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Is 60 a rational or irrational number?
60 is a rational number because it can be expressed as the quotient of two integers: 60 ÷ 1.
Is 60 squared an irrational number?
Is the Square Root of 60 Rational or Irrational? The square root of 60 is an irrational number with never-ending digits.
Why is 60 Irrational?
1 Expert Answer Since 15 is not a perfect square, the square root of 60 is irrational.
Is the square root of 60 rational?
Example: The square root of some numbers (for example the number 60) is an irrational number that never terminates or repeats (7.745 966 692 …). Benchmark numbers can be used to state that the square root of 60 is between 6 and 7. The square root of 60, estimated to two decimal places is 7.75.
Why is 60 irrational?
Is 60 a perfect square?
2 Answers By Expert Tutors 60 is not a perfect square, so the answer will still include a radical (a square root of some number). We can simplify the square root of any number, though, if the number has any factors that are perfect squares.
Is 60 a perfect cube?
Is 60 a Perfect Cube? The number 60 on prime factorization gives 2 × 2 × 3 × 5. Here, the prime factor 2 is not in the power of 3. Therefore the cube root of 60 is irrational, hence 60 is not a perfect cube.
Is the square root of 60 an irrational number?
Like we said above, since the square root of 60 is an irrational number, we cannot make it into an exact fraction. However, we can make it into an approximate fraction using the square root of 60 rounded to the nearest hundredth. √ 60 ≈ 7.75/1
Is the number √10 a rational or irrational number?
If the square root is a perfect square, then it would be a rational number. On the other side, if the square root of the number is not perfect, it will be an irrational number. i.e., √10 = 3.16227766017.
Are there any irrational numbers that are real?
In Mathematics, all the irrational numbers are considered as real numbers, which should not be rational numbers. It means that irrational numbers cannot be expressed as the ratio of two numbers. The irrational numbers can be expressed in the form of non-terminating fractions and in different ways.
Is the p / q of √20 an irrational number?
The square roots that are not perfectly square to any of the integer e.g. √8, √20. The p/q value can be further shortened through division and it can be converted into the decimal form The decimals that don’t stop or repeating are irrational number.