Another trick for it: say 103x107= We have to work with 3, 7: first multiply, then add as: Starting from right 1. 3x7=21 2. 3+7=0 and 1 carry 3. 10+1(carry)=11 102x104==》 2x4--> 08 2+4--> 6 10-->10(no carry writing as it is)
Sir after crackin my exam(ssc cgl) I will be there at ur place. Because u are the sole man who enhanced my tyro state of calculation to a pro lvl. A big thanks sir.
It seems to me that these 'tricks' fall into the same trap of normal multiplication which requires having to worry about carry numbers whilst doing the calculations. This also demands that one must do the sum right to left when in fact it makes more sense to do the sum left to right. If one uses the vedic trick of using 'open numbers' (which are separated by slashes during the working stage) then it does not matter which way one does the sum. The 'open number can be compressed at the end of the calculation stage or (if one is going left to right) as one proceeds along the sum. This method also makes it easier for students to see where they are going wrong when they are learning the techniques for the first time as there is a clear record of the 'open number' calculation and then the final closed number result. For example:112 x 117 becomes 1/2/10/9/14 = 13104. The criss-cross working are as follows 1x1/(1x1)+(1x1)/(1x7)+(1x1)+(2x1)/(1x7)+(2x1)/(2x7) N.B. Personally I find using commas to separate the numbers easier & more natural to use than the slash when writing down my calculations. 112 x 117 = [1,2,10,9,14] = 13104
Another trick for it: say 103x107=
We have to work with 3, 7: first multiply, then add as:
Starting from right
1. 3x7=21
2. 3+7=0 and 1 carry
3. 10+1(carry)=11
102x104==》
2x4--> 08
2+4--> 6
10-->10(no carry writing as it is)
Sir please explain multiplication with 50
Sir after crackin my exam(ssc cgl) I will be there at ur place. Because u are the sole man who enhanced my tyro state of calculation to a pro lvl. A big thanks sir.
All the best. I will wait eagerly.
Sir for the first ques. we can do 103 square - 1
Thanks alot for your videos sir. I missed you and this platform in school days. Thank god I found you for teaching my kid. 😍🙏🏻🙏🏻🙏🏻😇
The ebook of short tricks will be amazing for them.....whatsapp 9896369963 for details
Your tricks are superb👍👍👍
U r great sir
U r my best..........
It help me much thanx sir.
You are great sir!!❤️❤️
It seems to me that these 'tricks' fall into the same trap of normal multiplication which requires having to worry about carry numbers whilst doing the calculations. This also demands that one must do the sum right to left when in fact it makes more sense to do the sum left to right. If one uses the vedic trick of using 'open numbers' (which are separated by slashes during the working stage) then it does not matter which way one does the sum. The 'open number can be compressed at the end of the calculation stage or (if one is going left to right) as one proceeds along the sum. This method also makes it easier for students to see where they are going wrong when they are learning the techniques for the first time as there is a clear record of the 'open number' calculation and then the final closed number result. For example:112 x 117 becomes 1/2/10/9/14 = 13104.
The criss-cross working are as follows 1x1/(1x1)+(1x1)/(1x7)+(1x1)+(2x1)/(1x7)+(2x1)/(2x7)
N.B. Personally I find using commas to separate the numbers easier & more natural to use than the slash when writing down my calculations. 112 x 117 = [1,2,10,9,14] = 13104
Suresh aggarwal your the best math matition
thank you sir it really helped me.
Thanks sir👍
U r super duper hit
Wow!!!
Gajab
But sir what about numbers like 102×123
But anyway the trick has made such calculations really easy
Thank you sir
Mujhe pakka pata hai ki aapki tricks exam mein bahut useful hogi🙏
Not sure if it works always..I just deviced