How to Find the Cube Root of a Number using the Prime Factorisation Method? | Don't Memorise | Summary and Q&A

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December 8, 2014
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Infinity Learn NEET
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How to Find the Cube Root of a Number using the Prime Factorisation Method? | Don't Memorise

TL;DR

Learn how to find the cube root of large numbers using the prime factorization method.

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Key Insights

  • 💨 The prime factorization method is an effective way to find the cube root of large numbers.
  • 🧑‍🏭 By reducing the number to its prime factors, the cube root can be determined easily.
  • 👥 Grouping the prime factors and selecting one number from each group simplifies the calculation process.
  • 🧊 Memorizing the cubes of numbers from 1 to 10 can significantly speed up the calculation of cube roots.
  • 🪘 The prime factorization method is applicable to numbers up to even six digits long.
  • 🫚 Continuous learning and practice are essential for mastering cube roots and prime factorization.
  • ❓ The prime factorization method is a systematic approach that ensures accurate calculations.

Transcript

in the previous video we learned how we can find the cube roots of numbers in exponential form but what if the numbers are large and are not in exponential form well we use the prime factorization method say we want to find the cube root of 216 our aim is to reduce this number to its prime factors we write the number here and draw lines like these ... Read More

Questions & Answers

Q: What is the prime factorization method used for?

The prime factorization method is used to find the cube root of numbers that are not in exponential form.

Q: How does the prime factorization method work?

The method involves reducing the number to its prime factors and then grouping them in sets of three. One number is chosen from each group and multiplied to find the cube root.

Q: Is it necessary to include the prime number left at the bottom when writing the prime factors?

Yes, it is important to include all the prime factors, including the one that remains at the bottom, when writing the prime factorization.

Q: Why is it helpful to memorize the cubes of numbers from 1 to 10?

Memorizing the cubes of numbers allows for quick calculation of cube roots, especially for large numbers, saving time and effort.

Summary & Key Takeaways

  • The prime factorization method is used to find the cube root of numbers that are not in exponential form.

  • By reducing the number into its prime factors, the cube root can be found easily.

  • Grouping the prime factors and choosing one number from each group allows for the determination of the cube root.

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