Examination Result



From itd site, they said,

"Result for Undergraduate students Semester 1, 2008/2009 will be available on Dec 1st, 2008 ( after 4.00 p.m )
Result for Postgraduate students Semester 1, 2008/2009 will be available on Dec 1st, 2008 ( after 4.00 p.m )
"

That is what they said.

You can check you result at the official website

http://itdportal.iium.edu.my/student/Resultslip.html

Or, in case of traffic jame, Husz, with a lot of poyo had voluntered himself to build a duplicate site,

http://drhusz.50webs.com/

...................................................

Some problem may occur due to complication with download manager like IDM or etc.

Thank You. yea..yea... You Are Welcome.

IIUM Kuantan on Google Earth



(^_^)burrpppp...

Cute is also a calculation.




Attraction purpose only.

Nothing to do with math.

When people dont understand one single sign...



Are You Smarter Than A Fifth Grade : Multiplication

1. Multiplying by 9, or 99, or 999

Multiplying by 9 is really multiplying by 10-1.

So, 9×9 is just 9x(10-1) which is 9×10-9 which is 90-9 or 81.

Let’s try a harder example: 46×9 = 46×10-46 = 460-46 = 414.

One more example: 68×9 = 680-68 = 612.

To multiply by 99, you multiply by 100-1.

So, 46×99 = 46x(100-1) = 4600-46 = 4554.

Multiplying by 999 is similar to multiplying by 9 and by 99.

38×999 = 38x(1000-1) = 38000-38 = 37962.

2. Multiplying by 11

To multiply a number by 11 you add pairs of numbers next to each other, except for the numbers on the edges.

Let me illustrate:

To multiply 436 by 11 go from right to left.

First write down the 6 then add 6 to its neighbor on the left, 3, to get 9.

Write down 9 to the left of 6.

Then add 4 to 3 to get 7. Write down 7.

Then, write down the leftmost digit, 4.

So, 436×11 = is 4796.

Let’s do another example: 3254×11.

The answer comes from these sums and edge numbers: (3)(3+2)(2+5)(5+4)(4) = 35794.

One more example, this one involving carrying: 4657×11.

Write down the sums and edge numbers: (4)(4+6)(6+5)(5+7)(7).

Going from right to left we write down 7.

Then we notice that 5+7=12.

So we write down 2 and carry the 1.

6+5 = 11, plus the 1 we carried = 12.

So, we write down the 2 and carry the 1.

4+6 = 10, plus the 1 we carried = 11.

So, we write down the 1 and carry the 1.

To the leftmost digit, 4, we add the 1 we carried.

So, 4657×11 = 51227 .

3. Multiplying by 5, 25, or 125

Multiplying by 5 is just multiplying by 10 and then dividing by 2. Note: To multiply by 10 just add a 0 to the end of the number.

12×5 = (12×10)/2 = 120/2 = 60.

Another example: 64×5 = 640/2 = 320.

And, 4286×5 = 42860/2 = 21430.

To multiply by 25 you multiply by 100 (just add two 0’s to the end of the number) then divide by 4, since 100 = 25×4. Note: to divide by 4 your can just divide by 2 twice, since 2×2 = 4.

64×25 = 6400/4 = 3200/2 = 1600.

58×25 = 5800/4 = 2900/2 = 1450.

To multiply by 125, you multipy by 1000 then divide by 8 since 8×125 = 1000. Notice that 8 = 2×2x2. So, to divide by 1000 add three 0’s to the number and divide by 2 three times.

32×125 = 32000/8 = 16000/4 = 8000/2 = 4000.

48×125 = 48000/8 = 24000/4 = 12000/2 = 6000.

4. Multiplying together two numbers that differ by a small even number

This trick only works if you’ve memorized or can quickly calculate the squares of numbers. If you’re able to memorize some squares and use the tricks described later for some kinds of numbers you’ll be able to quickly multiply together many pairs of numbers that differ by 2, or 4, or 6.

Let’s say you want to calculate 12×14.

When two numbers differ by two their product is always the square of the number in between them minus 1.

12×14 = (13×13)-1 = 168.

16×18 = (17×17)-1 = 288.

99×101 = (100×100)-1 = 10000-1 = 9999

If two numbers differ by 4 then their product is the square of the number in the middle (the average of the two numbers) minus 4.

11×15 = (13×13)-4 = 169-4 = 165.

13×17 = (15×15)-4 = 225-4 = 221.

If the two numbers differ by 6 then their product is the square of their average minus 9.

12×18 = (15×15)-9 = 216.

17×23 = (20×20)-9 = 391.

5. Squaring 2-digit numbers that end in 5

If a number ends in 5 then its square always ends in 25. To get the rest of the product take the left digit and multiply it by one more than itself.

35×35 ends in 25. We get the rest of the product by multiplying 3 by one more than 3. So, 3×4 = 12 and that’s the rest of the product. Thus, 35×35 = 1225.

To calculate 65×65, notice that 6×7 = 42 and write down 4225 as the answer.

85×85: Calculate 8×9 = 72 and write down 7225.

6. Multiplying together 2-digit numbers where the first digits are the same and the last digits sum to 10

Let’s say you want to multiply 42 by 48. You notice that the first digit is 4 in both cases. You also notice that the other digits, 2 and 8, sum to 10. You can then use this trick: multiply the first digit by one more than itself to get the first part of the answer and multiply the last digits together to get the second (right) part of the answer.

An illustration is in order:

To calculate 42×48: Multiply 4 by 4+1. So, 4×5 = 20. Write down 20.

Multiply together the last digits: 2×8 = 16. Write down 16.

The product of 42 and 48 is thus 2016.

Notice that for this particular example you could also have noticed that 42 and 48 differ by 6 and have applied technique number 4.

Another example: 64×66. 6×7 = 42. 4×6 = 24. The product is 4224.

A final example: 86×84. 8×9 = 72. 6×4 = 24. The product is 7224

7. Squaring other 2-digit numbers

Let’s say you want to square 58. Square each digit and write a partial answer. 5×5 = 25. 8×8 = 64. Write down 2564 to start. Then, multiply the two digits of the number you’re squaring together, 5×8=40.

Double this product: 40×2=80, then add a 0 to it, getting 800.

Add 800 to 2564 to get 3364.

This is pretty complicated so let’s do more examples.

32×32. The first part of the answer comes from squaring 3 and 2.

3×3=9. 2×2 = 4. Write down 0904. Notice the extra zeros. It’s important that every square in the partial product have two digits.

Multiply the digits, 2 and 3, together and double the whole thing. 2×3x2 = 12.

Add a zero to get 120. Add 120 to the partial product, 0904, and we get 1024.

56×56. The partial product comes from 5×5 and 6×6. Write down 2536.

5×6x2 = 60. Add a zero to get 600.

56×56 = 2536+600 = 3136.

One more example: 67×67. Write down 3649 as the partial product.

6×7x2 = 42×2 = 84. Add a zero to get 840.

67×67=3649+840 = 4489.

8. Multiplying by doubling and halving

There are cases when you’re multiplying two numbers together and one of the numbers is even. In this case you can divide that number by two and multiply the other number by 2. You can do this over and over until you get to multiplication this is easy for you to do.

Let’s say you want to multiply 14 by 16. You can do this:

14×16 = 28×8 = 56×4 = 112×2 = 224.

Another example: 12×15 = 6×30 = 6×3 with a 0 at the end so it’s 180.

48×17 = 24×34 = 12×68 = 6×136 = 3×272 = 816. (Being able to calculate that 3×27 = 81 in your head is very helpful for this problem.)

9. Multiplying by a power of 2

To multiply a number by 2, 4, 8, 16, 32, or some other power of 2 just keep doubling the product as many times as necessary. If you want to multiply by 16 then double the number 4 times since 16 = 2×2x2×2.

15×16: 15×2 = 30. 30×2 = 60. 60×2 = 120. 120×2 = 240.
23×8: 23×2 = 46. 46×2 = 92. 92×2 = 184.
54×8: 54×2 = 108. 108×2 = 216. 216×2 = 432.

Practice these tricks and you’ll get good at solving many different kinds of arithmetic problems in your head, or at least quickly on paper. Half the fun is identifying which trick to use. Sometimes more than one trick will apply and you’ll get to choose which one is easiest for a particular problem.

Multiplication can be a great sport! Enjoy.

Simplicity...


Dear friends, dont you ever thought about simplicity?
Come on guys...


exam! exam! exam!

Wish all the best and good luck to all CTS 081 students for your final examination. May Allah bless us and give His guidance to us. InsyaAllah.

Malam Tautan Kasih Di Aidilfitri










solat hajat & bacaan yassin

CTS will organize Solat Hajat & Bacaan Yassin for all CTS students due to final exam. All CTS 081 students are invited.

Time: 6.30pm - 9.00pm(Maghrib - Isyak)
Date: 23 October 2008
Venue: IIUM Mosque(KOM)

jamuan raya cts 2008

All CTS students are invited to Jamuan Raya CTS 2008.

Time:Lunch Hour
Venue:Office CTS
Fee:RM 4.00

Please pay to Kak Anum

Tautan kasih di aidilfitri

All CTS 081, you are Cordially Invite to "Tautan Kasih Di Aidilfitri".

Date : 20 October 2008
Venue : Court Yard KOS
Time : 7.50pm - 10.30pm

Selamat Hari Raya


UNGS 2030K

ATTENTION! UNGS lecture on 25 Sept. 2008 will be postponed. Replacement will be held on 9 October 2008, Thursday at 5.30pm - 7.00pm. Thank you.

I CAN READ IT! CAN YOU? ----Ada sesiapa yg boleh baca ni?

(Mgnieukt kjiaan Cmabrigde Uinervtisy sseaipa upn bleoh mmbcanaya waalu hruufyna brterbaur kraena oatk ktia tiadk mngjea hruuf stau-prestau tpai mmebcaa preaktaan sceara mnyeulruh asalakn hruuf peratma jgua ynag trakehir bareda diteamptyna) :- 
fi yuo cna raed tihs, yuo hvae a sgtrane mnid too. 
Cna yuo raed tihs? Olny 55 plepoe can. 
i cdnuolt blveiee taht I cluod aulaclty uesdnatnrd waht I was rdanieg. The phaonmneal pweor of the hmuan mnid, aoccdrnig to a rscheearch at Cmabrigde Uinervtisy, it dseno't mtaetr in waht oerdr the ltteres in a wrod are, the olny iproamtnt tihng is taht the frsit and lsat ltteer be in the rghit pclae. The rset can be a taotl mses and you can sitll raed it whotuit a pboerlm. Tihs is bcuseae the huamn mnid deos not raed ervey lteter by istlef, but the wrod as a wlohe. Azanmig huh? yaeh and I awlyas tghuhot slpeling was ipmorantt! if you can raed tihs forwrad it. 

ramadhan kembali

Selamat Menyambut Ramadhan al-Mubarak kepada semua, semoga bulan ini menjadi bulan untuk kita berpesta ibadah dan diampunkan segala dosa serta diterima amalan.

ANDAI INI YANG TERAKHIR

andai kau tahu ini Ramadhan terakhir
tentu siangnya engkau sibuk berzikir
tentu engkau tak akan jemu melagukan syair rindu
mendayu..merayu. ..kepada- NYA Tuhan yang satu
andai kau tahu ini Ramadhan terakhir
tentu sholatmu kau kerjakan di awal waktu
sholat yang dikerjakan.. .sungguh khusyuk lagi tawadhu'
tubuh dan qalbu...bersatu memperhamba diri
menghadap Rabbul Jalil... menangisi kecurangan janji
"innasolati wanusuki wamahyaya wamamati lillahirabbil 'alamin"
[sesungguhnya solatku, ibadahku, hidupku, dan matiku...
kuserahkan hanya kepada Allah Tuhan seru sekalian alam]

[baca seterusnya]

Name List For CTS Grouping


Easily find your matric number by pressing CTRL+F on your keyboard.




























































































































































































































































































































































































































































































































































































































































































































GROUP A

GROUP B









No. Matric No.
No. Matric No.

1 0819271

1 0813459

2 0813919

2 0816893

3 0816581

3 0813561

4 0815769

4 0815115

5 0816531

5 0818857

6 0814415

6 0819963

7 0817215

7 0814707

8 0813025

8 0812505

9 0818077

9 0812345

10 0818979

10 0812879

11 0814050

11 0814431

12 0818476

12 0810768

13 0812508

13 0817170

14 0817886

14 0814426

15 0810010

15 0816296

16 0817110

16 0814994

17 0819764

17 0813164

18 0818772

18 0811089

19 0819664

19 0816830

20 0815518

20 0817962

21 0817204

21 0814166

22 0819970

22 0817754

23 0813952

23 0816216

24 0816448

24 0810040

25 0819320

25 0814396

26 0815912

26 0817076

27 0817128

27 0812326

28 0812064

28 0816380

29 0818924

29 0811072

30 0819842

30 0814658

31 0810280

31 0816894

32 0811500

32 0813778

33 0813070

33 0812798

34 0812028

34 0816532

35 0810724

35 0819176

36 0819082

36 0813810

37 0816006

37 0818272

38 0814486

38 0812534

39 0814644

39 0814014

40 0812312

40 0813796

41 0818422

41 0814328

42 0816284

42 0816084

43 0811176

43 0810336

44 0812426

44 0811492

45 0815352

45 0810254

46 0819732

46 0817814

47 0812168

47 0811964

48 0818066

48 0810854

49 0817826

49 0814268

50 0812546

50 0814800

51 0817834

51 0817012

52 0813910

52 0812896

53 0815484

53 0813080

54 0811676

54 0815378

55 0816614

55 0810882

56 0813048

56 0810422

57 0818742

57 0813644

58 0725904

58 0811320





59 0818281