Long Division trick - Fast calculation! | Summary and Q&A
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TL;DR
Learn an easier way to perform long division using a simplified method.
Key Insights
- ➗ The simplified long division method makes it easier to divide larger numbers.
- ✖️ The divisor is converted into the next nearest T number, and the multiplier determines the calculation.
- 🪘 Adding the remainder to the next iteration simplifies the long division process.
Transcript
hey going welcome to the tech tech math Channel what we're going to be looking at today is it's an easier way of doing long division I'm going to launch straight into it this probably going to take a couple of videos to I get through I'm going to sort of deal with it in sections I'm going to deal with it you know obviously getting into the easy stu... Read More
Questions & Answers
Q: How does this simplified long division method work?
The method involves breaking down the divisor into the nearest T number and using a multiplier. The remainder from each calculation is added to the next iteration, leading to the final answer.
Q: Does this method work only for specific numbers?
No, this method works for any number. It simplifies the long division process for larger numbers, making it easier to calculate the quotient and remainder.
Q: How does the multiplier affect the calculation?
The multiplier determines how many times to add the remainder to the next iteration. It varies depending on the divisor being used. For example, with a multiplier of 1, the remainder stays the same.
Q: Are there any limitations to this simplified method?
The method may take a bit of getting used to, but once you understand the process, it can be a quick and efficient way to perform long division. Practice and familiarity with the method will help improve accuracy and speed.
Summary & Key Takeaways
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The video introduces an alternative method for long division that simplifies the process for larger numbers.
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The method involves breaking down the divisor into the nearest T number, using the multiplier, and adding the remainder to the next iteration.
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The video provides step-by-step examples for dividing numbers and finding remainders using this new method.
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