei ka interval ba la kdew da '''x i '''.
|-
|06:54
| Ngi wad ia ka sum jong ki values jong ka integral ha man uwei u midpoint.
|-
|07:00
| To ngin solve ia kane ka problem da kaba pyndonkam ia ka '''Composite Midpoint Rule'''.
|-
|07:05
| '''We are given a function one minus x square d x in the interval zero to one point five'''.
|-
|07:15
| Ngi shim '''n''' is equal to '''twenty '''.
|-
|07:18
| To ngin peit ia u code na ka bynta ka '''Composite Midpoint rule'''.
|-
|07:24
| Nyngkong ngi define ia ka function ryngkat ki parameters '''f , a , b , n. '''
|-
|07:30
| '''f ''' ka thew sha ka function ba ngi hap ban solve,
|-
|07:33
| '''a''' udei u lower limit jong ka integral,
|-
|07:36
| '''b ''' udei u upper limit jong ka integral bad
|-
|07:39
| '''n ''' udei u number jong ki intervals.
|-
|07:41
| Ngi wad ia u midpoint jong man kawei ka interval.
|-
|07:45
| Wad ia u value jong ka integral ha man uwei u midpoint bad nangta wad ia ka sum bad buh ia ka ha '''I.'''
|-
|07:53
| To mynta ngin ia solve ia ka nuksa.
|-
|07:55
| Save bad execute ia ka file '''mid underscore composite dot s c i'''.
|-
|08:04
| To ngan clear ia ka screen.
|-
|08:08
| Ngi define ia ka function ba la ai ha ka nuksa da kaba type:
|-
|08:13
| '''d e f f open parenthesis open single quote open square bracket y close square bracket is equal to f of x close quote comma open quote y is equal to one minus x square close quote close parenthesis'''
|-
|08:37
| Nion '''Enter'''.
|-
|08:39
| Nangta type '''mid underscore composite open parenthesis f comma zero comma one point five comma twenty close parenthesis'''
|-
|08:53
|Nion '''Enter'''. Ka jubab la pyni ha ka '''console'''.
|-
|08:59
| To ngin batai kyllum ia kane ka jinghikai.
|-
|09:02
| Ha kane ka jinghikai ngi la pule ban:
|-
|09:04
| Develop ia u '''Scilab''' code na ka bynta ka'''numerical integration'''
|-
|09:08
| Wad ia u value jong ka '''integral'''.
|-
|09:11
| Peit ia ka video ba don ha ka link ba la pyni harum.
|-
| 09:15
| Ka kyllum lang ia ka Spoken Tutorial project.
|-
|09:18
||Lada phim don ia ka bandwidth kaba biang, phi lah ban shu download bad peit ia ka.
|-
|09:23
||Ka kynhun jong ka Spoken Tutorial
|-
|09:25
||Ka pynlong ia ki workshops da kaba pyndonkam da ki spoken turorials
|-
|09:29
||Ka ai certificates sha kito kiba pass ha ka online test.
|-
|09:32
||Na ka bynta kham bun ki jingtip ba bniah, sngewbha thoh sha ka contact@spoken-tutorial.org.
|-
|09:40
|Spoken Tutorial Project kadei shibynta jong ka Talk to a Teacher project.
|-
| 09:45
| La kyrshan ia ka da ka National Mission on Eduction lyngba ka ICT, MHRD, Sorkar India
|-
| 09:52
|Kham bun ki jingtip halor kane ka mission kidon ha http://spoken-tutorial.org/NMEICT-Intro.
|-
| 10:03
|Nga i Meboreen na Shillong nga pynkut ia kane. Khublei shibun.

Scilab/C4/Integration/Khasi - Revision history

Meboreen Mary: Created page with "{| Border=1 |'''Time''' |'''Narration''' |- | 00:01 |Paralok, ngi pdiangsngewbha ia phi sha ka Spoken Tutorial halor ka '''Composite Numerical Integration'''. |- |00:07 |Ha ka..."