Conversion from Decimal Fractions to Binary is been explained by considering an example. WATCH NEXT: Decimal Fractions to Hexadecimal • Decimal Fractions to H...
Hey everyone. Its important to remember that different number systems like base 2, 8, 10 and 16 have different attributes and therefore converting numbers between these systems may lead to fractions that go on for a very long time. If you're converting an irrational number, no number system can capture an entire irrational number. So therefore when you convert it the conversion will also be impossible to be entirely precise. So if your number seems to go on forever it is your job to decide which fraction to stop at to get your desired level of precision.
Thanks for the comment Aditya. With respect to number of iterations there are 3 possibilities. 1) You may get zero at the fractional part and stop the process. 2) You never get zero at the fractional part but you will get a pattern that keeps repeating and you may stop at that point. 3) You neither get zero or nor get any pattern that keeps repeating, in such case you may stop the process after 5-6 iterations. In such case, in the numerical itself they mention the number of iterations to be carried out. If nothing is mentioned then 5-6 iterations are ideal. Hope this helps! Thank you again and have a great day
With respect to number of iterations there are 3 possibilities. 1) You may get zero at the fractional part and stop the process. 2) You never get zero at the fractional part but you will get a pattern that keeps repeating and you may stop at that point. 3) You neither get zero or nor get any pattern that keeps repeating, in such case you may stop the process after 5-6 iterations. In such case, in the numerical itself they mention the number of iterations to be carried out. If nothing is mentioned then 5-6 iterations are ideal.
For people who see this in the future. For part 2 when he is solving the decimal. I'm assuming you stop when the number you multiply = 0. For example 0.25: 0.25 * 2 = 0.50 -> 0 0.50 * 2 = 1.00 -> 0 but then 0.00 * 2 = 0.00 which just repeats 0 forever. This means the answer would be: 0.01 This is just an assumption though. I'm not 100% sure but it seems to make sense.
I can't understand that why did we stop after doing the multiplication for 5 times, if we got a number 34.98 so did we just multiply to 2 f0r 5 times......?
sir, you should have continued to divide 1/2 then there should be a remainder 0.5 which will be represented by 1 bit so that others won't get confused. to give light to others, after dividing 1/2 you will get 0.5 as an answer. since the integer quotient is 0 then there you should stop dividing.
@@norestchonzi2903 you stop dividing when the number divided by 2 begins with a 0, in this case he could've done 1/2 = 0.5 which just equals 0 with remainder 1.
GREAT VIDEO! 👍 half isn't understandable yes But important parts are clearly pronounced, so you can understand meaning. Also writing. You could not understand a single word, and still learn subiect. Definite like from me! We need more of that kind of people here
Because it's a fraction basically the before the decimal would be the numerator hence divide by two and the other one would be the denominator hence multiple by two
Thanks for the comment Narymam. With respect to number of iterations there are 3 possibilities. 1) You may get zero at the fractional part and stop the process. 2) You never get zero at the fractional part but you will get a pattern that keeps repeating and you may stop at that point. 3) You neither get zero or nor get any pattern that keeps repeating, in such case you may stop the process after 5-6 iterations. In such case, in the numerical itself they mention the number of iterations to be carried out. If nothing is mentioned then 5-6 iterations are ideal. Hope this helps! Thank you again and have a great day.
Hey everyone. Its important to remember that different number systems like base 2, 8, 10 and 16 have different attributes and therefore converting numbers between these systems may lead to fractions that go on for a very long time.
If you're converting an irrational number, no number system can capture an entire irrational number. So therefore when you convert it the conversion will also be impossible to be entirely precise.
So if your number seems to go on forever it is your job to decide which fraction to stop at to get your desired level of precision.
got it
Sir you are a real teacher 😢 for me
Thanks you explained it in simple terms
Thank you so much sir.i understand it very easily.
Thank you very much. Very nice and helpful session sir
thankss sir, finally i know why it never end. I have no idea there is "case 3"🤭
Sir thank you for your better teaching 😊thank you
All the best for tomorrows exm
It was really useful . Thank you for making such a good video that helped me a lot sir and I hope to have more videos from you.
Thank you sir it was very helpful🙏
Thank you for the Great full information ❤
Hi bro, I have one question 'when do we stop multiplying by 2'? Also thank you for explaining this
Thanks for the comment Aditya. With respect to number of iterations there are 3 possibilities.
1) You may get zero at the fractional part and stop the process.
2) You never get zero at the fractional part but you will get a pattern that keeps repeating and you may stop at that point.
3) You neither get zero or nor get any pattern that keeps repeating, in such case you may stop the process after 5-6 iterations.
In such case, in the numerical itself they mention the number of iterations to be carried out. If nothing is mentioned then 5-6 iterations are ideal.
Hope this helps! Thank you again and have a great day
@@EnggClasses Yes, it definitely helps. Thank you so much!
EnggClasses hello sir, i can’t read more your comment can u reply to this comment so i can be able to see ur explanation when we stop multiplying by 2
With respect to number of iterations there are 3 possibilities.
1) You may get zero at the fractional part and stop the process.
2) You never get zero at the fractional part but you will get a pattern that keeps repeating and you may stop at that point.
3) You neither get zero or nor get any pattern that keeps repeating, in such case you may stop the process after 5-6 iterations.
In such case, in the numerical itself they mention the number of iterations to be carried out. If nothing is mentioned then 5-6 iterations are ideal.
You can stop after four binary numbers
For people who see this in the future. For part 2 when he is solving the decimal. I'm assuming you stop when the number you multiply = 0.
For example 0.25:
0.25 * 2 = 0.50 -> 0
0.50 * 2 = 1.00 -> 0
but then 0.00 * 2 = 0.00 which just repeats 0 forever.
This means the answer would be: 0.01
This is just an assumption though. I'm not 100% sure but it seems to make sense.
Perfect explanation 😊
I can't understand that why did we stop after doing the multiplication for 5 times, if we got a number 34.98 so did we just multiply to 2 f0r 5 times......?
mee to
Thankyou!! This was very helpful
You are most welcome Adam.
Subscribe to the channel EnggClasses for more videos.
thank u very much ---from morocco
really helpful thanx man
Thanks For the Explanation Sir 😊
Thank you and keep watching.
Thank you so much ❤️❤️
It was very helpful thankyou so much
Thank you sir😊
Thankyou so much sir😊
Thanks for the info sir😍🤝
You are most welcome.
Meanwhile, subscribe to our channel EnggClasses for more videos.
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What does it mean to continue until second repeat for fractional numbers to binary
@learn geometry but for example, 0.018 and 0.088 i couldnt find any repetition for both of them. It is endless.
Thank you soooooooo much
tq so much sir
until how many iteration we do sir please replay me sir
sir, you should have continued to divide 1/2 then there should be a remainder 0.5 which will be represented by 1 bit so that others won't get confused. to give light to others, after dividing 1/2 you will get 0.5 as an answer. since the integer quotient is 0 then there you should stop dividing.
May you explain it again in simple terms like where exactly to stop diving
@@norestchonzi2903 you stop dividing when the number divided by 2 begins with a 0, in this case he could've done 1/2 = 0.5 which just equals 0 with remainder 1.
Thanks alot sir
Thankyou sir
thank u u r my hero
Up to which limit we have to multiply fractional part with 2??
Do u know the answer now ?
GREAT VIDEO! 👍
half isn't understandable yes
But important parts are clearly pronounced, so you can understand meaning.
Also writing. You could not understand a single word, and still learn subiect.
Definite like from me! We need more of that kind of people here
Thanks sir very helpful
You are most welcome Atharv
Thanks sir
YOU A GOAT
How many time we multiple by sir??
Thank you
can you convert decimal 891.251 to binary number please
Thanku sir
Ty!🙏...
Can we also use bar symbol as fractional part repeats
Please sir why are you multiplying the decimal part ?
Because it's a fraction basically the before the decimal would be the numerator hence divide by two and the other one would be the denominator hence multiple by two
Thank uh so much sir.. It is very helpful to me.. But still I'm not understand when do i stop multiplying by 2 ??
Same
@@radesh1971 hmm 🙄
@@shizuka5561 jabtak 3 zero Nahi ata tabtak continue Karna ha .
@@snehadancecollection ohh.. Thnxx for this..
@@shizuka5561 welcome
tnx bro
thanks is easy
😄
What if example 0.5 x 2 ----> 1, do i need to keep multiply or stop at 1 ? hope anyone can answer this question
You stop because the fractional part is equal to zero .
Thanks
How to find the remainder????
the decimal part you multiply by 2
Fabulous...
Much pleasure and you are most welcome.
Thx
I love you sir
Sir I have a ques. please solve it
Convert decimal 125.062 into binary.
(1111101.00001111111) in binary.
How many times should I multiply it by 2?
Thanks for the comment Narymam. With respect to number of iterations there are 3 possibilities.
1) You may get zero at the fractional part and stop the process.
2) You never get zero at the fractional part but you will get a pattern that keeps repeating and you may stop at that point.
3) You neither get zero or nor get any pattern that keeps repeating, in such case you may stop the process after 5-6 iterations.
In such case, in the numerical itself they mention the number of iterations to be carried out. If nothing is mentioned then 5-6 iterations are ideal.
Hope this helps! Thank you again and have a great day.
It's just that beginning part. But, the rest is good.
thankkkksssssss
Those next video are blocking the answers
Sir point wali value ko dekhna 167 ko apka binary mai 00101 ko ap decimal maj convert krna isko convert krne pr 167 to a hi ni rha......
,????????
after the last iteration the fraction would have repeated
I have 5436.92. I dont know when I should stop. I have .92 = 1110
In first there will be 1 in the side of 43 are you doing mistake.?
Dear this math last unit is wrong I think.001 is end point
😊😊😊😊
Hii bro
01011 answer is coming
i love u
tw
Hindi main bolo
Thank you
Thank you sir
You most welcome. Subscribe to EnggClasses channel for more videos.